James D. McCaffrey

Four Different Techniques to Train a Linear Regression Model Using C#

Posted on April 28, 2026 by jamesdmccaffrey

The goal of a machine learning regression model is to predict a single numeric value. For example, you might want to predict a person’s credit score based on age, annual income, bank account balance, and so on. Common regression techniques include: linear regression, nearest neighbors regression, quadratic regression, kernel ridge regression, neural network regression, random forest regression, and gradient boosting regression. Each technique has pros and cons.

The form of a linear regression model is y’ = (w0 * x0) + (w1 * x1) + . . + b, where y’ is the predicted value, the xi are predictor variables, the wi are constants called weights (or coefficients), and b is a constant called the bias (or intercept). Training is the process of finding good values for the weights and bias so that predicted y values closely match known correct target y values in a set of training data.

There are several techniques that can be used to train a linear regression model. I put together a demo, using the C# language, of four techniques:

1.) left pseudo-inverse via normal equations with Cholesky inverse.
2.) basic stochastic gradient descent (SGD).
3.) relaxed Moore-Penrose pseudo-inverse with QR modified Gram-Schmidt inverse.
4.) relaxed Moore-Penrose pseudo-inverse with SVD Jacobi inverse.

Technique #1 works well for most scenarios, but can fail when the training data has an unfortunate combination of very small and/or very large values. Technique #2 is iterative and works well for most training datasets, even huge datasets, but requires you to specify a maximum number of training iterations and a constant called a learning rate, both of which must be determined by trial and error. Technique #3 can fail for very large datasets but is relatively easy to implement. Technique #4 is very similar to #3, but is less likely to fail for large datasets, but is very complicated to implement.

The output of my demo is:

Begin C# linear regression demo

Loading synthetic train (200) and test (40) data
Done

First three train X:
 -0.1660  0.4406 -0.9998 -0.3953 -0.7065
  0.0776 -0.1616  0.3704 -0.5911  0.7562
 -0.9452  0.3409 -0.1654  0.1174 -0.7192

First three train y:
  0.4840
  0.1568
  0.8054

==========================

1. Training model using left pseudo-inv via
   normal equations (Cholesky)
Done

Weights/coefficients:
-0.2656  0.0333  -0.0454  0.0358  -0.1146
Bias/constant: 0.3619

==========================

2. Training model using SGD
Setting lrnRate = 0.0010
Setting maxEpochs = 1000
epoch =     0  MSE =   0.1132
epoch =   200  MSE =   0.0026
epoch =   400  MSE =   0.0026
epoch =   600  MSE =   0.0026
epoch =   800  MSE =   0.0026
Done

Weights/coefficients:
-0.2656  0.0333  -0.0453  0.0358  -0.1146
Bias/constant: 0.3619

==========================

3. Training model using relaxed Moore-Penrose
   pseudo-inv via QR (Gram-Schmidt)
Done

Weights/coefficients:
-0.2656  0.0333  -0.0454  0.0358  -0.1146
Bias/constant: 0.3619

==========================

4. Training model using relaxed Moore-Penrose
   pseudo-inv via SVD (Jacobi)
Done

Weights/coefficients:
-0.2656  0.0333  -0.0454  0.0358  -0.1146
Bias/constant: 0.3619

==========================

End demo

The demo data is synthetic. There are just 200 training items. There are five predictor variables, so the regression model has five weights and a bias. The output shows that all four training techniques give the same model, meaning the values of the weights and the bias are the same (to four decimal places).

Good fun for me.

Machine learning regression is sort of like finding hidden patterns in datasets. Every cover of Playboy magazine (except for the very first issue in December 1953) has a logo of a bunny head. Sometimes the logo is obvious but sometimes the logo is very cleverly hidden in the cover photo. It’s kind of like a “Where’s Waldo” for adults.

Left: On the July 1982 issue, the bunny logo is sneakily incorporated into the telephone cord.

Right: On the June 1980 issue, the bunny logo is disguised as one of the butterflies.

Demo program. Very long. Replace “lt” (less than), “gt”, “lte”, “gte” with Boolean operator symbols (my blog editor chokes on symbols).

using System;
using System.IO;
using System.Collections.Generic;

namespace LinearRegressionFourTrainingTechniques
{
  internal class LinearRegressionProgram
  {
    static void Main(string[] args)
    {
      Console.WriteLine("\nBegin C# linear regression demo ");

      // 1. load data
      Console.WriteLine("\nLoading synthetic train" +
        " (200) and test (40) data");
      string trainFile =
        "..\\..\\..\\Data\\synthetic_train_200.txt";
      int[] colsX = new int[] { 0, 1, 2, 3, 4 };
      int colY = 5;

      double[][] trainX =
        MatLoad(trainFile, colsX, ',', "#");
      double[] trainY =
        MatToVec(MatLoad(trainFile,
        new int[] { colY }, ',', "#"));

      string testFile =
        "..\\..\\..\\Data\\synthetic_test_40.txt";
      double[][] testX =
        MatLoad(testFile, colsX, ',', "#");
      double[] testY =
        MatToVec(MatLoad(testFile,
        new int[] { colY }, ',', "#"));
      Console.WriteLine("Done ");

      Console.WriteLine("\nFirst three train X: ");
      for (int i = 0; i "lt" 3; ++i)
        VecShow(trainX[i], 4, 8);

      Console.WriteLine("\nFirst three train y: ");
      for (int i = 0; i "lt" 3; ++i)
        Console.WriteLine(trainY[i].ToString("F4").
          PadLeft(8));

      //// 2. create model
      //Console.WriteLine("\nCreating linear " +
      //  "regression model ");
      //LinearRegressor model = new LinearRegressor();
      //Console.WriteLine("Done");

      // 3a. train model using left pseudo-inv
      Console.WriteLine("\n========================== ");
      Console.WriteLine("\n1. Training model using" +
        " left pseudo-inv via normal equations (Cholesky) ");
      LinearRegressor model1 = new LinearRegressor();
      model1.TrainClosed(trainX, trainY);
      Console.WriteLine("Done ");
      Console.WriteLine("\nWeights/coefficients: ");
      for (int i = 0; i "lt" model1.weights.Length; ++i)
        Console.Write(model1.weights[i].ToString("F4") +
          "  ");
      Console.WriteLine("\nBias/constant: " +
        model1.bias.ToString("F4"));

      // 3b. train model using SGD
      Console.WriteLine("\n========================== ");
      Console.WriteLine("\n2. Training model using SGD ");
      LinearRegressor model2 = new LinearRegressor();
      double lrnRate = 0.001;
      int maxEpochs = 1000;
      Console.WriteLine("Setting lrnRate = " +
        lrnRate.ToString("F4"));
      Console.WriteLine("Setting maxEpochs = " +
        maxEpochs);
      model2.TrainSGD(trainX, trainY, lrnRate, maxEpochs);
      Console.WriteLine("Done ");
      Console.WriteLine("\nWeights/coefficients: ");
      for (int i = 0; i "lt" model2.weights.Length; ++i)
        Console.Write(model2.weights[i].ToString("F4") +
          "  ");
      Console.WriteLine("\nBias/constant: " +
        model2.bias.ToString("F4"));

      // 3c. train model using MP pseudo-inv QR
      Console.WriteLine("\n========================== ");
      Console.WriteLine("\n3. Training model using" +
        " relaxed Moore-Penrose pseudo-inv via" +
        " QR (Gram-Schmidt) ");
      LinearRegressor model3 = new LinearRegressor();
      model3.TrainPinvQR(trainX, trainY);
      Console.WriteLine("Done ");
      Console.WriteLine("\nWeights/coefficients: ");
      for (int i = 0; i "lt" model3.weights.Length; ++i)
        Console.Write(model3.weights[i].ToString("F4") +
          "  ");
      Console.WriteLine("\nBias/constant: " +
        model3.bias.ToString("F4"));

      // 3d. train model using MP pseudo-inv SVD
      Console.WriteLine("\n========================== ");
      Console.WriteLine("\n4. Training model using" +
        " relaxed Moore-Penrose pseudo-inv via" +
        " SVD (Jacobi) ");
      LinearRegressor model4 = new LinearRegressor();
      model4.TrainPinvSVD(trainX, trainY);
      Console.WriteLine("Done ");
      Console.WriteLine("\nWeights/coefficients: ");
      for (int i = 0; i "lt" model4.weights.Length; ++i)
        Console.Write(model4.weights[i].ToString("F4") +
          "  ");
      Console.WriteLine("\nBias/constant: " +
        model4.bias.ToString("F4"));

      //// 4. evaluate model
      //Console.WriteLine("\nEvaluating model ");
      //double accTrain = model.Accuracy(trainX, trainY, 0.10);
      //Console.WriteLine("\nAccuracy train (within 0.10) = " +
      //  accTrain.ToString("F4"));
      //double accTest = model.Accuracy(testX, testY, 0.10);
      //Console.WriteLine("Accuracy test (within 0.10) = " +
      //  accTest.ToString("F4"));

      //double mseTrain = model.MSE(trainX, trainY);
      //Console.WriteLine("\nMSE train = " +
      //  mseTrain.ToString("F4"));
      //double mseTest = model.MSE(testX, testY);
      //Console.WriteLine("MSE test = " +
      //  mseTest.ToString("F4"));

      //// 5. use model
      //double[] x = trainX[0];
      //Console.WriteLine("\nPredicting for x = ");
      //VecShow(x, 4, 9);
      //double predY = model.Predict(x);
      //Console.WriteLine("Predicted y = " +
      //  predY.ToString("F4"));

      // 6. TODO: save model weights, bias to text file

      Console.WriteLine("\n========================== ");
      Console.WriteLine("\nEnd demo ");
      Console.ReadLine();
    } // Main

    // ------------------------------------------------------
    // helpers for Main(): MatLoad, MatToVec, VecShow
    // ------------------------------------------------------

    static double[][] MatLoad(string fn, int[] usecols,
      char sep, string comment)
    {
      List"lt"double[]"gt" result = new List"lt"double[]"gt"();
      string line = "";
      FileStream ifs = new FileStream(fn, FileMode.Open);
      StreamReader sr = new StreamReader(ifs);
      while ((line = sr.ReadLine()) != null)
      {
        if (line.StartsWith(comment) == true)
          continue;
        string[] tokens = line.Split(sep);
        List"lt"double"gt" lst = new List"lt"double"gt"();
        for (int j = 0; j "lt" usecols.Length; ++j)
          lst.Add(double.Parse(tokens[usecols[j]]));
        double[] row = lst.ToArray();
        result.Add(row);
      }
      sr.Close(); ifs.Close();
      return result.ToArray();
    }

    static double[] MatToVec(double[][] mat)
    {
      int nRows = mat.Length;
      int nCols = mat[0].Length;
      double[] result = new double[nRows * nCols];
      int k = 0;
      for (int i = 0; i "lt" nRows; ++i)
        for (int j = 0; j "lt" nCols; ++j)
          result[k++] = mat[i][j];
      return result;
    }

    static void VecShow(double[] vec, int dec, int wid)
    {
      for (int i = 0; i "lt" vec.Length; ++i)
        Console.Write(vec[i].ToString("F" + dec).
          PadLeft(wid));
      Console.WriteLine("");
    }
  } // class Program

  // ========================================================

  public class LinearRegressor
  {
    public double[] weights;
    public double bias;
    private Random rnd;

    public LinearRegressor(int seed = 0)
    {
      this.weights = new double[0]; // quasi-null
      this.bias = 0.0;
      this.rnd = new Random(seed);
    }

    // ------------------------------------------------------

    public double Predict(double[] x)
    {
      double result = 0.0;
      for (int j = 0; j "lt" x.Length; ++j)
        result += x[j] * this.weights[j];
      result += this.bias;
      return result;
    }

    // ------------------------------------------------------

    public double Accuracy(double[][] dataX, double[] dataY,
      double pctClose)
    {
      int numCorrect = 0; int numWrong = 0;
      for (int i = 0; i "lt" dataX.Length; ++i)
      {
        double actualY = dataY[i];
        double predY = this.Predict(dataX[i]);
        if (Math.Abs(predY - actualY) "lt"
          Math.Abs(pctClose * actualY))
          ++numCorrect;
        else
          ++numWrong;
      }
      return (numCorrect * 1.0) / (numWrong + numCorrect);
    }

    // ------------------------------------------------------

    public double MSE(double[][] dataX, double[] dataY)
    {
      int n = dataX.Length;
      double sum = 0.0;
      for (int i = 0; i "lt" n; ++i)
      {
        double actualY = dataY[i];
        double predY = this.Predict(dataX[i]);
        sum += (actualY - predY) * (actualY - predY);
      }
      return sum / n;
    }

    // ------------------------------------------------------

    public void TrainClosed(double[][] trainX,
      double[] trainY)
    {
      // train using left pinv via normal equations
      // can fail for very large trainX (then use SGD)
      int dim = trainX[0].Length;
      this.weights = new double[dim];

      double[][] X = Cholesky.MatToDesign(trainX);
      double[][] Xpinv = Cholesky.MatPseudoInv(X);
      double[] biasAndWts = 
        Cholesky.MatVecProduct(Xpinv, trainY);
      this.bias = biasAndWts[0];
      for (int i = 1; i "lt" biasAndWts.Length; ++i)
        this.weights[i - 1] = biasAndWts[i];
      return;
    }

    // ------------------------------------------------------

    public void TrainSGD(double[][] trainX, double[] trainY,
      double lrnRate, int maxEpochs)
    {
      int n = trainX.Length;
      int dim = trainX[0].Length;
      this.weights = new double[dim];
      double lo = -0.01; double hi = 0.01;
      for (int i = 0; i "lt" dim; ++i)
        this.weights[i] = (hi - lo) *
          this.rnd.NextDouble() + lo;
      this.bias = (hi - lo) *
          this.rnd.NextDouble() + lo;

      int[] indices = new int[n];
      for (int i = 0; i "lt" n; ++i)
        indices[i] = i;

      for (int epoch = 0; epoch "lt" maxEpochs; ++epoch)
      {
        Shuffle(indices, this.rnd);
        for (int i = 0; i "lt" n; ++i)
        {
          int ii = indices[i];
          double[] x = trainX[ii];
          double actualY = trainY[ii];
          double predY = this.Predict(x);

          for (int j = 0; j "lt" dim; ++j)
            this.weights[j] -= lrnRate *
              (predY - actualY) * x[j];
          this.bias -= lrnRate * (predY - actualY);
        }
        if (epoch % (int)(maxEpochs / 5) == 0)
        {
          double mse = this.MSE(trainX, trainY);
          string s1 = "epoch = " + 
            epoch.ToString().PadLeft(5);
          string s2 = "  MSE = " + 
            mse.ToString("F4").PadLeft(8);
          Console.WriteLine(s1 + s2);
        }
      }
    } // TrainSGD()

    // ------------------------------------------------------

    private static void Shuffle(int[] indices, Random rnd)
    {
      // helper for TrainSGD()
      int n = indices.Length;
      for (int i = 0; i "lt" n; ++i)
      {
        int ri = rnd.Next(i, n);
        int tmp = indices[i];
        indices[i] = indices[ri];
        indices[ri] = tmp;
      }
    }

    // ------------------------------------------------------

    public void TrainPinvQR(double[][] trainX, double[] trainY)
    {
      // train using relaxed Moore-Penrose pinv, via
      // QR inverse, via QR decomp, via modified Gram-Schmidt

      int dim = trainX[0].Length;
      this.weights = new double[dim];

      double[][] X = QR_GramSchmidt.MatToDesign(trainX);
      double[][] Xpinv = QR_GramSchmidt.MatPseudoInv(X);
      double[] biasAndWts = 
        QR_GramSchmidt.MatVecProduct(Xpinv, trainY);
      this.bias = biasAndWts[0];
      for (int i = 1; i "lt" biasAndWts.Length; ++i)
        this.weights[i - 1] = biasAndWts[i];
      return;
    }

    // ------------------------------------------------------

    public void TrainPinvSVD(double[][] trainX, double[] trainY)
    {
      // train using relaxed Moore-Penrose pinv, via
      // SVD inverse, via SVD decomp, via Jacobi

      int dim = trainX[0].Length;
      this.weights = new double[dim];

      double[][] X = SVD_Jacobi.MatToDesign(trainX);
      double[][] Xpinv = SVD_Jacobi.MatPseudoInv(X);
      double[] biasAndWts = 
        SVD_Jacobi.MatVecProduct(Xpinv, trainY);
      this.bias = biasAndWts[0];
      for (int i = 1; i "lt" biasAndWts.Length; ++i)
        this.weights[i - 1] = biasAndWts[i];
      return;
    }

    // ------------------------------------------------------

  } // class LinearRegressor

  // ========================================================

  public class Cholesky
  {
    // container class for MatPseudoInv(), used in Train()
    // left pseudo-inv via normal equations

    public static double[][] MatPseudoInv(double[][] A)
    {
      // left pseudo-inverse via normal equations
      // A is design matrix where nRows must be gte nCols
      // pinv = inv(At * A) * A
      // calls MatInvCholesky, calls MatDecompCholesky
      double[][] At = MatTranspose(A);
      double[][] AtA = MatProduct(At, A);
      for (int i = 0; i "lt" AtA.Length; ++i)
        AtA[i][i] += 1.0e-8; /// condition before inv
      double[][] AtAinv = MatInvCholesky(AtA);
      double[][] pinv = MatProduct(AtAinv, At);
      return pinv;
    }

    // ------------------------------------------------------

    public static double[][] MatToDesign(double[][] X)
    {
      // utility function
      // construct design matrix from X (add col of 1.0s)
      int nRows = X.Length; // aka m
      int nCols = X[0].Length; // n
      
      double[][] result = MatMake(nRows, nCols + 1);
      for (int i = 0; i "lt" nRows; ++i)
      {
        result[i][0] = 1.0;
        for (int j = 1; j "lt" nCols + 1; ++j)
          result[i][j] = X[i][j - 1];
      }
      return result;
    }

    // ------------------------------------------------------

    public static double[] MatVecProduct(double[][] M,
      double[] v)
    {
      // M * v. return a regular vector
      int nRows = M.Length;
      int nCols = M[0].Length;
      int n = v.Length;
      if (nCols != n)
        throw new Exception("non-conform in MatVecProd");

      double[] result = new double[nRows];
      for (int i = 0; i "lt" nRows; ++i)
        for (int k = 0; k "lt" nCols; ++k)
          result[i] += M[i][k] * v[k];

      return result;
    }

    // ------------------------------------------------------

    private static double[][] MatInvCholesky(double[][] A)
    {
      // A must be square, symmetric, positive definite
      // calls MatDecompCholesky()
      int m = A.Length;
      int n = A[0].Length;  // m == n
      double[][] L = MatDecompCholesky(A); // L * Lt = A

      double[][] result = MatMake(n, n); // Identity
      for (int i = 0; i "lt" n; ++i)
        result[i][i] = 1.0;

      for (int k = 0; k "lt" n; ++k)
      {
        for (int j = 0; j "lt" n; j++)
        {
          for (int i = 0; i "lt" k; i++)
          {
            result[k][j] -= result[i][j] * L[k][i];
          }
          result[k][j] /= L[k][k];
        }
      }

      for (int k = n - 1; k "gte" 0; --k)
      {
        for (int j = 0; j "lt" n; j++)
        {
          for (int i = k + 1; i "lt" n; i++)
          {
            result[k][j] -= result[i][j] * L[i][k];
          }
          result[k][j] /= L[k][k];
        }
      }
      return result;
    }

    // ----------------------------------------------------

    private static double[][] MatDecompCholesky(double[][] A)
    {
      // decompose A to L such that L * Lt = A
      // A must be square
      int m = A.Length; int n = A[0].Length;  // m == n
      double[][] L = MatMake(n, n);  // or m

      for (int i = 0; i "lt" n; ++i)
      {
        for (int j = 0; j "lte" i; ++j)
        {
          double sum = 0.0;
          for (int k = 0; k "lt" j; ++k)
            sum += L[i][k] * L[j][k];
          if (i == j)
          {
            double tmp = A[i][i] - sum;
            if (tmp "lt" 0.0)
              throw new
                Exception("decomp Cholesky fatal");
            L[i][j] = Math.Sqrt(tmp);
          }
          else
          {
            if (L[j][j] == 0.0)
              throw new
                Exception("decomp Cholesky fatal ");
            L[i][j] = (A[i][j] - sum) / L[j][j];
          }
        } // j
      } // i

      return L;
    }

    // ----------------------------------------------------
    // helpers: MatMake, MatTranspose, MatProduct
    // ----------------------------------------------------

    private static double[][] MatMake(int nRows, int nCols)
    {
      double[][] result = new double[nRows][];
      for (int i = 0; i "lt" nRows; ++i)
        result[i] = new double[nCols];
      return result;
    }

    // ------------------------------------------------------

    private static double[][] MatTranspose(double[][] M)
    {
      int nr = M.Length; int nc = M[0].Length;
      double[][] result = new double[nc][]; // note
      for (int i = 0; i "lt" nc; ++i)
        result[i] = new double[nr];
      for (int i = 0; i "lt" nr; ++i)
        for (int j = 0; j "lt" nc; ++j)
          result[j][i] = M[i][j]; // note
      return result;
    }

    // ````````````````````````````````````````````````````

    private static double[][] MatProduct(double[][] A,
      double[][] B)
    {
      int aRows = A.Length; int aCols = A[0].Length;
      int bRows = B.Length; int bCols = B[0].Length;
      if (aCols != bRows)
        throw new Exception("Non-conformable matrices");

      double[][] result = new double[aRows][];
      for (int i = 0; i "lt" aRows; ++i)
        result[i] = new double[bCols];

      for (int i = 0; i "lt" aRows; ++i) // each row of A
        for (int j = 0; j "lt" bCols; ++j) // each col of B
          for (int k = 0; k "lt" aCols; ++k)
            result[i][j] += A[i][k] * B[k][j];
      return result;
    }

    // ------------------------------------------------------

  } // class Cholesky

  // ========================================================

  public class QR_GramSchmidt
  {
    public static double[][] MatPseudoInv(double[][] A)
    {
      // relaxed Moore-Penrose pseudo-inv via QR
      // decomposition, modified Gram-Schmidt algorithm
      // A is design matrix where nRows must be gte nCols
      // pinv = inv(R) * inv(Q)

      int nr = A.Length;
      int nc = A[0].Length; // aka m, n
      if (nr "lt" nc)
        Console.WriteLine("ERROR: Works only m "gte" n");

      double[][] Q; double[][] R;
      MatDecompQR(A, out Q, out R); // Gram-Schmidt
      double[][] Rinv = MatInvUpperTri(R); // std algo
      double[][] Qinv = MatTranspose(Q);  // is inv(Q)
      double[][] pinv = MatProduct(Rinv, Qinv);
      return pinv;
    }

    // ------------------------------------------------------

    public static double[][] MatToDesign(double[][] X)
    {
      // utility function
      // construct design matrix from X (add col of 1.0s)
      int nRows = X.Length; // aka m
      int nCols = X[0].Length; // n
      
      double[][] result = MatMake(nRows, nCols + 1);
      for (int i = 0; i "lt" nRows; ++i)
      {
        result[i][0] = 1.0;
        for (int j = 1; j "lt" nCols + 1; ++j)
          result[i][j] = X[i][j - 1];
      }
      return result;
    }

    // ------------------------------------------------------

    public static double[] MatVecProduct(double[][] M,
      double[] v)
    {
      // M * v. return a regular vector
      int nRows = M.Length;
      int nCols = M[0].Length;
      int n = v.Length;
      if (nCols != n)
        throw new Exception("non-conform in MatVecProd");

      double[] result = new double[nRows];
      for (int i = 0; i "lt" nRows; ++i)
        for (int k = 0; k "lt" nCols; ++k)
          result[i] += M[i][k] * v[k];

      return result;
    }

    // ------------------------------------------------------

    private static void MatDecompQR(double[][] A,
      out double[][] Q, out double[][] R)
    {
      // QR decomposition, modified Gram-Schmidt
      // 'reduced' mode (for machine learning scenarios)
      int m = A.Length; 
      int n = A[0].Length;
      if (m "lt" n)
        throw new Exception("m must be gte n ");

      double[][] QQ = new double[m][];  // working Q mxn
      for (int i = 0; i "lt" m; ++i)
        QQ[i] = new double[n];

      double[][] RR = new double[n][];  // working R nxn
      for (int i = 0; i "lt" n; ++i)
        RR[i] = new double[n];

      for (int k = 0; k "lt" n; ++k) // main loop each col
      {
        double[] v = new double[m];
        for (int i = 0; i "lt" m; ++i)  // col k
          v[i] = A[i][k];
        for (int j = 0; j "lt" k; ++j)  // inner loop
        {
          double[] colj = new double[QQ.Length];
          for (int i = 0; i "lt" colj.Length; ++i)
            colj[i] = QQ[i][j];

          double vecdot = 0.0;
          for (int i = 0; i "lt" colj.Length; ++i)
            vecdot += colj[i] * v[i];
          RR[j][k] = vecdot;

          // v = v - (R[j, k] * Q[:, j])
          for (int i = 0; i "lt" v.Length; ++i)
            v[i] = v[i] - (RR[j][k] * QQ[i][j]);
        } // j

        double normv = 0.0;
        for (int i = 0; i "lt" v.Length; ++i)
          normv += v[i] * v[i];
        normv = Math.Sqrt(normv);
        RR[k][k] = normv;

        // Q[:, k] = v / R[k, k]
        for (int i = 0; i "lt" QQ.Length; ++i)
          QQ[i][k] = v[i] / (RR[k][k] + 1.0e-12);

      } // k

      Q = QQ;
      R = RR;
    }

    // ------------------------------------------------------

    private static double[][] MatInvUpperTri(double[][] A)
    {
      // used to invert R from QR
      int n = A.Length;  // must be square matrix
      double[][] result = MatIdentity(n);

      for (int k = 0; k "lt" n; ++k)
      {
        for (int j = 0; j "lt" n; ++j)
        {
          for (int i = 0; i "lt" k; ++i)
          {
            result[j][k] -= result[j][i] * A[i][k];
          }
          result[j][k] /= (A[k][k] + 1.0e-8); // avoid 0
        }
      }
      return result;
    }

    // ------------------------------------------------------

    private static double[][] MatTranspose(double[][] M)
    {
      int nRows = M.Length; int nCols = M[0].Length;
      double[][] result = MatMake(nCols, nRows);  // note
      for (int i = 0; i "lt" nRows; ++i)
        for (int j = 0; j "lt" nCols; ++j)
          result[j][i] = M[i][j];
      return result;
    }

    // ------------------------------------------------------

    private static double[][] MatMake(int nRows, int nCols)
    {
      double[][] result = new double[nRows][];
      for (int i = 0; i "lt" nRows; ++i)
        result[i] = new double[nCols];
      return result;
    }

    // ------------------------------------------------------

    private static double[][] MatIdentity(int n)
    {
      double[][] result = MatMake(n, n);
      for (int i = 0; i "lt" n; ++i)
        result[i][i] = 1.0;
      return result;
    }

    // ------------------------------------------------------

    private static double[][] MatProduct(double[][] A,
      double[][] B)
    {
      int aRows = A.Length; int aCols = A[0].Length;
      int bRows = B.Length; int bCols = B[0].Length;
      if (aCols != bRows)
        throw new Exception("Non-conformable matrices");

      double[][] result = MatMake(aRows, bCols);

      for (int i = 0; i "lt" aRows; ++i) // each row of A
        for (int j = 0; j "lt" bCols; ++j) // each col of B
          for (int k = 0; k "lt" aCols; ++k)
            result[i][j] += A[i][k] * B[k][j];

      return result;
    }

  } // class QR_GramSchmidt

  // ========================================================

  public class SVD_Jacobi
  {
    public static double[][] MatPseudoInv(double[][] A)
    {
      double[][] U; double[] s; double[][] Vh;
      MatDecompSVD_Jacobi(A, out U, out s, out Vh);

      double[][] Uh = MatTranspose(U);
      double[][] V = MatTranspose(Vh);

      double[][] S = MatMake(s.Length, s.Length);
      for (int i = 0; i "lt" s.Length; ++i)
        S[i][i] = 1.0 / (s[i] + 1.0e-12); // avoid div by 0
 
      double[][] result = MatProduct(V, MatProduct(S, Uh));
      return result;
    }

    // ------------------------------------------------------

    public static double[][] MatToDesign(double[][] X)
    {
      // utility function
      // construct design matrix from X (add col of 1.0s)
      int nRows = X.Length; // aka m
      int nCols = X[0].Length; // n
      
      double[][] result = MatMake(nRows, nCols + 1);
      for (int i = 0; i "lt" nRows; ++i)
      {
        result[i][0] = 1.0;
        for (int j = 1; j "lt" nCols + 1; ++j)
          result[i][j] = X[i][j - 1];
      }
      return result;
    }

    // ------------------------------------------------------

    public static double[] MatVecProduct(double[][] M,
      double[] v)
    {
      // M * v. return a regular vector
      int nRows = M.Length;
      int nCols = M[0].Length;
      int n = v.Length;
      if (nCols != n)
        throw new Exception("non-conform in MatVecProd");

      double[] result = new double[nRows];
      for (int i = 0; i "lt" nRows; ++i)
        for (int k = 0; k "lt" nCols; ++k)
          result[i] += M[i][k] * v[k];

      return result;
    }

    // ------------------------------------------------------

    public static void MatDecompSVD_Jacobi(double[][] M,
      out double[][] U, out double[] s, out double[][] Vh)
    {
      // see references above
      double epsilon = 1.0e-15;

      double[][] A = MatCopyOf(M); // working U
      int m = A.Length; int n = A[0].Length;
      double[][] Q = MatIdentity(n); // working V
      double[] sv = new double[n];  // working s

      // initialize counters
      int count = 1;
      int pass = 0;
      double tolerance = 10 * m * epsilon; // heuristic

      // always do at least 12 sweeps
      int passMax = Math.Max(5 * n, 12); // heuristic

      // store the column error estimates for use
      // during orthogonalization

      for (int j = 0; j "lt" n; ++j)
      {
        double[] cj = MatGetColumn(A, j);
        double sj = VecNorm(cj);
        sv[j] = epsilon * sj;
      }

      // orthogonalize A using plane rotations
      while (count "gt" 0 && pass "lte" passMax)
      {
        // initialize rotation counter
        count = n * (n - 1) / 2;

        for (int j = 0; j "lt" n - 1; ++j)
        {
          for (int k = j + 1; k "lt" n; ++k)
          {
            double cosine, sine;

            double[] cj = MatGetColumn(A, j);
            double[] ck = MatGetColumn(A, k);

            double p = 2.0 * VecDot(cj, ck);
            double a = VecNorm(cj);
            double b = VecNorm(ck);

            double q = a * a - b * b;
            double v = Hypot(p, q);

            // test for columns j,k orthogonal,
            // or dominant errors 
            double abserr_a = sv[j];
            double abserr_b = sv[k];

            bool sorted = (a "gte" b);
            bool orthog = (Math.Abs(p) "lte"
              tolerance * (a * b));
            bool bada = (a "lt" abserr_a);
            bool badb = (b "lt" abserr_b);

            if (sorted == true && (orthog == true ||
              bada == true || badb == true))
            {
              --count;
              continue;
            }

            // calculate rotation angles
            if (v == 0 || sorted == false)
            {
              cosine = 0.0; sine = 1.0;
            }
            else
            {
              cosine = Math.Sqrt((v + q) / (2.0 * v));
              sine = p / (2.0 * v * cosine);
            }

            // apply rotation to A (working U)
            for (int i = 0; i "lt" m; ++i)
            {
              double Aik = A[i][k];
              double Aij = A[i][j];
              A[i][j] = Aij * cosine + Aik * sine;
              A[i][k] = -Aij * sine + Aik * cosine;
            }

            // update singular values
            sv[j] = Math.Abs(cosine) * abserr_a +
              Math.Abs(sine) * abserr_b;
            sv[k] = Math.Abs(sine) * abserr_a +
              Math.Abs(cosine) * abserr_b;

            // apply rotation to Q (working V)
            for (int i = 0; i "lt" n; ++i)
            {
              double Qij = Q[i][j];
              double Qik = Q[i][k];
              Q[i][j] = Qij * cosine + Qik * sine;
              Q[i][k] = -Qij * sine + Qik * cosine;
            } // i
          } // k
        } // j

        ++pass;
      } // while

      //  compute singular values
      double prevNorm = -1.0;

      for (int j = 0; j "lt" n; ++j)
      {
        double[] column = MatGetColumn(A, j);
        double norm = VecNorm(column);

        // determine if singular value is zero
        if (norm == 0.0 || prevNorm == 0.0
          || (j "gt" 0 &&
            norm "lte" tolerance * prevNorm))
        {
          sv[j] = 0.0;
          for (int i = 0; i "lt" m; ++i)
            A[i][j] = 0.0;
          prevNorm = 0.0;
        }
        else
        {
          sv[j] = norm;
          for (int i = 0; i "lt" m; ++i)
            A[i][j] = A[i][j] * 1.0 / norm;
          prevNorm = norm;
        }
      }

      if (count "gt" 0)
      {
        Console.WriteLine("Jacobi iterations did not" +
          " converge");
      }

      U = A;
      Vh = MatTranspose(Q);
      s = sv;

      // to sync with np.linalg.svd() full_matrices=False
      // shapes and allow U*S*Vh:
      // if m "lt" n, extract 1st m columns of U
      //   extract 1st m values of s
      //   extract 1st m rows of Vh

      if (m "lt" n)
      {
        U = MatExtractFirstColumns(U, m);
        s = VecExtractFirst(s, m);
        Vh = MatExtractFirstRows(Vh, m);
      }

    } // MatDecompSVD_Jacobi()

    // ------------------------------------------------------

    // === helper functions =================================
    //
    // MatMake, MatCopy, MatIdentity, MatGetColumn,
    // MatExtractFirstColumns, MatExtractFirstRows,
    // MatTranspose, MatProduct, VecNorm, VecDot,
    // Hypot, VecExtractFirst
    //
    // ======================================================

    private static double[][] MatMake(int nRows, int nCols)
    {
      double[][] result = new double[nRows][];
      for (int i = 0; i "lt" nRows; ++i)
        result[i] = new double[nCols];
      return result;
    }

    // ------------------------------------------------------

    private static double[][] MatCopyOf(double[][] M)
    {
      int nr = M.Length; int nc = M[0].Length;
      double[][] result = MatMake(nr, nc);
      for (int i = 0; i "lt" nr; ++i)
        for (int j = 0; j "lt" nc; ++j)
          result[i][j] = M[i][j];
      return result;
    }

    // ------------------------------------------------------

    private static double[][] MatIdentity(int n)
    {
      double[][] result = MatMake(n, n);
      for (int i = 0; i "lt" n; ++i)
        result[i][i] = 1.0;
      return result;
    }

    // ------------------------------------------------------

    private static double[] MatGetColumn(double[][] M, int j)
    {
      int nRows = M.Length;
      double[] result = new double[nRows];
      for (int i = 0; i "lt" nRows; ++i)
        result[i] = M[i][j];
      return result;
    }

    // ------------------------------------------------------

    private static double[][] 
      MatExtractFirstColumns(double[][] M, int n)
    {
      int nRows = M.Length;
      double[][] result = MatMake(nRows, n);
      for (int i = 0; i "lt" nRows; ++i)
        for (int j = 0; j "lt" n; ++j)
          result[i][j] = M[i][j];
      return result;
    }

    // ------------------------------------------------------

    private static double[][] 
      MatExtractFirstRows(double[][] M, int n)
    {
      int nCols = M[0].Length;
      double[][] result = MatMake(n, nCols);
      for (int i = 0; i "lt" n; ++i)
        for (int j = 0; j "lt" nCols; ++j)
          result[i][j] = M[i][j];
      return result;
    }

    // ------------------------------------------------------

    private static double[][] MatTranspose(double[][] M)
    {
      int nRows = M.Length;
      int nCols = M[0].Length;
      double[][] result = MatMake(nCols, nRows);
      for (int i = 0; i "lt" nRows; ++i)
        for (int j = 0; j "lt" nCols; ++j)
          result[j][i] = M[i][j];
      return result;
    }

    // ------------------------------------------------------

    private static double[][] MatProduct(double[][] A,
      double[][] B)
    {
      int aRows = A.Length;
      int aCols = A[0].Length;
      int bRows = B.Length;
      int bCols = B[0].Length;
      if (aCols != bRows)
        throw new Exception("Non-conformable matrices");

      double[][] result = MatMake(aRows, bCols);

      for (int i = 0; i "lt" aRows; ++i)
        for (int j = 0; j "lt" bCols; ++j)
          for (int k = 0; k "lt" aCols; ++k)
            result[i][j] += A[i][k] * B[k][j];

      return result;
    }

    // ------------------------------------------------------

    private static double VecNorm(double[] v)
    {
      double sum = 0.0;
      int n = v.Length;
      for (int i = 0; i "lt" n; ++i)
        sum += v[i] * v[i];
      return Math.Sqrt(sum);
    }

    // ------------------------------------------------------

    private static double VecDot(double[] v1, double[] v2)
    {
      int n = v1.Length;
      double sum = 0.0;
      for (int i = 0; i "lt" n; ++i)
        sum += v1[i] * v2[i];
      return sum;
    }

    // ------------------------------------------------------

    private static double Hypot(double x, double y)
    {
      // fancy sqrt(x^2 + y^2)  std technique
      double xabs = Math.Abs(x);
      double yabs = Math.Abs(y);
      double min, max;

      if (xabs "lt" yabs)
      {
        min = xabs; max = yabs;
      }
      else
      {
        min = yabs; max = xabs;
      }

      if (min == 0)
        return max;

      double u = min / max;
      return max * Math.Sqrt(1 + u * u);
    }

    // ------------------------------------------------------

    private static double[] VecExtractFirst(double[] v,
      int n)
    {
      double[] result = new double[n];
      for (int i = 0; i "lt" n; ++i)
        result[i] = v[i];
      return result;
    }

    // ------------------------------------------------------

  } // class SVD_Jacobi

  // ========================================================

} // ns

Training data:

# synthetic_train_200.txt
#
-0.1660,  0.4406, -0.9998, -0.3953, -0.7065,  0.4840
 0.0776, -0.1616,  0.3704, -0.5911,  0.7562,  0.1568
-0.9452,  0.3409, -0.1654,  0.1174, -0.7192,  0.8054
 0.9365, -0.3732,  0.3846,  0.7528,  0.7892,  0.1345
-0.8299, -0.9219, -0.6603,  0.7563, -0.8033,  0.7955
 0.0663,  0.3838, -0.3690,  0.3730,  0.6693,  0.3206
-0.9634,  0.5003,  0.9777,  0.4963, -0.4391,  0.7377
-0.1042,  0.8172, -0.4128, -0.4244, -0.7399,  0.4801
-0.9613,  0.3577, -0.5767, -0.4689, -0.0169,  0.6861
-0.7065,  0.1786,  0.3995, -0.7953, -0.1719,  0.5569
 0.3888, -0.1716, -0.9001,  0.0718,  0.3276,  0.2500
 0.1731,  0.8068, -0.7251, -0.7214,  0.6148,  0.3297
-0.2046, -0.6693,  0.8550, -0.3045,  0.5016,  0.2129
 0.2473,  0.5019, -0.3022, -0.4601,  0.7918,  0.2613
-0.1438,  0.9297,  0.3269,  0.2434, -0.7705,  0.5171
 0.1568, -0.1837, -0.5259,  0.8068,  0.1474,  0.3307
-0.9943,  0.2343, -0.3467,  0.0541,  0.7719,  0.5581
 0.2467, -0.9684,  0.8589,  0.3818,  0.9946,  0.1092
-0.6553, -0.7257,  0.8652,  0.3936, -0.8680,  0.7018
 0.8460,  0.4230, -0.7515, -0.9602, -0.9476,  0.1996
-0.9434, -0.5076,  0.7201,  0.0777,  0.1056,  0.5664
 0.9392,  0.1221, -0.9627,  0.6013, -0.5341,  0.1533
 0.6142, -0.2243,  0.7271,  0.4942,  0.1125,  0.1661
 0.4260,  0.1194, -0.9749, -0.8561,  0.9346,  0.2230
 0.1362, -0.5934, -0.4953,  0.4877, -0.6091,  0.3810
 0.6937, -0.5203, -0.0125,  0.2399,  0.6580,  0.1460
-0.6864, -0.9628, -0.8600, -0.0273,  0.2127,  0.5387
 0.9772,  0.1595, -0.2397,  0.1019,  0.4907,  0.1611
 0.3385, -0.4702, -0.8673, -0.2598,  0.2594,  0.2270
-0.8669, -0.4794,  0.6095, -0.6131,  0.2789,  0.4700
 0.0493,  0.8496, -0.4734, -0.8681,  0.4701,  0.3516
 0.8639, -0.9721, -0.5313,  0.2336,  0.8980,  0.1412
 0.9004,  0.1133,  0.8312,  0.2831, -0.2200,  0.1782
 0.0991,  0.8524,  0.8375, -0.2102,  0.9265,  0.2150
-0.6521, -0.7473, -0.7298,  0.0113, -0.9570,  0.7422
 0.6190, -0.3105,  0.8802,  0.1640,  0.7577,  0.1056
 0.6895,  0.8108, -0.0802,  0.0927,  0.5972,  0.2214
 0.1982, -0.9689,  0.1870, -0.1326,  0.6147,  0.1310
-0.3695,  0.7858,  0.1557, -0.6320,  0.5759,  0.3773
-0.1596,  0.3581,  0.8372, -0.9992,  0.9535,  0.2071
-0.2468,  0.9476,  0.2094,  0.6577,  0.1494,  0.4132
 0.1737,  0.5000,  0.7166,  0.5102,  0.3961,  0.2611
 0.7290, -0.3546,  0.3416, -0.0983, -0.2358,  0.1332
-0.3652,  0.2438, -0.1395,  0.9476,  0.3556,  0.4170
-0.6029, -0.1466, -0.3133,  0.5953,  0.7600,  0.4334
-0.4596, -0.4953,  0.7098,  0.0554,  0.6043,  0.2775
 0.1450,  0.4663,  0.0380,  0.5418,  0.1377,  0.2931
-0.8636, -0.2442, -0.8407,  0.9656, -0.6368,  0.7429
 0.6237,  0.7499,  0.3768,  0.1390, -0.6781,  0.2185
-0.5499,  0.1850, -0.3755,  0.8326,  0.8193,  0.4399
-0.4858, -0.7782, -0.6141, -0.0008,  0.4572,  0.4197
 0.7033, -0.1683,  0.2334, -0.5327, -0.7961,  0.1776
 0.0317, -0.0457, -0.6947,  0.2436,  0.0880,  0.3345
 0.5031, -0.5559,  0.0387,  0.5706, -0.9553,  0.3107
-0.3513,  0.7458,  0.6894,  0.0769,  0.7332,  0.3170
 0.2205,  0.5992, -0.9309,  0.5405,  0.4635,  0.3532
-0.4806, -0.4859,  0.2646, -0.3094,  0.5932,  0.3202
 0.9809, -0.3995, -0.7140,  0.8026,  0.0831,  0.1600
 0.9495,  0.2732,  0.9878,  0.0921,  0.0529,  0.1289
-0.9476, -0.6792,  0.4913, -0.9392, -0.2669,  0.5966
 0.7247,  0.3854,  0.3819, -0.6227, -0.1162,  0.1550
-0.5922, -0.5045, -0.4757,  0.5003, -0.0860,  0.5863
-0.8861,  0.0170, -0.5761,  0.5972, -0.4053,  0.7301
 0.6877, -0.2380,  0.4997,  0.0223,  0.0819,  0.1404
 0.9189,  0.6079, -0.9354,  0.4188, -0.0700,  0.1907
-0.1428, -0.7820,  0.2676,  0.6059,  0.3936,  0.2790
 0.5324, -0.3151,  0.6917, -0.1425,  0.6480,  0.1071
-0.8432, -0.9633, -0.8666, -0.0828, -0.7733,  0.7784
-0.9444,  0.5097, -0.2103,  0.4939, -0.0952,  0.6787
-0.0520,  0.6063, -0.1952,  0.8094, -0.9259,  0.4836
 0.5477, -0.7487,  0.2370, -0.9793,  0.0773,  0.1241
 0.2450,  0.8116,  0.9799,  0.4222,  0.4636,  0.2355
 0.8186, -0.1983, -0.5003, -0.6531, -0.7611,  0.1511
-0.4714,  0.6382, -0.3788,  0.9648, -0.4667,  0.5950
 0.0673, -0.3711,  0.8215, -0.2669, -0.1328,  0.2677
-0.9381,  0.4338,  0.7820, -0.9454,  0.0441,  0.5518
-0.3480,  0.7190,  0.1170,  0.3805, -0.0943,  0.4724
-0.9813,  0.1535, -0.3771,  0.0345,  0.8328,  0.5438
-0.1471, -0.5052, -0.2574,  0.8637,  0.8737,  0.3042
-0.5454, -0.3712, -0.6505,  0.2142, -0.1728,  0.5783
 0.6327, -0.6297,  0.4038, -0.5193,  0.1484,  0.1153
-0.5424,  0.3282, -0.0055,  0.0380, -0.6506,  0.6613
 0.1414,  0.9935,  0.6337,  0.1887,  0.9520,  0.2540
-0.9351, -0.8128, -0.8693, -0.0965, -0.2491,  0.7353
 0.9507, -0.6640,  0.9456,  0.5349,  0.6485,  0.1059
-0.0462, -0.9737, -0.2940, -0.0159,  0.4602,  0.2606
-0.0627, -0.0852, -0.7247, -0.9782,  0.5166,  0.2977
 0.0478,  0.5098, -0.0723, -0.7504, -0.3750,  0.3335
 0.0090,  0.3477,  0.5403, -0.7393, -0.9542,  0.4415
-0.9748,  0.3449,  0.3736, -0.1015,  0.8296,  0.4358
 0.2887, -0.9895, -0.0311,  0.7186,  0.6608,  0.2057
 0.1570, -0.4518,  0.1211,  0.3435, -0.2951,  0.3244
 0.7117, -0.6099,  0.4946, -0.4208,  0.5476,  0.1096
-0.2929, -0.5726,  0.5346, -0.3827,  0.4665,  0.2465
 0.4889, -0.5572, -0.5718, -0.6021, -0.7150,  0.2163
-0.7782,  0.3491,  0.5996, -0.8389, -0.5366,  0.6516
-0.5847,  0.8347,  0.4226,  0.1078, -0.3910,  0.6134
 0.8469,  0.4121, -0.0439, -0.7476,  0.9521,  0.1571
-0.6803, -0.5948, -0.1376, -0.1916, -0.7065,  0.7156
 0.2878,  0.5086, -0.5785,  0.2019,  0.4979,  0.2980
 0.2764,  0.1943, -0.4090,  0.4632,  0.8906,  0.2960
-0.8877,  0.6705, -0.6155, -0.2098, -0.3998,  0.7107
-0.8398,  0.8093, -0.2597,  0.0614, -0.0118,  0.6502
-0.8476,  0.0158, -0.4769, -0.2859, -0.7839,  0.7715
 0.5751, -0.7868,  0.9714, -0.6457,  0.1448,  0.1175
 0.4802, -0.7001,  0.1022, -0.5668,  0.5184,  0.1090
 0.4458, -0.6469,  0.7239, -0.9604,  0.7205,  0.0779
 0.5175,  0.4339,  0.9747, -0.4438, -0.9924,  0.2879
 0.8678,  0.7158,  0.4577,  0.0334,  0.4139,  0.1678
 0.5406,  0.5012,  0.2264, -0.1963,  0.3946,  0.2088
-0.9938,  0.5498,  0.7928, -0.5214, -0.7585,  0.7687
 0.7661,  0.0863, -0.4266, -0.7233, -0.4197,  0.1466
 0.2277, -0.3517, -0.0853, -0.1118,  0.6563,  0.1767
 0.3499, -0.5570, -0.0655, -0.3705,  0.2537,  0.1632
 0.7547, -0.1046,  0.5689, -0.0861,  0.3125,  0.1257
 0.8186,  0.2110,  0.5335,  0.0094, -0.0039,  0.1391
 0.6858, -0.8644,  0.1465,  0.8855,  0.0357,  0.1845
-0.4967,  0.4015,  0.0805,  0.8977,  0.2487,  0.4663
 0.6760, -0.9841,  0.9787, -0.8446, -0.3557,  0.1509
-0.1203, -0.4885,  0.6054, -0.0443, -0.7313,  0.4854
 0.8557,  0.7919, -0.0169,  0.7134, -0.1628,  0.2002
 0.0115, -0.6209,  0.9300, -0.4116, -0.7931,  0.4052
-0.7114, -0.9718,  0.4319,  0.1290,  0.5892,  0.3661
 0.3915,  0.5557, -0.1870,  0.2955, -0.6404,  0.2954
-0.3564, -0.6548, -0.1827, -0.5172, -0.1862,  0.4622
 0.2392, -0.4959,  0.5857, -0.1341, -0.2850,  0.2470
-0.3394,  0.3947, -0.4627,  0.6166, -0.4094,  0.5325
 0.7107,  0.7768, -0.6312,  0.1707,  0.7964,  0.2757
-0.1078,  0.8437, -0.4420,  0.2177,  0.3649,  0.4028
-0.3139,  0.5595, -0.6505, -0.3161, -0.7108,  0.5546
 0.4335,  0.3986,  0.3770, -0.4932,  0.3847,  0.1810
-0.2562, -0.2894, -0.8847,  0.2633,  0.4146,  0.4036
 0.2272,  0.2966, -0.6601, -0.7011,  0.0284,  0.2778
-0.0743, -0.1421, -0.0054, -0.6770, -0.3151,  0.3597
-0.4762,  0.6891,  0.6007, -0.1467,  0.2140,  0.4266
-0.4061,  0.7193,  0.3432,  0.2669, -0.7505,  0.6147
-0.0588,  0.9731,  0.8966,  0.2902, -0.6966,  0.4955
-0.0627, -0.1439,  0.1985,  0.6999,  0.5022,  0.3077
 0.1587,  0.8494, -0.8705,  0.9827, -0.8940,  0.4263
-0.7850,  0.2473, -0.9040, -0.4308, -0.8779,  0.7199
 0.4070,  0.3369, -0.2428, -0.6236,  0.4940,  0.2215
-0.0242,  0.0513, -0.9430,  0.2885, -0.2987,  0.3947
-0.5416, -0.1322, -0.2351, -0.0604,  0.9590,  0.3683
 0.1055,  0.7783, -0.2901, -0.5090,  0.8220,  0.2984
-0.9129,  0.9015,  0.1128, -0.2473,  0.9901,  0.4776
-0.9378,  0.1424, -0.6391,  0.2619,  0.9618,  0.5368
 0.7498, -0.0963,  0.4169,  0.5549, -0.0103,  0.1614
-0.2612, -0.7156,  0.4538, -0.0460, -0.1022,  0.3717
 0.7720,  0.0552, -0.1818, -0.4622, -0.8560,  0.1685
-0.4177,  0.0070,  0.9319, -0.7812,  0.3461,  0.3052
-0.0001,  0.5542, -0.7128, -0.8336, -0.2016,  0.3803
 0.5356, -0.4194, -0.5662, -0.9666, -0.2027,  0.1776
-0.2378,  0.3187, -0.8582, -0.6948, -0.9668,  0.5474
-0.1947, -0.3579,  0.1158,  0.9869,  0.6690,  0.2992
 0.3992,  0.8365, -0.9205, -0.8593, -0.0520,  0.3154
-0.0209,  0.0793,  0.7905, -0.1067,  0.7541,  0.1864
-0.4928, -0.4524, -0.3433,  0.0951, -0.5597,  0.6261
-0.8118,  0.7404, -0.5263, -0.2280,  0.1431,  0.6349
 0.0516, -0.8480,  0.7483,  0.9023,  0.6250,  0.1959
-0.3212,  0.1093,  0.9488, -0.3766,  0.3376,  0.2735
-0.3481,  0.5490, -0.3484,  0.7797,  0.5034,  0.4379
-0.5785, -0.9170, -0.3563, -0.9258,  0.3877,  0.4121
 0.3407, -0.1391,  0.5356,  0.0720, -0.9203,  0.3458
-0.3287, -0.8954,  0.2102,  0.0241,  0.2349,  0.3247
-0.1353,  0.6954, -0.0919, -0.9692,  0.7461,  0.3338
 0.9036, -0.8982, -0.5299, -0.8733, -0.1567,  0.1187
 0.7277, -0.8368, -0.0538, -0.7489,  0.5458,  0.0830
 0.9049,  0.8878,  0.2279,  0.9470, -0.3103,  0.2194
 0.7957, -0.1308, -0.5284,  0.8817,  0.3684,  0.2172
 0.4647, -0.4931,  0.2010,  0.6292, -0.8918,  0.3371
-0.7390,  0.6849,  0.2367,  0.0626, -0.5034,  0.7039
-0.1567, -0.8711,  0.7940, -0.5932,  0.6525,  0.1710
 0.7635, -0.0265,  0.1969,  0.0545,  0.2496,  0.1445
 0.7675,  0.1354, -0.7698, -0.5460,  0.1920,  0.1728
-0.5211, -0.7372, -0.6763,  0.6897,  0.2044,  0.5217
 0.1913,  0.1980,  0.2314, -0.8816,  0.5006,  0.1998
 0.8964,  0.0694, -0.6149,  0.5059, -0.9854,  0.1825
 0.1767,  0.7104,  0.2093,  0.6452,  0.7590,  0.2832
-0.3580, -0.7541,  0.4426, -0.1193, -0.7465,  0.5657
-0.5996,  0.5766, -0.9758, -0.3933, -0.9572,  0.6800
 0.9950,  0.1641, -0.4132,  0.8579,  0.0142,  0.2003
-0.4717, -0.3894, -0.2567, -0.5111,  0.1691,  0.4266
 0.3917, -0.8561,  0.9422,  0.5061,  0.6123,  0.1212
-0.0366, -0.1087,  0.3449, -0.1025,  0.4086,  0.2475
 0.3633,  0.3943,  0.2372, -0.6980,  0.5216,  0.1925
-0.5325, -0.6466, -0.2178, -0.3589,  0.6310,  0.3568
 0.2271,  0.5200, -0.1447, -0.8011, -0.7699,  0.3128
 0.6415,  0.1993,  0.3777, -0.0178, -0.8237,  0.2181
-0.5298, -0.0768, -0.6028, -0.9490,  0.4588,  0.4356
 0.6870, -0.1431,  0.7294,  0.3141,  0.1621,  0.1632
-0.5985,  0.0591,  0.7889, -0.3900,  0.7419,  0.2945
 0.3661,  0.7984, -0.8486,  0.7572, -0.6183,  0.3449
 0.6995,  0.3342, -0.3113, -0.6972,  0.2707,  0.1712
 0.2565,  0.9126,  0.1798, -0.6043, -0.1413,  0.2893
-0.3265,  0.9839, -0.2395,  0.9854,  0.0376,  0.4770
 0.2690, -0.1722,  0.9818,  0.8599, -0.7015,  0.3954
-0.2102, -0.0768,  0.1219,  0.5607, -0.0256,  0.3949
 0.8216, -0.9555,  0.6422, -0.6231,  0.3715,  0.0801
-0.2896,  0.9484, -0.7545, -0.6249,  0.7789,  0.4370
-0.9985, -0.5448, -0.7092, -0.5931,  0.7926,  0.5402

Test data:

# synthetic_test_40.txt
#
 0.7462,  0.4006, -0.0590,  0.6543, -0.0083,  0.1935
 0.8495, -0.2260, -0.0142, -0.4911,  0.7699,  0.1078
-0.2335, -0.4049,  0.4352, -0.6183, -0.7636,  0.5088
 0.1810, -0.5142,  0.2465,  0.2767, -0.3449,  0.3136
-0.8650,  0.7611, -0.0801,  0.5277, -0.4922,  0.7140
-0.2358, -0.7466, -0.5115, -0.8413, -0.3943,  0.4533
 0.4834,  0.2300,  0.3448, -0.9832,  0.3568,  0.1360
-0.6502, -0.6300,  0.6885,  0.9652,  0.8275,  0.3046
-0.3053,  0.5604,  0.0929,  0.6329, -0.0325,  0.4756
-0.7995,  0.0740, -0.2680,  0.2086,  0.9176,  0.4565
-0.2144, -0.2141,  0.5813,  0.2902, -0.2122,  0.4119
-0.7278, -0.0987, -0.3312, -0.5641,  0.8515,  0.4438
 0.3793,  0.1976,  0.4933,  0.0839,  0.4011,  0.1905
-0.8568,  0.9573, -0.5272,  0.3212, -0.8207,  0.7415
-0.5785,  0.0056, -0.7901, -0.2223,  0.0760,  0.5551
 0.0735, -0.2188,  0.3925,  0.3570,  0.3746,  0.2191
 0.1230, -0.2838,  0.2262,  0.8715,  0.1938,  0.2878
 0.4792, -0.9248,  0.5295,  0.0366, -0.9894,  0.3149
-0.4456,  0.0697,  0.5359, -0.8938,  0.0981,  0.3879
 0.8629, -0.8505, -0.4464,  0.8385,  0.5300,  0.1769
 0.1995,  0.6659,  0.7921,  0.9454,  0.9970,  0.2330
-0.0249, -0.3066, -0.2927, -0.4923,  0.8220,  0.2437
 0.4513, -0.9481, -0.0770, -0.4374, -0.9421,  0.2879
-0.3405,  0.5931, -0.3507, -0.3842,  0.8562,  0.3987
 0.9538,  0.0471,  0.9039,  0.7760,  0.0361,  0.1706
-0.0887,  0.2104,  0.9808,  0.5478, -0.3314,  0.4128
-0.8220, -0.6302,  0.0537, -0.1658,  0.6013,  0.4306
-0.4123, -0.2880,  0.9074, -0.0461, -0.4435,  0.5144
 0.0060,  0.2867, -0.7775,  0.5161,  0.7039,  0.3599
-0.7968, -0.5484,  0.9426, -0.4308,  0.8148,  0.2979
 0.7811,  0.8450, -0.6877,  0.7594,  0.2640,  0.2362
-0.6802, -0.1113, -0.8325, -0.6694, -0.6056,  0.6544
 0.3821,  0.1476,  0.7466, -0.5107,  0.2592,  0.1648
 0.7265,  0.9683, -0.9803, -0.4943, -0.5523,  0.2454
-0.9049, -0.9797, -0.0196, -0.9090, -0.4433,  0.6447
-0.4607,  0.1811, -0.2389,  0.4050, -0.0078,  0.5229
 0.2664, -0.2932, -0.4259, -0.7336,  0.8742,  0.1834
-0.4507,  0.1029, -0.6294, -0.1158, -0.6294,  0.6081
 0.8948, -0.0124,  0.9278,  0.2899, -0.0314,  0.1534
-0.1323, -0.8813, -0.0146, -0.0697,  0.6135,  0.2386

Posted in Machine Learning | Leave a comment

Matrix Pseudo-Inverse via Normal Equations (Left Pseudo-Inverse) Using C#

Posted on April 27, 2026 by jamesdmccaffrey

One Sunday morning, I figured I’d refactor one of my implementations of matrix pseudo-inverse via normal equations, sometimes called the left pseudo-inverse. The technique is not a general purpose pseudo-inverse such as the Moore-Penrose pseudo-inverse — it is used in machine learning scenarios with a matrix of training data (or a design matrix derived from the training data matrix) where the number of rows is greater than or equal to the number of columns. (There is a right pseudo-inverse for non-ML scenarios where the number of rows is less than the number of columns).

If you have a source matrix A with nRows gte nCols, the pseudo-inverse via normal equations is computed as inv(At * A) * At where At is the transpose of A, and inv() is any standard matrix inverse. But because At * A is square, symmetric, positive definite (is a small conditioning constant is added to the diagonal), it is possible to use the relatively simple inverse via Cholesky decomposition.

My main goal in the refactoring was to put the essential code into a container class called Cholesky to reduce the number of isolated methods.

My refactoring looks like:

public class Cholesky
{

  public static double[][] MatPseudoInv(double[][] A)
  {
    // inv(At * A) * A
    double[][] At = MatTranspose(A);
    double[][] AtA = MatProduct(At, A);
    for (int i = 0; i < AtA.Length; ++i)
      AtA[i][i] += 1.0e-8; /// condition before inv
    double[][] AtAinv = MatInvCholesky(AtA);
    double[][] pinv = MatProduct(AtAinv, At);
    return pinv;
  } 

  // MatInvCholesky() and many other helper functions
}

I dropped my refactored code into a test harness that I had. I generated 10,000 random matrices, where each matrix has between 100 and 1,000 rows, and between 2 and 20 columns, with each value in the matrix between -10.0 and +10.0. The MatPseudoInv() function pass xxx as expected.

The downside to pseudo-inverse via normal equations training is the (Xt * X) matrix multiplication operation. Suppose X is the training data design matrix, and it has 1000 rows and 10 columns. Then Xt * X is shape (10 x 1000) * (1000 x 10) which is only 10 x 10 -- small and simple to invert. But the number of multiplication and addition operations involved in computing Xt * X is approximately (10 * 10 * (2 * 1000)) = 200,000 which is a lot, and if there are very small values or very large values in X, then there could be arithmetic overflow or underflow.

I love stop motion animated movies. They're kind of like refactored reality. There are a surprising number of these movies.

Left: In "James and the Giant Peach" (1996), young orphan James runs away from his evil aunts Spiker and Sponge. He finds a way to grow a peach to giant size. He meets Mr. Grasshopper, Mr. Centipede, Mrs. Ladybug, Miss Spider, Mr. Earthworm, and Mrs. Glowworm. This is a wildly creative movie that has a happy ending. My personal grade = A-.

Right: In "Kubo and the Two Strings" (2016), young boy Kubo has a magic musical instrument sort of like a Japanese guitar. Kubo is menaced by his two aunts and has many adventures. This is another wildly creative movie that has a happy ending. My personal grade = solid A.

Both of these movies got great reviews from critics and audiences, but they were box office disappointments that lost money because not enough people were willing to take a chance on unusual stories with unusual style.

Demo code. Replace "lt" (less than), "gt", "lte", "gte" with Boolean operator symbols (my blog editor chokes on symbols).

  public class Cholesky
  {
    // container class for MatPseudoInv()

    public static double[][] MatPseudoInv(double[][] A)
    {
      // left pseudo-inverse via normal equations
      // nRows must be gte nCols
      // inv(At * A) * A
      double[][] At = MatTranspose(A);
      double[][] AtA = MatProduct(At, A);
      for (int i = 0; i "lt" AtA.Length; ++i)
        AtA[i][i] += 1.0e-8; /// condition before inv
      double[][] AtAinv = MatInvCholesky(AtA);
      double[][] pinv = MatProduct(AtAinv, At);
      return pinv;
    } // MatPseudoInv()

    // ------------------------------------------------------

    private static double[][] MatDecompCholesky(double[][] A)
    {
      // decompose A to L such that L * Lt = A
      // A must be square
      int m = A.Length; int n = A[0].Length;  // m == n
      double[][] L = MatMake(n, n);  // or m

      for (int i = 0; i "lt" n; ++i)
      {
        for (int j = 0; j "lte" i; ++j)
        {
          double sum = 0.0;
          for (int k = 0; k "lt" j; ++k)
            sum += L[i][k] * L[j][k];
          if (i == j)
          {
            double tmp = A[i][i] - sum;
            if (tmp "lt" 0.0)
              throw new
                Exception("decomp Cholesky fatal");
            L[i][j] = Math.Sqrt(tmp);
          }
          else
          {
            if (L[j][j] == 0.0)
              throw new
                Exception("decomp Cholesky fatal ");
            L[i][j] = (A[i][j] - sum) / L[j][j];
          }
        } // j
      } // i

      return L;
    } // MatDecompCholesky()

    private static double[][] MatInvCholesky(double[][] A)
    {
      int m = A.Length; int n = A[0].Length;  // m == n
      double[][] L = MatDecompCholesky(A);

      double[][] result = MatMake(n, n); // make Identity
      for (int i = 0; i "lt" n; ++i)
        result[i][i] = 1.0;

      for (int k = 0; k "lt" n; ++k)
      {
        for (int j = 0; j "lt" n; j++)
        {
          for (int i = 0; i "lt" k; i++)
          {
            result[k][j] -= result[i][j] * L[k][i];
          }
          result[k][j] /= L[k][k];
        }
      }

      for (int k = n - 1; k "gte" 0; --k)
      {
        for (int j = 0; j "lt" n; j++)
        {
          for (int i = k + 1; i "lt" n; i++)
          {
            result[k][j] -= result[i][j] * L[i][k];
          }
          result[k][j] /= L[k][k];
        }
      }
      return result;
    } // MatInvCholesky()

    private static double[][] MatMake(int nRows, int nCols)
    {
      double[][] result = new double[nRows][];
      for (int i = 0; i "lt" nRows; ++i)
        result[i] = new double[nCols];
      return result;
    }

    // ------------------------------------------------------

    private static double[][] MatTranspose(double[][] M)
    {
      int nr = M.Length; int nc = M[0].Length;
      double[][] result = new double[nc][]; // note
      for (int i = 0; i "lt" nc; ++i)
        result[i] = new double[nr];
      for (int i = 0; i "lt" nr; ++i)
        for (int j = 0; j "lt" nc; ++j)
          result[j][i] = M[i][j]; // note
      return result;
    }

    // ````````````````````````````````````````````````````

    private static double[][] MatProduct(double[][] A,
      double[][] B)
    {
      int aRows = A.Length; int aCols = A[0].Length;
      int bRows = B.Length; int bCols = B[0].Length;
      if (aCols != bRows)
        throw new Exception("Non-conformable matrices");

      double[][] result = new double[aRows][];
      for (int i = 0; i "lt" aRows; ++i)
        result[i] = new double[bCols];

      for (int i = 0; i "lt" aRows; ++i) // each row of A
        for (int j = 0; j "lt" bCols; ++j) // each col of B
          for (int k = 0; k "lt" aCols; ++k)
            result[i][j] += A[i][k] * B[k][j];
      return result;
    }

    // ------------------------------------------------------

  } // class Cholesky

Posted in Machine Learning | Leave a comment

Computing Cook’s Distances for a Linear Regression Model Using C#

Posted on April 24, 2026 by jamesdmccaffrey

Suppose you have some data and you compute a regression model to predict a single numeric value. You can compute Cook’s distance on each training data item. Cook’s distance is a number that is a measure of how sensitive the data item is on regression prediction model. A large Cook’s value (typically greater than 1.0) means the associated data item has large influence.

Cook’s distance is conceptually simple. First you compute a regression model (usually linear regression but the idea works for any model — nearest neighbors regression, quadratic regression, kernel ridge regression, etc.) Then for each data item, you compute another model without using the current data item. And then you compute the sum of the squared differences of predictions of the two models. If the sum is large, that means the current data item had a big effect on the prediction model.

To take into account different numbers of predictor variables, and the baseline mean squared error of the model that uses all training data, you normalize Cook’s value for a particular data item by dividing the sum of the squared differences by (rank * MSE) where rank is the number of predictor variables plus 1 (to account for the bias) and MSE is the mean squared error of the model trained on all the data items.

From the Wikipedia article on Cook’s Distance

I put together a Cook’s distances demo for linear regression, using raw C#. The output of the demo is:

Begin C# linear regression Cook's distances demo

Loading synthetic train (200) and test (40) data
Done

First three train X:
 -0.1660  0.4406 -0.9998 -0.3953 -0.7065
  0.0776 -0.1616  0.3704 -0.5911  0.7562
 -0.9452  0.3409 -0.1654  0.1174 -0.7192

First three train y:
  0.4840
  0.1568
  0.8054

Creating and training Linear Regression model
Done

Coefficients/weights:
-0.2656  0.0333  -0.0454  0.0358  -0.1146
Bias/constant: 0.3619

Evaluating model

Accuracy train (within 0.10) = 0.4600
Accuracy test (within 0.10) = 0.6500

MSE train = 0.0026
MSE test = 0.0020

Predicting for x =
  -0.1660   0.4406  -0.9998  -0.3953  -0.7065

Predicted y = 0.5329

Computing Cook's distances . .
Done

i =    0 Cook's dist = 0.0050
i =    2 Cook's dist = 0.0144
i =    3 Cook's dist = 0.0337
i =    4 Cook's dist = 0.0365
i =   18 Cook's dist = 0.0493
i =   97 Cook's dist = 0.0522

End demo

There are 200 training items. The largest Cook’s distance is 0.0522 which is associated with data item [97]. This is a small value (less than 1.0) and so the conclusion is that none of the training items has a significantly large effect on the regression model.

Cook’s distances aren’t used very often. For linear regression models, it’s much simpler to just identify outlier training data items — an outlier will have more impact than normal data items, and finding outliers is much easier than constructing a new regression model for each removed data item in the training dataset.

An artist named “Gill” produced airbrush art in the 1940s — maybe. There is literally nothing known about him — not even his first name. Here are three examples. They’re clearly very similar so it seems as if Gill’s main motivation was commercial, rather than artistic.

Demo program. Replace “lt” (less than), “gt”, “lte”, “gte” with Boolean operator symbols — my blog editor chokes on symbols.

using System;
using System.IO;
using System.Collections.Generic;

namespace LinearRegressionCooksDistances
{
  internal class LinearRegressionCooksProgram
  {
    static void Main(string[] args)
    {
      Console.WriteLine("\nBegin C# linear regression" +
        " Cook's distances demo ");

      // 1. load data
      Console.WriteLine("\nLoading synthetic train" +
        " (200) and test (40) data");
      string trainFile =
        "..\\..\\..\\Data\\synthetic_train_200.txt";
      int[] colsX = new int[] { 0, 1, 2, 3, 4 };
      double[][] trainX =
        MatLoad(trainFile, colsX, ',', "#");
      double[] trainY =
        MatToVec(MatLoad(trainFile,
        new int[] { 5 }, ',', "#"));

      string testFile =
        "..\\..\\..\\Data\\synthetic_test_40.txt";
      double[][] testX =
         MatLoad(testFile, colsX, ',', "#");
      double[] testY =
        MatToVec(MatLoad(testFile,
        new int[] { 5 }, ',', "#"));
      Console.WriteLine("Done ");

      Console.WriteLine("\nFirst three train X: ");
      for (int i = 0; i "lt" 3; ++i)
        VecShow(trainX[i], 4, 8);

      Console.WriteLine("\nFirst three train y: ");
      for (int i = 0; i "lt" 3; ++i)
        Console.WriteLine(trainY[i].ToString("F4").
          PadLeft(8));

      // 2. create and train model using pseudo-inverse
      Console.WriteLine("\nCreating and training" +
        " Linear Regression model using closed-form ");
      LinearRegressor model = new LinearRegressor();
      model.TrainClosed(trainX, trainY);
      Console.WriteLine("Done ");

      // 2b. show model parameters
      Console.WriteLine("\nCoefficients/weights: ");
      for (int i = 0; i "lt" model.weights.Length; ++i)
        Console.Write(model.weights[i].ToString("F4") + "  ");
      Console.WriteLine("\nBias/constant: " +
        model.bias.ToString("F4"));

      // 3. evaluate model
      Console.WriteLine("\nEvaluating model ");
      double accTrain = model.Accuracy(trainX, trainY, 0.10);
      Console.WriteLine("\nAccuracy train (within 0.10) = " +
        accTrain.ToString("F4"));
      double accTest = model.Accuracy(testX, testY, 0.10);
      Console.WriteLine("Accuracy test (within 0.10) = " +
        accTest.ToString("F4"));

      double mseTrain = model.MSE(trainX, trainY);
      Console.WriteLine("\nMSE train = " +
        mseTrain.ToString("F4"));
      double mseTest = model.MSE(testX, testY);
      Console.WriteLine("MSE test = " +
        mseTest.ToString("F4"));

      // 4. use model to predict first training item
      double[] x = trainX[0];
      Console.WriteLine("\nPredicting for x = ");
      VecShow(x, 4, 9);
      double predY = model.Predict(x);
      Console.WriteLine("\nPredicted y = " +
        predY.ToString("F4"));

      // 5. compute Cook's distances for each train item
      Console.WriteLine("\nComputing Cooks distances . . ");
      double[] cooks = model.CooksDistances(trainX, trainY);
      Console.WriteLine("Done ");

      // 6. scan for largest Cook's value
      double maxCook = -1.0;
      for (int i = 0; i "lt" cooks.Length; ++i)
      {
        if (cooks[i] "gt" maxCook)
        {
          Console.WriteLine("i = " +
            i.ToString().PadLeft(4) +
            " Cook's dist = " + cooks[i].ToString("F4"));
          maxCook = cooks[i];
        }
      }

      Console.WriteLine("\nEnd demo ");
      Console.ReadLine();
    } // Main

    // ------------------------------------------------------
    // helpers for Main(): MatLoad(), MatToVec(), VecShow()
    // ------------------------------------------------------

    static double[][] MatLoad(string fn, int[] usecols,
      char sep, string comment)
    {
      List"lt"double[]"gt" result = 
        new List"lt"double[]"gt"();
      string line = "";
      FileStream ifs = new FileStream(fn, FileMode.Open);
      StreamReader sr = new StreamReader(ifs);
      while ((line = sr.ReadLine()) != null)
      {
        if (line.StartsWith(comment) == true)
          continue;
        string[] tokens = line.Split(sep);
        List"lt"double"gt" lst = new List"lt"double"gt"();
        for (int j = 0; j "lt" usecols.Length; ++j)
          lst.Add(double.Parse(tokens[usecols[j]]));
        double[] row = lst.ToArray();
        result.Add(row);
      }
      sr.Close(); ifs.Close();
      return result.ToArray();
    }

    static double[] MatToVec(double[][] mat)
    {
      int nRows = mat.Length;
      int nCols = mat[0].Length;
      double[] result = new double[nRows * nCols];
      int k = 0;
      for (int i = 0; i "lt" nRows; ++i)
        for (int j = 0; j "lt" nCols; ++j)
          result[k++] = mat[i][j];
      return result;
    }

    static void VecShow(double[] vec, int dec, int wid)
    {
      for (int i = 0; i "lt" vec.Length; ++i)
        Console.Write(vec[i].ToString("F" + dec).
          PadLeft(wid));
      Console.WriteLine("");
    }

  } // class Program

  // ========================================================

  public class LinearRegressor
  {
    public double[] weights;
    public double bias;
    private Random rnd;

    // ------------------------------------------------------

    public LinearRegressor(int seed = 0)  // ctor
    {
      this.weights = new double[0]; // happy compiler
      this.bias = 0;
      this.rnd = new Random(seed); // not used this version
    }

    // ------------------------------------------------------

    public double Predict(double[] x)
    {
      double result = 0.0;
      for (int j = 0; j "lt" x.Length; ++j)
        result += x[j] * this.weights[j];
      result += this.bias;
      return result;
    }

    // ------------------------------------------------------

    public void TrainClosed(double[][] trainX,
      double[] trainY)
    {
      // pseudo-inverse via normal equations
      // wts_bias = (inv(Xt * X) * Xt) * trainY
      int dim = trainX[0].Length;
      this.weights = new double[dim];

      double[][] X = MatDesign(trainX);
      double[][] Xinv = Cholesky.MatPseudoInv(X);
      double[] biasAndWts =
        MatVecProduct(Xinv, trainY);

      // extract bias and weights
      this.bias = biasAndWts[0];
      for (int i = 1; i "lt" biasAndWts.Length; ++i)
        this.weights[i - 1] = biasAndWts[i];
      return;  // all done
    } // TrainClosed()

    private static double[] MatVecProduct(double[][] A,
        double[] v)
    {
      // helper for TrainClosed()
      double[] result = new double[A.Length];
      for (int i = 0; i "lt" A.Length; ++i)
        for (int k = 0; k "lt" A[0].Length; ++k)
          result[i] += A[i][k] * v[k];
      return result;
    }

    // ------------------------------------------------------

    private static double[][] MatDesign(double[][] M)
    {
      // helper for TrainClosed()
      int nRows = M.Length; int nCols = M[0].Length;
      double[][] result = new double[nRows][];
      for (int i = 0; i "lt" nRows; ++i)
        result[i] = new double[nCols + 1];
      for (int i = 0; i "lt" nRows; ++i)
      {
        result[i][0] = 1.0;
        for (int j = 1; j "lt" nCols + 1; ++j)
          result[i][j] = M[i][j - 1];
      }
      return result;
    }

    // ------------------------------------------------------

    public double Accuracy(double[][] dataX, double[] dataY,
      double pctClose)
    {
      int numCorrect = 0; int numWrong = 0;
      for (int i = 0; i "lt" dataX.Length; ++i)
      {
        double actualY = dataY[i];
        double predY = this.Predict(dataX[i]);
        if (Math.Abs(predY - actualY) "lt"
          Math.Abs(pctClose * actualY))
          ++numCorrect;
        else
          ++numWrong;
      }
      return (numCorrect * 1.0) / (numWrong + numCorrect);
    }

    // ------------------------------------------------------

    public double MSE(double[][] dataX, double[] dataY)
    {
      int n = dataX.Length;
      double sum = 0.0;
      for (int i = 0; i "lt" n; ++i)
      {
        double actualY = dataY[i];
        double predY = this.Predict(dataX[i]);
        sum += (actualY - predY) * (actualY - predY);
      }
      return sum / n;
    }

    // ------------------------------------------------------

    public double[] CooksDistances(double[][] trainX,
      double[] trainY)
    {
      // return array of Cook's distances, one per train
      // large value means large influence

      double[] result = new double[trainX.Length];

      // 1. train model using all data
      var model = new LinearRegressor();
      model.TrainClosed(trainX, trainY);
      int rank = trainX[0].Length + 1; // add 1 for bias
      double mse = model.MSE(trainX, trainY);

      // 2. get Cook's dist for each train item
      for (int i = 0; i "lt" trainX.Length; ++i)
      {
        // remove item i
        double[][] X = RemoveRow(trainX, i);
        double[] y = RemoveItem(trainY, i);
        // train model without current item
        var tmp = new LinearRegressor();
        tmp.TrainClosed(X, y);
        double sum = 0.0;
        for (int j = 0; j "lt" trainX.Length; ++j)
        {
          double p1 = model.Predict(trainX[j]);
          double p2 = tmp.Predict(trainX[j]);
          sum += (p1 - p2) * (p1 - p2);
        }
        result[i] = sum / (rank * mse);
      }
      return result;
    } // CooksDistances()

    private static double[][] RemoveRow(double[][] dataX,
      int row)
    {
      double[][] result = new double[dataX.Length - 1][];
      for (int i = 0; i "lt" result.Length; ++i)
        result[i] = new double[dataX.Length];
      int k = 0; // points into result
      for (int i = 0; i "lt" dataX.Length; ++i)
      {
        if (i == row) continue;
        for (int j = 0; j "lt" dataX[0].Length; ++j)
        {
          result[k][j] = dataX[i][j];
        }
        ++k;
      }
      return result;
    }

    private static double[] RemoveItem(double[] dataY,
      int idx)
    {
      double[] result = new double[dataY.Length - 1];
      int k = 0; // pts into result
      for (int i = 0; i "lt" dataY.Length; ++i)
      {
        if (i == idx) continue;
        result[k] = dataY[i];
        ++k;
      }
      return result;
    }

  } // class LinearRegressor

  // ========================================================

  public class Cholesky
  {
    // container class for MatPseudoInv()

    public static double[][] MatPseudoInv(double[][] A)
    {
      // left pseudo-inverse via normal equations
      // nRows must be gte nCols
      // inv(At * A) * A
      double[][] At = MatTranspose(A);
      double[][] AtA = MatProduct(At, A);
      for (int i = 0; i "lt" AtA.Length; ++i)
        AtA[i][i] += 1.0e-8; /// condition before inv
      double[][] AtAinv = MatInvCholesky(AtA);
      double[][] pinv = MatProduct(AtAinv, At);
      return pinv;
    } // MatPseudoInv()

    // ------------------------------------------------------

    private static double[][] MatInvCholesky(double[][] A)
    {
      // A must be square, symmetric, positive definite
      int m = A.Length; int n = A[0].Length;  // m == n
      // 1. decompose A to L
      double[][] L = new double[n][];
      for (int i = 0; i "lt" n; ++i)
        L[i] = new double[n];

      for (int i = 0; i "lt" n; ++i)
      {
        for (int j = 0; j "lte" i; ++j)
        {
          double sum = 0.0;
          for (int k = 0; k "lt" j; ++k)
            sum += L[i][k] * L[j][k];
          if (i == j)
          {
            double tmp = A[i][i] - sum;
            if (tmp "lt" 0.0)
              throw new
                Exception("decomp Cholesky fatal");
            L[i][j] = Math.Sqrt(tmp);
          }
          else
          {
            if (L[j][j] == 0.0)
              throw new
                Exception("decomp Cholesky fatal ");
            L[i][j] = (A[i][j] - sum) / L[j][j];
          }
        } // j
      } // i

      // 2. compute inverse from L
      double[][] result = new double[n][];  // Identity
      for (int i = 0; i "lt" n; ++i)
        result[i] = new double[n];
      for (int i = 0; i "lt" n; ++i)
        result[i][i] = 1.0;

      for (int k = 0; k "lt" n; ++k)
      {
        for (int j = 0; j "lt" n; j++)
        {
          for (int i = 0; i "lt" k; i++)
          {
            result[k][j] -= result[i][j] * L[k][i];
          }
          result[k][j] /= L[k][k];
        }
      }

      for (int k = n - 1; k "gte" 0; --k)
      {
        for (int j = 0; j "lt" n; j++)
        {
          for (int i = k + 1; i "lt" n; i++)
          {
            result[k][j] -= result[i][j] * L[i][k];
          }
          result[k][j] /= L[k][k];
        }
      }
      return result;
    } // MatInvCholesky()

    // ------------------------------------------------------

    private static double[][] MatTranspose(double[][] M)
    {
      int nr = M.Length; int nc = M[0].Length;
      double[][] result = new double[nc][]; // note
      for (int i = 0; i "lt" nc; ++i)
        result[i] = new double[nr];
      for (int i = 0; i "lt" nr; ++i)
        for (int j = 0; j "lt" nc; ++j)
          result[j][i] = M[i][j]; // note
      return result;
    }

    // ````````````````````````````````````````````````````

    private static double[][] MatProduct(double[][] A,
      double[][] B)
    {
      int aRows = A.Length; int aCols = A[0].Length;
      int bRows = B.Length; int bCols = B[0].Length;
      if (aCols != bRows)
        throw new Exception("Non-conformable matrices");

      double[][] result = new double[aRows][];
      for (int i = 0; i "lt" aRows; ++i)
        result[i] = new double[bCols];

      for (int i = 0; i "lt" aRows; ++i) // each row of A
        for (int j = 0; j "lt" bCols; ++j) // each col of B
          for (int k = 0; k "lt" aCols; ++k)
            result[i][j] += A[i][k] * B[k][j];
      return result;
    }

    // ------------------------------------------------------

  } // class Cholesky

} // ns

Training data:

# synthetic_train_200.txt
#
-0.1660,  0.4406, -0.9998, -0.3953, -0.7065,  0.4840
 0.0776, -0.1616,  0.3704, -0.5911,  0.7562,  0.1568
-0.9452,  0.3409, -0.1654,  0.1174, -0.7192,  0.8054
 0.9365, -0.3732,  0.3846,  0.7528,  0.7892,  0.1345
-0.8299, -0.9219, -0.6603,  0.7563, -0.8033,  0.7955
 0.0663,  0.3838, -0.3690,  0.3730,  0.6693,  0.3206
-0.9634,  0.5003,  0.9777,  0.4963, -0.4391,  0.7377
-0.1042,  0.8172, -0.4128, -0.4244, -0.7399,  0.4801
-0.9613,  0.3577, -0.5767, -0.4689, -0.0169,  0.6861
-0.7065,  0.1786,  0.3995, -0.7953, -0.1719,  0.5569
 0.3888, -0.1716, -0.9001,  0.0718,  0.3276,  0.2500
 0.1731,  0.8068, -0.7251, -0.7214,  0.6148,  0.3297
-0.2046, -0.6693,  0.8550, -0.3045,  0.5016,  0.2129
 0.2473,  0.5019, -0.3022, -0.4601,  0.7918,  0.2613
-0.1438,  0.9297,  0.3269,  0.2434, -0.7705,  0.5171
 0.1568, -0.1837, -0.5259,  0.8068,  0.1474,  0.3307
-0.9943,  0.2343, -0.3467,  0.0541,  0.7719,  0.5581
 0.2467, -0.9684,  0.8589,  0.3818,  0.9946,  0.1092
-0.6553, -0.7257,  0.8652,  0.3936, -0.8680,  0.7018
 0.8460,  0.4230, -0.7515, -0.9602, -0.9476,  0.1996
-0.9434, -0.5076,  0.7201,  0.0777,  0.1056,  0.5664
 0.9392,  0.1221, -0.9627,  0.6013, -0.5341,  0.1533
 0.6142, -0.2243,  0.7271,  0.4942,  0.1125,  0.1661
 0.4260,  0.1194, -0.9749, -0.8561,  0.9346,  0.2230
 0.1362, -0.5934, -0.4953,  0.4877, -0.6091,  0.3810
 0.6937, -0.5203, -0.0125,  0.2399,  0.6580,  0.1460
-0.6864, -0.9628, -0.8600, -0.0273,  0.2127,  0.5387
 0.9772,  0.1595, -0.2397,  0.1019,  0.4907,  0.1611
 0.3385, -0.4702, -0.8673, -0.2598,  0.2594,  0.2270
-0.8669, -0.4794,  0.6095, -0.6131,  0.2789,  0.4700
 0.0493,  0.8496, -0.4734, -0.8681,  0.4701,  0.3516
 0.8639, -0.9721, -0.5313,  0.2336,  0.8980,  0.1412
 0.9004,  0.1133,  0.8312,  0.2831, -0.2200,  0.1782
 0.0991,  0.8524,  0.8375, -0.2102,  0.9265,  0.2150
-0.6521, -0.7473, -0.7298,  0.0113, -0.9570,  0.7422
 0.6190, -0.3105,  0.8802,  0.1640,  0.7577,  0.1056
 0.6895,  0.8108, -0.0802,  0.0927,  0.5972,  0.2214
 0.1982, -0.9689,  0.1870, -0.1326,  0.6147,  0.1310
-0.3695,  0.7858,  0.1557, -0.6320,  0.5759,  0.3773
-0.1596,  0.3581,  0.8372, -0.9992,  0.9535,  0.2071
-0.2468,  0.9476,  0.2094,  0.6577,  0.1494,  0.4132
 0.1737,  0.5000,  0.7166,  0.5102,  0.3961,  0.2611
 0.7290, -0.3546,  0.3416, -0.0983, -0.2358,  0.1332
-0.3652,  0.2438, -0.1395,  0.9476,  0.3556,  0.4170
-0.6029, -0.1466, -0.3133,  0.5953,  0.7600,  0.4334
-0.4596, -0.4953,  0.7098,  0.0554,  0.6043,  0.2775
 0.1450,  0.4663,  0.0380,  0.5418,  0.1377,  0.2931
-0.8636, -0.2442, -0.8407,  0.9656, -0.6368,  0.7429
 0.6237,  0.7499,  0.3768,  0.1390, -0.6781,  0.2185
-0.5499,  0.1850, -0.3755,  0.8326,  0.8193,  0.4399
-0.4858, -0.7782, -0.6141, -0.0008,  0.4572,  0.4197
 0.7033, -0.1683,  0.2334, -0.5327, -0.7961,  0.1776
 0.0317, -0.0457, -0.6947,  0.2436,  0.0880,  0.3345
 0.5031, -0.5559,  0.0387,  0.5706, -0.9553,  0.3107
-0.3513,  0.7458,  0.6894,  0.0769,  0.7332,  0.3170
 0.2205,  0.5992, -0.9309,  0.5405,  0.4635,  0.3532
-0.4806, -0.4859,  0.2646, -0.3094,  0.5932,  0.3202
 0.9809, -0.3995, -0.7140,  0.8026,  0.0831,  0.1600
 0.9495,  0.2732,  0.9878,  0.0921,  0.0529,  0.1289
-0.9476, -0.6792,  0.4913, -0.9392, -0.2669,  0.5966
 0.7247,  0.3854,  0.3819, -0.6227, -0.1162,  0.1550
-0.5922, -0.5045, -0.4757,  0.5003, -0.0860,  0.5863
-0.8861,  0.0170, -0.5761,  0.5972, -0.4053,  0.7301
 0.6877, -0.2380,  0.4997,  0.0223,  0.0819,  0.1404
 0.9189,  0.6079, -0.9354,  0.4188, -0.0700,  0.1907
-0.1428, -0.7820,  0.2676,  0.6059,  0.3936,  0.2790
 0.5324, -0.3151,  0.6917, -0.1425,  0.6480,  0.1071
-0.8432, -0.9633, -0.8666, -0.0828, -0.7733,  0.7784
-0.9444,  0.5097, -0.2103,  0.4939, -0.0952,  0.6787
-0.0520,  0.6063, -0.1952,  0.8094, -0.9259,  0.4836
 0.5477, -0.7487,  0.2370, -0.9793,  0.0773,  0.1241
 0.2450,  0.8116,  0.9799,  0.4222,  0.4636,  0.2355
 0.8186, -0.1983, -0.5003, -0.6531, -0.7611,  0.1511
-0.4714,  0.6382, -0.3788,  0.9648, -0.4667,  0.5950
 0.0673, -0.3711,  0.8215, -0.2669, -0.1328,  0.2677
-0.9381,  0.4338,  0.7820, -0.9454,  0.0441,  0.5518
-0.3480,  0.7190,  0.1170,  0.3805, -0.0943,  0.4724
-0.9813,  0.1535, -0.3771,  0.0345,  0.8328,  0.5438
-0.1471, -0.5052, -0.2574,  0.8637,  0.8737,  0.3042
-0.5454, -0.3712, -0.6505,  0.2142, -0.1728,  0.5783
 0.6327, -0.6297,  0.4038, -0.5193,  0.1484,  0.1153
-0.5424,  0.3282, -0.0055,  0.0380, -0.6506,  0.6613
 0.1414,  0.9935,  0.6337,  0.1887,  0.9520,  0.2540
-0.9351, -0.8128, -0.8693, -0.0965, -0.2491,  0.7353
 0.9507, -0.6640,  0.9456,  0.5349,  0.6485,  0.1059
-0.0462, -0.9737, -0.2940, -0.0159,  0.4602,  0.2606
-0.0627, -0.0852, -0.7247, -0.9782,  0.5166,  0.2977
 0.0478,  0.5098, -0.0723, -0.7504, -0.3750,  0.3335
 0.0090,  0.3477,  0.5403, -0.7393, -0.9542,  0.4415
-0.9748,  0.3449,  0.3736, -0.1015,  0.8296,  0.4358
 0.2887, -0.9895, -0.0311,  0.7186,  0.6608,  0.2057
 0.1570, -0.4518,  0.1211,  0.3435, -0.2951,  0.3244
 0.7117, -0.6099,  0.4946, -0.4208,  0.5476,  0.1096
-0.2929, -0.5726,  0.5346, -0.3827,  0.4665,  0.2465
 0.4889, -0.5572, -0.5718, -0.6021, -0.7150,  0.2163
-0.7782,  0.3491,  0.5996, -0.8389, -0.5366,  0.6516
-0.5847,  0.8347,  0.4226,  0.1078, -0.3910,  0.6134
 0.8469,  0.4121, -0.0439, -0.7476,  0.9521,  0.1571
-0.6803, -0.5948, -0.1376, -0.1916, -0.7065,  0.7156
 0.2878,  0.5086, -0.5785,  0.2019,  0.4979,  0.2980
 0.2764,  0.1943, -0.4090,  0.4632,  0.8906,  0.2960
-0.8877,  0.6705, -0.6155, -0.2098, -0.3998,  0.7107
-0.8398,  0.8093, -0.2597,  0.0614, -0.0118,  0.6502
-0.8476,  0.0158, -0.4769, -0.2859, -0.7839,  0.7715
 0.5751, -0.7868,  0.9714, -0.6457,  0.1448,  0.1175
 0.4802, -0.7001,  0.1022, -0.5668,  0.5184,  0.1090
 0.4458, -0.6469,  0.7239, -0.9604,  0.7205,  0.0779
 0.5175,  0.4339,  0.9747, -0.4438, -0.9924,  0.2879
 0.8678,  0.7158,  0.4577,  0.0334,  0.4139,  0.1678
 0.5406,  0.5012,  0.2264, -0.1963,  0.3946,  0.2088
-0.9938,  0.5498,  0.7928, -0.5214, -0.7585,  0.7687
 0.7661,  0.0863, -0.4266, -0.7233, -0.4197,  0.1466
 0.2277, -0.3517, -0.0853, -0.1118,  0.6563,  0.1767
 0.3499, -0.5570, -0.0655, -0.3705,  0.2537,  0.1632
 0.7547, -0.1046,  0.5689, -0.0861,  0.3125,  0.1257
 0.8186,  0.2110,  0.5335,  0.0094, -0.0039,  0.1391
 0.6858, -0.8644,  0.1465,  0.8855,  0.0357,  0.1845
-0.4967,  0.4015,  0.0805,  0.8977,  0.2487,  0.4663
 0.6760, -0.9841,  0.9787, -0.8446, -0.3557,  0.1509
-0.1203, -0.4885,  0.6054, -0.0443, -0.7313,  0.4854
 0.8557,  0.7919, -0.0169,  0.7134, -0.1628,  0.2002
 0.0115, -0.6209,  0.9300, -0.4116, -0.7931,  0.4052
-0.7114, -0.9718,  0.4319,  0.1290,  0.5892,  0.3661
 0.3915,  0.5557, -0.1870,  0.2955, -0.6404,  0.2954
-0.3564, -0.6548, -0.1827, -0.5172, -0.1862,  0.4622
 0.2392, -0.4959,  0.5857, -0.1341, -0.2850,  0.2470
-0.3394,  0.3947, -0.4627,  0.6166, -0.4094,  0.5325
 0.7107,  0.7768, -0.6312,  0.1707,  0.7964,  0.2757
-0.1078,  0.8437, -0.4420,  0.2177,  0.3649,  0.4028
-0.3139,  0.5595, -0.6505, -0.3161, -0.7108,  0.5546
 0.4335,  0.3986,  0.3770, -0.4932,  0.3847,  0.1810
-0.2562, -0.2894, -0.8847,  0.2633,  0.4146,  0.4036
 0.2272,  0.2966, -0.6601, -0.7011,  0.0284,  0.2778
-0.0743, -0.1421, -0.0054, -0.6770, -0.3151,  0.3597
-0.4762,  0.6891,  0.6007, -0.1467,  0.2140,  0.4266
-0.4061,  0.7193,  0.3432,  0.2669, -0.7505,  0.6147
-0.0588,  0.9731,  0.8966,  0.2902, -0.6966,  0.4955
-0.0627, -0.1439,  0.1985,  0.6999,  0.5022,  0.3077
 0.1587,  0.8494, -0.8705,  0.9827, -0.8940,  0.4263
-0.7850,  0.2473, -0.9040, -0.4308, -0.8779,  0.7199
 0.4070,  0.3369, -0.2428, -0.6236,  0.4940,  0.2215
-0.0242,  0.0513, -0.9430,  0.2885, -0.2987,  0.3947
-0.5416, -0.1322, -0.2351, -0.0604,  0.9590,  0.3683
 0.1055,  0.7783, -0.2901, -0.5090,  0.8220,  0.2984
-0.9129,  0.9015,  0.1128, -0.2473,  0.9901,  0.4776
-0.9378,  0.1424, -0.6391,  0.2619,  0.9618,  0.5368
 0.7498, -0.0963,  0.4169,  0.5549, -0.0103,  0.1614
-0.2612, -0.7156,  0.4538, -0.0460, -0.1022,  0.3717
 0.7720,  0.0552, -0.1818, -0.4622, -0.8560,  0.1685
-0.4177,  0.0070,  0.9319, -0.7812,  0.3461,  0.3052
-0.0001,  0.5542, -0.7128, -0.8336, -0.2016,  0.3803
 0.5356, -0.4194, -0.5662, -0.9666, -0.2027,  0.1776
-0.2378,  0.3187, -0.8582, -0.6948, -0.9668,  0.5474
-0.1947, -0.3579,  0.1158,  0.9869,  0.6690,  0.2992
 0.3992,  0.8365, -0.9205, -0.8593, -0.0520,  0.3154
-0.0209,  0.0793,  0.7905, -0.1067,  0.7541,  0.1864
-0.4928, -0.4524, -0.3433,  0.0951, -0.5597,  0.6261
-0.8118,  0.7404, -0.5263, -0.2280,  0.1431,  0.6349
 0.0516, -0.8480,  0.7483,  0.9023,  0.6250,  0.1959
-0.3212,  0.1093,  0.9488, -0.3766,  0.3376,  0.2735
-0.3481,  0.5490, -0.3484,  0.7797,  0.5034,  0.4379
-0.5785, -0.9170, -0.3563, -0.9258,  0.3877,  0.4121
 0.3407, -0.1391,  0.5356,  0.0720, -0.9203,  0.3458
-0.3287, -0.8954,  0.2102,  0.0241,  0.2349,  0.3247
-0.1353,  0.6954, -0.0919, -0.9692,  0.7461,  0.3338
 0.9036, -0.8982, -0.5299, -0.8733, -0.1567,  0.1187
 0.7277, -0.8368, -0.0538, -0.7489,  0.5458,  0.0830
 0.9049,  0.8878,  0.2279,  0.9470, -0.3103,  0.2194
 0.7957, -0.1308, -0.5284,  0.8817,  0.3684,  0.2172
 0.4647, -0.4931,  0.2010,  0.6292, -0.8918,  0.3371
-0.7390,  0.6849,  0.2367,  0.0626, -0.5034,  0.7039
-0.1567, -0.8711,  0.7940, -0.5932,  0.6525,  0.1710
 0.7635, -0.0265,  0.1969,  0.0545,  0.2496,  0.1445
 0.7675,  0.1354, -0.7698, -0.5460,  0.1920,  0.1728
-0.5211, -0.7372, -0.6763,  0.6897,  0.2044,  0.5217
 0.1913,  0.1980,  0.2314, -0.8816,  0.5006,  0.1998
 0.8964,  0.0694, -0.6149,  0.5059, -0.9854,  0.1825
 0.1767,  0.7104,  0.2093,  0.6452,  0.7590,  0.2832
-0.3580, -0.7541,  0.4426, -0.1193, -0.7465,  0.5657
-0.5996,  0.5766, -0.9758, -0.3933, -0.9572,  0.6800
 0.9950,  0.1641, -0.4132,  0.8579,  0.0142,  0.2003
-0.4717, -0.3894, -0.2567, -0.5111,  0.1691,  0.4266
 0.3917, -0.8561,  0.9422,  0.5061,  0.6123,  0.1212
-0.0366, -0.1087,  0.3449, -0.1025,  0.4086,  0.2475
 0.3633,  0.3943,  0.2372, -0.6980,  0.5216,  0.1925
-0.5325, -0.6466, -0.2178, -0.3589,  0.6310,  0.3568
 0.2271,  0.5200, -0.1447, -0.8011, -0.7699,  0.3128
 0.6415,  0.1993,  0.3777, -0.0178, -0.8237,  0.2181
-0.5298, -0.0768, -0.6028, -0.9490,  0.4588,  0.4356
 0.6870, -0.1431,  0.7294,  0.3141,  0.1621,  0.1632
-0.5985,  0.0591,  0.7889, -0.3900,  0.7419,  0.2945
 0.3661,  0.7984, -0.8486,  0.7572, -0.6183,  0.3449
 0.6995,  0.3342, -0.3113, -0.6972,  0.2707,  0.1712
 0.2565,  0.9126,  0.1798, -0.6043, -0.1413,  0.2893
-0.3265,  0.9839, -0.2395,  0.9854,  0.0376,  0.4770
 0.2690, -0.1722,  0.9818,  0.8599, -0.7015,  0.3954
-0.2102, -0.0768,  0.1219,  0.5607, -0.0256,  0.3949
 0.8216, -0.9555,  0.6422, -0.6231,  0.3715,  0.0801
-0.2896,  0.9484, -0.7545, -0.6249,  0.7789,  0.4370
-0.9985, -0.5448, -0.7092, -0.5931,  0.7926,  0.5402

Test data:

# synthetic_test_40.txt
#
 0.7462,  0.4006, -0.0590,  0.6543, -0.0083,  0.1935
 0.8495, -0.2260, -0.0142, -0.4911,  0.7699,  0.1078
-0.2335, -0.4049,  0.4352, -0.6183, -0.7636,  0.5088
 0.1810, -0.5142,  0.2465,  0.2767, -0.3449,  0.3136
-0.8650,  0.7611, -0.0801,  0.5277, -0.4922,  0.7140
-0.2358, -0.7466, -0.5115, -0.8413, -0.3943,  0.4533
 0.4834,  0.2300,  0.3448, -0.9832,  0.3568,  0.1360
-0.6502, -0.6300,  0.6885,  0.9652,  0.8275,  0.3046
-0.3053,  0.5604,  0.0929,  0.6329, -0.0325,  0.4756
-0.7995,  0.0740, -0.2680,  0.2086,  0.9176,  0.4565
-0.2144, -0.2141,  0.5813,  0.2902, -0.2122,  0.4119
-0.7278, -0.0987, -0.3312, -0.5641,  0.8515,  0.4438
 0.3793,  0.1976,  0.4933,  0.0839,  0.4011,  0.1905
-0.8568,  0.9573, -0.5272,  0.3212, -0.8207,  0.7415
-0.5785,  0.0056, -0.7901, -0.2223,  0.0760,  0.5551
 0.0735, -0.2188,  0.3925,  0.3570,  0.3746,  0.2191
 0.1230, -0.2838,  0.2262,  0.8715,  0.1938,  0.2878
 0.4792, -0.9248,  0.5295,  0.0366, -0.9894,  0.3149
-0.4456,  0.0697,  0.5359, -0.8938,  0.0981,  0.3879
 0.8629, -0.8505, -0.4464,  0.8385,  0.5300,  0.1769
 0.1995,  0.6659,  0.7921,  0.9454,  0.9970,  0.2330
-0.0249, -0.3066, -0.2927, -0.4923,  0.8220,  0.2437
 0.4513, -0.9481, -0.0770, -0.4374, -0.9421,  0.2879
-0.3405,  0.5931, -0.3507, -0.3842,  0.8562,  0.3987
 0.9538,  0.0471,  0.9039,  0.7760,  0.0361,  0.1706
-0.0887,  0.2104,  0.9808,  0.5478, -0.3314,  0.4128
-0.8220, -0.6302,  0.0537, -0.1658,  0.6013,  0.4306
-0.4123, -0.2880,  0.9074, -0.0461, -0.4435,  0.5144
 0.0060,  0.2867, -0.7775,  0.5161,  0.7039,  0.3599
-0.7968, -0.5484,  0.9426, -0.4308,  0.8148,  0.2979
 0.7811,  0.8450, -0.6877,  0.7594,  0.2640,  0.2362
-0.6802, -0.1113, -0.8325, -0.6694, -0.6056,  0.6544
 0.3821,  0.1476,  0.7466, -0.5107,  0.2592,  0.1648
 0.7265,  0.9683, -0.9803, -0.4943, -0.5523,  0.2454
-0.9049, -0.9797, -0.0196, -0.9090, -0.4433,  0.6447
-0.4607,  0.1811, -0.2389,  0.4050, -0.0078,  0.5229
 0.2664, -0.2932, -0.4259, -0.7336,  0.8742,  0.1834
-0.4507,  0.1029, -0.6294, -0.1158, -0.6294,  0.6081
 0.8948, -0.0124,  0.9278,  0.2899, -0.0314,  0.1534
-0.1323, -0.8813, -0.0146, -0.0697,  0.6135,  0.2386

Posted in Machine Learning | Leave a comment

Matrix Pseudo-Inverse Using Singular Value Decomposition (SVD) Jacobi Algorithm – Refactor and Test Using C#

Posted on April 23, 2026 by jamesdmccaffrey

If you have a square matrix A, you can compute the inverse of A so that A * Ainv = I, where * is matrix multiplication and I is the identity matrix. In machine learning scenarios, the A matrix is usually a matrix of training data or a design matrix derived from the training data, and so you need to compute the pseudo-inverse of A.

There are many ways to compute a pseudo-inverse for machine learning scenarios where the number of rows of A are greater than or equal to the number of columns. Three common techniques include singular value decomposition (SVD), QR decomposition, and left pseudo-inverse via normal equations. Each technique has several variations, for example SVD Jacobi, SVD Lanczos, SVD Householder+QR, SVD Golub-Kahan, QR Householder, QR modified Gram-Schmidt, QR Givens, normal equations Cholesky, normal equations LUP, and many others.

Why are there so many techniques to compute a pseudo-inverse? First, the problem is extremely difficult and different techniques have different pros and cons related to stability, performance, and implementation complexity. Second, the problem is so rich in ideas, many mathematicians worked for many years and came up with dozens of techniques.

One afternoon during a work break, I figured I’d refactor my C# implementations of matrix pseudo-inverse using the SVD Jacobi algorithm. It is the most complex of my pseudo-inverse implementations but it is the most stable and the fastest.

To test my refactored version, I generated 5,000 random matrices, computed the pseudo-inverse and then verified that (A * Apinv) * A = A to within 1.0e-8. Each random matrix has between 100 and 1,000 rows, and between 2 and 20 columns, and each value is between -10.0 and +10.0. All 5,000 tests passed. This is by no means thorough testing, but it indicates that basic functionality is correct for most simple machine learning scenarios.

The key calling code is:

for (int i = 0; i "lt" nTrials; ++i) {
  Console.WriteLine("trial " + i);
  double[][] A = MakeRandomMatrix(minRows, maxRows,
    minCols, maxCols, rnd);
  double[][] Apinv = SVDJacobi.MatPseudoInv(A);
     
  // check (A * Apinv) * A = A
  double[][] AApinv = MatProduct(A, Apinv);
  double[][] C = MatProduct(AApinv, A); 
  if (MatAreEqual(C, A, 1.0e-8) == true)
    ++nPass;
  else
    ++nFail;
}

The static MatPseudoInv() function is in a container class named SVDJacobi.

Anyway, good fun during a work break. But now it’s Time to get back to work.

The “Lie Detector” game was first produced in 1960. There are 24 character cards, and each is both a witness and a suspect. The game starts by blindly selecting one of the 24 “guily” cards (not shown) and inserting it into the back of the lie detector machine. Then, each player takes a turn taking one of their witness cards, placing on the machine, and inserting an electric probe. The machine needle would swing to “True” or “False”.

Eventually you build up enough information — “overweight”, “wears glasses”, “blonde hair” — to name the guilty person.

I loved this game and was fascinated by the matrix of holes and the combinatorics of the primitive machine. But alas, none of the other kids in the neighborhood (Roger, Beth, Kenny, Tommy, Nancy, Rick, Bobby, Kirk, Lisa, Bill, Sally) liked the game.

Demo program. Replace “lt” (less than), “gt”, “lte”, “gte” with Boolean operator symbols.

using System.IO;

namespace MatrixPseudoInverseSVDJacobi
{
  internal class MatrixPseudoInverseSVDJacobi
  {
    static void Main(string[] args)
    {
      Console.WriteLine("\nBegin relaxed Moore-Penrose" +
        " pseudo-inverse using SVD decomp" +
        " (Jacobi) ");

      int minRows = 100; int maxRows = 1000;
      int minCols = 2; int maxCols = 20;
      Random rnd = new Random(0);
      int nTrials = 5000;
      int nPass = 0; int nFail = 0;
      for (int i = 0; i "lt" nTrials; ++i)
      {
        Console.WriteLine("\n==========");
        Console.WriteLine("trial " + i);
        double[][] A = 
          MakeRandomMatrix(minRows, maxRows,
          minCols, maxCols, rnd);
        double[][] Apinv = SVDJacobi.MatPseudoInv(A);
     
        // check (A * Apinv) * A = A
        double[][] AApinv = MatProduct(A, Apinv);
        double[][] C = MatProduct(AApinv, A); 
        
        //Console.WriteLine("\nA = ");
        //MatShow(A, 4, 9);
        //Console.WriteLine("\nApinv = ");
        //MatShow(Apinv, 4, 9);
        //Console.WriteLine("\n(A * Apinv) * A = ");
        //MatShow(C, 4, 9);

        if (MatAreEqual(C, A, 1.0e-8) == true)
        {
          Console.WriteLine("pass");
          ++nPass;
        }
        else
        {
          Console.WriteLine("FAIL");
          Console.WriteLine("nRows = " + A.Length +
            " nCols = " + A[0].Length);
          Console.ReadLine();
          ++nFail;
        }
        Console.WriteLine("==========");
        // Console.ReadLine();
      } // nTrials

      Console.WriteLine("\nNumber pass = " + nPass);
      Console.WriteLine("Number fail = " + nFail);

      Console.WriteLine("\nEnd testing ");
      Console.ReadLine();
    } // Main

    // ------------------------------------------------------
    // helpers: MakeRandomMatrix(), MatProduct(), 
    // MatShow(), MatAreEqual()
    // ------------------------------------------------------

    public static double[][] MakeRandomMatrix(int minRows,
      int maxRows, int minCols, int maxCols, Random rnd)
    {
      int nRows = rnd.Next(minRows, maxRows);  // [2,maxN)
      int nCols = rnd.Next(minCols, maxCols);
      double[][] result = new double[nRows][];
      for (int i = 0; i "lt" nRows; ++i)
        result[i] = new double[nCols];

      double lo = -10.0; double hi = 10.0;
      for (int r = 0; r "lt" nRows; ++r)
        for (int c = 0; c "lt" nCols; ++c)
          result[r][c] = (hi - lo) * rnd.NextDouble() + lo;
      return result;
    }

    // ------------------------------------------------------

    public static double[][] MatProduct(double[][] A,
      double[][] B)
    {
      int aRows = A.Length; int aCols = A[0].Length;
      int bRows = B.Length; int bCols = B[0].Length;
      if (aCols != bRows)
        throw new Exception("Non-conformable matrices");

      double[][] result = new double[aRows][];
      for (int i = 0; i "lt" aRows; ++i)
        result[i] = new double[bCols];

      for (int i = 0; i "lt" aRows; ++i) // each row of A
        for (int j = 0; j "lt" bCols; ++j) // each col of B
          for (int k = 0; k "lt" aCols; ++k)
            result[i][j] += A[i][k] * B[k][j];

      return result;
    }

    // ------------------------------------------------------

    public static void MatShow(double[][] m, int dec, int wid)
    {
      int nRows = m.Length; int nCols = m[0].Length;
      double small = 1.0 / Math.Pow(10, dec);
      for (int i = 0; i "lt" nRows; ++i)
      {
        for (int j = 0; j "lt" nCols; ++j)
        {
          double v = m[i][j];
          if (Math.Abs(v) "lt" small) v = 0.0;
          Console.Write(v.ToString("F" + dec).
            PadLeft(wid));
        }
        Console.WriteLine("");
      }
    }

    // ------------------------------------------------------

    public static bool MatAreEqual(double[][] A, double[][] B,
      double epsilon)
    {
      int nRows = A.Length; int nCols = A[0].Length;
      for (int i = 0; i "lt" nRows; ++i)
        for (int j = 0; j "lt" nCols; ++j)
          if (Math.Abs( A[i][j] - B[i][j] ) "gt" epsilon)
            return false;
      return true;
    }

    // ------------------------------------------------------

  } // Program

  // ========================================================

  public class SVDJacobi
  {
    // ------------------------------------------------------

    // "Compact Numerical Methods for Computers" (1979).
    // Nash, J.C.

    // "Jacobi's Method is More Accurate than QR" (1989),
    // Demmel, J. and Veselic, K.

    // C language code (unknown location) by Kosowsky, A.
    // (Rutgers University)

    // C language code at
    // github.com/ampl/gsl/blob/master/linalg by
    // Jungman, G. (Los Alamos National Laboratory)

    // "Algorithm for Computing the Singular Value
    // Decomposition on a Vector Computer" (1989),
    // De Rijk, P.P.M.

    // NumPy documentation at
    // numpy.org/doc/2.1/reference/generated/
    //  numpy.linalg.svd.html

    // ------------------------------------------------------

    public static double[][] MatPseudoInv(double[][] M)
    {
      double[][] U; double[][] Vh; double[] s;
      SVD_Jacobi(M, out U, out Vh, out s);

      // pinv = V * Sinv * Uh
      double[][] Sinv = MatMake(s.Length, s.Length);
      for (int i = 0; i "lt" Sinv.Length; ++i)
        Sinv[i][i] = 1.0 / (s[i] + 1.0e-8); // no div 0
      double[][] V = MatTranspose(Vh);
      double[][] Uh = MatTranspose(U);
      double[][] tmp = MatProduct(Sinv, Uh);
      double[][] result = MatProduct(V, tmp);
      return result;
    }

    // ------------------------------------------------------

    public static void SVD_Jacobi(double[][] M,
      out double[][] U, out double[][] Vh, out double[] s)
    {
      // see references above
      double epsilon = 1.0e-15;

      double[][] A = MatCopyOf(M); // working U
      int m = A.Length; int n = A[0].Length;
      double[][] Q = MatIdentity(n); // working V
      double[] sv = new double[n];  // working s

      // initialize counters
      int count = 1;
      int pass = 0;
      double tolerance = 10 * m * epsilon; // heuristic

      // always do at least 12 sweeps
      int passMax = Math.Max(5 * n, 12); // heuristic

      // store the column error estimates for use
      // during orthogonalization

      for (int j = 0; j "lt" n; ++j)
      {
        double[] cj = MatGetColumn(A, j);
        double sj = VecNorm(cj);
        sv[j] = epsilon * sj;
      }

      // orthogonalize A using plane rotations
      while (count "gt" 0 && pass "lte" passMax)
      {
        // initialize rotation counter
        count = n * (n - 1) / 2;

        for (int j = 0; j "lt" n - 1; ++j)
        {
          for (int k = j + 1; k "lt" n; ++k)
          {
            double cosine, sine;

            double[] cj = MatGetColumn(A, j);
            double[] ck = MatGetColumn(A, k);

            double p = 2.0 * VecDot(cj, ck);
            double a = VecNorm(cj);
            double b = VecNorm(ck);

            double q = a * a - b * b;
            double v = Hypot(p, q);

            // test for columns j,k orthogonal,
            // or dominant errors 
            double abserr_a = sv[j];
            double abserr_b = sv[k];

            bool sorted = (a "gte" b);
            bool orthog = (Math.Abs(p) "lte"
              tolerance * (a * b));
            bool bada = (a "lt" abserr_a);
            bool badb = (b "lt" abserr_b);

            if (sorted == true && (orthog == true ||
              bada == true || badb == true))
            {
              --count;
              continue;
            }

            // calculate rotation angles
            if (v == 0 || sorted == false)
            {
              cosine = 0.0; sine = 1.0;
            }
            else
            {
              cosine = Math.Sqrt((v + q) / (2.0 * v));
              sine = p / (2.0 * v * cosine);
            }

            // apply rotation to A (working U)
            for (int i = 0; i "lt" m; ++i)
            {
              double Aik = A[i][k];
              double Aij = A[i][j];
              A[i][j] = Aij * cosine + Aik * sine;
              A[i][k] = -Aij * sine + Aik * cosine;
            }

            // update singular values
            sv[j] = Math.Abs(cosine) * abserr_a +
              Math.Abs(sine) * abserr_b;
            sv[k] = Math.Abs(sine) * abserr_a +
              Math.Abs(cosine) * abserr_b;

            // apply rotation to Q (working V)
            for (int i = 0; i "lt" n; ++i)
            {
              double Qij = Q[i][j];
              double Qik = Q[i][k];
              Q[i][j] = Qij * cosine + Qik * sine;
              Q[i][k] = -Qij * sine + Qik * cosine;
            } // i
          } // k
        } // j

        ++pass;
      } // while

      //  compute singular values
      double prevNorm = -1.0;

      for (int j = 0; j "lt" n; ++j)
      {
        double[] column = MatGetColumn(A, j);
        double norm = VecNorm(column);

        // determine if singular value is zero
        if (norm == 0.0 || prevNorm == 0.0
          || (j "gt" 0 &&
            norm "lte" tolerance * prevNorm))
        {
          sv[j] = 0.0;
          for (int i = 0; i "lt" m; ++i)
            A[i][j] = 0.0;
          prevNorm = 0.0;
        }
        else
        {
          sv[j] = norm;
          for (int i = 0; i "lt" m; ++i)
            A[i][j] = A[i][j] * 1.0 / norm;
          prevNorm = norm;
        }
      }

      if (count "gt" 0)
      {
        Console.WriteLine("Jacobi iterations did not" +
          " converge");
      }

      U = A;
      Vh = MatTranspose(Q);
      s = sv;

      // to sync with np.linalg.svd() full_matrices=False
      // shapes and allow U*S*Vh:
      // if m "lt" n, extract 1st m columns of U
      //   extract 1st m values of s
      //   extract 1st m rows of Vh

      if (m "lt" n)
      {
        U = MatExtractFirstColumns(U, m);
        s = VecExtractFirst(s, m);
        Vh = MatExtractFirstRows(Vh, m);
      }

    } // SVD_Jacobi()

    // === helper functions =================================
    //
    // MatMake, MatCopy, MatIdentity, MatGetColumn,
    // MatExtractFirstColumns, MatExtractFirstRows,
    // MatTranspose, MatProduct, VecNorm, VecDot,
    // Hypot, VecExtractFirst
    //
    // ======================================================

    private static double[][] MatMake(int nRows, int nCols)
    {
      double[][] result = new double[nRows][];
      for (int i = 0; i "lt" nRows; ++i)
        result[i] = new double[nCols];
      return result;
    }

    // ------------------------------------------------------

    private static double[][] MatCopyOf(double[][] M)
    {
      int nr = M.Length; int nc = M[0].Length;
      double[][] result = MatMake(nr, nc);
      for (int i = 0; i "lt" nr; ++i)
        for (int j = 0; j "lt" nc; ++j)
          result[i][j] = M[i][j];
      return result;
    }

    // ------------------------------------------------------

    private static double[][] MatIdentity(int n)
    {
      double[][] result = MatMake(n, n);
      for (int i = 0; i "lt" n; ++i)
        result[i][i] = 1.0;
      return result;
    }

    // ------------------------------------------------------

    private static double[] MatGetColumn(double[][] M, int j)
    {
      int nRows = M.Length;
      double[] result = new double[nRows];
      for (int i = 0; i "lt" nRows; ++i)
        result[i] = M[i][j];
      return result;
    }

    // ------------------------------------------------------

    private static double[][] 
      MatExtractFirstColumns(double[][] M, int n)
    {
      int nRows = M.Length;
      double[][] result = MatMake(nRows, n);
      for (int i = 0; i "lt" nRows; ++i)
        for (int j = 0; j "lt" n; ++j)
          result[i][j] = M[i][j];
      return result;
    }

    // ------------------------------------------------------

    private static double[][] 
      MatExtractFirstRows(double[][] M, int n)
    {
      int nCols = M[0].Length;
      double[][] result = MatMake(n, nCols);
      for (int i = 0; i "lt" n; ++i)
        for (int j = 0; j "lt" nCols; ++j)
          result[i][j] = M[i][j];
      return result;
    }

    // ------------------------------------------------------

    private static double[][] MatTranspose(double[][] M)
    {
      int nRows = M.Length;
      int nCols = M[0].Length;
      double[][] result = MatMake(nCols, nRows);
      for (int i = 0; i "lt" nRows; ++i)
        for (int j = 0; j "lt" nCols; ++j)
          result[j][i] = M[i][j];
      return result;
    }

    // ------------------------------------------------------

    private static double[][] MatProduct(double[][] A,
      double[][] B)
    {
      int aRows = A.Length;
      int aCols = A[0].Length;
      int bRows = B.Length;
      int bCols = B[0].Length;
      if (aCols != bRows)
        throw new Exception("Non-conformable matrices");

      double[][] result = MatMake(aRows, bCols);

      for (int i = 0; i "lt" aRows; ++i)
        for (int j = 0; j "lt" bCols; ++j)
          for (int k = 0; k "lt" aCols; ++k)
            result[i][j] += A[i][k] * B[k][j];

      return result;
    }

    // ------------------------------------------------------

    private static double VecNorm(double[] v)
    {
      double sum = 0.0;
      int n = v.Length;
      for (int i = 0; i "lt" n; ++i)
        sum += v[i] * v[i];
      return Math.Sqrt(sum);
    }

    // ------------------------------------------------------

    private static double VecDot(double[] v1, double[] v2)
    {
      int n = v1.Length;
      double sum = 0.0;
      for (int i = 0; i "lt" n; ++i)
        sum += v1[i] * v2[i];
      return sum;
    }

    // ------------------------------------------------------

    private static double Hypot(double x, double y)
    {
      // fancy sqrt(x^2 + y^2)  std technique
      double xabs = Math.Abs(x);
      double yabs = Math.Abs(y);
      double min, max;

      if (xabs "lt" yabs)
      {
        min = xabs; max = yabs;
      }
      else
      {
        min = yabs; max = xabs;
      }

      if (min == 0)
        return max;

      double u = min / max;
      return max * Math.Sqrt(1 + u * u);
    }

    // ------------------------------------------------------

    private static double[] VecExtractFirst(double[] v,
      int n)
    {
      double[] result = new double[n];
      for (int i = 0; i "lt" n; ++i)
        result[i] = v[i];
      return result;
    }

    // ------------------------------------------------------

  } // class SVDJacobi

  // ========================================================

} // ns

Posted in Machine Learning | Leave a comment

Neural Network Regression Using C# Applied to the Diabetes Dataset – Poor Results

Posted on April 22, 2026 by jamesdmccaffrey

I write code almost every day. Like mamy things, writing code is a skill that must be practiced, and also I just enjoy writing code. One morning before work, I figured I’d run the well-known Diabetes Dataset through a neural network regression model. Based on previous experiments with linear regression, quadratic regression, a scikit DecisionTreeRegressor model, and several other models, I was pretty sure the C# neural network model would give poor prediction accuracy. And that is the result I got.

The Diabetes Dataset looks like:

59, 2, 32.1, 101.00, 157,  93.2, 38, 4.00, 4.8598, 87, 151
48, 1, 21.6,  87.00, 183, 103.2, 70, 3.00, 3.8918, 69,  75
72, 2, 30.5,  93.00, 156,  93.6, 41, 4.00, 4.6728, 85, 141
. . .

Note that there is a completely different, Pima Diabetes Dataset, that is sometimes confused with this dataset.

Each line represents a patient. The first 10 values on each line are predictors. The last value on each line is the target value (a diabetes metric) to predict. The predictors are: age, sex, body mass index, blood pressure, serum cholesterol, low-density lipoproteins, high-density lipoproteins, total cholesterol, triglycerides, blood sugar. There are 442 data items.

The sex encoding isn’t explained anywhere but I suspect male = 1, female = 2 because there are 235 1 values and 206 2 values).

I converted the sex values from 1,2 into 0,1. Then I applied divide-by-constant normalization by dividing the 10 predictor columns by (100, 1, 100, 1000, 1000, 1000, 100, 10, 10, 1000) and the target y values by 1000. The resulting encoded and normalized data looks like:

0.5900, 1.0000, 0.3210, . . . 0.1510
0.4800, 0.0000, 0.2160, . . . 0.0750
0.7200, 1.0000, 0.3050, . . . 0.1410
. . .

Normalization isn’t absolutely necessary for neural network regression models, but it doesn’t hurt and often speeds up training. I split the 442-items into a 342-item training set and a 100-item test set.

I implemented a neural network regression model using C#. I set the architecture to 10-50-1, used tanh hidden node activation, and identity (i.e., none) output activation.

For training I used a learning rate of 0.01 and maximum epochs of 100,000.

The output of the demo is:

Begin NN regression using C#

Loading diabetes train (342) and test (100) data
Done

First three train X:
  0.5900  1.0000  0.3210  . . .  0.0870
  0.4800  0.0000  0.2160  . . .  0.0690
  0.7200  1.0000  0.3050  . . .  0.0850

First three train y:
  0.1510
  0.0750
  0.1410

Creating 10-50-1 tanh() identity() neural network
Done

Setting lrnRate = 0.0100
Setting maxEpochs = 100000

Starting training
epoch:      0  MSE = 0.0059  acc = 0.1228
epoch:  20000  MSE = 0.0029  acc = 0.1725
epoch:  40000  MSE = 0.0028  acc = 0.1754
epoch:  60000  MSE = 0.0029  acc = 0.2018
epoch:  80000  MSE = 0.0028  acc = 0.1901
Done

Evaluating model

Accuracy (10%) on train data = 0.2018
Accuracy (10%) on test data  = 0.2609

MSE on train data = 0.0028
MSE on test data = 0.0027

Predicting y for train[0]
Predicted y = 0.2157

End demo

These results (the MSE and accuracy) were similar to the results I got using the a quadratic regression model. I expected the neural network to do a bit better than that.

I have done quite a few experiments with the Diabetes Dataset and I’ve concluded the the default target value in the last column (a patient diabetes score) simply cannot be predicted well. But the variables in columns [4], [5], [6], [7], and [8] can be meaningfully predicted from the other columns.

One way to think about a machine learning regression model is that it finds a pattern in some data.

Playboy Magazine has a bunny logo on every cover (except for the very first issue in December 1953). The bunny logo is usually easy to see, but sometimes the logo is very cleverly hidden and difficult to find.

Left: February 1982. The bunny logo is in the spilled nail polish at the bottom of the cover. Clever.

Right: February 1984. The bunny logo is created by a small ribbon that is part of the model’s shirt (or whatever they call what she’s wearing) just below her right shoulder. Tricky.

Demo program. Replace “lt” (less than), “gt”, “lte”, gte” with Boolean operator symbols. (My blog editor chokes on symbols).

using System;
using System.IO;
using System.Collections.Generic;

// simplified, one hidden layer, "online" train
// hard-coded tanh hidden activation, identity output

namespace NeuralNetworkRegression
{
  internal class NeuralNetworkProgram
  {
    static void Main(string[] args)
    {
      Console.WriteLine("\nBegin NN regression using C# ");

      // 1. load data
      Console.WriteLine("\nLoading diabetes train" +
        " (342) and test (100) data");
      string trainFile =
        "..\\..\\..\\Data\\diabetes_norm_train_342.txt";
      int[] colsX = new int[] { 0, 1, 2, 3, 4, 5,
        6, 7, 8, 9 };
      int colY = 10;
      double[][] trainX =
        MatLoad(trainFile, colsX, ',', "#");
      double[] trainY =
        MatToVec(MatLoad(trainFile,
        new int[] { colY }, ',', "#"));

      string testFile =
        "..\\..\\..\\Data\\diabetes_norm_test_100.txt";
      double[][] testX =
        MatLoad(testFile, colsX, ',', "#");
      double[] testY =
        MatToVec(MatLoad(testFile,
        new int[] { colY }, ',', "#"));
      Console.WriteLine("Done ");

      Console.WriteLine("\nFirst three train X: ");
      for (int i = 0; i "lt" 3; ++i)
        VecShow(trainX[i], 4, 8);

      Console.WriteLine("\nFirst three train y: ");
      for (int i = 0; i "lt" 3; ++i)
        Console.WriteLine(trainY[i].ToString("F4").
          PadLeft(8));

      // 2. create NN
      Console.WriteLine("\nCreating 10-50-1 tanh()" +
        " identity() neural network ");
       NeuralNetworkRegressor nn =
        new NeuralNetworkRegressor(10, 50, 1); // default seed
      Console.WriteLine("Done ");

      // 3. train NN
      double lrnRate = 0.01;
      int maxEpochs = 100000;
      Console.WriteLine("\nSetting lrnRate = " +
        lrnRate.ToString("F4"));
      Console.WriteLine("Setting maxEpochs = " +
        maxEpochs);
      Console.WriteLine("\nStarting training ");
      nn.Train(trainX, trainY, lrnRate, maxEpochs);
      Console.WriteLine("Done ");

      // 4. evaluate trained model
      Console.WriteLine("\nEvaluating model ");
      double trainAcc = nn.Accuracy(trainX, trainY, 0.10);
      Console.WriteLine("\nAccuracy (10%) on train data = " +
        trainAcc.ToString("F4"));

      double testAcc = nn.Accuracy(testX, testY, 0.10);
      Console.WriteLine("Accuracy (10%) on test data  = " +
        testAcc.ToString("F4"));

      double trainMSE = nn.MSE(trainX, trainY);
      Console.WriteLine("\nMSE on train data = " +
        trainMSE.ToString("F4"));

      double testMSE = nn.MSE(testX, testY);
      Console.WriteLine("MSE on test data = " +
        testMSE.ToString("F4"));

      // 5. use model
      Console.WriteLine("\nPredicting y for train[0] ");
      double[] x = trainX[0];
      double predY = nn.Predict(x);
      Console.WriteLine("Predicted y = " +
        predY.ToString("F4"));

      // TODO: Save() and Load()

      Console.WriteLine("\nEnd demo ");
      Console.ReadLine();
    } // Main()

    // ------------------------------------------------------
    // helpers for Main(): MatLoad(), MatToVec(), VecShow()
    // ------------------------------------------------------

    static double[][] MatLoad(string fn, int[] usecols,
      char sep, string comment)
    {
      List"lt"double[]"gt" result = new List"lt"double[]"gt"();
      string line = "";
      FileStream ifs = new FileStream(fn, FileMode.Open);
      StreamReader sr = new StreamReader(ifs);
      while ((line = sr.ReadLine()) != null)
      {
        if (line.StartsWith(comment) == true)
          continue;
        string[] tokens = line.Split(sep);
        List"lt"double"gt" lst = new List"lt"double"gt"();
        for (int j = 0; j "lt" usecols.Length; ++j)
          lst.Add(double.Parse(tokens[usecols[j]]));
        double[] row = lst.ToArray();
        result.Add(row);
      }
      sr.Close(); ifs.Close();
      return result.ToArray();
    }

    static double[] MatToVec(double[][] mat)
    {
      int nRows = mat.Length;
      int nCols = mat[0].Length;
      double[] result = new double[nRows * nCols];
      int k = 0;
      for (int i = 0; i "lt" nRows; ++i)
        for (int j = 0; j "lt" nCols; ++j)
          result[k++] = mat[i][j];
      return result;
    }

    static void VecShow(double[] vec, int dec, int wid)
    {
      for (int i = 0; i "lt" vec.Length; ++i)
        Console.Write(vec[i].ToString("F" + dec).
          PadLeft(wid));
      Console.WriteLine("");
    }

  } // class Program

  // ========================================================

  public class NeuralNetworkRegressor
  {
    public int ni; // number input nodes
    public int nh; // hidden
    public int no; // outout

    public Random rnd; // wt init, train order

    public double[] iNodes;
    public double[][] ihWeights; // input-hidden
    public double[] hBiases;
    public double[] hNodes;

    public double[][] hoWeights; // hidden-output
    public double[] oBiases;
    public double[] oNodes;  // single val as array

    public NeuralNetworkRegressor(int numIn, int numHid,
      int numOut, int seed = 0)
    {
      this.ni = numIn;
      this.nh = numHid;
      this.no = numOut;  // 1 for regression
      this.rnd = new Random(seed);

      this.iNodes = new double[numIn];

      this.ihWeights = MatMake(numIn, numHid);
      this.hBiases = new double[numHid];
      this.hNodes = new double[numHid];

      this.hoWeights = MatMake(numHid, numOut);
      this.oBiases = new double[numOut];  // [1]
      this.oNodes = new double[numOut];  // [1]
    } // ctor

    private static double[][] MatMake(int nr, int nc)
    {
      double[][] result = new double[nr][];
      for (int i = 0; i "lt" nr; ++i)
        result[i] = new double[nc];
      return result;
    }

    // ------------------------------------------------------

    public double Predict(double[] x)
    {
      double[] hSums = new double[this.nh]; // scratch 
      double[] oSums = new double[this.no]; // out sums

      for (int i = 0; i "lt" x.Length; ++i)
        this.iNodes[i] = x[i];  // no need to copy
 
      // 1. compute i-h sum of weights * inputs
      for (int j = 0; j "lt" this.nh; ++j)
        for (int i = 0; i "lt" this.ni; ++i)
          hSums[j] += this.iNodes[i] *
            this.ihWeights[i][j]; // note +=

      // 2. add biases to hidden sums
      for (int i = 0; i "lt" this.nh; ++i)
        hSums[i] += this.hBiases[i];

      // 3. apply hidden activation
      for (int i = 0; i "lt" this.nh; ++i)
        this.hNodes[i] = HyperTan(hSums[i]);

      // 4. compute h-o sum of wts * hOutputs
      for (int j = 0; j "lt" this.no; ++j)
        for (int i = 0; i "lt" this.nh; ++i)
          oSums[j] += this.hNodes[i] *
            this.hoWeights[i][j];  // [1]

      // 5. add biases to output sums
      for (int i = 0; i "lt" this.no; ++i)
        oSums[i] += this.oBiases[i];

      // 6. apply output activation
      for (int i = 0; i "lt" this.no; ++i)
        this.oNodes[i] = Identity(oSums[i]);

      return this.oNodes[0];  // single value
    }

    // ------------------------------------------------------

    private static double HyperTan(double x)
    {
      if (x "lt" -10.0) return -1.0;
      else if (x "gt" 10.0) return 1.0;
      else return Math.Tanh(x);
    }

    // ------------------------------------------------------

    private static double Identity(double x)
    {
      return x;
    }

    // ------------------------------------------------------

    public void Train(double[][] trainX, double[] trainY,
      double lrnRate, int maxEpochs)
    {
      int freq = maxEpochs / 5;  // show progress 5 times

      // set up gradients
      double[][] ihGrads = MatMake(this.ni, this.nh);
      double[] hbGrads = new double[nh];
      double[][] hoGrads = MatMake(nh, no);
      double[] obGrads = new double[no];

      // set up signals, convenience
      double[] oSignals = new double[this.no];
      double[] hSignals = new double[this.nh];

      // 1. initialize the weights and biases
      double lo = -0.01; double hi = +0.01;

      for (int i = 0; i "lt" this.ni; ++i) // ih weights
        for (int j = 0; j "lt" this.nh; ++j)
          this.ihWeights[i][j] = 
            (hi - lo) * rnd.NextDouble() + lo;

      for (int i = 0; i "lt" this.nh; ++i) // h biases
        this.hBiases[i] = 
          (hi - lo) * rnd.NextDouble() + lo;

      for (int i = 0; i "lt" this.nh; ++i) // ho weights
        for (int j = 0; j "lt" this.no; ++j)
          this.hoWeights[i][j] =
            (hi - lo) * rnd.NextDouble() + lo;

      for (int i = 0; i "lt" this.no; ++i) // o biases
        this.oBiases[i] = 
          (hi - lo) * rnd.NextDouble() + lo;

      // 2. prepare indices for random order processing
      int n = trainX.Length;
      int[] indices = new int[n];
      for (int i = 0; i "lt" n; ++i)
        indices[i] = i;

      // 3. loop max epochs times
      for (int epoch = 0; epoch "lt" maxEpochs; ++epoch)
      {
        this.Shuffle(indices);
        for (int ii = 0; ii "lt" n; ++ii) // loop each item
        {
          int idx = indices[ii];
          double[] x = trainX[idx];
          double y = trainY[idx];
          this.Predict(x); // forward pass ignore return
  
          // 1. compute output node signals
          for (int k = 0; k "lt" this.no; ++k) // always 1
          {
            double derivative = 1.0; // for Identity output
            oSignals[k] = derivative * (this.oNodes[k] - y);
          }

          // 2. hidden-to-output weight gradients
          for (int j = 0; j "lt" this.nh; ++j)
            for (int k = 0; k "lt" this.no; ++k)
              hoGrads[j][k] = oSignals[k] * this.hNodes[j];

          // 3. output node bias gradient
          for (int k = 0; k "lt" this.no; ++k)
            obGrads[k] = oSignals[k] * 1.0; // dummy 

          // 4. hidden node signals
          for (int j = 0; j "lt" this.nh; ++j)
          {
            double sum = 0.0;
            for (int k = 0; k "lt" this.no; ++k)
              sum += oSignals[k] * this.hoWeights[j][k];
            double derivative = 
              (1 - this.hNodes[j]) *
              (1 + this.hNodes[j]);  // tanh
            hSignals[j] = derivative * sum;
          }

          // 5. input-to-hidden weight gradients
          for (int i = 0; i "lt" this.ni; ++i)
            for (int j = 0; j "lt" this.nh; ++j)
              ihGrads[i][j] = hSignals[j] * this.iNodes[i];

          // 6. hidden node bias gradients
          for (int j = 0; j "lt" this.nh; ++j)
            hbGrads[j] = hSignals[j] * 1.0; // dummy

          // gradients computed, now update weights, biases

          // 1. input-to-hidden weights
          for (int i = 0; i "lt" this.ni; ++i)
          {
            for (int j = 0; j "lt" this.nh; ++j)
            {
              double delta = -1.0 * lrnRate * ihGrads[i][j];
              this.ihWeights[i][j] += delta;
            }
          }

          // 2. hidden node biases
          for (int j = 0; j "lt" this.nh; ++j)
          {
            double delta = -1.0 * lrnRate * hbGrads[j];
            this.hBiases[j] += delta;
          }

          // 3. hidden-to-output weights
          for (int j = 0; j "lt" this.nh; ++j)
          {
            for (int k = 0; k "lt" this.no; ++k)
            {
              double delta = -1.0 * lrnRate * hoGrads[j][k];
              this.hoWeights[j][k] += delta;
            }
          }

          // 4. output node biases
          for (int k = 0; k "lt" this.no; ++k)
          {
            double delta = -1.0 * lrnRate * obGrads[k];
            this.oBiases[k] += delta;
          }
        } // ii each item

        if (epoch % freq == 0)  // show progress
        {
          double mse = this.MSE(trainX, trainY);
          double acc = this.Accuracy(trainX, trainY, 0.10);

          string s1 = "epoch: " + epoch.ToString().PadLeft(6);
          string s2 = "  MSE = " + mse.ToString("F4");
          string s3 = "  acc = " + acc.ToString("F4");
          Console.WriteLine(s1 + s2 + s3);
        }

      } // each epoch

      return; // weights and biases have been set
    } // Train()

    // ------------------------------------------------------

    private void Shuffle(int[] indices)
    {
      for (int i = 0; i "lt" indices.Length; ++i)
      {
        int r = this.rnd.Next(i, indices.Length);
        int tmp = indices[r];
        indices[r] = indices[i];
        indices[i] = tmp;
      }
    }

    // ------------------------------------------------------

    public double Accuracy(double[][] dataX,
      double[] dataY, double pctClose)
    {
      int n = dataX.Length;
      int nCorrect = 0; int nWrong = 0;
      for (int i = 0; i "lt" n; ++i)
      {
        double predY = this.Predict(dataX[i]);
        double actualY = dataY[i];
        if (Math.Abs(predY - actualY) "lt"
          Math.Abs(pctClose * actualY))
          ++nCorrect;
        else
          ++nWrong;
      }
      return (nCorrect * 1.0) / (nCorrect + nWrong);
    }

    // ------------------------------------------------------

    public double MSE(double[][] dataX, double[] dataY)
    {
      int n = dataX.Length;
      double sum = 0.0;
      for (int i = 0; i "lt" n; ++i)
      {
        double predY = this.Predict(dataX[i]);
        double actualY = dataY[i];
        sum += (predY - actualY) *
          (predY - actualY);
      }
      return sum / n;
    }

    // ------------------------------------------------------

  } // class NeuralNetworkRegressor

} // ns

Training data:


# diabetes_norm_train_342.txt
# cols [0] to [9] predictors. col [10] target
# norm division constants:
# 100, -1, 100, 1000, 1000, 1000, 100, 10, 10, 1000, 1000
#
0.5900, 1.0000, 0.3210, 0.1010, 0.1570, 0.0932, 0.3800, 0.4000, 0.4860, 0.0870, 0.1510
0.4800, 0.0000, 0.2160, 0.0870, 0.1830, 0.1032, 0.7000, 0.3000, 0.3892, 0.0690, 0.0750
0.7200, 1.0000, 0.3050, 0.0930, 0.1560, 0.0936, 0.4100, 0.4000, 0.4673, 0.0850, 0.1410
0.2400, 0.0000, 0.2530, 0.0840, 0.1980, 0.1314, 0.4000, 0.5000, 0.4890, 0.0890, 0.2060
0.5000, 0.0000, 0.2300, 0.1010, 0.1920, 0.1254, 0.5200, 0.4000, 0.4291, 0.0800, 0.1350
0.2300, 0.0000, 0.2260, 0.0890, 0.1390, 0.0648, 0.6100, 0.2000, 0.4190, 0.0680, 0.0970
0.3600, 1.0000, 0.2200, 0.0900, 0.1600, 0.0996, 0.5000, 0.3000, 0.3951, 0.0820, 0.1380
0.6600, 1.0000, 0.2620, 0.1140, 0.2550, 0.1850, 0.5600, 0.4550, 0.4249, 0.0920, 0.0630
0.6000, 1.0000, 0.3210, 0.0830, 0.1790, 0.1194, 0.4200, 0.4000, 0.4477, 0.0940, 0.1100
0.2900, 0.0000, 0.3000, 0.0850, 0.1800, 0.0934, 0.4300, 0.4000, 0.5385, 0.0880, 0.3100
0.2200, 0.0000, 0.1860, 0.0970, 0.1140, 0.0576, 0.4600, 0.2000, 0.3951, 0.0830, 0.1010
0.5600, 1.0000, 0.2800, 0.0850, 0.1840, 0.1448, 0.3200, 0.6000, 0.3584, 0.0770, 0.0690
0.5300, 0.0000, 0.2370, 0.0920, 0.1860, 0.1092, 0.6200, 0.3000, 0.4304, 0.0810, 0.1790
0.5000, 1.0000, 0.2620, 0.0970, 0.1860, 0.1054, 0.4900, 0.4000, 0.5063, 0.0880, 0.1850
0.6100, 0.0000, 0.2400, 0.0910, 0.2020, 0.1154, 0.7200, 0.3000, 0.4291, 0.0730, 0.1180
0.3400, 1.0000, 0.2470, 0.1180, 0.2540, 0.1842, 0.3900, 0.7000, 0.5037, 0.0810, 0.1710
0.4700, 0.0000, 0.3030, 0.1090, 0.2070, 0.1002, 0.7000, 0.3000, 0.5215, 0.0980, 0.1660
0.6800, 1.0000, 0.2750, 0.1110, 0.2140, 0.1470, 0.3900, 0.5000, 0.4942, 0.0910, 0.1440
0.3800, 0.0000, 0.2540, 0.0840, 0.1620, 0.1030, 0.4200, 0.4000, 0.4443, 0.0870, 0.0970
0.4100, 0.0000, 0.2470, 0.0830, 0.1870, 0.1082, 0.6000, 0.3000, 0.4543, 0.0780, 0.1680
0.3500, 0.0000, 0.2110, 0.0820, 0.1560, 0.0878, 0.5000, 0.3000, 0.4511, 0.0950, 0.0680
0.2500, 1.0000, 0.2430, 0.0950, 0.1620, 0.0986, 0.5400, 0.3000, 0.3850, 0.0870, 0.0490
0.2500, 0.0000, 0.2600, 0.0920, 0.1870, 0.1204, 0.5600, 0.3000, 0.3970, 0.0880, 0.0680
0.6100, 1.0000, 0.3200, 0.1037, 0.2100, 0.0852, 0.3500, 0.6000, 0.6107, 0.1240, 0.2450
0.3100, 0.0000, 0.2970, 0.0880, 0.1670, 0.1034, 0.4800, 0.4000, 0.4357, 0.0780, 0.1840
0.3000, 1.0000, 0.2520, 0.0830, 0.1780, 0.1184, 0.3400, 0.5000, 0.4852, 0.0830, 0.2020
0.1900, 0.0000, 0.1920, 0.0870, 0.1240, 0.0540, 0.5700, 0.2000, 0.4174, 0.0900, 0.1370
0.4200, 0.0000, 0.3190, 0.0830, 0.1580, 0.0876, 0.5300, 0.3000, 0.4466, 0.1010, 0.0850
0.6300, 0.0000, 0.2440, 0.0730, 0.1600, 0.0914, 0.4800, 0.3000, 0.4635, 0.0780, 0.1310
0.6700, 1.0000, 0.2580, 0.1130, 0.1580, 0.0542, 0.6400, 0.2000, 0.5293, 0.1040, 0.2830
0.3200, 0.0000, 0.3050, 0.0890, 0.1820, 0.1106, 0.5600, 0.3000, 0.4344, 0.0890, 0.1290
0.4200, 0.0000, 0.2030, 0.0710, 0.1610, 0.0812, 0.6600, 0.2000, 0.4234, 0.0810, 0.0590
0.5800, 1.0000, 0.3800, 0.1030, 0.1500, 0.1072, 0.2200, 0.7000, 0.4644, 0.0980, 0.3410
0.5700, 0.0000, 0.2170, 0.0940, 0.1570, 0.0580, 0.8200, 0.2000, 0.4443, 0.0920, 0.0870
0.5300, 0.0000, 0.2050, 0.0780, 0.1470, 0.0842, 0.5200, 0.3000, 0.3989, 0.0750, 0.0650
0.6200, 1.0000, 0.2350, 0.0803, 0.2250, 0.1128, 0.8600, 0.2620, 0.4875, 0.0960, 0.1020
0.5200, 0.0000, 0.2850, 0.1100, 0.1950, 0.0972, 0.6000, 0.3000, 0.5242, 0.0850, 0.2650
0.4600, 0.0000, 0.2740, 0.0780, 0.1710, 0.0880, 0.5800, 0.3000, 0.4828, 0.0900, 0.2760
0.4800, 1.0000, 0.3300, 0.1230, 0.2530, 0.1636, 0.4400, 0.6000, 0.5425, 0.0970, 0.2520
0.4800, 1.0000, 0.2770, 0.0730, 0.1910, 0.1194, 0.4600, 0.4000, 0.4852, 0.0920, 0.0900
0.5000, 1.0000, 0.2560, 0.1010, 0.2290, 0.1622, 0.4300, 0.5000, 0.4779, 0.1140, 0.1000
0.2100, 0.0000, 0.2010, 0.0630, 0.1350, 0.0690, 0.5400, 0.3000, 0.4094, 0.0890, 0.0550
0.3200, 1.0000, 0.2540, 0.0903, 0.1530, 0.1004, 0.3400, 0.4500, 0.4533, 0.0830, 0.0610
0.5400, 0.0000, 0.2420, 0.0740, 0.2040, 0.1090, 0.8200, 0.2000, 0.4174, 0.1090, 0.0920
0.6100, 1.0000, 0.3270, 0.0970, 0.1770, 0.1184, 0.2900, 0.6000, 0.4997, 0.0870, 0.2590
0.5600, 1.0000, 0.2310, 0.1040, 0.1810, 0.1164, 0.4700, 0.4000, 0.4477, 0.0790, 0.0530
0.3300, 0.0000, 0.2530, 0.0850, 0.1550, 0.0850, 0.5100, 0.3000, 0.4554, 0.0700, 0.1900
0.2700, 0.0000, 0.1960, 0.0780, 0.1280, 0.0680, 0.4300, 0.3000, 0.4443, 0.0710, 0.1420
0.6700, 1.0000, 0.2250, 0.0980, 0.1910, 0.1192, 0.6100, 0.3000, 0.3989, 0.0860, 0.0750
0.3700, 1.0000, 0.2770, 0.0930, 0.1800, 0.1194, 0.3000, 0.6000, 0.5030, 0.0880, 0.1420
0.5800, 0.0000, 0.2570, 0.0990, 0.1570, 0.0916, 0.4900, 0.3000, 0.4407, 0.0930, 0.1550
0.6500, 1.0000, 0.2790, 0.1030, 0.1590, 0.0968, 0.4200, 0.4000, 0.4615, 0.0860, 0.2250
0.3400, 0.0000, 0.2550, 0.0930, 0.2180, 0.1440, 0.5700, 0.4000, 0.4443, 0.0880, 0.0590
0.4600, 0.0000, 0.2490, 0.1150, 0.1980, 0.1296, 0.5400, 0.4000, 0.4277, 0.1030, 0.1040
0.3500, 0.0000, 0.2870, 0.0970, 0.2040, 0.1268, 0.6400, 0.3000, 0.4190, 0.0930, 0.1820
0.3700, 0.0000, 0.2180, 0.0840, 0.1840, 0.1010, 0.7300, 0.3000, 0.3912, 0.0930, 0.1280
0.3700, 0.0000, 0.3020, 0.0870, 0.1660, 0.0960, 0.4000, 0.4150, 0.5011, 0.0870, 0.0520
0.4100, 0.0000, 0.2050, 0.0800, 0.1240, 0.0488, 0.6400, 0.2000, 0.4025, 0.0750, 0.0370
0.6000, 0.0000, 0.2040, 0.1050, 0.1980, 0.0784, 0.9900, 0.2000, 0.4635, 0.0790, 0.1700
0.6600, 1.0000, 0.2400, 0.0980, 0.2360, 0.1464, 0.5800, 0.4000, 0.5063, 0.0960, 0.1700
0.2900, 0.0000, 0.2600, 0.0830, 0.1410, 0.0652, 0.6400, 0.2000, 0.4078, 0.0830, 0.0610
0.3700, 1.0000, 0.2680, 0.0790, 0.1570, 0.0980, 0.2800, 0.6000, 0.5043, 0.0960, 0.1440
0.4100, 1.0000, 0.2570, 0.0830, 0.1810, 0.1066, 0.6600, 0.3000, 0.3738, 0.0850, 0.0520
0.3900, 0.0000, 0.2290, 0.0770, 0.2040, 0.1432, 0.4600, 0.4000, 0.4304, 0.0740, 0.1280
0.6700, 1.0000, 0.2400, 0.0830, 0.1430, 0.0772, 0.4900, 0.3000, 0.4431, 0.0940, 0.0710
0.3600, 1.0000, 0.2410, 0.1120, 0.1930, 0.1250, 0.3500, 0.6000, 0.5106, 0.0950, 0.1630
0.4600, 1.0000, 0.2470, 0.0850, 0.1740, 0.1232, 0.3000, 0.6000, 0.4644, 0.0960, 0.1500
0.6000, 1.0000, 0.2500, 0.0897, 0.1850, 0.1208, 0.4600, 0.4020, 0.4511, 0.0920, 0.0970
0.5900, 1.0000, 0.2360, 0.0830, 0.1650, 0.1000, 0.4700, 0.4000, 0.4500, 0.0920, 0.1600
0.5300, 0.0000, 0.2210, 0.0930, 0.1340, 0.0762, 0.4600, 0.3000, 0.4078, 0.0960, 0.1780
0.4800, 0.0000, 0.1990, 0.0910, 0.1890, 0.1096, 0.6900, 0.3000, 0.3951, 0.1010, 0.0480
0.4800, 0.0000, 0.2950, 0.1310, 0.2070, 0.1322, 0.4700, 0.4000, 0.4935, 0.1060, 0.2700
0.6600, 1.0000, 0.2600, 0.0910, 0.2640, 0.1466, 0.6500, 0.4000, 0.5568, 0.0870, 0.2020
0.5200, 1.0000, 0.2450, 0.0940, 0.2170, 0.1494, 0.4800, 0.5000, 0.4585, 0.0890, 0.1110
0.5200, 1.0000, 0.2660, 0.1110, 0.2090, 0.1264, 0.6100, 0.3000, 0.4682, 0.1090, 0.0850
0.4600, 1.0000, 0.2350, 0.0870, 0.1810, 0.1148, 0.4400, 0.4000, 0.4710, 0.0980, 0.0420
0.4000, 1.0000, 0.2900, 0.1150, 0.0970, 0.0472, 0.3500, 0.2770, 0.4304, 0.0950, 0.1700
0.2200, 0.0000, 0.2300, 0.0730, 0.1610, 0.0978, 0.5400, 0.3000, 0.3829, 0.0910, 0.2000
0.5000, 0.0000, 0.2100, 0.0880, 0.1400, 0.0718, 0.3500, 0.4000, 0.5112, 0.0710, 0.2520
0.2000, 0.0000, 0.2290, 0.0870, 0.1910, 0.1282, 0.5300, 0.4000, 0.3892, 0.0850, 0.1130
0.6800, 0.0000, 0.2750, 0.1070, 0.2410, 0.1496, 0.6400, 0.4000, 0.4920, 0.0900, 0.1430
0.5200, 1.0000, 0.2430, 0.0860, 0.1970, 0.1336, 0.4400, 0.5000, 0.4575, 0.0910, 0.0510
0.4400, 0.0000, 0.2310, 0.0870, 0.2130, 0.1264, 0.7700, 0.3000, 0.3871, 0.0720, 0.0520
0.3800, 0.0000, 0.2730, 0.0810, 0.1460, 0.0816, 0.4700, 0.3000, 0.4466, 0.0810, 0.2100
0.4900, 0.0000, 0.2270, 0.0653, 0.1680, 0.0962, 0.6200, 0.2710, 0.3892, 0.0600, 0.0650
0.6100, 0.0000, 0.3300, 0.0950, 0.1820, 0.1148, 0.5400, 0.3000, 0.4190, 0.0740, 0.1410
0.2900, 1.0000, 0.1940, 0.0830, 0.1520, 0.1058, 0.3900, 0.4000, 0.3584, 0.0830, 0.0550
0.6100, 0.0000, 0.2580, 0.0980, 0.2350, 0.1258, 0.7600, 0.3000, 0.5112, 0.0820, 0.1340
0.3400, 1.0000, 0.2260, 0.0750, 0.1660, 0.0918, 0.6000, 0.3000, 0.4263, 0.1080, 0.0420
0.3600, 0.0000, 0.2190, 0.0890, 0.1890, 0.1052, 0.6800, 0.3000, 0.4369, 0.0960, 0.1110
0.5200, 0.0000, 0.2400, 0.0830, 0.1670, 0.0866, 0.7100, 0.2000, 0.3850, 0.0940, 0.0980
0.6100, 0.0000, 0.3120, 0.0790, 0.2350, 0.1568, 0.4700, 0.5000, 0.5050, 0.0960, 0.1640
0.4300, 0.0000, 0.2680, 0.1230, 0.1930, 0.1022, 0.6700, 0.3000, 0.4779, 0.0940, 0.0480
0.3500, 0.0000, 0.2040, 0.0650, 0.1870, 0.1056, 0.6700, 0.2790, 0.4277, 0.0780, 0.0960
0.2700, 0.0000, 0.2480, 0.0910, 0.1890, 0.1068, 0.6900, 0.3000, 0.4190, 0.0690, 0.0900
0.2900, 0.0000, 0.2100, 0.0710, 0.1560, 0.0970, 0.3800, 0.4000, 0.4654, 0.0900, 0.1620
0.6400, 1.0000, 0.2730, 0.1090, 0.1860, 0.1076, 0.3800, 0.5000, 0.5308, 0.0990, 0.1500
0.4100, 0.0000, 0.3460, 0.0873, 0.2050, 0.1426, 0.4100, 0.5000, 0.4673, 0.1100, 0.2790
0.4900, 1.0000, 0.2590, 0.0910, 0.1780, 0.1066, 0.5200, 0.3000, 0.4575, 0.0750, 0.0920
0.4800, 0.0000, 0.2040, 0.0980, 0.2090, 0.1394, 0.4600, 0.5000, 0.4771, 0.0780, 0.0830
0.5300, 0.0000, 0.2800, 0.0880, 0.2330, 0.1438, 0.5800, 0.4000, 0.5050, 0.0910, 0.1280
0.5300, 1.0000, 0.2220, 0.1130, 0.1970, 0.1152, 0.6700, 0.3000, 0.4304, 0.1000, 0.1020
0.2300, 0.0000, 0.2900, 0.0900, 0.2160, 0.1314, 0.6500, 0.3000, 0.4585, 0.0910, 0.3020
0.6500, 1.0000, 0.3020, 0.0980, 0.2190, 0.1606, 0.4000, 0.5000, 0.4522, 0.0840, 0.1980
0.4100, 0.0000, 0.3240, 0.0940, 0.1710, 0.1044, 0.5600, 0.3000, 0.3970, 0.0760, 0.0950
0.5500, 1.0000, 0.2340, 0.0830, 0.1660, 0.1016, 0.4600, 0.4000, 0.4522, 0.0960, 0.0530
0.2200, 0.0000, 0.1930, 0.0820, 0.1560, 0.0932, 0.5200, 0.3000, 0.3989, 0.0710, 0.1340
0.5600, 0.0000, 0.3100, 0.0787, 0.1870, 0.1414, 0.3400, 0.5500, 0.4060, 0.0900, 0.1440
0.5400, 1.0000, 0.3060, 0.1033, 0.1440, 0.0798, 0.3000, 0.4800, 0.5142, 0.1010, 0.2320
0.5900, 1.0000, 0.2550, 0.0953, 0.1900, 0.1394, 0.3500, 0.5430, 0.4357, 0.1170, 0.0810
0.6000, 1.0000, 0.2340, 0.0880, 0.1530, 0.0898, 0.5800, 0.3000, 0.3258, 0.0950, 0.1040
0.5400, 0.0000, 0.2680, 0.0870, 0.2060, 0.1220, 0.6800, 0.3000, 0.4382, 0.0800, 0.0590
0.2500, 0.0000, 0.2830, 0.0870, 0.1930, 0.1280, 0.4900, 0.4000, 0.4382, 0.0920, 0.2460
0.5400, 1.0000, 0.2770, 0.1130, 0.2000, 0.1284, 0.3700, 0.5000, 0.5153, 0.1130, 0.2970
0.5500, 0.0000, 0.3660, 0.1130, 0.1990, 0.0944, 0.4300, 0.4630, 0.5730, 0.0970, 0.2580
0.4000, 1.0000, 0.2650, 0.0930, 0.2360, 0.1470, 0.3700, 0.7000, 0.5561, 0.0920, 0.2290
0.6200, 1.0000, 0.3180, 0.1150, 0.1990, 0.1286, 0.4400, 0.5000, 0.4883, 0.0980, 0.2750
0.6500, 0.0000, 0.2440, 0.1200, 0.2220, 0.1356, 0.3700, 0.6000, 0.5509, 0.1240, 0.2810
0.3300, 1.0000, 0.2540, 0.1020, 0.2060, 0.1410, 0.3900, 0.5000, 0.4868, 0.1050, 0.1790
0.5300, 0.0000, 0.2200, 0.0940, 0.1750, 0.0880, 0.5900, 0.3000, 0.4942, 0.0980, 0.2000
0.3500, 0.0000, 0.2680, 0.0980, 0.1620, 0.1036, 0.4500, 0.4000, 0.4205, 0.0860, 0.2000
0.6600, 0.0000, 0.2800, 0.1010, 0.1950, 0.1292, 0.4000, 0.5000, 0.4860, 0.0940, 0.1730
0.6200, 1.0000, 0.3390, 0.1010, 0.2210, 0.1564, 0.3500, 0.6000, 0.4997, 0.1030, 0.1800
0.5000, 1.0000, 0.2960, 0.0943, 0.3000, 0.2424, 0.3300, 0.9090, 0.4812, 0.1090, 0.0840
0.4700, 0.0000, 0.2860, 0.0970, 0.1640, 0.0906, 0.5600, 0.3000, 0.4466, 0.0880, 0.1210
0.4700, 1.0000, 0.2560, 0.0940, 0.1650, 0.0748, 0.4000, 0.4000, 0.5526, 0.0930, 0.1610
0.2400, 0.0000, 0.2070, 0.0870, 0.1490, 0.0806, 0.6100, 0.2000, 0.3611, 0.0780, 0.0990
0.5800, 1.0000, 0.2620, 0.0910, 0.2170, 0.1242, 0.7100, 0.3000, 0.4691, 0.0680, 0.1090
0.3400, 0.0000, 0.2060, 0.0870, 0.1850, 0.1122, 0.5800, 0.3000, 0.4304, 0.0740, 0.1150
0.5100, 0.0000, 0.2790, 0.0960, 0.1960, 0.1222, 0.4200, 0.5000, 0.5069, 0.1200, 0.2680
0.3100, 1.0000, 0.3530, 0.1250, 0.1870, 0.1124, 0.4800, 0.4000, 0.4890, 0.1090, 0.2740
0.2200, 0.0000, 0.1990, 0.0750, 0.1750, 0.1086, 0.5400, 0.3000, 0.4127, 0.0720, 0.1580
0.5300, 1.0000, 0.2440, 0.0920, 0.2140, 0.1460, 0.5000, 0.4000, 0.4500, 0.0970, 0.1070
0.3700, 1.0000, 0.2140, 0.0830, 0.1280, 0.0696, 0.4900, 0.3000, 0.3850, 0.0840, 0.0830
0.2800, 0.0000, 0.3040, 0.0850, 0.1980, 0.1156, 0.6700, 0.3000, 0.4344, 0.0800, 0.1030
0.4700, 0.0000, 0.3160, 0.0840, 0.1540, 0.0880, 0.3000, 0.5100, 0.5199, 0.1050, 0.2720
0.2300, 0.0000, 0.1880, 0.0780, 0.1450, 0.0720, 0.6300, 0.2000, 0.3912, 0.0860, 0.0850
0.5000, 0.0000, 0.3100, 0.1230, 0.1780, 0.1050, 0.4800, 0.4000, 0.4828, 0.0880, 0.2800
0.5800, 1.0000, 0.3670, 0.1170, 0.1660, 0.0938, 0.4400, 0.4000, 0.4949, 0.1090, 0.3360
0.5500, 0.0000, 0.3210, 0.1100, 0.1640, 0.0842, 0.4200, 0.4000, 0.5242, 0.0900, 0.2810
0.6000, 1.0000, 0.2770, 0.1070, 0.1670, 0.1146, 0.3800, 0.4000, 0.4277, 0.0950, 0.1180
0.4100, 0.0000, 0.3080, 0.0810, 0.2140, 0.1520, 0.2800, 0.7600, 0.5136, 0.1230, 0.3170
0.6000, 1.0000, 0.2750, 0.1060, 0.2290, 0.1438, 0.5100, 0.4000, 0.5142, 0.0910, 0.2350
0.4000, 0.0000, 0.2690, 0.0920, 0.2030, 0.1198, 0.7000, 0.3000, 0.4190, 0.0810, 0.0600
0.5700, 1.0000, 0.3070, 0.0900, 0.2040, 0.1478, 0.3400, 0.6000, 0.4710, 0.0930, 0.1740
0.3700, 0.0000, 0.3830, 0.1130, 0.1650, 0.0946, 0.5300, 0.3000, 0.4466, 0.0790, 0.2590
0.4000, 1.0000, 0.3190, 0.0950, 0.1980, 0.1356, 0.3800, 0.5000, 0.4804, 0.0930, 0.1780
0.3300, 0.0000, 0.3500, 0.0890, 0.2000, 0.1304, 0.4200, 0.4760, 0.4927, 0.1010, 0.1280
0.3200, 1.0000, 0.2780, 0.0890, 0.2160, 0.1462, 0.5500, 0.4000, 0.4304, 0.0910, 0.0960
0.3500, 1.0000, 0.2590, 0.0810, 0.1740, 0.1024, 0.3100, 0.6000, 0.5313, 0.0820, 0.1260
0.5500, 0.0000, 0.3290, 0.1020, 0.1640, 0.1062, 0.4100, 0.4000, 0.4431, 0.0890, 0.2880
0.4900, 0.0000, 0.2600, 0.0930, 0.1830, 0.1002, 0.6400, 0.3000, 0.4543, 0.0880, 0.0880
0.3900, 1.0000, 0.2630, 0.1150, 0.2180, 0.1582, 0.3200, 0.7000, 0.4935, 0.1090, 0.2920
0.6000, 1.0000, 0.2230, 0.1130, 0.1860, 0.1258, 0.4600, 0.4000, 0.4263, 0.0940, 0.0710
0.6700, 1.0000, 0.2830, 0.0930, 0.2040, 0.1322, 0.4900, 0.4000, 0.4736, 0.0920, 0.1970
0.4100, 1.0000, 0.3200, 0.1090, 0.2510, 0.1706, 0.4900, 0.5000, 0.5056, 0.1030, 0.1860
0.4400, 0.0000, 0.2540, 0.0950, 0.1620, 0.0926, 0.5300, 0.3000, 0.4407, 0.0830, 0.0250
0.4800, 1.0000, 0.2330, 0.0893, 0.2120, 0.1428, 0.4600, 0.4610, 0.4754, 0.0980, 0.0840
0.4500, 0.0000, 0.2030, 0.0743, 0.1900, 0.1262, 0.4900, 0.3880, 0.4304, 0.0790, 0.0960
0.4700, 0.0000, 0.3040, 0.1200, 0.1990, 0.1200, 0.4600, 0.4000, 0.5106, 0.0870, 0.1950
0.4600, 0.0000, 0.2060, 0.0730, 0.1720, 0.1070, 0.5100, 0.3000, 0.4249, 0.0800, 0.0530
0.3600, 1.0000, 0.3230, 0.1150, 0.2860, 0.1994, 0.3900, 0.7000, 0.5472, 0.1120, 0.2170
0.3400, 0.0000, 0.2920, 0.0730, 0.1720, 0.1082, 0.4900, 0.4000, 0.4304, 0.0910, 0.1720
0.5300, 1.0000, 0.3310, 0.1170, 0.1830, 0.1190, 0.4800, 0.4000, 0.4382, 0.1060, 0.1310
0.6100, 0.0000, 0.2460, 0.1010, 0.2090, 0.1068, 0.7700, 0.3000, 0.4836, 0.0880, 0.2140
0.3700, 0.0000, 0.2020, 0.0810, 0.1620, 0.0878, 0.6300, 0.3000, 0.4025, 0.0880, 0.0590
0.3300, 1.0000, 0.2080, 0.0840, 0.1250, 0.0702, 0.4600, 0.3000, 0.3784, 0.0660, 0.0700
0.6800, 0.0000, 0.3280, 0.1057, 0.2050, 0.1164, 0.4000, 0.5130, 0.5493, 0.1170, 0.2200
0.4900, 1.0000, 0.3190, 0.0940, 0.2340, 0.1558, 0.3400, 0.7000, 0.5398, 0.1220, 0.2680
0.4800, 0.0000, 0.2390, 0.1090, 0.2320, 0.1052, 0.3700, 0.6000, 0.6107, 0.0960, 0.1520
0.5500, 1.0000, 0.2450, 0.0840, 0.1790, 0.1058, 0.6600, 0.3000, 0.3584, 0.0870, 0.0470
0.4300, 0.0000, 0.2210, 0.0660, 0.1340, 0.0772, 0.4500, 0.3000, 0.4078, 0.0800, 0.0740
0.6000, 1.0000, 0.3300, 0.0970, 0.2170, 0.1256, 0.4500, 0.5000, 0.5447, 0.1120, 0.2950
0.3100, 1.0000, 0.1900, 0.0930, 0.1370, 0.0730, 0.4700, 0.3000, 0.4443, 0.0780, 0.1010
0.5300, 1.0000, 0.2730, 0.0820, 0.1190, 0.0550, 0.3900, 0.3000, 0.4828, 0.0930, 0.1510
0.6700, 0.0000, 0.2280, 0.0870, 0.1660, 0.0986, 0.5200, 0.3000, 0.4344, 0.0920, 0.1270
0.6100, 1.0000, 0.2820, 0.1060, 0.2040, 0.1320, 0.5200, 0.4000, 0.4605, 0.0960, 0.2370
0.6200, 0.0000, 0.2890, 0.0873, 0.2060, 0.1272, 0.3300, 0.6240, 0.5434, 0.0990, 0.2250
0.6000, 0.0000, 0.2560, 0.0870, 0.2070, 0.1258, 0.6900, 0.3000, 0.4111, 0.0840, 0.0810
0.4200, 0.0000, 0.2490, 0.0910, 0.2040, 0.1418, 0.3800, 0.5000, 0.4796, 0.0890, 0.1510
0.3800, 1.0000, 0.2680, 0.1050, 0.1810, 0.1192, 0.3700, 0.5000, 0.4820, 0.0910, 0.1070
0.6200, 0.0000, 0.2240, 0.0790, 0.2220, 0.1474, 0.5900, 0.4000, 0.4357, 0.0760, 0.0640
0.6100, 1.0000, 0.2690, 0.1110, 0.2360, 0.1724, 0.3900, 0.6000, 0.4812, 0.0890, 0.1380
0.6100, 1.0000, 0.2310, 0.1130, 0.1860, 0.1144, 0.4700, 0.4000, 0.4812, 0.1050, 0.1850
0.5300, 0.0000, 0.2860, 0.0880, 0.1710, 0.0988, 0.4100, 0.4000, 0.5050, 0.0990, 0.2650
0.2800, 1.0000, 0.2470, 0.0970, 0.1750, 0.0996, 0.3200, 0.5000, 0.5380, 0.0870, 0.1010
0.2600, 1.0000, 0.3030, 0.0890, 0.2180, 0.1522, 0.3100, 0.7000, 0.5159, 0.0820, 0.1370
0.3000, 0.0000, 0.2130, 0.0870, 0.1340, 0.0630, 0.6300, 0.2000, 0.3689, 0.0660, 0.1430
0.5000, 0.0000, 0.2610, 0.1090, 0.2430, 0.1606, 0.6200, 0.4000, 0.4625, 0.0890, 0.1410
0.4800, 0.0000, 0.2020, 0.0950, 0.1870, 0.1174, 0.5300, 0.4000, 0.4419, 0.0850, 0.0790
0.5100, 0.0000, 0.2520, 0.1030, 0.1760, 0.1122, 0.3700, 0.5000, 0.4898, 0.0900, 0.2920
0.4700, 1.0000, 0.2250, 0.0820, 0.1310, 0.0668, 0.4100, 0.3000, 0.4754, 0.0890, 0.1780
0.6400, 1.0000, 0.2350, 0.0970, 0.2030, 0.1290, 0.5900, 0.3000, 0.4318, 0.0770, 0.0910
0.5100, 1.0000, 0.2590, 0.0760, 0.2400, 0.1690, 0.3900, 0.6000, 0.5075, 0.0960, 0.1160
0.3000, 0.0000, 0.2090, 0.1040, 0.1520, 0.0838, 0.4700, 0.3000, 0.4663, 0.0970, 0.0860
0.5600, 1.0000, 0.2870, 0.0990, 0.2080, 0.1464, 0.3900, 0.5000, 0.4727, 0.0970, 0.1220
0.4200, 0.0000, 0.2210, 0.0850, 0.2130, 0.1386, 0.6000, 0.4000, 0.4277, 0.0940, 0.0720
0.6200, 1.0000, 0.2670, 0.1150, 0.1830, 0.1240, 0.3500, 0.5000, 0.4788, 0.1000, 0.1290
0.3400, 0.0000, 0.3140, 0.0870, 0.1490, 0.0938, 0.4600, 0.3000, 0.3829, 0.0770, 0.1420
0.6000, 0.0000, 0.2220, 0.1047, 0.2210, 0.1054, 0.6000, 0.3680, 0.5628, 0.0930, 0.0900
0.6400, 0.0000, 0.2100, 0.0923, 0.2270, 0.1468, 0.6500, 0.3490, 0.4331, 0.1020, 0.1580
0.3900, 1.0000, 0.2120, 0.0900, 0.1820, 0.1104, 0.6000, 0.3000, 0.4060, 0.0980, 0.0390
0.7100, 1.0000, 0.2650, 0.1050, 0.2810, 0.1736, 0.5500, 0.5000, 0.5568, 0.0840, 0.1960
0.4800, 1.0000, 0.2920, 0.1100, 0.2180, 0.1516, 0.3900, 0.6000, 0.4920, 0.0980, 0.2220
0.7900, 1.0000, 0.2700, 0.1030, 0.1690, 0.1108, 0.3700, 0.5000, 0.4663, 0.1100, 0.2770
0.4000, 0.0000, 0.3070, 0.0990, 0.1770, 0.0854, 0.5000, 0.4000, 0.5338, 0.0850, 0.0990
0.4900, 1.0000, 0.2880, 0.0920, 0.2070, 0.1400, 0.4400, 0.5000, 0.4745, 0.0920, 0.1960
0.5100, 0.0000, 0.3060, 0.1030, 0.1980, 0.1066, 0.5700, 0.3000, 0.5148, 0.1000, 0.2020
0.5700, 0.0000, 0.3010, 0.1170, 0.2020, 0.1396, 0.4200, 0.5000, 0.4625, 0.1200, 0.1550
0.5900, 1.0000, 0.2470, 0.1140, 0.1520, 0.1048, 0.2900, 0.5000, 0.4511, 0.0880, 0.0770
0.5100, 0.0000, 0.2770, 0.0990, 0.2290, 0.1456, 0.6900, 0.3000, 0.4277, 0.0770, 0.1910
0.7400, 0.0000, 0.2980, 0.1010, 0.1710, 0.1048, 0.5000, 0.3000, 0.4394, 0.0860, 0.0700
0.6700, 0.0000, 0.2670, 0.1050, 0.2250, 0.1354, 0.6900, 0.3000, 0.4635, 0.0960, 0.0730
0.4900, 0.0000, 0.1980, 0.0880, 0.1880, 0.1148, 0.5700, 0.3000, 0.4394, 0.0930, 0.0490
0.5700, 0.0000, 0.2330, 0.0880, 0.1550, 0.0636, 0.7800, 0.2000, 0.4205, 0.0780, 0.0650
0.5600, 1.0000, 0.3510, 0.1230, 0.1640, 0.0950, 0.3800, 0.4000, 0.5043, 0.1170, 0.2630
0.5200, 1.0000, 0.2970, 0.1090, 0.2280, 0.1628, 0.3100, 0.8000, 0.5142, 0.1030, 0.2480
0.6900, 0.0000, 0.2930, 0.1240, 0.2230, 0.1390, 0.5400, 0.4000, 0.5011, 0.1020, 0.2960
0.3700, 0.0000, 0.2030, 0.0830, 0.1850, 0.1246, 0.3800, 0.5000, 0.4719, 0.0880, 0.2140
0.2400, 0.0000, 0.2250, 0.0890, 0.1410, 0.0680, 0.5200, 0.3000, 0.4654, 0.0840, 0.1850
0.5500, 1.0000, 0.2270, 0.0930, 0.1540, 0.0942, 0.5300, 0.3000, 0.3526, 0.0750, 0.0780
0.3600, 0.0000, 0.2280, 0.0870, 0.1780, 0.1160, 0.4100, 0.4000, 0.4654, 0.0820, 0.0930
0.4200, 1.0000, 0.2400, 0.1070, 0.1500, 0.0850, 0.4400, 0.3000, 0.4654, 0.0960, 0.2520
0.2100, 0.0000, 0.2420, 0.0760, 0.1470, 0.0770, 0.5300, 0.3000, 0.4443, 0.0790, 0.1500
0.4100, 0.0000, 0.2020, 0.0620, 0.1530, 0.0890, 0.5000, 0.3000, 0.4249, 0.0890, 0.0770
0.5700, 1.0000, 0.2940, 0.1090, 0.1600, 0.0876, 0.3100, 0.5000, 0.5333, 0.0920, 0.2080
0.2000, 1.0000, 0.2210, 0.0870, 0.1710, 0.0996, 0.5800, 0.3000, 0.4205, 0.0780, 0.0770
0.6700, 1.0000, 0.2360, 0.1113, 0.1890, 0.1054, 0.7000, 0.2700, 0.4220, 0.0930, 0.1080
0.3400, 0.0000, 0.2520, 0.0770, 0.1890, 0.1206, 0.5300, 0.4000, 0.4344, 0.0790, 0.1600
0.4100, 1.0000, 0.2490, 0.0860, 0.1920, 0.1150, 0.6100, 0.3000, 0.4382, 0.0940, 0.0530
0.3800, 1.0000, 0.3300, 0.0780, 0.3010, 0.2150, 0.5000, 0.6020, 0.5193, 0.1080, 0.2200
0.5100, 0.0000, 0.2350, 0.1010, 0.1950, 0.1210, 0.5100, 0.4000, 0.4745, 0.0940, 0.1540
0.5200, 1.0000, 0.2640, 0.0913, 0.2180, 0.1520, 0.3900, 0.5590, 0.4905, 0.0990, 0.2590
0.6700, 0.0000, 0.2980, 0.0800, 0.1720, 0.0934, 0.6300, 0.3000, 0.4357, 0.0820, 0.0900
0.6100, 0.0000, 0.3000, 0.1080, 0.1940, 0.1000, 0.5200, 0.3730, 0.5347, 0.1050, 0.2460
0.6700, 1.0000, 0.2500, 0.1117, 0.1460, 0.0934, 0.3300, 0.4420, 0.4585, 0.1030, 0.1240
0.5600, 0.0000, 0.2700, 0.1050, 0.2470, 0.1606, 0.5400, 0.5000, 0.5088, 0.0940, 0.0670
0.6400, 0.0000, 0.2000, 0.0747, 0.1890, 0.1148, 0.6200, 0.3050, 0.4111, 0.0910, 0.0720
0.5800, 1.0000, 0.2550, 0.1120, 0.1630, 0.1106, 0.2900, 0.6000, 0.4762, 0.0860, 0.2570
0.5500, 0.0000, 0.2820, 0.0910, 0.2500, 0.1402, 0.6700, 0.4000, 0.5366, 0.1030, 0.2620
0.6200, 1.0000, 0.3330, 0.1140, 0.1820, 0.1140, 0.3800, 0.5000, 0.5011, 0.0960, 0.2750
0.5700, 1.0000, 0.2560, 0.0960, 0.2000, 0.1330, 0.5200, 0.3850, 0.4318, 0.1050, 0.1770
0.2000, 1.0000, 0.2420, 0.0880, 0.1260, 0.0722, 0.4500, 0.3000, 0.3784, 0.0740, 0.0710
0.5300, 1.0000, 0.2210, 0.0980, 0.1650, 0.1052, 0.4700, 0.4000, 0.4159, 0.0810, 0.0470
0.3200, 1.0000, 0.3140, 0.0890, 0.1530, 0.0842, 0.5600, 0.3000, 0.4159, 0.0900, 0.1870
0.4100, 0.0000, 0.2310, 0.0860, 0.1480, 0.0780, 0.5800, 0.3000, 0.4094, 0.0600, 0.1250
0.6000, 0.0000, 0.2340, 0.0767, 0.2470, 0.1480, 0.6500, 0.3800, 0.5136, 0.0770, 0.0780
0.2600, 0.0000, 0.1880, 0.0830, 0.1910, 0.1036, 0.6900, 0.3000, 0.4522, 0.0690, 0.0510
0.3700, 0.0000, 0.3080, 0.1120, 0.2820, 0.1972, 0.4300, 0.7000, 0.5342, 0.1010, 0.2580
0.4500, 0.0000, 0.3200, 0.1100, 0.2240, 0.1342, 0.4500, 0.5000, 0.5412, 0.0930, 0.2150
0.6700, 0.0000, 0.3160, 0.1160, 0.1790, 0.0904, 0.4100, 0.4000, 0.5472, 0.1000, 0.3030
0.3400, 1.0000, 0.3550, 0.1200, 0.2330, 0.1466, 0.3400, 0.7000, 0.5568, 0.1010, 0.2430
0.5000, 0.0000, 0.3190, 0.0783, 0.2070, 0.1492, 0.3800, 0.5450, 0.4595, 0.0840, 0.0910
0.7100, 0.0000, 0.2950, 0.0970, 0.2270, 0.1516, 0.4500, 0.5000, 0.5024, 0.1080, 0.1500
0.5700, 1.0000, 0.3160, 0.1170, 0.2250, 0.1076, 0.4000, 0.6000, 0.5958, 0.1130, 0.3100
0.4900, 0.0000, 0.2030, 0.0930, 0.1840, 0.1030, 0.6100, 0.3000, 0.4605, 0.0930, 0.1530
0.3500, 0.0000, 0.4130, 0.0810, 0.1680, 0.1028, 0.3700, 0.5000, 0.4949, 0.0940, 0.3460
0.4100, 1.0000, 0.2120, 0.1020, 0.1840, 0.1004, 0.6400, 0.3000, 0.4585, 0.0790, 0.0630
0.7000, 1.0000, 0.2410, 0.0823, 0.1940, 0.1492, 0.3100, 0.6260, 0.4234, 0.1050, 0.0890
0.5200, 0.0000, 0.2300, 0.1070, 0.1790, 0.1237, 0.4250, 0.4210, 0.4159, 0.0930, 0.0500
0.6000, 0.0000, 0.2560, 0.0780, 0.1950, 0.0954, 0.9100, 0.2000, 0.3761, 0.0870, 0.0390
0.6200, 0.0000, 0.2250, 0.1250, 0.2150, 0.0990, 0.9800, 0.2000, 0.4500, 0.0950, 0.1030
0.4400, 1.0000, 0.3820, 0.1230, 0.2010, 0.1266, 0.4400, 0.5000, 0.5024, 0.0920, 0.3080
0.2800, 1.0000, 0.1920, 0.0810, 0.1550, 0.0946, 0.5100, 0.3000, 0.3850, 0.0870, 0.1160
0.5800, 1.0000, 0.2900, 0.0850, 0.1560, 0.1092, 0.3600, 0.4000, 0.3989, 0.0860, 0.1450
0.3900, 1.0000, 0.2400, 0.0897, 0.1900, 0.1136, 0.5200, 0.3650, 0.4804, 0.1010, 0.0740
0.3400, 1.0000, 0.2060, 0.0980, 0.1830, 0.0920, 0.8300, 0.2000, 0.3689, 0.0920, 0.0450
0.6500, 0.0000, 0.2630, 0.0700, 0.2440, 0.1662, 0.5100, 0.5000, 0.4898, 0.0980, 0.1150
0.6600, 1.0000, 0.3460, 0.1150, 0.2040, 0.1394, 0.3600, 0.6000, 0.4963, 0.1090, 0.2640
0.5100, 0.0000, 0.2340, 0.0870, 0.2200, 0.1088, 0.9300, 0.2000, 0.4511, 0.0820, 0.0870
0.5000, 1.0000, 0.2920, 0.1190, 0.1620, 0.0852, 0.5400, 0.3000, 0.4736, 0.0950, 0.2020
0.5900, 1.0000, 0.2720, 0.1070, 0.1580, 0.1020, 0.3900, 0.4000, 0.4443, 0.0930, 0.1270
0.5200, 0.0000, 0.2700, 0.0783, 0.1340, 0.0730, 0.4400, 0.3050, 0.4443, 0.0690, 0.1820
0.6900, 1.0000, 0.2450, 0.1080, 0.2430, 0.1364, 0.4000, 0.6000, 0.5808, 0.1000, 0.2410
0.5300, 0.0000, 0.2410, 0.1050, 0.1840, 0.1134, 0.4600, 0.4000, 0.4812, 0.0950, 0.0660
0.4700, 1.0000, 0.2530, 0.0980, 0.1730, 0.1056, 0.4400, 0.4000, 0.4762, 0.1080, 0.0940
0.5200, 0.0000, 0.2880, 0.1130, 0.2800, 0.1740, 0.6700, 0.4000, 0.5273, 0.0860, 0.2830
0.3900, 0.0000, 0.2090, 0.0950, 0.1500, 0.0656, 0.6800, 0.2000, 0.4407, 0.0950, 0.0640
0.6700, 1.0000, 0.2300, 0.0700, 0.1840, 0.1280, 0.3500, 0.5000, 0.4654, 0.0990, 0.1020
0.5900, 1.0000, 0.2410, 0.0960, 0.1700, 0.0986, 0.5400, 0.3000, 0.4466, 0.0850, 0.2000
0.5100, 1.0000, 0.2810, 0.1060, 0.2020, 0.1222, 0.5500, 0.4000, 0.4820, 0.0870, 0.2650
0.2300, 1.0000, 0.1800, 0.0780, 0.1710, 0.0960, 0.4800, 0.4000, 0.4905, 0.0920, 0.0940
0.6800, 0.0000, 0.2590, 0.0930, 0.2530, 0.1812, 0.5300, 0.5000, 0.4543, 0.0980, 0.2300
0.4400, 0.0000, 0.2150, 0.0850, 0.1570, 0.0922, 0.5500, 0.3000, 0.3892, 0.0840, 0.1810
0.6000, 1.0000, 0.2430, 0.1030, 0.1410, 0.0866, 0.3300, 0.4000, 0.4673, 0.0780, 0.1560
0.5200, 0.0000, 0.2450, 0.0900, 0.1980, 0.1290, 0.2900, 0.7000, 0.5298, 0.0860, 0.2330
0.3800, 0.0000, 0.2130, 0.0720, 0.1650, 0.0602, 0.8800, 0.2000, 0.4431, 0.0900, 0.0600
0.6100, 0.0000, 0.2580, 0.0900, 0.2800, 0.1954, 0.5500, 0.5000, 0.4997, 0.0900, 0.2190
0.6800, 1.0000, 0.2480, 0.1010, 0.2210, 0.1514, 0.6000, 0.4000, 0.3871, 0.0870, 0.0800
0.2800, 1.0000, 0.3150, 0.0830, 0.2280, 0.1494, 0.3800, 0.6000, 0.5313, 0.0830, 0.0680
0.6500, 1.0000, 0.3350, 0.1020, 0.1900, 0.1262, 0.3500, 0.5000, 0.4970, 0.1020, 0.3320
0.6900, 0.0000, 0.2810, 0.1130, 0.2340, 0.1428, 0.5200, 0.4000, 0.5278, 0.0770, 0.2480
0.5100, 0.0000, 0.2430, 0.0853, 0.1530, 0.0716, 0.7100, 0.2150, 0.3951, 0.0820, 0.0840
0.2900, 0.0000, 0.3500, 0.0983, 0.2040, 0.1426, 0.5000, 0.4080, 0.4043, 0.0910, 0.2000
0.5500, 1.0000, 0.2350, 0.0930, 0.1770, 0.1268, 0.4100, 0.4000, 0.3829, 0.0830, 0.0550
0.3400, 1.0000, 0.3000, 0.0830, 0.1850, 0.1072, 0.5300, 0.3000, 0.4820, 0.0920, 0.0850
0.6700, 0.0000, 0.2070, 0.0830, 0.1700, 0.0998, 0.5900, 0.3000, 0.4025, 0.0770, 0.0890
0.4900, 0.0000, 0.2560, 0.0760, 0.1610, 0.0998, 0.5100, 0.3000, 0.3932, 0.0780, 0.0310
0.5500, 1.0000, 0.2290, 0.0810, 0.1230, 0.0672, 0.4100, 0.3000, 0.4304, 0.0880, 0.1290
0.5900, 1.0000, 0.2510, 0.0900, 0.1630, 0.1014, 0.4600, 0.4000, 0.4357, 0.0910, 0.0830
0.5300, 0.0000, 0.3320, 0.0827, 0.1860, 0.1068, 0.4600, 0.4040, 0.5112, 0.1020, 0.2750
0.4800, 1.0000, 0.2410, 0.1100, 0.2090, 0.1346, 0.5800, 0.4000, 0.4407, 0.1000, 0.0650
0.5200, 0.0000, 0.2950, 0.1043, 0.2110, 0.1328, 0.4900, 0.4310, 0.4984, 0.0980, 0.1980
0.6900, 0.0000, 0.2960, 0.1220, 0.2310, 0.1284, 0.5600, 0.4000, 0.5451, 0.0860, 0.2360
0.6000, 1.0000, 0.2280, 0.1100, 0.2450, 0.1898, 0.3900, 0.6000, 0.4394, 0.0880, 0.2530
0.4600, 1.0000, 0.2270, 0.0830, 0.1830, 0.1258, 0.3200, 0.6000, 0.4836, 0.0750, 0.1240
0.5100, 1.0000, 0.2620, 0.1010, 0.1610, 0.0996, 0.4800, 0.3000, 0.4205, 0.0880, 0.0440
0.6700, 1.0000, 0.2350, 0.0960, 0.2070, 0.1382, 0.4200, 0.5000, 0.4898, 0.1110, 0.1720
0.4900, 0.0000, 0.2210, 0.0850, 0.1360, 0.0634, 0.6200, 0.2190, 0.3970, 0.0720, 0.1140
0.4600, 1.0000, 0.2650, 0.0940, 0.2470, 0.1602, 0.5900, 0.4000, 0.4935, 0.1110, 0.1420
0.4700, 0.0000, 0.3240, 0.1050, 0.1880, 0.1250, 0.4600, 0.4090, 0.4443, 0.0990, 0.1090
0.7500, 0.0000, 0.3010, 0.0780, 0.2220, 0.1542, 0.4400, 0.5050, 0.4779, 0.0970, 0.1800
0.2800, 0.0000, 0.2420, 0.0930, 0.1740, 0.1064, 0.5400, 0.3000, 0.4220, 0.0840, 0.1440
0.6500, 1.0000, 0.3130, 0.1100, 0.2130, 0.1280, 0.4700, 0.5000, 0.5247, 0.0910, 0.1630
0.4200, 0.0000, 0.3010, 0.0910, 0.1820, 0.1148, 0.4900, 0.4000, 0.4511, 0.0820, 0.1470
0.5100, 0.0000, 0.2450, 0.0790, 0.2120, 0.1286, 0.6500, 0.3000, 0.4522, 0.0910, 0.0970
0.5300, 1.0000, 0.2770, 0.0950, 0.1900, 0.1018, 0.4100, 0.5000, 0.5464, 0.1010, 0.2200
0.5400, 0.0000, 0.2320, 0.1107, 0.2380, 0.1628, 0.4800, 0.4960, 0.4913, 0.1080, 0.1900
0.7300, 0.0000, 0.2700, 0.1020, 0.2110, 0.1210, 0.6700, 0.3000, 0.4745, 0.0990, 0.1090
0.5400, 0.0000, 0.2680, 0.1080, 0.1760, 0.0806, 0.6700, 0.3000, 0.4956, 0.1060, 0.1910
0.4200, 0.0000, 0.2920, 0.0930, 0.2490, 0.1742, 0.4500, 0.6000, 0.5004, 0.0920, 0.1220
0.7500, 0.0000, 0.3120, 0.1177, 0.2290, 0.1388, 0.2900, 0.7900, 0.5724, 0.1060, 0.2300
0.5500, 1.0000, 0.3210, 0.1127, 0.2070, 0.0924, 0.2500, 0.8280, 0.6105, 0.1110, 0.2420
0.6800, 1.0000, 0.2570, 0.1090, 0.2330, 0.1126, 0.3500, 0.7000, 0.6057, 0.1050, 0.2480
0.5700, 0.0000, 0.2690, 0.0980, 0.2460, 0.1652, 0.3800, 0.7000, 0.5366, 0.0960, 0.2490
0.4800, 0.0000, 0.3140, 0.0753, 0.2420, 0.1516, 0.3800, 0.6370, 0.5568, 0.1030, 0.1920
0.6100, 1.0000, 0.2560, 0.0850, 0.1840, 0.1162, 0.3900, 0.5000, 0.4970, 0.0980, 0.1310
0.6900, 0.0000, 0.3700, 0.1030, 0.2070, 0.1314, 0.5500, 0.4000, 0.4635, 0.0900, 0.2370
0.3800, 0.0000, 0.3260, 0.0770, 0.1680, 0.1006, 0.4700, 0.4000, 0.4625, 0.0960, 0.0780
0.4500, 1.0000, 0.2120, 0.0940, 0.1690, 0.0968, 0.5500, 0.3000, 0.4454, 0.1020, 0.1350
0.5100, 1.0000, 0.2920, 0.1070, 0.1870, 0.1390, 0.3200, 0.6000, 0.4382, 0.0950, 0.2440
0.7100, 1.0000, 0.2400, 0.0840, 0.1380, 0.0858, 0.3900, 0.4000, 0.4190, 0.0900, 0.1990
0.5700, 0.0000, 0.3610, 0.1170, 0.1810, 0.1082, 0.3400, 0.5000, 0.5268, 0.1000, 0.2700
0.5600, 1.0000, 0.2580, 0.1030, 0.1770, 0.1144, 0.3400, 0.5000, 0.4963, 0.0990, 0.1640
0.3200, 1.0000, 0.2200, 0.0880, 0.1370, 0.0786, 0.4800, 0.3000, 0.3951, 0.0780, 0.0720
0.5000, 0.0000, 0.2190, 0.0910, 0.1900, 0.1112, 0.6700, 0.3000, 0.4078, 0.0770, 0.0960
0.4300, 0.0000, 0.3430, 0.0840, 0.2560, 0.1726, 0.3300, 0.8000, 0.5529, 0.1040, 0.3060
0.5400, 1.0000, 0.2520, 0.1150, 0.1810, 0.1200, 0.3900, 0.5000, 0.4701, 0.0920, 0.0910
0.3100, 0.0000, 0.2330, 0.0850, 0.1900, 0.1308, 0.4300, 0.4000, 0.4394, 0.0770, 0.2140
0.5600, 0.0000, 0.2570, 0.0800, 0.2440, 0.1516, 0.5900, 0.4000, 0.5118, 0.0950, 0.0950
0.4400, 0.0000, 0.2510, 0.1330, 0.1820, 0.1130, 0.5500, 0.3000, 0.4249, 0.0840, 0.2160
0.5700, 1.0000, 0.3190, 0.1110, 0.1730, 0.1162, 0.4100, 0.4000, 0.4369, 0.0870, 0.2630

Test data:


# diabetes_norm_test_100.txt
#
0.6400, 1.0000, 0.2840, 0.1110, 0.1840, 0.1270, 0.4100, 0.4000, 0.4382, 0.0970, 0.1780
0.4300, 0.0000, 0.2810, 0.1210, 0.1920, 0.1210, 0.6000, 0.3000, 0.4007, 0.0930, 0.1130
0.1900, 0.0000, 0.2530, 0.0830, 0.2250, 0.1566, 0.4600, 0.5000, 0.4719, 0.0840, 0.2000
0.7100, 1.0000, 0.2610, 0.0850, 0.2200, 0.1524, 0.4700, 0.5000, 0.4635, 0.0910, 0.1390
0.5000, 1.0000, 0.2800, 0.1040, 0.2820, 0.1968, 0.4400, 0.6000, 0.5328, 0.0950, 0.1390
0.5900, 1.0000, 0.2360, 0.0730, 0.1800, 0.1074, 0.5100, 0.4000, 0.4682, 0.0840, 0.0880
0.5700, 0.0000, 0.2450, 0.0930, 0.1860, 0.0966, 0.7100, 0.3000, 0.4522, 0.0910, 0.1480
0.4900, 1.0000, 0.2100, 0.0820, 0.1190, 0.0854, 0.2300, 0.5000, 0.3970, 0.0740, 0.0880
0.4100, 1.0000, 0.3200, 0.1260, 0.1980, 0.1042, 0.4900, 0.4000, 0.5412, 0.1240, 0.2430
0.2500, 1.0000, 0.2260, 0.0850, 0.1300, 0.0710, 0.4800, 0.3000, 0.4007, 0.0810, 0.0710
0.5200, 1.0000, 0.1970, 0.0810, 0.1520, 0.0534, 0.8200, 0.2000, 0.4419, 0.0820, 0.0770
0.3400, 0.0000, 0.2120, 0.0840, 0.2540, 0.1134, 0.5200, 0.5000, 0.6094, 0.0920, 0.1090
0.4200, 1.0000, 0.3060, 0.1010, 0.2690, 0.1722, 0.5000, 0.5000, 0.5455, 0.1060, 0.2720
0.2800, 1.0000, 0.2550, 0.0990, 0.1620, 0.1016, 0.4600, 0.4000, 0.4277, 0.0940, 0.0600
0.4700, 1.0000, 0.2330, 0.0900, 0.1950, 0.1258, 0.5400, 0.4000, 0.4331, 0.0730, 0.0540
0.3200, 1.0000, 0.3100, 0.1000, 0.1770, 0.0962, 0.4500, 0.4000, 0.5187, 0.0770, 0.2210
0.4300, 0.0000, 0.1850, 0.0870, 0.1630, 0.0936, 0.6100, 0.2670, 0.3738, 0.0800, 0.0900
0.5900, 1.0000, 0.2690, 0.1040, 0.1940, 0.1266, 0.4300, 0.5000, 0.4804, 0.1060, 0.3110
0.5300, 0.0000, 0.2830, 0.1010, 0.1790, 0.1070, 0.4800, 0.4000, 0.4788, 0.1010, 0.2810
0.6000, 0.0000, 0.2570, 0.1030, 0.1580, 0.0846, 0.6400, 0.2000, 0.3850, 0.0970, 0.1820
0.5400, 1.0000, 0.3610, 0.1150, 0.1630, 0.0984, 0.4300, 0.4000, 0.4682, 0.1010, 0.3210
0.3500, 1.0000, 0.2410, 0.0947, 0.1550, 0.0974, 0.3200, 0.4840, 0.4852, 0.0940, 0.0580
0.4900, 1.0000, 0.2580, 0.0890, 0.1820, 0.1186, 0.3900, 0.5000, 0.4804, 0.1150, 0.2620
0.5800, 0.0000, 0.2280, 0.0910, 0.1960, 0.1188, 0.4800, 0.4000, 0.4984, 0.1150, 0.2060
0.3600, 1.0000, 0.3910, 0.0900, 0.2190, 0.1358, 0.3800, 0.6000, 0.5421, 0.1030, 0.2330
0.4600, 1.0000, 0.4220, 0.0990, 0.2110, 0.1370, 0.4400, 0.5000, 0.5011, 0.0990, 0.2420
0.4400, 1.0000, 0.2660, 0.0990, 0.2050, 0.1090, 0.4300, 0.5000, 0.5580, 0.1110, 0.1230
0.4600, 0.0000, 0.2990, 0.0830, 0.1710, 0.1130, 0.3800, 0.4500, 0.4585, 0.0980, 0.1670
0.5400, 0.0000, 0.2100, 0.0780, 0.1880, 0.1074, 0.7000, 0.3000, 0.3970, 0.0730, 0.0630
0.6300, 1.0000, 0.2550, 0.1090, 0.2260, 0.1032, 0.4600, 0.5000, 0.5951, 0.0870, 0.1970
0.4100, 1.0000, 0.2420, 0.0900, 0.1990, 0.1236, 0.5700, 0.4000, 0.4522, 0.0860, 0.0710
0.2800, 0.0000, 0.2540, 0.0930, 0.1410, 0.0790, 0.4900, 0.3000, 0.4174, 0.0910, 0.1680
0.1900, 0.0000, 0.2320, 0.0750, 0.1430, 0.0704, 0.5200, 0.3000, 0.4635, 0.0720, 0.1400
0.6100, 1.0000, 0.2610, 0.1260, 0.2150, 0.1298, 0.5700, 0.4000, 0.4949, 0.0960, 0.2170
0.4800, 0.0000, 0.3270, 0.0930, 0.2760, 0.1986, 0.4300, 0.6420, 0.5148, 0.0910, 0.1210
0.5400, 1.0000, 0.2730, 0.1000, 0.2000, 0.1440, 0.3300, 0.6000, 0.4745, 0.0760, 0.2350
0.5300, 1.0000, 0.2660, 0.0930, 0.1850, 0.1224, 0.3600, 0.5000, 0.4890, 0.0820, 0.2450
0.4800, 0.0000, 0.2280, 0.1010, 0.1100, 0.0416, 0.5600, 0.2000, 0.4127, 0.0970, 0.0400
0.5300, 0.0000, 0.2880, 0.1117, 0.1450, 0.0872, 0.4600, 0.3150, 0.4078, 0.0850, 0.0520
0.2900, 1.0000, 0.1810, 0.0730, 0.1580, 0.0990, 0.4100, 0.4000, 0.4500, 0.0780, 0.1040
0.6200, 0.0000, 0.3200, 0.0880, 0.1720, 0.0690, 0.3800, 0.4000, 0.5784, 0.1000, 0.1320
0.5000, 1.0000, 0.2370, 0.0920, 0.1660, 0.0970, 0.5200, 0.3000, 0.4443, 0.0930, 0.0880
0.5800, 1.0000, 0.2360, 0.0960, 0.2570, 0.1710, 0.5900, 0.4000, 0.4905, 0.0820, 0.0690
0.5500, 1.0000, 0.2460, 0.1090, 0.1430, 0.0764, 0.5100, 0.3000, 0.4357, 0.0880, 0.2190
0.5400, 0.0000, 0.2260, 0.0900, 0.1830, 0.1042, 0.6400, 0.3000, 0.4304, 0.0920, 0.0720
0.3600, 0.0000, 0.2780, 0.0730, 0.1530, 0.1044, 0.4200, 0.4000, 0.3497, 0.0730, 0.2010
0.6300, 1.0000, 0.2410, 0.1110, 0.1840, 0.1122, 0.4400, 0.4000, 0.4935, 0.0820, 0.1100
0.4700, 1.0000, 0.2650, 0.0700, 0.1810, 0.1048, 0.6300, 0.3000, 0.4190, 0.0700, 0.0510
0.5100, 1.0000, 0.3280, 0.1120, 0.2020, 0.1006, 0.3700, 0.5000, 0.5775, 0.1090, 0.2770
0.4200, 0.0000, 0.1990, 0.0760, 0.1460, 0.0832, 0.5500, 0.3000, 0.3664, 0.0790, 0.0630
0.3700, 1.0000, 0.2360, 0.0940, 0.2050, 0.1388, 0.5300, 0.4000, 0.4190, 0.1070, 0.1180
0.2800, 0.0000, 0.2210, 0.0820, 0.1680, 0.1006, 0.5400, 0.3000, 0.4205, 0.0860, 0.0690
0.5800, 0.0000, 0.2810, 0.1110, 0.1980, 0.0806, 0.3100, 0.6000, 0.6068, 0.0930, 0.2730
0.3200, 0.0000, 0.2650, 0.0860, 0.1840, 0.1016, 0.5300, 0.4000, 0.4990, 0.0780, 0.2580
0.2500, 1.0000, 0.2350, 0.0880, 0.1430, 0.0808, 0.5500, 0.3000, 0.3584, 0.0830, 0.0430
0.6300, 0.0000, 0.2600, 0.0857, 0.1550, 0.0782, 0.4600, 0.3370, 0.5037, 0.0970, 0.1980
0.5200, 0.0000, 0.2780, 0.0850, 0.2190, 0.1360, 0.4900, 0.4000, 0.5136, 0.0750, 0.2420
0.6500, 1.0000, 0.2850, 0.1090, 0.2010, 0.1230, 0.4600, 0.4000, 0.5075, 0.0960, 0.2320
0.4200, 0.0000, 0.3060, 0.1210, 0.1760, 0.0928, 0.6900, 0.3000, 0.4263, 0.0890, 0.1750
0.5300, 0.0000, 0.2220, 0.0780, 0.1640, 0.0810, 0.7000, 0.2000, 0.4174, 0.1010, 0.0930
0.7900, 1.0000, 0.2330, 0.0880, 0.1860, 0.1284, 0.3300, 0.6000, 0.4812, 0.1020, 0.1680
0.4300, 0.0000, 0.3540, 0.0930, 0.1850, 0.1002, 0.4400, 0.4000, 0.5318, 0.1010, 0.2750
0.4400, 0.0000, 0.3140, 0.1150, 0.1650, 0.0976, 0.5200, 0.3000, 0.4344, 0.0890, 0.2930
0.6200, 1.0000, 0.3780, 0.1190, 0.1130, 0.0510, 0.3100, 0.4000, 0.5043, 0.0840, 0.2810
0.3300, 0.0000, 0.1890, 0.0700, 0.1620, 0.0918, 0.5900, 0.3000, 0.4025, 0.0580, 0.0720
0.5600, 0.0000, 0.3500, 0.0793, 0.1950, 0.1408, 0.4200, 0.4640, 0.4111, 0.0960, 0.1400
0.6600, 0.0000, 0.2170, 0.1260, 0.2120, 0.1278, 0.4500, 0.4710, 0.5278, 0.1010, 0.1890
0.3400, 1.0000, 0.2530, 0.1110, 0.2300, 0.1620, 0.3900, 0.6000, 0.4977, 0.0900, 0.1810
0.4600, 1.0000, 0.2380, 0.0970, 0.2240, 0.1392, 0.4200, 0.5000, 0.5366, 0.0810, 0.2090
0.5000, 0.0000, 0.3180, 0.0820, 0.1360, 0.0692, 0.5500, 0.2000, 0.4078, 0.0850, 0.1360
0.6900, 0.0000, 0.3430, 0.1130, 0.2000, 0.1238, 0.5400, 0.4000, 0.4710, 0.1120, 0.2610
0.3400, 0.0000, 0.2630, 0.0870, 0.1970, 0.1200, 0.6300, 0.3000, 0.4249, 0.0960, 0.1130
0.7100, 1.0000, 0.2700, 0.0933, 0.2690, 0.1902, 0.4100, 0.6560, 0.5242, 0.0930, 0.1310
0.4700, 0.0000, 0.2720, 0.0800, 0.2080, 0.1456, 0.3800, 0.6000, 0.4804, 0.0920, 0.1740
0.4100, 0.0000, 0.3380, 0.1233, 0.1870, 0.1270, 0.4500, 0.4160, 0.4318, 0.1000, 0.2570
0.3400, 0.0000, 0.3300, 0.0730, 0.1780, 0.1146, 0.5100, 0.3490, 0.4127, 0.0920, 0.0550
0.5100, 0.0000, 0.2410, 0.0870, 0.2610, 0.1756, 0.6900, 0.4000, 0.4407, 0.0930, 0.0840
0.4300, 0.0000, 0.2130, 0.0790, 0.1410, 0.0788, 0.5300, 0.3000, 0.3829, 0.0900, 0.0420
0.5500, 0.0000, 0.2300, 0.0947, 0.1900, 0.1376, 0.3800, 0.5000, 0.4277, 0.1060, 0.1460
0.5900, 1.0000, 0.2790, 0.1010, 0.2180, 0.1442, 0.3800, 0.6000, 0.5187, 0.0950, 0.2120
0.2700, 1.0000, 0.3360, 0.1100, 0.2460, 0.1566, 0.5700, 0.4000, 0.5088, 0.0890, 0.2330
0.5100, 1.0000, 0.2270, 0.1030, 0.2170, 0.1624, 0.3000, 0.7000, 0.4812, 0.0800, 0.0910
0.4900, 1.0000, 0.2740, 0.0890, 0.1770, 0.1130, 0.3700, 0.5000, 0.4905, 0.0970, 0.1110
0.2700, 0.0000, 0.2260, 0.0710, 0.1160, 0.0434, 0.5600, 0.2000, 0.4419, 0.0790, 0.1520
0.5700, 1.0000, 0.2320, 0.1073, 0.2310, 0.1594, 0.4100, 0.5630, 0.5030, 0.1120, 0.1200
0.3900, 1.0000, 0.2690, 0.0930, 0.1360, 0.0754, 0.4800, 0.3000, 0.4143, 0.0990, 0.0670
0.6200, 1.0000, 0.3460, 0.1200, 0.2150, 0.1292, 0.4300, 0.5000, 0.5366, 0.1230, 0.3100
0.3700, 0.0000, 0.2330, 0.0880, 0.2230, 0.1420, 0.6500, 0.3400, 0.4357, 0.0820, 0.0940
0.4600, 0.0000, 0.2110, 0.0800, 0.2050, 0.1444, 0.4200, 0.5000, 0.4533, 0.0870, 0.1830
0.6800, 1.0000, 0.2350, 0.1010, 0.1620, 0.0854, 0.5900, 0.3000, 0.4477, 0.0910, 0.0660
0.5100, 0.0000, 0.3150, 0.0930, 0.2310, 0.1440, 0.4900, 0.4700, 0.5252, 0.1170, 0.1730
0.4100, 0.0000, 0.2080, 0.0860, 0.2230, 0.1282, 0.8300, 0.3000, 0.4078, 0.0890, 0.0720
0.5300, 0.0000, 0.2650, 0.0970, 0.1930, 0.1224, 0.5800, 0.3000, 0.4143, 0.0990, 0.0490
0.4500, 0.0000, 0.2420, 0.0830, 0.1770, 0.1184, 0.4500, 0.4000, 0.4220, 0.0820, 0.0640
0.3300, 0.0000, 0.1950, 0.0800, 0.1710, 0.0854, 0.7500, 0.2000, 0.3970, 0.0800, 0.0480
0.6000, 1.0000, 0.2820, 0.1120, 0.1850, 0.1138, 0.4200, 0.4000, 0.4984, 0.0930, 0.1780
0.4700, 1.0000, 0.2490, 0.0750, 0.2250, 0.1660, 0.4200, 0.5000, 0.4443, 0.1020, 0.1040
0.6000, 1.0000, 0.2490, 0.0997, 0.1620, 0.1066, 0.4300, 0.3770, 0.4127, 0.0950, 0.1320
0.3600, 0.0000, 0.3000, 0.0950, 0.2010, 0.1252, 0.4200, 0.4790, 0.5130, 0.0850, 0.2200
0.3600, 0.0000, 0.1960, 0.0710, 0.2500, 0.1332, 0.9700, 0.3000, 0.4595, 0.0920, 0.0570

Posted in Machine Learning | Leave a comment

Moore-Penrose Pseudo-Inverse via Three Versions of QR Decomposition Using C#: Householder, Modified Gram-Schmidt, Givens

Posted on April 21, 2026 by jamesdmccaffrey

I enjoy writing code. I write code almost every day. One downside to writing lots of code is that I often refactor a technique several times using different algorithms and different design patterns — and so I end up with many different versions of a function or system.

For example, there are many ways to implement relaxed Moore-Penrose pseudo-inverse for machine learning scenarios to train a linear model (linear regression and quadratic regression are two common examples). For MP pseudo-inverse, there are several algorithms that use singular value decomposition (SVD), and several algorithms that use QR decomposition.

Based on my experience, implementing any of the SVD versions from scratch is not a good idea — SVD is one of the most complex algorithms in all of numerical programming. The standard LAPACK library implementation of SVD is over 10,000 lines of code. Implementing a QR decomposition version of MP pseudo-inverse from scratch is more feasible. There are three main QR decomposition algorithms: Householder, modified Gram-Schmidt, and Givens. Householder is the most complicated to implement but most robust in theory. Modified Gram-Schmidt is the easiest to implement but less robust than Householder in theory. The Givens algorithm is sort of in between — moderately complex to implement, and sort of moderately robust (but the robustness claim is somewhat dubious in my opinion).

One evening when I couldn’t sleep (which is every evening because I have a no-sleep gene inherited from my father), I decided to wade through my dozens of implementations of MP pseudo-inverse using QR decomposition and consolidate down to three version — one Householder, one Gram-Schmidt, one Givens.

I organized the code into three container classes: QRHouseholder, QRGramSchmidt, QRGivens. Each class exposes a MatPseudoInv() method which is computed using the associated QR decomposition algorithm. Here’s the Householder version but all three versions are identical; they just call different versions of MatDecompQR():

public static double[][] MatPseudoInv(double[][] M)
{
  // relaxed Moore-Penrose pseudo-inverse
  // using QR Householder decomposition
  // A = Q*R, pinv(A) = inv(R) * trans(Q)

  int nr = M.Length; int nc = M[0].Length; // aka m, n
  if (nr < nc)
    Console.WriteLine("ERROR: Works only m >= n");

  double[][] Q; double[][] R;
  MatDecompQR(M, out Q, out R); // Householder

  double[][] Rinv = MatInvUpperTri(R); // std algo
  double[][] Qinv = MatTranspose(Q);  // is inv(Q)
  double[][] result = MatProduct(Rinv, Qinv);
  return result;
}

I tested all three versions of the relaxed Moore-Penrose pseudo-inverse functions via the three different QR decomposition algorithms. For each algorithm, I generated 5,000 different random matrices, with between 100 and 1,000 rows, and between 2 and 20 columns, and where each value is between -10.0 and +10.0. All three versions passed all tests. This isn’t a great set of tests by any means, but it suggests the three pseudo-inverse implementations are probably OK for non-critical work.

Most of the guys I work with enjoy all kinds of puzzles. I like the “Where’s Waldo” books, and I’ll bet that if you’re reading this blog post, you enjoy Waldo too.

The covers of Playboy Magazine are sort of like Where’s Waldo for adults. Every cover, except for the very first one in 1953, has a bunny logo. Most of the bunnies are obvious and easy to see, but some are very cleverly hidden.

Left: June 1989. The bunny logo is disguised as ribbon decoration on the model’s left thigh.

Right: August 1989. The bunny logo is on the newspaper as part of a graph near the business woman’s left thumb.

Demo program. Very long and very complicated. Replace “lt” (less than), “gt”, “lte”, “gte” with Boolean operator symbols (my blog editor chokes on symbols).

using System.IO;

namespace MatrixMoorePenrosePseudoInverseThreeDifferentQR
{
  internal class Program
  {
    static void Main(string[] args)
    {
      Console.WriteLine("\nBegin relaxed Moore-Penrose" +
        " pseudo-inverse using QR decomp Householder ");
      //Console.WriteLine("\nBegin relaxed Moore-Penrose" +
      //  " pseudo-inverse using QR decomp Gram-Schmidt ");
      //Console.WriteLine("\nBegin relaxed Moore-Penrose" +
      //  " pseudo-inverse using QR decomp Givens ");

      int minRows = 100; int maxRows = 1000;
      int minCols = 2; int maxCols = 20;
      Random rnd = new Random(0);
      int nTrials = 5000;
      int nPass = 4990; int nFail = 0;
      for (int i = 4990; i "lt" nTrials; ++i)
      {
        Console.WriteLine("\n==========");
        Console.WriteLine("trial " + i);
        double[][] A = 
          MakeRandomMatrix(minRows, maxRows,
          minCols, maxCols, rnd);

        double[][] Apinv = QRHouseholder.MatPseudoInv(A);
        // double[][] Apinv = QRGramSchmidt.MatPseudoInv(A);
        // double[][] Apinv = QRGivens.MatPseudoInv(A);
     
        // check (A * Apinv) * A = A
        double[][] AApinv = MatProduct(A, Apinv);
        double[][] C = MatProduct(AApinv, A); 
        
        //Console.WriteLine("\nA = ");
        //MatShow(A, 4, 9);
        //Console.WriteLine("\nApinv = ");
        //MatShow(Apinv, 4, 9);
        //Console.WriteLine("\n(A * Apinv) * A = ");
        //MatShow(C, 4, 9);

        if (MatAreEqual(C, A, 1.0e-8) == true)
        {
          Console.WriteLine("pass");
          ++nPass;
        }
        else
        {
          Console.WriteLine("FAIL");
          Console.WriteLine("nRows = " + A.Length +
            " nCols = " + A[0].Length);
          //Console.ReadLine();
          ++nFail;
        }
        Console.WriteLine("==========");
        // Console.ReadLine();
      } // nTrials

      Console.WriteLine("\nNumber pass = " + nPass);
      Console.WriteLine("Number fail = " + nFail);

      Console.WriteLine("\nEnd testing ");
      Console.ReadLine();
    } // Main

    // ------------------------------------------------------
    // helpers: 
    // ------------------------------------------------------

    public static double[][] MakeRandomMatrix(int minRows,
      int maxRows, int minCols, int maxCols, Random rnd)
    {
      int nRows = rnd.Next(minRows, maxRows);  // [2,maxN)
      int nCols = rnd.Next(minCols, maxCols);
      double[][] result = new double[nRows][];
      for (int i = 0; i "lt" nRows; ++i)
        result[i] = new double[nCols];

      double lo = -10.0; double hi = 10.0;
      for (int r = 0; r "lt" nRows; ++r)
        for (int c = 0; c "lt" nCols; ++c)
          result[r][c] = (hi - lo) * rnd.NextDouble() + lo;
      return result;
    }

    // ------------------------------------------------------

    public static double[][] MatProduct(double[][] A,
      double[][] B)
    {
      int aRows = A.Length; int aCols = A[0].Length;
      int bRows = B.Length; int bCols = B[0].Length;
      if (aCols != bRows)
        throw new Exception("Non-conformable matrices");

      double[][] result = new double[aRows][];
      for (int i = 0; i "lt" aRows; ++i)
        result[i] = new double[bCols];

      for (int i = 0; i "lt" aRows; ++i) // each row of A
        for (int j = 0; j "lt" bCols; ++j) // each col of B
          for (int k = 0; k "lt" aCols; ++k)
            result[i][j] += A[i][k] * B[k][j];

      return result;
    }

    // ------------------------------------------------------

    public static void MatShow(double[][] m, int dec, int wid)
    {
      int nRows = m.Length; int nCols = m[0].Length;
      double small = 1.0 / Math.Pow(10, dec);
      for (int i = 0; i "lt" nRows; ++i)
      {
        for (int j = 0; j "lt" nCols; ++j)
        {
          double v = m[i][j];
          if (Math.Abs(v) "lt" small) v = 0.0;
          Console.Write(v.ToString("F" + dec).
            PadLeft(wid));
        }
        Console.WriteLine("");
      }
    }

    // ------------------------------------------------------

    public static bool MatAreEqual(double[][] A, double[][] B,
      double epsilon)
    {
      int nRows = A.Length; int nCols = A[0].Length;
      for (int i = 0; i "lt" nRows; ++i)
        for (int j = 0; j "lt" nCols; ++j)
          if (Math.Abs( A[i][j] - B[i][j] ) "gt" epsilon)
            return false;
      return true;
    }

    // ------------------------------------------------------

  } // Program

  // ========================================================

  public class QRHouseholder
  {
    // container class for relaxed Moore-Penrose
    // pseudo-inverse using QR decomposition with QR
    // Householder algorithm

    public static double[][] MatPseudoInv(double[][] M)
    {
      // relaxed Moore-Penrose pseudo-inverse
      // using QR Householder decomposition
      // A = Q*R, pinv(A) = inv(R) * trans(Q)

      int nr = M.Length; int nc = M[0].Length; // aka m, n
      if (nr "lt" nc)
        Console.WriteLine("ERROR: Works only m "gte" n");

      double[][] Q; double[][] R;
      MatDecompQR(M, out Q, out R); // Householder

      double[][] Rinv = MatInvUpperTri(R); // std algo
      double[][] Qinv = MatTranspose(Q);  // is inv(Q)
      double[][] result = MatProduct(Rinv, Qinv);
      return result;
    }

    // ------------------------------------------------------

    private static void MatDecompQR(double[][] A,
      out double[][] Q, out double[][] R)
    {
      // reduced QR decomp using Householder reflections
      int m = A.Length; int n = A[0].Length;
      //if (m "lt" n)
      //  throw new Exception("No rows less than cols");

      double[][] QQ = MatIdentity(m);  // working Q
      double[][] RR = MatCopy(A);  // working R

      for (int k = 0; k "lt" n; ++k)
      {
        double[] x = MatColToEnd(RR, k); // RR[k:, k]
        double normx = VecNorm(x);
        if (Math.Abs(normx) "lt" 1.0e-12) continue;

        double[] v = VecCopy(x);
        double sign;
        if (x[0] "gte" 0.0) sign = 1.0; else sign = -1.0;
        v[0] += sign * normx;
        double normv = VecNorm(v);
        for (int i = 0; i "lt" v.Length; ++i)
          v[i] /= normv;

        // apply reflection to R
        double[][] tmp1 =
          MatRowColToEnd(RR, k); // RR[k:, k:]
        double[] tmp2 = VecMatProduct(v, tmp1);
        double[][] tmp3 = VecOuter(v, tmp2);
        double[][] B = MatScalarMult(2.0, tmp3);
        MatSubtractCorner(RR, k, B);  // R[k:, k:] -= B

        // accumulate Q
        double[][] tmp4 =
          MatExtractAllRowsColToEnd(QQ, k); // QQ[:, k:]
        double[] tmp5 = MatVecProduct(tmp4, v);
        double[][] tmp6 = VecOuter(tmp5, v);
        double[][] C = MatScalarMult(2.0, tmp6);
        MatSubtractRows(QQ, k, C); // QQ[:, k:] -= C
      } // for k

      // return parts of QQ and RR
      Q = MatExtractFirstCols(QQ, n); // Q[:, :n]
      R = MatExtractFirstRows(RR, n); // R[:n, :]

    } // MatDecompQR()

    // ------------------------------------------------------

    private static double[][] MatInvUpperTri(double[][] A)
    {
      // used to invert R from QR
      int n = A.Length;  // must be square matrix
      double[][] result = MatIdentity(n);

      for (int k = 0; k "lt" n; ++k)
      {
        for (int j = 0; j "lt" n; ++j)
        {
          for (int i = 0; i "lt" k; ++i)
          {
            result[j][k] -= result[j][i] * A[i][k];
          }
          result[j][k] /= (A[k][k] + 1.0e-8); // avoid 0
        }
      }
      return result;
    }

    // ------------------------------------------------------

    private static double[][] MatTranspose(double[][] M)
    {
      int nRows = M.Length; int nCols = M[0].Length;
      double[][] result = MatMake(nCols, nRows);  // note
      for (int i = 0; i "lt" nRows; ++i)
        for (int j = 0; j "lt" nCols; ++j)
          result[j][i] = M[i][j];
      return result;
    }

    // ------------------------------------------------------

    private static double[][] MatProduct(double[][] A,
      double[][] B)
    {
      int aRows = A.Length; int aCols = A[0].Length;
      int bRows = B.Length; int bCols = B[0].Length;
      if (aCols != bRows)
        throw new Exception("Non-conformable matrices");

      double[][] result = MatMake(aRows, bCols);

      for (int i = 0; i "lt" aRows; ++i) // each row of A
        for (int j = 0; j "lt" bCols; ++j) // each col of B
          for (int k = 0; k "lt" aCols; ++k)
            result[i][j] += A[i][k] * B[k][j];

      return result;
    }

    // ------------------------------------------------------

    private static double[][] MatMake(int nRows, int nCols)
    {
      double[][] result = new double[nRows][];
      for (int i = 0; i "lt" nRows; ++i)
        result[i] = new double[nCols];
      return result;
    }

    // ------------------------------------------------------

    private static double[][] MatIdentity(int n)
    {
      double[][] result = MatMake(n, n);
      for (int i = 0; i "lt" n; ++i)
        result[i][i] = 1.0;
      return result;
    }

    // ------------------------------------------------------

    private static double[][] MatCopy(double[][] M)
    {
      int nr = M.Length; int nc = M[0].Length;
      double[][] result = MatMake(nr, nc);
      for (int i = 0; i "lt" nr; ++i)
        for (int j = 0; j "lt" nc; ++j)
          result[i][j] = M[i][j];
      return result;
    }

    // ------------------------------------------------------

    private static double[] MatColToEnd(double[][] A,
      int k)
    {
      // last part of col k, from [k,k] to end
      int m = A.Length; int n = A[0].Length;
      double[] result = new double[m - k];
      for (int i = 0; i "lt" m - k; ++i)
        result[i] = A[i + k][k];
      return result;
    }

    // ------------------------------------------------------

    private static double[][] MatRowColToEnd(double[][] A,
      int k)
    {
      // block of A, row k to end, col k to end
      // A[k:, k:]
      int m = A.Length; int n = A[0].Length;
      double[][] result = MatMake(m - k, n - k);
      for (int i = 0; i "lt" m - k; ++i)
        for (int j = 0; j "lt" n - k; ++j)
          result[i][j] = A[i + k][j + k];
      return result;
    }

    // ------------------------------------------------------

    private static double[] VecCopy(double[] v)
    {
      double[] result = new double[v.Length];
      for (int i = 0; i "lt" v.Length; ++i)
        result[i] = v[i];
      return result;
    }

    // ------------------------------------------------------

    private static double[] VecMatProduct(double[] v,
      double[][] A)
    {
      // v * A
      int m = A.Length; int n = A[0].Length;
      double[] result = new double[n];
      for (int j = 0; j "lt" n; ++j)
        for (int i = 0; i "lt" m; ++i)
          result[j] += v[i] * A[i][j];
      return result;
    }

    // ------------------------------------------------------

    private static double[][] VecOuter(double[] v1,
      double[] v2)
    {
      // vector outer product
      double[][] result = MatMake(v1.Length, v2.Length);
      for (int i = 0; i "lt" v1.Length; ++i)
        for (int j = 0; j "lt" v2.Length; ++j)
          result[i][j] = v1[i] * v2[j];
      return result;
    }

    // ------------------------------------------------------

    private static double[][] MatScalarMult(double x,
      double[][] A)
    {
      // x * A element-wise
      int m = A.Length; int n = A[0].Length;
      double[][] result = MatMake(m, n);
      for (int i = 0; i "lt" m; ++i)
        for (int j = 0; j "lt" n; ++j)
          result[i][j] = x * A[i][j];
      return result;
    }

    // ------------------------------------------------------

    private static void MatSubtractCorner(double[][] A,
      int k, double[][] C)
    {
      // subtract elements in C from lower right A
      // A[k:, k:] -= C
      int m = A.Length; int n = A[0].Length;
      for (int i = 0; i "lt" m - k; ++i)
        for (int j = 0; j "lt" n - k; ++j)
          A[i + k][j + k] -= C[i][j];

      return;  // modify A in-place 
    }

    // ------------------------------------------------------

    private static double[][]
      MatExtractAllRowsColToEnd(double[][] A, int k)
    {
      // A[:, k:]
      int m = A.Length; int n = A[0].Length;
      double[][] result = MatMake(m, n - k);
      for (int i = 0; i "lt" m; ++i)
        for (int j = 0; j "lt" n - k; ++j)
          result[i][j] = A[i][j + k];
      return result;
    }

    // -----------------------------------------------------

    private static double[] MatVecProduct(double[][] A,
      double[] v)
    {
      // A * v
      int m = A.Length; int n = A[0].Length;
      double[] result = new double[m];
      for (int i = 0; i "lt" m; ++i)
        for (int j = 0; j "lt" n; ++j)
          result[i] += A[i][j] * v[j];
      return result;
    }

    // ------------------------------------------------------

    private static void MatSubtractRows(double[][] A,
      int k, double[][] C)
    {
      // A[:, k:] -= C
      int m = A.Length; int n = A[0].Length;
      for (int i = 0; i "lt" m; ++i)
        for (int j = 0; j "lt" n - k; ++j)
          A[i][j + k] -= C[i][j];

      return;  // modify A in-place
    }

    // ------------------------------------------------------

    private static double[][]
      MatExtractFirstCols(double[][] A, int k)
    {
      // A[:, :n]
      int m = A.Length; int n = A[0].Length;
      double[][] result = MatMake(m, k);
      for (int i = 0; i "lt" m; ++i)
        for (int j = 0; j "lt" k; ++j)
          result[i][j] = A[i][j];
      return result;
    }

    // ------------------------------------------------------

    private static double[][]
      MatExtractFirstRows(double[][] A, int k)
    {
      // A[:n, :]
      int m = A.Length; int n = A[0].Length;
      double[][] result = MatMake(k, n);
      for (int i = 0; i "lt" k; ++i)
        for (int j = 0; j "lt" n; ++j)
          result[i][j] = A[i][j];
      return result;
    }

    // ------------------------------------------------------

    private static double VecNorm(double[] vec)
    {
      int n = vec.Length;
      double sum = 0.0;
      for (int i = 0; i "lt" n; ++i)
        sum += vec[i] * vec[i];
      return Math.Sqrt(sum);
    }

    // ------------------------------------------------------

  } // MatDecomQR2

  // ========================================================

  public class QRGramSchmidt
  {
    // container class for relaxed Moore-Penrose
    // pseudo-inverse using QR decomposition with modified
    // Gram-Schmidt algorithm

    public static double[][] MatPseudoInv(double[][] M)
    {
      // relaxed Moore-Penrose pseudo-inverse using QR-GS
      // A = Q*R, pinv(A) = inv(R) * trans(Q)

      int nr = M.Length; int nc = M[0].Length; // aka m, n
      if (nr "lt" nc)
        Console.WriteLine("ERROR: Works only m "gte" n");

      double[][] Q; double[][] R;
      MatDecompQR(M, out Q, out R); // Gram-Schmidt

      double[][] Rinv = MatInvUpperTri(R); // std algo
      double[][] Qinv = MatTranspose(Q);  // is inv(Q)
      double[][] result = MatProduct(Rinv, Qinv);
      return result;
    }

    // ------------------------------------------------------

    private static void MatDecompQR(double[][] A,
      out double[][] Q, out double[][] R)
    {
      // QR decomposition, modified Gram-Schmidt
      // 'reduced' mode (all machine learning scenarios)
      int m = A.Length; int n = A[0].Length;
      if (m "lt" n)
        throw new Exception("m must be gte n ");

      double[][] QQ = new double[m][];  // working Q mxn
      for (int i = 0; i "lt" m; ++i)
        QQ[i] = new double[n];

      double[][] RR = new double[n][];  // working R nxn
      for (int i = 0; i "lt" n; ++i)
        RR[i] = new double[n];

      for (int k = 0; k "lt" n; ++k) // main loop each col
      {
        double[] v = new double[m];
        for (int i = 0; i "lt" m; ++i)  // col k
          v[i] = A[i][k];
        for (int j = 0; j "lt" k; ++j)  // inner loop
        {
          double[] colj = new double[QQ.Length];
          for (int i = 0; i "lt" colj.Length; ++i)
            colj[i] = QQ[i][j];

          double vecdot = 0.0;
          for (int i = 0; i "lt" colj.Length; ++i)
            vecdot += colj[i] * v[i];
          RR[j][k] = vecdot;

          // v = v - (R[j, k] * Q[:, j])
          for (int i = 0; i "lt" v.Length; ++i)
            v[i] = v[i] - (RR[j][k] * QQ[i][j]);
        } // j

        double normv = 0.0;
        for (int i = 0; i "lt" v.Length; ++i)
          normv += v[i] * v[i];
        normv = Math.Sqrt(normv);
        RR[k][k] = normv;

        // Q[:, k] = v / R[k, k]
        for (int i = 0; i "lt" QQ.Length; ++i)
          QQ[i][k] = v[i] / (RR[k][k] + 1.0e-12);

      } // k

      Q = QQ;
      R = RR;
    }

    // ------------------------------------------------------

    private static double[][] MatInvUpperTri(double[][] A)
    {
      // used to invert R from QR
      int n = A.Length;  // must be square matrix
      double[][] result = MatIdentity(n);

      for (int k = 0; k "lt" n; ++k)
      {
        for (int j = 0; j "lt" n; ++j)
        {
          for (int i = 0; i "lt" k; ++i)
          {
            result[j][k] -= result[j][i] * A[i][k];
          }
          result[j][k] /= (A[k][k] + 1.0e-8); // avoid 0
        }
      }
      return result;
    }

    // ------------------------------------------------------

    private static double[][] MatTranspose(double[][] M)
    {
      int nRows = M.Length; int nCols = M[0].Length;
      double[][] result = MatMake(nCols, nRows);  // note
      for (int i = 0; i "lt" nRows; ++i)
        for (int j = 0; j "lt" nCols; ++j)
          result[j][i] = M[i][j];
      return result;
    }

    // ------------------------------------------------------

    private static double[][] MatMake(int nRows, int nCols)
    {
      double[][] result = new double[nRows][];
      for (int i = 0; i "lt" nRows; ++i)
        result[i] = new double[nCols];
      return result;
    }

    // ------------------------------------------------------

    private static double[][] MatIdentity(int n)
    {
      double[][] result = MatMake(n, n);
      for (int i = 0; i "lt" n; ++i)
        result[i][i] = 1.0;
      return result;
    }

    // ------------------------------------------------------

    private static double[][] MatProduct(double[][] A,
      double[][] B)
    {
      int aRows = A.Length; int aCols = A[0].Length;
      int bRows = B.Length; int bCols = B[0].Length;
      if (aCols != bRows)
        throw new Exception("Non-conformable matrices");

      double[][] result = MatMake(aRows, bCols);

      for (int i = 0; i "lt" aRows; ++i) // each row of A
        for (int j = 0; j "lt" bCols; ++j) // each col of B
          for (int k = 0; k "lt" aCols; ++k)
            result[i][j] += A[i][k] * B[k][j];

      return result;
    }

  } // class QRGramSchmidt

  // ========================================================

  public class QRGivens
  {
    // container class for relaxed Moore-Penrose
    // pseudo-inverse using QR decomposition with Givens
    // rotations algorithm

    public static double[][] MatPseudoInv(double[][] M)
    {
      // relaxed Moore-Penrose pseudo-inverse using QR-GS
      // A = Q*R, pinv(A) = inv(R) * trans(Q)

      int nr = M.Length; int nc = M[0].Length; // aka m, n
      if (nr "lt" nc)
        Console.WriteLine("ERROR: Works only m "gte" n");

      double[][] Q; double[][] R;
      MatDecompQR(M, out Q, out R); // Givens

      double[][] Rinv = MatInvUpperTri(R); // std algo
      double[][] Qinv = MatTranspose(Q);  // is inv(Q)
      double[][] result = MatProduct(Rinv, Qinv);
      return result;
    }

    // ------------------------------------------------------

    private static void MatDecompQR(double[][] A,
      out double[][] Q, out double[][] R)
    {
      // QR decomposition using Givens rotations
      // 'reduced' mode (all machine learning scenarios)
      int m = A.Length; int n = A[0].Length;
      if (m "lt" n)
        throw new Exception("m must be gte n ");
      int k = Math.Min(m, n);

      double[][] QQ = new double[m][];  // working Q mxm
      for (int i = 0; i "lt" m; ++i)
        QQ[i] = new double[m];
      for (int i = 0; i "lt" m; ++i)
        QQ[i][i] = 1.0;  // Identity

      double[][] RR = new double[m][];  // working R mxn
      for (int i = 0; i "lt" m; ++i)
        RR[i] = new double[n];
      for (int i = 0; i "lt" m; ++i)
        for (int j = 0; j "lt" n; ++j)
          RR[i][j] = A[i][j];  // copy of A

      for (int j = 0; j "lt" k; ++j) // outer loop
      {
        for (int i = m - 1; i "gt" j; --i) // inner loop
        {
          double a = RR[j][j];
          double b = RR[i][j];
          //if (b == 0.0) continue;  // risky
          if (Math.Abs(b) "lt" 1.0e-12) continue;

          double r = Math.Sqrt((a * a) + (b * b));
          double c = a / r;
          double s = -b / r;

          for (int col = j; col "lt" n; ++col)
          {
            double tmp = (c * RR[j][col]) - (s * RR[i][col]);
            RR[i][col] = (s * RR[j][col]) + (c * RR[i][col]);
            RR[j][col] = tmp;
          }

          for (int row = 0; row "lt" m; ++row)
          {
            double tmp = (c * QQ[row][j]) - (s * QQ[row][i]);
            QQ[row][i] = (s * QQ[row][j]) + (c * QQ[row][i]);
            QQ[row][j] = tmp;
          }
        } // inner i loop

      } // j loop

      // Q_reduced = Q[:, :k] // all rows, col 0 to k
      // R_reduced = R[:k, :] // rows 0 to k, all cols

      double[][] Qred = new double[m][];
      for (int i = 0; i "lt" m; ++i)
        Qred[i] = new double[k];
      for (int i = 0; i "lt" m; ++i)
        for (int j = 0; j "lt" k; ++j)
          Qred[i][j] = QQ[i][j];
      Q = Qred;

      double[][] Rred = new double[k][];
      for (int i = 0; i "lt" k; ++i)
        Rred[i] = new double[n];
      for (int i = 0; i "lt" k; ++i)
        for (int j = 0; j "lt" n; ++j)
          Rred[i][j] = RR[i][j];
      R = Rred;

    } // MatDecompQR() 

    // ------------------------------------------------------

    private static double[][] MatInvUpperTri(double[][] A)
    {
      // used to invert R from QR
      int n = A.Length;  // must be square matrix
      double[][] result = MatIdentity(n);

      for (int k = 0; k "lt" n; ++k)
      {
        for (int j = 0; j "lt" n; ++j)
        {
          for (int i = 0; i "lt" k; ++i)
          {
            result[j][k] -= result[j][i] * A[i][k];
          }
          result[j][k] /= (A[k][k] + 1.0e-8); // avoid 0
        }
      }
      return result;
    }

    // ------------------------------------------------------

    private static double[][] MatTranspose(double[][] M)
    {
      int nRows = M.Length; int nCols = M[0].Length;
      double[][] result = MatMake(nCols, nRows);  // note
      for (int i = 0; i "lt" nRows; ++i)
        for (int j = 0; j "lt" nCols; ++j)
          result[j][i] = M[i][j];
      return result;
    }

    // ------------------------------------------------------

    private static double[][] MatProduct(double[][] A,
      double[][] B)
    {
      int aRows = A.Length; int aCols = A[0].Length;
      int bRows = B.Length; int bCols = B[0].Length;
      if (aCols != bRows)
        throw new Exception("Non-conformable matrices");

      double[][] result = MatMake(aRows, bCols);

      for (int i = 0; i "lt" aRows; ++i) // each row of A
        for (int j = 0; j "lt" bCols; ++j) // each col of B
          for (int k = 0; k "lt" aCols; ++k)
            result[i][j] += A[i][k] * B[k][j];

      return result;
    }

    // ------------------------------------------------------

    private static double[][] MatMake(int nRows, int nCols)
    {
      double[][] result = new double[nRows][];
      for (int i = 0; i "lt" nRows; ++i)
        result[i] = new double[nCols];
      return result;
    }

    // ------------------------------------------------------

    private static double[][] MatIdentity(int n)
    {
      double[][] result = MatMake(n, n);
      for (int i = 0; i "lt" n; ++i)
        result[i][i] = 1.0;
      return result;
    }

    // ------------------------------------------------------

  } // class QRGivens

  // ========================================================

} // ns

Posted in Machine Learning | Leave a comment

Refactoring My Demo of Linear Regression With Closed Form Training Using C#

Posted on April 20, 2026 by jamesdmccaffrey

I write code almost every day. I enjoy writing code, and writing code is a skill that must be practiced. One morning before work, I figured I’d refactor an old C# demo of linear regression trained using closed-form pseudo-inverse via normal equations (also called left pseudo-inverse).

My new version of the training method is:

public void TrainClosed(double[][] trainX, double[] trainY)
{
  // wts_bias = (inv(Xt * X) * Xt) * trainY
  int dim = trainX[0].Length;
  this.weights = new double[dim];

  double[][] X = MatDesign(trainX);
  double[][] Xinv = Cholesky.MatPseudoInv(X);
  double[] biasAndWts = MatVecProduct(Xinv, trainY);

  // extract bias and weights
  this.bias = biasAndWts[0];
  for (int i = 1; i < biasAndWts.Length; ++i)
    this.weights[i - 1] = biasAndWts[i];
  return;  // all done
}

The code is mostly self-explanatory, but all the significant work is done by non-trivial helper methods. In particular, the pseudo-inverse functionality is inside a container class named Cholesky. Cholesky inverse is a special algorithm that works only for matrices that are square, symmetric, positive definite.

If trainX is a matrix that holds the training data, and X is a design matrix from trainX (a leading column of 1.0 values added to account for the model bias), and Xt is the transpose of X, then the pseudo-inverse of X can be computed as inv(Xt * X) * Xt, where inv() is any matrix inverse function. But luckily, Xt * X is square symmetric positive definite, and so the relatively simple Cholesky inverse algorithm can be used.

The output of the demo program is:

Begin C# linear regression using closed-form 
 (Cholesky) training
Also called left pseudo-inverse via normal equations

Loading synthetic train (200) and test (40) data
Done

First three train X:
 -0.1660  0.4406 -0.9998 -0.3953 -0.7065
  0.0776 -0.1616  0.3704 -0.5911  0.7562
 -0.9452  0.3409 -0.1654  0.1174 -0.7192

First three train y:
  0.4840
  0.1568
  0.8054

Creating and training Linear Regression model
 using closed-form
Done

Coefficients/weights:
-0.2656  0.0333  -0.0454  0.0358  -0.1146
Bias/constant: 0.3619

Evaluating model

Accuracy train (within 0.10) = 0.4600
Accuracy test (within 0.10) = 0.6500

MSE train = 0.0026
MSE test = 0.0020

Predicting for x =
  -0.1660   0.4406  -0.9998  -0.3953  -0.7065

Predicted y = 0.5329

End demo

This pseudo-inverse via normal equations training technique is simpler to use than stochastic gradient descent training because you don't need to specify a learning rate and maximum number of training epochs. And pseudo-inverse via normal equations training technique is much simpler to implement than relaxed Moore-Penrose pseudo-inverse training.

The downside to pseudo-inverse via normal equations training is the (Xt * X) matrix multiplication operation. Suppose X is the training data design matrix, and it has 1000 rows and 10 columns. Then Xt * X is (10 x 1000) * (1000 x 10) which is only 10 x 10 -- small and simple to invert. But the number of operations involved in computing Xt * X is approximately (10 * 10 * (2 * 1000)) = 200,000 which is a lot, and if there are very small values or very large values in X, then there could be arithmetic overflow or underflow.

Good fun on a Saturday morning.

I enjoy refactoring code because it involves finding patterns. Every Playboy Magazine cover, except for the first issue in December 1953, has the bunny logo hidden somewhere. Most bunnies are obvious and easy to find, but some bunnies are very difficult to find.

Left: December 1988. The hidden bunny logo is in the lace near the lower left. Right: March 1980. The bunny logo is cleverly placed in the reflection in the water at the very bottom of the photo.

Demo program. Replace "lt" (less than), "gt", "lte", "gte" with Boolean operator symbols. My blog editor chokes on symbols.

using System;
using System.IO;
using System.Collections.Generic;

namespace LinearRegressionClosed
{
  internal class LinearRegressionClosedProgram
  {
    static void Main(string[] args)
    {
      Console.WriteLine("\nBegin C# linear regression" +
        " using closed-form (Cholesky) training ");
      Console.WriteLine("Also called left pseudo-inverse" +
        " via normal equations ");

      // 1. load data
      Console.WriteLine("\nLoading synthetic train" +
        " (200) and test (40) data");
      string trainFile =
        "..\\..\\..\\Data\\synthetic_train_200.txt";
      int[] colsX = new int[] { 0, 1, 2, 3, 4 };
      double[][] trainX =
        MatLoad(trainFile, colsX, ',', "#");
      double[] trainY =
        MatToVec(MatLoad(trainFile,
        new int[] { 5 }, ',', "#"));

      string testFile =
        "..\\..\\..\\Data\\synthetic_test_40.txt";
      double[][] testX =
         MatLoad(testFile, colsX, ',', "#");
      double[] testY =
        MatToVec(MatLoad(testFile,
        new int[] { 5 }, ',', "#"));
      Console.WriteLine("Done ");

      Console.WriteLine("\nFirst three train X: ");
      for (int i = 0; i "lt" 3; ++i)
        VecShow(trainX[i], 4, 8);

      Console.WriteLine("\nFirst three train y: ");
      for (int i = 0; i "lt" 3; ++i)
        Console.WriteLine(trainY[i].ToString("F4").
          PadLeft(8));

      // 2. create and train model using pseudo-inverse
      Console.WriteLine("\nCreating and training" +
        " Linear Regression model using closed-form ");
      LinearRegressor model = new LinearRegressor();
      model.TrainClosed(trainX, trainY);
      Console.WriteLine("Done ");

      // 2b. show model parameters
      Console.WriteLine("\nCoefficients/weights: ");
      for (int i = 0; i "lt" model.weights.Length; ++i)
        Console.Write(model.weights[i].ToString("F4") + "  ");
      Console.WriteLine("\nBias/constant: " +
        model.bias.ToString("F4"));

      // 3. evaluate model
      Console.WriteLine("\nEvaluating model ");
      double accTrain = model.Accuracy(trainX, trainY, 0.10);
      Console.WriteLine("\nAccuracy train (within 0.10) = " +
        accTrain.ToString("F4"));
      double accTest = model.Accuracy(testX, testY, 0.10);
      Console.WriteLine("Accuracy test (within 0.10) = " +
        accTest.ToString("F4"));

      double mseTrain = model.MSE(trainX, trainY);
      Console.WriteLine("\nMSE train = " +
        mseTrain.ToString("F4"));
      double mseTest = model.MSE(testX, testY);
      Console.WriteLine("MSE test = " +
        mseTest.ToString("F4"));

      // 4. use model to predict first training item
      double[] x = trainX[0];
      Console.WriteLine("\nPredicting for x = ");
      VecShow(x, 4, 9);
      double predY = model.Predict(x);
      Console.WriteLine("\nPredicted y = " +
        predY.ToString("F4"));

      Console.WriteLine("\nEnd demo ");
      Console.ReadLine();
    } // Main()

    // ------------------------------------------------------
    // helpers for Main(): MatLoad(), MatToVec(), VecShow()
    // ------------------------------------------------------

    static double[][] MatLoad(string fn, int[] usecols,
      char sep, string comment)
    {
      List"lt"double[]"gt" result = 
        new List"lt"double[]"gt"();
      string line = "";
      FileStream ifs = new FileStream(fn, FileMode.Open);
      StreamReader sr = new StreamReader(ifs);
      while ((line = sr.ReadLine()) != null)
      {
        if (line.StartsWith(comment) == true)
          continue;
        string[] tokens = line.Split(sep);
        List"lt"double"gt" lst = new List"lt"double"gt"();
        for (int j = 0; j "lt" usecols.Length; ++j)
          lst.Add(double.Parse(tokens[usecols[j]]));
        double[] row = lst.ToArray();
        result.Add(row);
      }
      sr.Close(); ifs.Close();
      return result.ToArray();
    }

    static double[] MatToVec(double[][] mat)
    {
      int nRows = mat.Length;
      int nCols = mat[0].Length;
      double[] result = new double[nRows * nCols];
      int k = 0;
      for (int i = 0; i "lt" nRows; ++i)
        for (int j = 0; j "lt" nCols; ++j)
          result[k++] = mat[i][j];
      return result;
    }

    static void VecShow(double[] vec, int dec, int wid)
    {
      for (int i = 0; i "lt" vec.Length; ++i)
        Console.Write(vec[i].ToString("F" + dec).
          PadLeft(wid));
      Console.WriteLine("");
    }

  } // class Program

  // ========================================================

  public class LinearRegressor
  {
    public double[] weights;
    public double bias;
    private Random rnd;

    // ------------------------------------------------------

    public LinearRegressor(int seed = 0)  // ctor
    {
      this.weights = new double[0]; // happy compiler
      this.bias = 0;
      this.rnd = new Random(seed); // not used this version
    }

    // ------------------------------------------------------

    public double Predict(double[] x)
    {
      double result = 0.0;
      for (int j = 0; j "lt" x.Length; ++j)
        result += x[j] * this.weights[j];
      result += this.bias;
      return result;
    }

    // ------------------------------------------------------

    public void TrainClosed(double[][] trainX,
      double[] trainY)
    {
      // pseudo-inverse via normal equations
      // wts_bias = (inv(Xt * X) * Xt) * trainY
      int dim = trainX[0].Length;
      this.weights = new double[dim];

      double[][] X = MatDesign(trainX);
      double[][] Xinv = Cholesky.MatPseudoInv(X);
      double[] biasAndWts =
        MatVecProduct(Xinv, trainY);

      // extract bias and weights
      this.bias = biasAndWts[0];
      for (int i = 1; i "lt" biasAndWts.Length; ++i)
        this.weights[i - 1] = biasAndWts[i];
      return;  // all done
    } // TrainClosed()

    private static double[] MatVecProduct(double[][] A,
        double[] v)
    {
      // helper for TrainClosed()
      double[] result = new double[A.Length];
      for (int i = 0; i "lt" A.Length; ++i)
        for (int k = 0; k "lt" A[0].Length; ++k)
          result[i] += A[i][k] * v[k];
      return result;
    }

    // ------------------------------------------------------

    private static double[][] MatDesign(double[][] M)
    {
      // helper for TrainClosed()
      int nRows = M.Length; int nCols = M[0].Length;
      double[][] result = new double[nRows][];
      for (int i = 0; i "lt" nRows; ++i)
        result[i] = new double[nCols + 1];
      for (int i = 0; i "lt" nRows; ++i)
      {
        result[i][0] = 1.0;
        for (int j = 1; j "lt" nCols + 1; ++j)
          result[i][j] = M[i][j - 1];
      }
      return result;
    }

    // ------------------------------------------------------

    public double Accuracy(double[][] dataX, double[] dataY,
      double pctClose)
    {
      int numCorrect = 0; int numWrong = 0;
      for (int i = 0; i "lt" dataX.Length; ++i)
      {
        double actualY = dataY[i];
        double predY = this.Predict(dataX[i]);
        if (Math.Abs(predY - actualY) "lt"
          Math.Abs(pctClose * actualY))
          ++numCorrect;
        else
          ++numWrong;
      }
      return (numCorrect * 1.0) / (numWrong + numCorrect);
    }

    // ------------------------------------------------------

    public double MSE(double[][] dataX, double[] dataY)
    {
      int n = dataX.Length;
      double sum = 0.0;
      for (int i = 0; i "lt" n; ++i)
      {
        double actualY = dataY[i];
        double predY = this.Predict(dataX[i]);
        sum += (actualY - predY) * (actualY - predY);
      }
      return sum / n;
    }

    // ------------------------------------------------------

  } // class LinearRegressor

  // ========================================================

  public class Cholesky
  {
    // container class for MatPseudoInv()

    public static double[][] MatPseudoInv(double[][] A)
    {
      // left pseudo-inverse via normal equations
      // nRows must be gte nCols
      // inv(At * A) * A
      double[][] At = MatTranspose(A);
      double[][] AtA = MatProduct(At, A);
      for (int i = 0; i "lt" AtA.Length; ++i)
        AtA[i][i] += 1.0e-8; /// condition before inv
      double[][] AtAinv = MatInvCholesky(AtA);
      double[][] pinv = MatProduct(AtAinv, At);
      return pinv;
    } // MatPseudoInv()

    // ------------------------------------------------------

    private static double[][] MatInvCholesky(double[][] A)
    {
      // A must be square, symmetric, positive definite
      int m = A.Length; int n = A[0].Length;  // m == n
      // 1. decompose A to L
      double[][] L = new double[n][];
      for (int i = 0; i "lt" n; ++i)
        L[i] = new double[n];

      for (int i = 0; i "lt" n; ++i)
      {
        for (int j = 0; j "lte" i; ++j)
        {
          double sum = 0.0;
          for (int k = 0; k "lt" j; ++k)
            sum += L[i][k] * L[j][k];
          if (i == j)
          {
            double tmp = A[i][i] - sum;
            if (tmp "lt" 0.0)
              throw new
                Exception("decomp Cholesky fatal");
            L[i][j] = Math.Sqrt(tmp);
          }
          else
          {
            if (L[j][j] == 0.0)
              throw new
                Exception("decomp Cholesky fatal ");
            L[i][j] = (A[i][j] - sum) / L[j][j];
          }
        } // j
      } // i

      // 2. compute inverse from L
      double[][] result = new double[n][];  // make Identity
      for (int i = 0; i "lt" n; ++i)
        result[i] = new double[n];
      for (int i = 0; i "lt" n; ++i)
        result[i][i] = 1.0;

      for (int k = 0; k "lt" n; ++k)
      {
        for (int j = 0; j "lt" n; j++)
        {
          for (int i = 0; i "lt" k; i++)
          {
            result[k][j] -= result[i][j] * L[k][i];
          }
          result[k][j] /= L[k][k];
        }
      }

      for (int k = n - 1; k "gte" 0; --k)
      {
        for (int j = 0; j "lt" n; j++)
        {
          for (int i = k + 1; i "lt" n; i++)
          {
            result[k][j] -= result[i][j] * L[i][k];
          }
          result[k][j] /= L[k][k];
        }
      }
      return result;
    } // MatInvCholesky()

    // ------------------------------------------------------

    private static double[][] MatTranspose(double[][] M)
    {
      int nr = M.Length; int nc = M[0].Length;
      double[][] result = new double[nc][]; // note
      for (int i = 0; i "lt" nc; ++i)
        result[i] = new double[nr];
      for (int i = 0; i "lt" nr; ++i)
        for (int j = 0; j "lt" nc; ++j)
          result[j][i] = M[i][j]; // note
      return result;
    }

    // ````````````````````````````````````````````````````

    private static double[][] MatProduct(double[][] A,
      double[][] B)
    {
      int aRows = A.Length; int aCols = A[0].Length;
      int bRows = B.Length; int bCols = B[0].Length;
      if (aCols != bRows)
        throw new Exception("Non-conformable matrices");

      double[][] result = new double[aRows][];
      for (int i = 0; i "lt" aRows; ++i)
        result[i] = new double[bCols];

      for (int i = 0; i "lt" aRows; ++i) // each row of A
        for (int j = 0; j "lt" bCols; ++j) // each col of B
          for (int k = 0; k "lt" aCols; ++k)
            result[i][j] += A[i][k] * B[k][j];
      return result;
    }

    // ------------------------------------------------------

  } // class Cholesky

} // ns

Training data:

# synthetic_train_200.txt
#
-0.1660,  0.4406, -0.9998, -0.3953, -0.7065,  0.4840
 0.0776, -0.1616,  0.3704, -0.5911,  0.7562,  0.1568
-0.9452,  0.3409, -0.1654,  0.1174, -0.7192,  0.8054
 0.9365, -0.3732,  0.3846,  0.7528,  0.7892,  0.1345
-0.8299, -0.9219, -0.6603,  0.7563, -0.8033,  0.7955
 0.0663,  0.3838, -0.3690,  0.3730,  0.6693,  0.3206
-0.9634,  0.5003,  0.9777,  0.4963, -0.4391,  0.7377
-0.1042,  0.8172, -0.4128, -0.4244, -0.7399,  0.4801
-0.9613,  0.3577, -0.5767, -0.4689, -0.0169,  0.6861
-0.7065,  0.1786,  0.3995, -0.7953, -0.1719,  0.5569
 0.3888, -0.1716, -0.9001,  0.0718,  0.3276,  0.2500
 0.1731,  0.8068, -0.7251, -0.7214,  0.6148,  0.3297
-0.2046, -0.6693,  0.8550, -0.3045,  0.5016,  0.2129
 0.2473,  0.5019, -0.3022, -0.4601,  0.7918,  0.2613
-0.1438,  0.9297,  0.3269,  0.2434, -0.7705,  0.5171
 0.1568, -0.1837, -0.5259,  0.8068,  0.1474,  0.3307
-0.9943,  0.2343, -0.3467,  0.0541,  0.7719,  0.5581
 0.2467, -0.9684,  0.8589,  0.3818,  0.9946,  0.1092
-0.6553, -0.7257,  0.8652,  0.3936, -0.8680,  0.7018
 0.8460,  0.4230, -0.7515, -0.9602, -0.9476,  0.1996
-0.9434, -0.5076,  0.7201,  0.0777,  0.1056,  0.5664
 0.9392,  0.1221, -0.9627,  0.6013, -0.5341,  0.1533
 0.6142, -0.2243,  0.7271,  0.4942,  0.1125,  0.1661
 0.4260,  0.1194, -0.9749, -0.8561,  0.9346,  0.2230
 0.1362, -0.5934, -0.4953,  0.4877, -0.6091,  0.3810
 0.6937, -0.5203, -0.0125,  0.2399,  0.6580,  0.1460
-0.6864, -0.9628, -0.8600, -0.0273,  0.2127,  0.5387
 0.9772,  0.1595, -0.2397,  0.1019,  0.4907,  0.1611
 0.3385, -0.4702, -0.8673, -0.2598,  0.2594,  0.2270
-0.8669, -0.4794,  0.6095, -0.6131,  0.2789,  0.4700
 0.0493,  0.8496, -0.4734, -0.8681,  0.4701,  0.3516
 0.8639, -0.9721, -0.5313,  0.2336,  0.8980,  0.1412
 0.9004,  0.1133,  0.8312,  0.2831, -0.2200,  0.1782
 0.0991,  0.8524,  0.8375, -0.2102,  0.9265,  0.2150
-0.6521, -0.7473, -0.7298,  0.0113, -0.9570,  0.7422
 0.6190, -0.3105,  0.8802,  0.1640,  0.7577,  0.1056
 0.6895,  0.8108, -0.0802,  0.0927,  0.5972,  0.2214
 0.1982, -0.9689,  0.1870, -0.1326,  0.6147,  0.1310
-0.3695,  0.7858,  0.1557, -0.6320,  0.5759,  0.3773
-0.1596,  0.3581,  0.8372, -0.9992,  0.9535,  0.2071
-0.2468,  0.9476,  0.2094,  0.6577,  0.1494,  0.4132
 0.1737,  0.5000,  0.7166,  0.5102,  0.3961,  0.2611
 0.7290, -0.3546,  0.3416, -0.0983, -0.2358,  0.1332
-0.3652,  0.2438, -0.1395,  0.9476,  0.3556,  0.4170
-0.6029, -0.1466, -0.3133,  0.5953,  0.7600,  0.4334
-0.4596, -0.4953,  0.7098,  0.0554,  0.6043,  0.2775
 0.1450,  0.4663,  0.0380,  0.5418,  0.1377,  0.2931
-0.8636, -0.2442, -0.8407,  0.9656, -0.6368,  0.7429
 0.6237,  0.7499,  0.3768,  0.1390, -0.6781,  0.2185
-0.5499,  0.1850, -0.3755,  0.8326,  0.8193,  0.4399
-0.4858, -0.7782, -0.6141, -0.0008,  0.4572,  0.4197
 0.7033, -0.1683,  0.2334, -0.5327, -0.7961,  0.1776
 0.0317, -0.0457, -0.6947,  0.2436,  0.0880,  0.3345
 0.5031, -0.5559,  0.0387,  0.5706, -0.9553,  0.3107
-0.3513,  0.7458,  0.6894,  0.0769,  0.7332,  0.3170
 0.2205,  0.5992, -0.9309,  0.5405,  0.4635,  0.3532
-0.4806, -0.4859,  0.2646, -0.3094,  0.5932,  0.3202
 0.9809, -0.3995, -0.7140,  0.8026,  0.0831,  0.1600
 0.9495,  0.2732,  0.9878,  0.0921,  0.0529,  0.1289
-0.9476, -0.6792,  0.4913, -0.9392, -0.2669,  0.5966
 0.7247,  0.3854,  0.3819, -0.6227, -0.1162,  0.1550
-0.5922, -0.5045, -0.4757,  0.5003, -0.0860,  0.5863
-0.8861,  0.0170, -0.5761,  0.5972, -0.4053,  0.7301
 0.6877, -0.2380,  0.4997,  0.0223,  0.0819,  0.1404
 0.9189,  0.6079, -0.9354,  0.4188, -0.0700,  0.1907
-0.1428, -0.7820,  0.2676,  0.6059,  0.3936,  0.2790
 0.5324, -0.3151,  0.6917, -0.1425,  0.6480,  0.1071
-0.8432, -0.9633, -0.8666, -0.0828, -0.7733,  0.7784
-0.9444,  0.5097, -0.2103,  0.4939, -0.0952,  0.6787
-0.0520,  0.6063, -0.1952,  0.8094, -0.9259,  0.4836
 0.5477, -0.7487,  0.2370, -0.9793,  0.0773,  0.1241
 0.2450,  0.8116,  0.9799,  0.4222,  0.4636,  0.2355
 0.8186, -0.1983, -0.5003, -0.6531, -0.7611,  0.1511
-0.4714,  0.6382, -0.3788,  0.9648, -0.4667,  0.5950
 0.0673, -0.3711,  0.8215, -0.2669, -0.1328,  0.2677
-0.9381,  0.4338,  0.7820, -0.9454,  0.0441,  0.5518
-0.3480,  0.7190,  0.1170,  0.3805, -0.0943,  0.4724
-0.9813,  0.1535, -0.3771,  0.0345,  0.8328,  0.5438
-0.1471, -0.5052, -0.2574,  0.8637,  0.8737,  0.3042
-0.5454, -0.3712, -0.6505,  0.2142, -0.1728,  0.5783
 0.6327, -0.6297,  0.4038, -0.5193,  0.1484,  0.1153
-0.5424,  0.3282, -0.0055,  0.0380, -0.6506,  0.6613
 0.1414,  0.9935,  0.6337,  0.1887,  0.9520,  0.2540
-0.9351, -0.8128, -0.8693, -0.0965, -0.2491,  0.7353
 0.9507, -0.6640,  0.9456,  0.5349,  0.6485,  0.1059
-0.0462, -0.9737, -0.2940, -0.0159,  0.4602,  0.2606
-0.0627, -0.0852, -0.7247, -0.9782,  0.5166,  0.2977
 0.0478,  0.5098, -0.0723, -0.7504, -0.3750,  0.3335
 0.0090,  0.3477,  0.5403, -0.7393, -0.9542,  0.4415
-0.9748,  0.3449,  0.3736, -0.1015,  0.8296,  0.4358
 0.2887, -0.9895, -0.0311,  0.7186,  0.6608,  0.2057
 0.1570, -0.4518,  0.1211,  0.3435, -0.2951,  0.3244
 0.7117, -0.6099,  0.4946, -0.4208,  0.5476,  0.1096
-0.2929, -0.5726,  0.5346, -0.3827,  0.4665,  0.2465
 0.4889, -0.5572, -0.5718, -0.6021, -0.7150,  0.2163
-0.7782,  0.3491,  0.5996, -0.8389, -0.5366,  0.6516
-0.5847,  0.8347,  0.4226,  0.1078, -0.3910,  0.6134
 0.8469,  0.4121, -0.0439, -0.7476,  0.9521,  0.1571
-0.6803, -0.5948, -0.1376, -0.1916, -0.7065,  0.7156
 0.2878,  0.5086, -0.5785,  0.2019,  0.4979,  0.2980
 0.2764,  0.1943, -0.4090,  0.4632,  0.8906,  0.2960
-0.8877,  0.6705, -0.6155, -0.2098, -0.3998,  0.7107
-0.8398,  0.8093, -0.2597,  0.0614, -0.0118,  0.6502
-0.8476,  0.0158, -0.4769, -0.2859, -0.7839,  0.7715
 0.5751, -0.7868,  0.9714, -0.6457,  0.1448,  0.1175
 0.4802, -0.7001,  0.1022, -0.5668,  0.5184,  0.1090
 0.4458, -0.6469,  0.7239, -0.9604,  0.7205,  0.0779
 0.5175,  0.4339,  0.9747, -0.4438, -0.9924,  0.2879
 0.8678,  0.7158,  0.4577,  0.0334,  0.4139,  0.1678
 0.5406,  0.5012,  0.2264, -0.1963,  0.3946,  0.2088
-0.9938,  0.5498,  0.7928, -0.5214, -0.7585,  0.7687
 0.7661,  0.0863, -0.4266, -0.7233, -0.4197,  0.1466
 0.2277, -0.3517, -0.0853, -0.1118,  0.6563,  0.1767
 0.3499, -0.5570, -0.0655, -0.3705,  0.2537,  0.1632
 0.7547, -0.1046,  0.5689, -0.0861,  0.3125,  0.1257
 0.8186,  0.2110,  0.5335,  0.0094, -0.0039,  0.1391
 0.6858, -0.8644,  0.1465,  0.8855,  0.0357,  0.1845
-0.4967,  0.4015,  0.0805,  0.8977,  0.2487,  0.4663
 0.6760, -0.9841,  0.9787, -0.8446, -0.3557,  0.1509
-0.1203, -0.4885,  0.6054, -0.0443, -0.7313,  0.4854
 0.8557,  0.7919, -0.0169,  0.7134, -0.1628,  0.2002
 0.0115, -0.6209,  0.9300, -0.4116, -0.7931,  0.4052
-0.7114, -0.9718,  0.4319,  0.1290,  0.5892,  0.3661
 0.3915,  0.5557, -0.1870,  0.2955, -0.6404,  0.2954
-0.3564, -0.6548, -0.1827, -0.5172, -0.1862,  0.4622
 0.2392, -0.4959,  0.5857, -0.1341, -0.2850,  0.2470
-0.3394,  0.3947, -0.4627,  0.6166, -0.4094,  0.5325
 0.7107,  0.7768, -0.6312,  0.1707,  0.7964,  0.2757
-0.1078,  0.8437, -0.4420,  0.2177,  0.3649,  0.4028
-0.3139,  0.5595, -0.6505, -0.3161, -0.7108,  0.5546
 0.4335,  0.3986,  0.3770, -0.4932,  0.3847,  0.1810
-0.2562, -0.2894, -0.8847,  0.2633,  0.4146,  0.4036
 0.2272,  0.2966, -0.6601, -0.7011,  0.0284,  0.2778
-0.0743, -0.1421, -0.0054, -0.6770, -0.3151,  0.3597
-0.4762,  0.6891,  0.6007, -0.1467,  0.2140,  0.4266
-0.4061,  0.7193,  0.3432,  0.2669, -0.7505,  0.6147
-0.0588,  0.9731,  0.8966,  0.2902, -0.6966,  0.4955
-0.0627, -0.1439,  0.1985,  0.6999,  0.5022,  0.3077
 0.1587,  0.8494, -0.8705,  0.9827, -0.8940,  0.4263
-0.7850,  0.2473, -0.9040, -0.4308, -0.8779,  0.7199
 0.4070,  0.3369, -0.2428, -0.6236,  0.4940,  0.2215
-0.0242,  0.0513, -0.9430,  0.2885, -0.2987,  0.3947
-0.5416, -0.1322, -0.2351, -0.0604,  0.9590,  0.3683
 0.1055,  0.7783, -0.2901, -0.5090,  0.8220,  0.2984
-0.9129,  0.9015,  0.1128, -0.2473,  0.9901,  0.4776
-0.9378,  0.1424, -0.6391,  0.2619,  0.9618,  0.5368
 0.7498, -0.0963,  0.4169,  0.5549, -0.0103,  0.1614
-0.2612, -0.7156,  0.4538, -0.0460, -0.1022,  0.3717
 0.7720,  0.0552, -0.1818, -0.4622, -0.8560,  0.1685
-0.4177,  0.0070,  0.9319, -0.7812,  0.3461,  0.3052
-0.0001,  0.5542, -0.7128, -0.8336, -0.2016,  0.3803
 0.5356, -0.4194, -0.5662, -0.9666, -0.2027,  0.1776
-0.2378,  0.3187, -0.8582, -0.6948, -0.9668,  0.5474
-0.1947, -0.3579,  0.1158,  0.9869,  0.6690,  0.2992
 0.3992,  0.8365, -0.9205, -0.8593, -0.0520,  0.3154
-0.0209,  0.0793,  0.7905, -0.1067,  0.7541,  0.1864
-0.4928, -0.4524, -0.3433,  0.0951, -0.5597,  0.6261
-0.8118,  0.7404, -0.5263, -0.2280,  0.1431,  0.6349
 0.0516, -0.8480,  0.7483,  0.9023,  0.6250,  0.1959
-0.3212,  0.1093,  0.9488, -0.3766,  0.3376,  0.2735
-0.3481,  0.5490, -0.3484,  0.7797,  0.5034,  0.4379
-0.5785, -0.9170, -0.3563, -0.9258,  0.3877,  0.4121
 0.3407, -0.1391,  0.5356,  0.0720, -0.9203,  0.3458
-0.3287, -0.8954,  0.2102,  0.0241,  0.2349,  0.3247
-0.1353,  0.6954, -0.0919, -0.9692,  0.7461,  0.3338
 0.9036, -0.8982, -0.5299, -0.8733, -0.1567,  0.1187
 0.7277, -0.8368, -0.0538, -0.7489,  0.5458,  0.0830
 0.9049,  0.8878,  0.2279,  0.9470, -0.3103,  0.2194
 0.7957, -0.1308, -0.5284,  0.8817,  0.3684,  0.2172
 0.4647, -0.4931,  0.2010,  0.6292, -0.8918,  0.3371
-0.7390,  0.6849,  0.2367,  0.0626, -0.5034,  0.7039
-0.1567, -0.8711,  0.7940, -0.5932,  0.6525,  0.1710
 0.7635, -0.0265,  0.1969,  0.0545,  0.2496,  0.1445
 0.7675,  0.1354, -0.7698, -0.5460,  0.1920,  0.1728
-0.5211, -0.7372, -0.6763,  0.6897,  0.2044,  0.5217
 0.1913,  0.1980,  0.2314, -0.8816,  0.5006,  0.1998
 0.8964,  0.0694, -0.6149,  0.5059, -0.9854,  0.1825
 0.1767,  0.7104,  0.2093,  0.6452,  0.7590,  0.2832
-0.3580, -0.7541,  0.4426, -0.1193, -0.7465,  0.5657
-0.5996,  0.5766, -0.9758, -0.3933, -0.9572,  0.6800
 0.9950,  0.1641, -0.4132,  0.8579,  0.0142,  0.2003
-0.4717, -0.3894, -0.2567, -0.5111,  0.1691,  0.4266
 0.3917, -0.8561,  0.9422,  0.5061,  0.6123,  0.1212
-0.0366, -0.1087,  0.3449, -0.1025,  0.4086,  0.2475
 0.3633,  0.3943,  0.2372, -0.6980,  0.5216,  0.1925
-0.5325, -0.6466, -0.2178, -0.3589,  0.6310,  0.3568
 0.2271,  0.5200, -0.1447, -0.8011, -0.7699,  0.3128
 0.6415,  0.1993,  0.3777, -0.0178, -0.8237,  0.2181
-0.5298, -0.0768, -0.6028, -0.9490,  0.4588,  0.4356
 0.6870, -0.1431,  0.7294,  0.3141,  0.1621,  0.1632
-0.5985,  0.0591,  0.7889, -0.3900,  0.7419,  0.2945
 0.3661,  0.7984, -0.8486,  0.7572, -0.6183,  0.3449
 0.6995,  0.3342, -0.3113, -0.6972,  0.2707,  0.1712
 0.2565,  0.9126,  0.1798, -0.6043, -0.1413,  0.2893
-0.3265,  0.9839, -0.2395,  0.9854,  0.0376,  0.4770
 0.2690, -0.1722,  0.9818,  0.8599, -0.7015,  0.3954
-0.2102, -0.0768,  0.1219,  0.5607, -0.0256,  0.3949
 0.8216, -0.9555,  0.6422, -0.6231,  0.3715,  0.0801
-0.2896,  0.9484, -0.7545, -0.6249,  0.7789,  0.4370
-0.9985, -0.5448, -0.7092, -0.5931,  0.7926,  0.5402

Test data:

# synthetic_test_40.txt
#
 0.7462,  0.4006, -0.0590,  0.6543, -0.0083,  0.1935
 0.8495, -0.2260, -0.0142, -0.4911,  0.7699,  0.1078
-0.2335, -0.4049,  0.4352, -0.6183, -0.7636,  0.5088
 0.1810, -0.5142,  0.2465,  0.2767, -0.3449,  0.3136
-0.8650,  0.7611, -0.0801,  0.5277, -0.4922,  0.7140
-0.2358, -0.7466, -0.5115, -0.8413, -0.3943,  0.4533
 0.4834,  0.2300,  0.3448, -0.9832,  0.3568,  0.1360
-0.6502, -0.6300,  0.6885,  0.9652,  0.8275,  0.3046
-0.3053,  0.5604,  0.0929,  0.6329, -0.0325,  0.4756
-0.7995,  0.0740, -0.2680,  0.2086,  0.9176,  0.4565
-0.2144, -0.2141,  0.5813,  0.2902, -0.2122,  0.4119
-0.7278, -0.0987, -0.3312, -0.5641,  0.8515,  0.4438
 0.3793,  0.1976,  0.4933,  0.0839,  0.4011,  0.1905
-0.8568,  0.9573, -0.5272,  0.3212, -0.8207,  0.7415
-0.5785,  0.0056, -0.7901, -0.2223,  0.0760,  0.5551
 0.0735, -0.2188,  0.3925,  0.3570,  0.3746,  0.2191
 0.1230, -0.2838,  0.2262,  0.8715,  0.1938,  0.2878
 0.4792, -0.9248,  0.5295,  0.0366, -0.9894,  0.3149
-0.4456,  0.0697,  0.5359, -0.8938,  0.0981,  0.3879
 0.8629, -0.8505, -0.4464,  0.8385,  0.5300,  0.1769
 0.1995,  0.6659,  0.7921,  0.9454,  0.9970,  0.2330
-0.0249, -0.3066, -0.2927, -0.4923,  0.8220,  0.2437
 0.4513, -0.9481, -0.0770, -0.4374, -0.9421,  0.2879
-0.3405,  0.5931, -0.3507, -0.3842,  0.8562,  0.3987
 0.9538,  0.0471,  0.9039,  0.7760,  0.0361,  0.1706
-0.0887,  0.2104,  0.9808,  0.5478, -0.3314,  0.4128
-0.8220, -0.6302,  0.0537, -0.1658,  0.6013,  0.4306
-0.4123, -0.2880,  0.9074, -0.0461, -0.4435,  0.5144
 0.0060,  0.2867, -0.7775,  0.5161,  0.7039,  0.3599
-0.7968, -0.5484,  0.9426, -0.4308,  0.8148,  0.2979
 0.7811,  0.8450, -0.6877,  0.7594,  0.2640,  0.2362
-0.6802, -0.1113, -0.8325, -0.6694, -0.6056,  0.6544
 0.3821,  0.1476,  0.7466, -0.5107,  0.2592,  0.1648
 0.7265,  0.9683, -0.9803, -0.4943, -0.5523,  0.2454
-0.9049, -0.9797, -0.0196, -0.9090, -0.4433,  0.6447
-0.4607,  0.1811, -0.2389,  0.4050, -0.0078,  0.5229
 0.2664, -0.2932, -0.4259, -0.7336,  0.8742,  0.1834
-0.4507,  0.1029, -0.6294, -0.1158, -0.6294,  0.6081
 0.8948, -0.0124,  0.9278,  0.2899, -0.0314,  0.1534
-0.1323, -0.8813, -0.0146, -0.0697,  0.6135,  0.2386

Posted in Machine Learning | Leave a comment

A Tribute to Actors Arthur Franz and Marshall Thompson

Posted on April 17, 2026 by jamesdmccaffrey

I’m a big fan of 1950s science fiction movies. Two of my favorite actors appeared in these old movies — Arthur Franz (1920-2006) and Marshall Thompson (1925-1992). To my eye they look very much alike, and to my ear their voices are very similar too.

Left: Arthur Franz. Right: Marshall Thompson.

Invaders from Mars (1953) – Franz plays an astronomer who discovers a Martian invasion. One of my all-time favorite movies. My grade = A.

The Atomic Submarine (1959) – Franz plays Lieutenant Commander Richard Holloway. He and the crew of the Tigerfish battle an alien spacecraft under the Arctic ice. My grade = B+.

The Flame Barrier(1958) – Franz plays a jungle guide who is hired to find a U.S. space probe that unfortunately bought an alien blob back to Earth. My grade = C.

Fiend Without a Face (1958) – Thompson plays an Air Force major in charge of a secret U.S. radar site. He investigates the appearnace of nasty enegy creatures that take the form of brains. My grade = B.

First Man into space (1959) – Thompson plays a Navy Commander whose brother takes an experimental rocket plane into space, but who comes back mutated. My grade = C+

It! The Terror from Beyond Space (1958) – Thompson plays a U.S. Air Force Colonel who goes to Mars but the expedition picks up a nasty stowaway. My grade = A-.

Posted in Top Ten | Leave a comment

“Why Data Is the Real Artificial Intelligence” on the Pure AI Web Site

Posted on April 16, 2026 by jamesdmccaffrey

I contributed some technical content and opinions to an article titled “Why Data Is the Real Artificial Intelligence” on the Pure AI web site. See https://pureai.com/articles/2026/04/01/why-data-is-the-real-artificial-intelligence.aspx.

In a nutshell:

* Data is the main driver of AI value, not sophisticated algorithms.
* Data is a strategic asset that creates competitive advantage.
* Data quality, governance, and human involvement are critical for AI success.

While algorithms determine how learning occurs, data determines what is learned. Two companies using the same algorithm can achieve dramatically different results depending on the size, relevance, and cleanliness of their datasets. For businesses, this means that proprietary data assets often matter more than proprietary code.

High-quality datasets are difficult to acquire, expensive to maintain, and often impossible to replicate. Companies such as Amazon (sales data), Google (search data), and Microsoft (computer code from GitHub) owe much of their AI success to years of accumulated user data that their competitors cannot easily access.

I gave some opinions:

The Pure AI editors asked Dr. James McCaffrey, a technical expert who has worked with large language models and AI systems, for comments. McCaffrey observed, “It’s critical for businesses to recognize the importance of data for artificial intelligence. This allows organizations to make more informed strategic decisions and avoid the common misconception that AI success is purely a technological challenge.”

He added, “For businesses, competitive advantage in AI is less about discovering revolutionary models and more about cultivating high-quality, well-governed, proprietary data assets. It’s sometimes said that data for AI is the oil of the 21st century.”

Artificial intelligence is composed of data and algorithms. Animated movies are composed of art and story. Here are three animated movies that have stunningly beautiful (to my eye) art.

Left: “Sleeping Beauty” (1959). In my opinion, the most beautiful animated movie artwork of all time.

Center: “The Adventures of Tintin: The Blue Lotus” (1991). The Adventures of Tintin was an animated television series based on the comic books by Belgian cartoonist Herge. There are 39 half-hour episodes. The animated artwork is true to the books’ ligne claire style.

Right: “Batman: The Mask of the Phantasm” (1993). This was a theatrical release to supplement the animated TV series that ran 1992-1995. The art is a perfect balance of abstraction and detail.

Posted in Machine Learning | Leave a comment

Decision Tree Regression Using C# Applied to the Diabetes Dataset – Poor Results

Posted on April 15, 2026 by jamesdmccaffrey

I write code almost every day. Like most things, writing code is a skill that must be practiced, plus I just enjoy writing code. One evening after work, I figured I’d run the well-known Diabetes Dataset through a decision tree regression model. Based on previous experiments with linear regression, quadratic regression, and a scikit DecisionTreeRegressor model, I was pretty sure the C# decision tree would give poor prediction accuracy. And that’s what happened.

The Diabetes Dataset looks like:

59, 2, 32.1, 101.00, 157,  93.2, 38, 4.00, 4.8598, 87, 151
48, 1, 21.6,  87.00, 183, 103.2, 70, 3.00, 3.8918, 69,  75
72, 2, 30.5,  93.00, 156,  93.6, 41, 4.00, 4.6728, 85, 141
. . .

The sex encoding isn’t explained anywhere but I suspect male = 1, female = 2 because there are 235 1 values and 206 2 values).

0.5900, 1.0000, 0.3210, . . . 0.1510
0.4800, 0.0000, 0.2160, . . . 0.0750
0.7200, 1.0000, 0.3050, . . . 0.1410
. . .

Normalization isn’t necessary for decision tree models, but it doesn’t hurt. I split the 442-items into a 342-item training set and a 100-item test set.

I implemented a decision tree regression model using C#. I set the maximum depth of the tree to 12, the minimum samples parameter to 2 (standard default), and the minimum leaf parameter to 1 (standard default).

The output of the demo is:

Begin decision tree regression (simplified version)

Loading diabetes train (342) and test (100) data
Done

First three train X:
  0.5900  1.0000  0.3210  . . .  0.0870
  0.4800  0.0000  0.2160  . . .  0.0690
  0.7200  1.0000  0.3050  . . .  0.0850

First three train y:
  0.1510
  0.0750
  0.1410

Setting maxDepth = 12
Setting minSamples = 2
Setting minLeaf = 1
Using default numSplitCols = -1

Creating and training tree
Done

Evaluating model
Accuracy train (within 0.10) = 0.8304
Accuracy test (within 0.10) = 0.1300

MSE train = 0.0002
MSE test = 0.0073

Predicting for trainX[0] =
   0.5900   1.0000   0.3210   . . .   0.0870
Predicted y = 0.1510

End demo

These results were essentially the same as the results I got using the scikit DecisionTreeRegressor module (there was slight difference in the training MSE). The decision tree exhibited extreme overfitting, which is a common problem with decision trees, and the reason they are usually used in a collection (random forest, gradient boosting, etc.) rather than used by themselves.

I have done some experiemnts with the Diabetes Dataset and I’ve concluded the the default target value in the last column (a patitent diabetes score) simply cannot be predicted well. But the variables in columns [4], [5], [6], [7], and [8] can be meaningfully predicted from the other columns.

Each node in a decision tree has a left child and a right child, but they are neither sons nor daughters. I am a big fan of old science fiction movies. A surprising number of these movies feature a daughter of one of the main scientists.

“From the Earth to the Moon” (1958) – In the late 1860s, munitions producer Victor Barbicane invents a powerful new explosive called Power X. He recruits another inventor, Stuyvesant Nicholl, and they build a spaceship. Nicholl’s daughter and her boyfriend stow away. This movie is based on Jules Verne’s 1865 science fiction novel. My grade for the movie = B-.

“Journey to the Center of the Earth” (1959) – In 1880, Professor Sir Oliver Lindenbrook, his student, Alec McEwan, and a Carla, the widow of a murdered professor, and Hans find a route to the center of the Earth. Lindenbrook’s niece (not a daughter but close enough for this blog) Jenny is the fiance of Alec. They (Jenny stays home) are followed by the evil Count Saknussemm and his henchman. Another movie based on a Jules Verne novel. I saw this movie when it was released in 1959 at the Fox Fullerton (California) theater on Harbor Blvd! My grade = B.

“When Worlds Collide” (1951) – A rogue star, Bellus, is headed towards Earth. The only chance is to build a spacecraft to bring a select group of people to Zyra, a planet of Bellus. The plan succeeds. Dr. Cole Hendron, assisted by his daughter Joyce, leads the effort to save humanity. The movie won an Honorary Academy Award for Special Effects. My grade = B+.

Demo program. Replace “lt” (less than), “gt”, “lte”, gte” with Boolean operator symbols. (My blog editor chokes on symbols).

using System;
using System.IO;
using System.Collections.Generic;

// full List storage with indexes (no pointers)
// iteration-based construction (no stack, no recursion)
// Nodes hold associated row idxs (interpretability)
// but rows can be deleted after training (ensembles)

namespace DecisionTreeRegression
{
  internal class DecisionTreeRegressionProgram
  {
    static void Main(string[] args)
    {
      Console.WriteLine("\nBegin decision tree" +
        " regression (simplified version) ");

      // 1. load data
      Console.WriteLine("\nLoading diabetes train" +
        " (342) and test (100) data");
      string trainFile = "..\\..\\..\\Data\\" +
        "diabetes_norm_train_342.txt";
      int[] colsX = new int[] { 0, 1, 2, 3, 4,
        5, 6, 7, 8, 9};
      int colY = 10;
      double[][] trainX =
        MatLoad(trainFile, colsX, ',', "#");
      double[] trainY =
        MatToVec(MatLoad(trainFile,
        new int[] { colY }, ',', "#"));

      string testFile = "..\\..\\..\\Data\\" +
        "diabetes_norm_test_100.txt";
      double[][] testX =
        MatLoad(testFile, colsX, ',', "#");
      double[] testY =
        MatToVec(MatLoad(testFile,
        new int[] { colY }, ',', "#"));
      Console.WriteLine("Done ");

      Console.WriteLine("\nFirst three train X: ");
      for (int i = 0; i "lt" 3; ++i)
        VecShow(trainX[i], 4, 8);

      Console.WriteLine("\nFirst three train y: ");
      for (int i = 0; i "lt" 3; ++i)
        Console.WriteLine(trainY[i].ToString("F4").
          PadLeft(8));

      // 2. create and train/build tree
       int maxDepth = 12;
      int minSamples = 2;
      int minLeaf = 1;
      int numSplitCols = -1;  // all columns

      Console.WriteLine("\nSetting maxDepth = " +
        maxDepth);
      Console.WriteLine("Setting minSamples = " +
        minSamples);
      Console.WriteLine("Setting minLeaf = " +
        minLeaf);
      Console.WriteLine("Using default numSplitCols = -1 ");

      Console.WriteLine("\nCreating and training tree ");
      DecisionTreeRegressor dtr =
        new DecisionTreeRegressor(maxDepth, minSamples,
        minLeaf, numSplitCols, seed: 0);
      dtr.Train(trainX, trainY);
      Console.WriteLine("Done ");

      // 3. evaluate model
      Console.WriteLine("\nEvaluating model ");
      double accTrain = dtr.Accuracy(trainX, trainY, 0.10);
      Console.WriteLine("Accuracy train (within 0.10) = " +
        accTrain.ToString("F4"));
      double accTest = dtr.Accuracy(testX, testY, 0.10);
      Console.WriteLine("Accuracy test (within 0.10) = " +
        accTest.ToString("F4"));

      double mseTrain = dtr.MSE(trainX, trainY);
      Console.WriteLine("\nMSE train = " +
        mseTrain.ToString("F4"));
      double mseTest = dtr.MSE(testX, testY);
      Console.WriteLine("MSE test = " +
        mseTest.ToString("F4"));

      // 4. use model
      Console.WriteLine("\nPredicting for trainX[0] = ");
      double[] x = trainX[0];
      VecShow(x, 4, 9);
      double predY = dtr.Predict(x);
      Console.WriteLine("Predicted y = " +
        predY.ToString("F4"));

      //dtr.Explain(x);

      Console.WriteLine("\nEnd demo ");
      Console.ReadLine();

    } // Main()

    // ------------------------------------------------------
    // helpers for Main():
    //   MatLoad(), MatToVec(), VecShow().
    // ------------------------------------------------------

    static double[][] MatLoad(string fn, int[] usecols,
      char sep, string comment)
    {
      List"lt"double[]"gt" result =
        new List"lt"double[]"gt"();
      string line = "";
      FileStream ifs = new FileStream(fn, FileMode.Open);
      StreamReader sr = new StreamReader(ifs);
      while ((line = sr.ReadLine()) != null)
      {
        if (line.StartsWith(comment) == true)
          continue;
        string[] tokens = line.Split(sep);
        List"lt"double"gt" lst = new List"lt"double"gt"();
        for (int j = 0; j "lt" usecols.Length; ++j)
          lst.Add(double.Parse(tokens[usecols[j]]));
        double[] row = lst.ToArray();
        result.Add(row);
      }
      sr.Close(); ifs.Close();
      return result.ToArray();
    }

    static double[] MatToVec(double[][] mat)
    {
      int nRows = mat.Length;
      int nCols = mat[0].Length;
      double[] result = new double[nRows * nCols];
      int k = 0;
      for (int i = 0; i "lt" nRows; ++i)
        for (int j = 0; j "lt" nCols; ++j)
          result[k++] = mat[i][j];
      return result;
    }

    static void VecShow(double[] vec, int dec, int wid)
    {
      for (int i = 0; i "lt" vec.Length; ++i)
        Console.Write(vec[i].ToString("F" + dec).
          PadLeft(wid));
      Console.WriteLine("");
    }

  } // class Program

  // ========================================================

  public class DecisionTreeRegressor
  {
    public int maxDepth;
    public int minSamples;  // aka min_samples_split
    public int minLeaf;  // min number of values in a leaf
    public int numSplitCols; // mostly for random forest
    public List"lt"Node"gt" tree = new List"lt"Node"gt"();
    public Random rnd;  // order in which cols are searched

    public double[][] trainX;  // store data by ref
    public double[] trainY;

    // ------------------------------------------------------

    public class Node
    {
      public int id;
      public int colIdx;  // aka featureIdx
      public double thresh;
      public int left;  // index into List
      public int right;
      public double value;
      public bool isLeaf;
      public List"lt"int"gt" rows;  // assoc rows in train data

      public Node()
      {
        this.id = -1;
        this.colIdx = -1;
        this.thresh = 0.0;  // aka split value
        this.left = -1;
        this.right = -1;
        this.value = 0.0;  // aka pred y
        this.isLeaf = false;
        this.rows = null;
      }
    } // class Node

    // --------------------------------------------

    public DecisionTreeRegressor(int maxDepth = 2,
      int minSamples = 2, int minLeaf = 1,
      int numSplitCols = -1, int seed = 0)
    {
      // if maxDepth = 0, tree has just a root node
      // if maxDepth = 1, at most 3 nodes (root, l, r)
      // if maxDepth = n, at most 2^(n+1) - 1 nodes
      this.maxDepth = maxDepth;
      this.minSamples = minSamples;
      this.minLeaf = minLeaf;
      this.numSplitCols = numSplitCols;  // for ran. forest

      // create full tree List with null nodes
      int numNodes = (int)Math.Pow(2, (maxDepth + 1)) - 1;
      for (int i = 0; i "lt" numNodes; ++i)
      {
        this.tree.Add(null);  // empty nodes
      }
      this.rnd = new Random(seed);
    }

    // ------------------------------------------------------
    // public: Train(), Predict(), Explain(), Accuracy(),
    //   MSE(), Display().
    // helpers: MakeTree(), BestSplit(), TreeTargetMean(),
    //   TreeTargetVariance().
    // ------------------------------------------------------

    public void Train(double[][] trainX, double[] trainY)
    {
      this.trainX = trainX; // 
      this.trainY = trainY;
      this.MakeTree();

      // optionally delete rows in each Node to save space
      // when tree is part of an ensemble
      // for (int i = 0; i "lt" this.tree.Count; ++i)
      //   if (this.tree[i] != null)
      //     this.tree[i].rows = null;
    }

    // ------------------------------------------------------

    public double Predict(double[] x)
    {
      int p = 0;
      Node currNode = this.tree[p];
      while (currNode != null && 
        currNode.isLeaf == false &&
        p "lt" this.tree.Count)
      {
        if (x[currNode.colIdx] "lte" currNode.thresh)
          p = currNode.left;
        else
          p = currNode.right;
        currNode = this.tree[p];
      }
      return this.tree[p].value;
    }

    // ------------------------------------------------------

    public void Explain(double[] x)
    {
      int p = 0;
      Console.WriteLine("\nIF ");
      Node currNode = this.tree[p];
      while (currNode.isLeaf == false)
      {
        Console.Write("column ");
        Console.Write(currNode.colIdx + " ");
        if (x[currNode.colIdx] "lte" currNode.thresh)
        {
          Console.Write(" "lte" ");
          Console.WriteLine(currNode.thresh.
            ToString("F4").PadLeft(8) + " AND ");
          p = currNode.left;
          currNode = this.tree[p];
        }
        else
        {
          Console.Write(" "gt"  ");
          Console.WriteLine(currNode.thresh.
            ToString("F4").PadLeft(8) + " AND ");
          p = currNode.right;
          currNode = this.tree[p];
        }
      }
      Console.WriteLine("THEN \npredicted = " +
        currNode.value.ToString("F4"));
    }

    // ------------------------------------------------------

    public double Accuracy(double[][] dataX, double[] dataY,
      double pctClose)
    {
      int numCorrect = 0; int numWrong = 0;
      for (int i = 0; i "lt" dataX.Length; ++i)
      {
        double actualY = dataY[i];
        double predY = this.Predict(dataX[i]);
        if (Math.Abs(predY - actualY) "lt"
          Math.Abs(pctClose * actualY))
          ++numCorrect;
        else
          ++numWrong;
      }
      return (numCorrect * 1.0) / (numWrong + numCorrect);
    }

    // ------------------------------------------------------

    public double MSE(double[][] dataX,
      double[] dataY)
    {
      // standard machine learning MSE
      int n = dataX.Length;
      double sum = 0.0;
      for (int i = 0; i "lt" n; ++i)
      {
        double actualY = dataY[i];
        double predY = this.Predict(dataX[i]);
        sum += (actualY - predY) * (actualY - predY);
      }
      return sum / n;
    }

    // ------------------------------------------------------

    public void Display(bool showRows)
    {
      for (int i = 0; i "lt" this.tree.Count; ++i)
      {
        Node n = this.tree[i];
        // check for empty nodes
        if (n == null) continue;
        
        string s1 = "ID " +
          n.id.ToString().PadRight(3) + " | ";
        string s2 = "idx " +
          n.colIdx.ToString().PadLeft(3) + " | ";
        string s3 = "v " +
          n.thresh.ToString("F4").PadLeft(8) + " | ";
        string s4 = "L " +
          n.left.ToString().PadLeft(3) + " | ";
        string s5 = "R " +
          n.right.ToString().PadLeft(3) + " | ";
        string s6 = "y " +
          n.value.ToString("F4").PadLeft(8) + " | ";
        string s7 = "leaf " + (n.isLeaf == true ? "T" : "F");
          //n.isLeaf.ToString().PadLeft(6);

        string s8;
        if (showRows == true)
        {
          s8 = "\nRows: \n";
          for (int j = 0; j "lt" n.rows.Count; ++j)
          {
            if (j "gt" 0 && j % 20 == 0)
              s8 += "\n";
            s8 += n.rows[j].ToString().PadLeft(4) + " ";
          }
        }
        else
        {
          s8 = "";
        }
        Console.WriteLine(s1 + s2 + s3 + s4 +
          s5 + s6 + s7 + s8);
        if (showRows == true) Console.WriteLine("");
      }
    } // Display()

    // ------------------------------------------------------

    // helpers: MakeTree(), BestSplit(),
    // TreeTargetMean(), TreeTargetVariance()

    private void MakeTree()
    {
      // no recursion, no pointers, List storage, no stack
      if (this.numSplitCols == -1) // use all cols
        this.numSplitCols = this.trainX[0].Length;

      // prepare root node
      List"lt"int"gt" allRows = new List"lt"int"gt"();
      for (int i = 0; i "lt" this.trainX.Length; ++i)
        allRows.Add(i);
      double grandMean = this.TreeTargetMean(allRows);
     
      // wait to supply colIdx and thresh in loop
      Node root = new Node();
      root.id = 0;
      root.left = 1;
      root.right = 2;
      root.value = grandMean;
      root.isLeaf = false; // already set
      root.rows = allRows;
      this.tree[0] = root;

      for (int i = 0; i "lt" this.tree.Count; ++i) 
      {
        Node currNode = this.tree[i];
        // curr node has values for everything
        // except colIdx and thresh

        // curr node too deep to have children OR
        // curr node not enough rows to split then
        // leave both children as null
        if (currNode == null ||
          currNode.rows.Count == 0) { continue; }

        // if parent cannot be split, make parent a leaf
        if (currNode.id "gte" (int)Math.Pow(2,
          (this.maxDepth)) - 1 ||
          currNode.rows.Count "lt" this.minSamples)
        {
          currNode.isLeaf = true;
          continue;
        }

        // parent has enough rows to try to split
        double[] splitInfo = this.BestSplit(currNode.rows);
        int colIdx = (int)splitInfo[0];
        double splitVal = splitInfo[1]; //split value

        if (colIdx == -1)  // parent is a leaf
        {
          currNode.isLeaf = true;
          continue;
        }

        // complete the fields for curr node
        currNode.colIdx = colIdx;
        currNode.thresh = splitVal;
       
        // construct the children, except colIdx and thresh
        Node leftNode = new Node();
        Node rightNode = new Node();

        // construct the children rows using split info
        // all info except colIdx and thresh
        List"lt"int"gt" leftIdxs = new List"lt"int"gt"();
        List"lt"int"gt" rightIdxs = new List"lt"int"gt"();
        for (int k = 0; k "lt" currNode.rows.Count; ++k)
        {
          int r = currNode.rows[k];
          if (this.trainX[r][colIdx] "lte" splitVal)
            leftIdxs.Add(r);
          else
            rightIdxs.Add(r);
        }

        // assign -1 to children if out of range
        leftNode.id = currNode.id * 2 + 1;
        if (leftNode.id "gt" (int)Math.Pow(2,
          (maxDepth + 1)) - 2) leftNode.id = -1;
        leftNode.left = leftNode.id * 2 + 1;
        if (leftNode.left "gt" (int)Math.Pow(2,
          (maxDepth + 1)) - 2) leftNode.left = -1;
        leftNode.right = leftNode.id * 2 + 2;
        if (leftNode.right "gt" (int)Math.Pow(2,
          (maxDepth + 1)) - 2) leftNode.right = -1;
        leftNode.rows = leftIdxs;
        leftNode.value = 
          this.TreeTargetMean(leftNode.rows);
        this.tree[leftNode.id] = leftNode;

        rightNode.id = currNode.id * 2 + 2;
        if (rightNode.id "gt" (int)Math.Pow(2,
          (maxDepth + 1)) - 2) rightNode.id = -1;
        rightNode.left = rightNode.id * 2 + 1;
        if (rightNode.left "gt" (int)Math.Pow(2,
          (maxDepth + 1)) - 2) rightNode.left = -1;
        rightNode.right = rightNode.id * 2 + 2;
        if (rightNode.right "gt" (int)Math.Pow(2,
          (maxDepth + 1)) - 2) rightNode.right = -1;
        rightNode.rows = rightIdxs;
        rightNode.value = 
          this.TreeTargetMean(rightNode.rows);
        this.tree[rightNode.id] = rightNode;

      } // i
      return;
    }

    // ------------------------------------------------------

    private double[] BestSplit(List"lt"int"gt" rows)
    {
      // implicit params numSplitCols, minLeaf, numsplitCols
      // result[0] = best col idx (as double)
      // result[1] = best split value
      rows.Sort();

      int bestColIdx = -1;  // indicates bad split
      double bestThresh = 0.0;
      double bestVar = double.MaxValue;  // smaller better

      int nRows = rows.Count;  // or dataY.Length
      int nCols = this.trainX[0].Length;

      if (nRows == 0)
      {
        throw new Exception("empty data in BestSplit()");
      }

      // process cols in scrambled order
      int[] colIndices = new int[nCols];
      for (int k = 0; k "lt" nCols; ++k)
        colIndices[k] = k;
      // shuffle, inline Fisher-Yates
      int n = colIndices.Length;
      for (int i = 0; i "lt" n; ++i)
      {
        int ri = rnd.Next(i, n);  // be careful
        int tmp = colIndices[i];
        colIndices[i] = colIndices[ri];
        colIndices[ri] = tmp;
      }

      // numSplitCols is usually all columns (-1)
      for (int j = 0; j "lt" this.numSplitCols; ++j)
      {
        int colIdx = colIndices[j];
        HashSet"lt"double"gt" examineds = 
          new HashSet"lt"double"gt"();

        for (int i = 0; i "lt" nRows; ++i) // each row
        {
          // if curr thresh been seen, skip it
          double thresh = this.trainX[rows[i]][colIdx];
          if (examineds.Contains(thresh)) continue;
          examineds.Add(thresh);

          // get row idxs where x is lte, gt thresh
          List"lt"int"gt" leftIdxs = new List"lt"int"gt"();
          List"lt"int"gt" rightIdxs = new List"lt"int"gt"();
          for (int k = 0; k "lt" nRows; ++k)
          {
            if (this.trainX[rows[k]][colIdx] "lte" thresh)
              leftIdxs.Add(rows[k]);
            else
              rightIdxs.Add(rows[k]);
          }

          // Check if proposed split has too few values
          if (leftIdxs.Count "lt" this.minLeaf ||
            rightIdxs.Count "lt" this.minLeaf)
            continue;  // to next row

          double leftVar = 
            this.TreeTargetVariance(leftIdxs);
          double rightVar = 
            this.TreeTargetVariance(rightIdxs);
          double weightedVar = (leftIdxs.Count * leftVar +
            rightIdxs.Count * rightVar) / nRows;

          if (weightedVar "lt" bestVar)
          {
            // if this never happens, bestColIdx remains -1
            // which means a bad split. used in MakeTree()
            bestColIdx = colIdx;
            bestThresh = thresh;
            bestVar = weightedVar;
          }

        } // each row
      } // j each col

      double[] result = new double[2];  // out params ugly
      result[0] = 1.0 * bestColIdx;
      result[1] = bestThresh;
      return result;

    } // BestSplit()

    // ------------------------------------------------------

    private double TreeTargetMean(List"lt"int"gt" rows)
    {
      // mean of rows items in trainY: for node prediction
      double sum = 0.0;
      for (int i = 0; i "lt" rows.Count; ++i)
      {
        int r = rows[i];
        sum += this.trainY[r];
      }
      return sum / rows.Count;
    }

    // ------------------------------------------------------

    private double TreeTargetVariance(List"lt"int"gt" rows)
    {
      double mean = this.TreeTargetMean(rows);
      double sum = 0.0;
      for (int i = 0; i "lt" rows.Count; ++i)
      {
        int r = rows[i];
        sum += (this.trainY[r] - mean) *
          (this.trainY[r] - mean);
      }
      return sum / rows.Count;
    }

    // ------------------------------------------------------

  } // class DecisionTreeRegressor

} // ns

Training data:


# diabetes_norm_train_342.txt
# cols [0] to [9] predictors. col [10] target
# norm division constants:
# 100, -1, 100, 1000, 1000, 1000, 100, 10, 10, 1000, 1000
#
0.5900, 1.0000, 0.3210, 0.1010, 0.1570, 0.0932, 0.3800, 0.4000, 0.4860, 0.0870, 0.1510
0.4800, 0.0000, 0.2160, 0.0870, 0.1830, 0.1032, 0.7000, 0.3000, 0.3892, 0.0690, 0.0750
0.7200, 1.0000, 0.3050, 0.0930, 0.1560, 0.0936, 0.4100, 0.4000, 0.4673, 0.0850, 0.1410
0.2400, 0.0000, 0.2530, 0.0840, 0.1980, 0.1314, 0.4000, 0.5000, 0.4890, 0.0890, 0.2060
0.5000, 0.0000, 0.2300, 0.1010, 0.1920, 0.1254, 0.5200, 0.4000, 0.4291, 0.0800, 0.1350
0.2300, 0.0000, 0.2260, 0.0890, 0.1390, 0.0648, 0.6100, 0.2000, 0.4190, 0.0680, 0.0970
0.3600, 1.0000, 0.2200, 0.0900, 0.1600, 0.0996, 0.5000, 0.3000, 0.3951, 0.0820, 0.1380
0.6600, 1.0000, 0.2620, 0.1140, 0.2550, 0.1850, 0.5600, 0.4550, 0.4249, 0.0920, 0.0630
0.6000, 1.0000, 0.3210, 0.0830, 0.1790, 0.1194, 0.4200, 0.4000, 0.4477, 0.0940, 0.1100
0.2900, 0.0000, 0.3000, 0.0850, 0.1800, 0.0934, 0.4300, 0.4000, 0.5385, 0.0880, 0.3100
0.2200, 0.0000, 0.1860, 0.0970, 0.1140, 0.0576, 0.4600, 0.2000, 0.3951, 0.0830, 0.1010
0.5600, 1.0000, 0.2800, 0.0850, 0.1840, 0.1448, 0.3200, 0.6000, 0.3584, 0.0770, 0.0690
0.5300, 0.0000, 0.2370, 0.0920, 0.1860, 0.1092, 0.6200, 0.3000, 0.4304, 0.0810, 0.1790
0.5000, 1.0000, 0.2620, 0.0970, 0.1860, 0.1054, 0.4900, 0.4000, 0.5063, 0.0880, 0.1850
0.6100, 0.0000, 0.2400, 0.0910, 0.2020, 0.1154, 0.7200, 0.3000, 0.4291, 0.0730, 0.1180
0.3400, 1.0000, 0.2470, 0.1180, 0.2540, 0.1842, 0.3900, 0.7000, 0.5037, 0.0810, 0.1710
0.4700, 0.0000, 0.3030, 0.1090, 0.2070, 0.1002, 0.7000, 0.3000, 0.5215, 0.0980, 0.1660
0.6800, 1.0000, 0.2750, 0.1110, 0.2140, 0.1470, 0.3900, 0.5000, 0.4942, 0.0910, 0.1440
0.3800, 0.0000, 0.2540, 0.0840, 0.1620, 0.1030, 0.4200, 0.4000, 0.4443, 0.0870, 0.0970
0.4100, 0.0000, 0.2470, 0.0830, 0.1870, 0.1082, 0.6000, 0.3000, 0.4543, 0.0780, 0.1680
0.3500, 0.0000, 0.2110, 0.0820, 0.1560, 0.0878, 0.5000, 0.3000, 0.4511, 0.0950, 0.0680
0.2500, 1.0000, 0.2430, 0.0950, 0.1620, 0.0986, 0.5400, 0.3000, 0.3850, 0.0870, 0.0490
0.2500, 0.0000, 0.2600, 0.0920, 0.1870, 0.1204, 0.5600, 0.3000, 0.3970, 0.0880, 0.0680
0.6100, 1.0000, 0.3200, 0.1037, 0.2100, 0.0852, 0.3500, 0.6000, 0.6107, 0.1240, 0.2450
0.3100, 0.0000, 0.2970, 0.0880, 0.1670, 0.1034, 0.4800, 0.4000, 0.4357, 0.0780, 0.1840
0.3000, 1.0000, 0.2520, 0.0830, 0.1780, 0.1184, 0.3400, 0.5000, 0.4852, 0.0830, 0.2020
0.1900, 0.0000, 0.1920, 0.0870, 0.1240, 0.0540, 0.5700, 0.2000, 0.4174, 0.0900, 0.1370
0.4200, 0.0000, 0.3190, 0.0830, 0.1580, 0.0876, 0.5300, 0.3000, 0.4466, 0.1010, 0.0850
0.6300, 0.0000, 0.2440, 0.0730, 0.1600, 0.0914, 0.4800, 0.3000, 0.4635, 0.0780, 0.1310
0.6700, 1.0000, 0.2580, 0.1130, 0.1580, 0.0542, 0.6400, 0.2000, 0.5293, 0.1040, 0.2830
0.3200, 0.0000, 0.3050, 0.0890, 0.1820, 0.1106, 0.5600, 0.3000, 0.4344, 0.0890, 0.1290
0.4200, 0.0000, 0.2030, 0.0710, 0.1610, 0.0812, 0.6600, 0.2000, 0.4234, 0.0810, 0.0590
0.5800, 1.0000, 0.3800, 0.1030, 0.1500, 0.1072, 0.2200, 0.7000, 0.4644, 0.0980, 0.3410
0.5700, 0.0000, 0.2170, 0.0940, 0.1570, 0.0580, 0.8200, 0.2000, 0.4443, 0.0920, 0.0870
0.5300, 0.0000, 0.2050, 0.0780, 0.1470, 0.0842, 0.5200, 0.3000, 0.3989, 0.0750, 0.0650
0.6200, 1.0000, 0.2350, 0.0803, 0.2250, 0.1128, 0.8600, 0.2620, 0.4875, 0.0960, 0.1020
0.5200, 0.0000, 0.2850, 0.1100, 0.1950, 0.0972, 0.6000, 0.3000, 0.5242, 0.0850, 0.2650
0.4600, 0.0000, 0.2740, 0.0780, 0.1710, 0.0880, 0.5800, 0.3000, 0.4828, 0.0900, 0.2760
0.4800, 1.0000, 0.3300, 0.1230, 0.2530, 0.1636, 0.4400, 0.6000, 0.5425, 0.0970, 0.2520
0.4800, 1.0000, 0.2770, 0.0730, 0.1910, 0.1194, 0.4600, 0.4000, 0.4852, 0.0920, 0.0900
0.5000, 1.0000, 0.2560, 0.1010, 0.2290, 0.1622, 0.4300, 0.5000, 0.4779, 0.1140, 0.1000
0.2100, 0.0000, 0.2010, 0.0630, 0.1350, 0.0690, 0.5400, 0.3000, 0.4094, 0.0890, 0.0550
0.3200, 1.0000, 0.2540, 0.0903, 0.1530, 0.1004, 0.3400, 0.4500, 0.4533, 0.0830, 0.0610
0.5400, 0.0000, 0.2420, 0.0740, 0.2040, 0.1090, 0.8200, 0.2000, 0.4174, 0.1090, 0.0920
0.6100, 1.0000, 0.3270, 0.0970, 0.1770, 0.1184, 0.2900, 0.6000, 0.4997, 0.0870, 0.2590
0.5600, 1.0000, 0.2310, 0.1040, 0.1810, 0.1164, 0.4700, 0.4000, 0.4477, 0.0790, 0.0530
0.3300, 0.0000, 0.2530, 0.0850, 0.1550, 0.0850, 0.5100, 0.3000, 0.4554, 0.0700, 0.1900
0.2700, 0.0000, 0.1960, 0.0780, 0.1280, 0.0680, 0.4300, 0.3000, 0.4443, 0.0710, 0.1420
0.6700, 1.0000, 0.2250, 0.0980, 0.1910, 0.1192, 0.6100, 0.3000, 0.3989, 0.0860, 0.0750
0.3700, 1.0000, 0.2770, 0.0930, 0.1800, 0.1194, 0.3000, 0.6000, 0.5030, 0.0880, 0.1420
0.5800, 0.0000, 0.2570, 0.0990, 0.1570, 0.0916, 0.4900, 0.3000, 0.4407, 0.0930, 0.1550
0.6500, 1.0000, 0.2790, 0.1030, 0.1590, 0.0968, 0.4200, 0.4000, 0.4615, 0.0860, 0.2250
0.3400, 0.0000, 0.2550, 0.0930, 0.2180, 0.1440, 0.5700, 0.4000, 0.4443, 0.0880, 0.0590
0.4600, 0.0000, 0.2490, 0.1150, 0.1980, 0.1296, 0.5400, 0.4000, 0.4277, 0.1030, 0.1040
0.3500, 0.0000, 0.2870, 0.0970, 0.2040, 0.1268, 0.6400, 0.3000, 0.4190, 0.0930, 0.1820
0.3700, 0.0000, 0.2180, 0.0840, 0.1840, 0.1010, 0.7300, 0.3000, 0.3912, 0.0930, 0.1280
0.3700, 0.0000, 0.3020, 0.0870, 0.1660, 0.0960, 0.4000, 0.4150, 0.5011, 0.0870, 0.0520
0.4100, 0.0000, 0.2050, 0.0800, 0.1240, 0.0488, 0.6400, 0.2000, 0.4025, 0.0750, 0.0370
0.6000, 0.0000, 0.2040, 0.1050, 0.1980, 0.0784, 0.9900, 0.2000, 0.4635, 0.0790, 0.1700
0.6600, 1.0000, 0.2400, 0.0980, 0.2360, 0.1464, 0.5800, 0.4000, 0.5063, 0.0960, 0.1700
0.2900, 0.0000, 0.2600, 0.0830, 0.1410, 0.0652, 0.6400, 0.2000, 0.4078, 0.0830, 0.0610
0.3700, 1.0000, 0.2680, 0.0790, 0.1570, 0.0980, 0.2800, 0.6000, 0.5043, 0.0960, 0.1440
0.4100, 1.0000, 0.2570, 0.0830, 0.1810, 0.1066, 0.6600, 0.3000, 0.3738, 0.0850, 0.0520
0.3900, 0.0000, 0.2290, 0.0770, 0.2040, 0.1432, 0.4600, 0.4000, 0.4304, 0.0740, 0.1280
0.6700, 1.0000, 0.2400, 0.0830, 0.1430, 0.0772, 0.4900, 0.3000, 0.4431, 0.0940, 0.0710
0.3600, 1.0000, 0.2410, 0.1120, 0.1930, 0.1250, 0.3500, 0.6000, 0.5106, 0.0950, 0.1630
0.4600, 1.0000, 0.2470, 0.0850, 0.1740, 0.1232, 0.3000, 0.6000, 0.4644, 0.0960, 0.1500
0.6000, 1.0000, 0.2500, 0.0897, 0.1850, 0.1208, 0.4600, 0.4020, 0.4511, 0.0920, 0.0970
0.5900, 1.0000, 0.2360, 0.0830, 0.1650, 0.1000, 0.4700, 0.4000, 0.4500, 0.0920, 0.1600
0.5300, 0.0000, 0.2210, 0.0930, 0.1340, 0.0762, 0.4600, 0.3000, 0.4078, 0.0960, 0.1780
0.4800, 0.0000, 0.1990, 0.0910, 0.1890, 0.1096, 0.6900, 0.3000, 0.3951, 0.1010, 0.0480
0.4800, 0.0000, 0.2950, 0.1310, 0.2070, 0.1322, 0.4700, 0.4000, 0.4935, 0.1060, 0.2700
0.6600, 1.0000, 0.2600, 0.0910, 0.2640, 0.1466, 0.6500, 0.4000, 0.5568, 0.0870, 0.2020
0.5200, 1.0000, 0.2450, 0.0940, 0.2170, 0.1494, 0.4800, 0.5000, 0.4585, 0.0890, 0.1110
0.5200, 1.0000, 0.2660, 0.1110, 0.2090, 0.1264, 0.6100, 0.3000, 0.4682, 0.1090, 0.0850
0.4600, 1.0000, 0.2350, 0.0870, 0.1810, 0.1148, 0.4400, 0.4000, 0.4710, 0.0980, 0.0420
0.4000, 1.0000, 0.2900, 0.1150, 0.0970, 0.0472, 0.3500, 0.2770, 0.4304, 0.0950, 0.1700
0.2200, 0.0000, 0.2300, 0.0730, 0.1610, 0.0978, 0.5400, 0.3000, 0.3829, 0.0910, 0.2000
0.5000, 0.0000, 0.2100, 0.0880, 0.1400, 0.0718, 0.3500, 0.4000, 0.5112, 0.0710, 0.2520
0.2000, 0.0000, 0.2290, 0.0870, 0.1910, 0.1282, 0.5300, 0.4000, 0.3892, 0.0850, 0.1130
0.6800, 0.0000, 0.2750, 0.1070, 0.2410, 0.1496, 0.6400, 0.4000, 0.4920, 0.0900, 0.1430
0.5200, 1.0000, 0.2430, 0.0860, 0.1970, 0.1336, 0.4400, 0.5000, 0.4575, 0.0910, 0.0510
0.4400, 0.0000, 0.2310, 0.0870, 0.2130, 0.1264, 0.7700, 0.3000, 0.3871, 0.0720, 0.0520
0.3800, 0.0000, 0.2730, 0.0810, 0.1460, 0.0816, 0.4700, 0.3000, 0.4466, 0.0810, 0.2100
0.4900, 0.0000, 0.2270, 0.0653, 0.1680, 0.0962, 0.6200, 0.2710, 0.3892, 0.0600, 0.0650
0.6100, 0.0000, 0.3300, 0.0950, 0.1820, 0.1148, 0.5400, 0.3000, 0.4190, 0.0740, 0.1410
0.2900, 1.0000, 0.1940, 0.0830, 0.1520, 0.1058, 0.3900, 0.4000, 0.3584, 0.0830, 0.0550
0.6100, 0.0000, 0.2580, 0.0980, 0.2350, 0.1258, 0.7600, 0.3000, 0.5112, 0.0820, 0.1340
0.3400, 1.0000, 0.2260, 0.0750, 0.1660, 0.0918, 0.6000, 0.3000, 0.4263, 0.1080, 0.0420
0.3600, 0.0000, 0.2190, 0.0890, 0.1890, 0.1052, 0.6800, 0.3000, 0.4369, 0.0960, 0.1110
0.5200, 0.0000, 0.2400, 0.0830, 0.1670, 0.0866, 0.7100, 0.2000, 0.3850, 0.0940, 0.0980
0.6100, 0.0000, 0.3120, 0.0790, 0.2350, 0.1568, 0.4700, 0.5000, 0.5050, 0.0960, 0.1640
0.4300, 0.0000, 0.2680, 0.1230, 0.1930, 0.1022, 0.6700, 0.3000, 0.4779, 0.0940, 0.0480
0.3500, 0.0000, 0.2040, 0.0650, 0.1870, 0.1056, 0.6700, 0.2790, 0.4277, 0.0780, 0.0960
0.2700, 0.0000, 0.2480, 0.0910, 0.1890, 0.1068, 0.6900, 0.3000, 0.4190, 0.0690, 0.0900
0.2900, 0.0000, 0.2100, 0.0710, 0.1560, 0.0970, 0.3800, 0.4000, 0.4654, 0.0900, 0.1620
0.6400, 1.0000, 0.2730, 0.1090, 0.1860, 0.1076, 0.3800, 0.5000, 0.5308, 0.0990, 0.1500
0.4100, 0.0000, 0.3460, 0.0873, 0.2050, 0.1426, 0.4100, 0.5000, 0.4673, 0.1100, 0.2790
0.4900, 1.0000, 0.2590, 0.0910, 0.1780, 0.1066, 0.5200, 0.3000, 0.4575, 0.0750, 0.0920
0.4800, 0.0000, 0.2040, 0.0980, 0.2090, 0.1394, 0.4600, 0.5000, 0.4771, 0.0780, 0.0830
0.5300, 0.0000, 0.2800, 0.0880, 0.2330, 0.1438, 0.5800, 0.4000, 0.5050, 0.0910, 0.1280
0.5300, 1.0000, 0.2220, 0.1130, 0.1970, 0.1152, 0.6700, 0.3000, 0.4304, 0.1000, 0.1020
0.2300, 0.0000, 0.2900, 0.0900, 0.2160, 0.1314, 0.6500, 0.3000, 0.4585, 0.0910, 0.3020
0.6500, 1.0000, 0.3020, 0.0980, 0.2190, 0.1606, 0.4000, 0.5000, 0.4522, 0.0840, 0.1980
0.4100, 0.0000, 0.3240, 0.0940, 0.1710, 0.1044, 0.5600, 0.3000, 0.3970, 0.0760, 0.0950
0.5500, 1.0000, 0.2340, 0.0830, 0.1660, 0.1016, 0.4600, 0.4000, 0.4522, 0.0960, 0.0530
0.2200, 0.0000, 0.1930, 0.0820, 0.1560, 0.0932, 0.5200, 0.3000, 0.3989, 0.0710, 0.1340
0.5600, 0.0000, 0.3100, 0.0787, 0.1870, 0.1414, 0.3400, 0.5500, 0.4060, 0.0900, 0.1440
0.5400, 1.0000, 0.3060, 0.1033, 0.1440, 0.0798, 0.3000, 0.4800, 0.5142, 0.1010, 0.2320
0.5900, 1.0000, 0.2550, 0.0953, 0.1900, 0.1394, 0.3500, 0.5430, 0.4357, 0.1170, 0.0810
0.6000, 1.0000, 0.2340, 0.0880, 0.1530, 0.0898, 0.5800, 0.3000, 0.3258, 0.0950, 0.1040
0.5400, 0.0000, 0.2680, 0.0870, 0.2060, 0.1220, 0.6800, 0.3000, 0.4382, 0.0800, 0.0590
0.2500, 0.0000, 0.2830, 0.0870, 0.1930, 0.1280, 0.4900, 0.4000, 0.4382, 0.0920, 0.2460
0.5400, 1.0000, 0.2770, 0.1130, 0.2000, 0.1284, 0.3700, 0.5000, 0.5153, 0.1130, 0.2970
0.5500, 0.0000, 0.3660, 0.1130, 0.1990, 0.0944, 0.4300, 0.4630, 0.5730, 0.0970, 0.2580
0.4000, 1.0000, 0.2650, 0.0930, 0.2360, 0.1470, 0.3700, 0.7000, 0.5561, 0.0920, 0.2290
0.6200, 1.0000, 0.3180, 0.1150, 0.1990, 0.1286, 0.4400, 0.5000, 0.4883, 0.0980, 0.2750
0.6500, 0.0000, 0.2440, 0.1200, 0.2220, 0.1356, 0.3700, 0.6000, 0.5509, 0.1240, 0.2810
0.3300, 1.0000, 0.2540, 0.1020, 0.2060, 0.1410, 0.3900, 0.5000, 0.4868, 0.1050, 0.1790
0.5300, 0.0000, 0.2200, 0.0940, 0.1750, 0.0880, 0.5900, 0.3000, 0.4942, 0.0980, 0.2000
0.3500, 0.0000, 0.2680, 0.0980, 0.1620, 0.1036, 0.4500, 0.4000, 0.4205, 0.0860, 0.2000
0.6600, 0.0000, 0.2800, 0.1010, 0.1950, 0.1292, 0.4000, 0.5000, 0.4860, 0.0940, 0.1730
0.6200, 1.0000, 0.3390, 0.1010, 0.2210, 0.1564, 0.3500, 0.6000, 0.4997, 0.1030, 0.1800
0.5000, 1.0000, 0.2960, 0.0943, 0.3000, 0.2424, 0.3300, 0.9090, 0.4812, 0.1090, 0.0840
0.4700, 0.0000, 0.2860, 0.0970, 0.1640, 0.0906, 0.5600, 0.3000, 0.4466, 0.0880, 0.1210
0.4700, 1.0000, 0.2560, 0.0940, 0.1650, 0.0748, 0.4000, 0.4000, 0.5526, 0.0930, 0.1610
0.2400, 0.0000, 0.2070, 0.0870, 0.1490, 0.0806, 0.6100, 0.2000, 0.3611, 0.0780, 0.0990
0.5800, 1.0000, 0.2620, 0.0910, 0.2170, 0.1242, 0.7100, 0.3000, 0.4691, 0.0680, 0.1090
0.3400, 0.0000, 0.2060, 0.0870, 0.1850, 0.1122, 0.5800, 0.3000, 0.4304, 0.0740, 0.1150
0.5100, 0.0000, 0.2790, 0.0960, 0.1960, 0.1222, 0.4200, 0.5000, 0.5069, 0.1200, 0.2680
0.3100, 1.0000, 0.3530, 0.1250, 0.1870, 0.1124, 0.4800, 0.4000, 0.4890, 0.1090, 0.2740
0.2200, 0.0000, 0.1990, 0.0750, 0.1750, 0.1086, 0.5400, 0.3000, 0.4127, 0.0720, 0.1580
0.5300, 1.0000, 0.2440, 0.0920, 0.2140, 0.1460, 0.5000, 0.4000, 0.4500, 0.0970, 0.1070
0.3700, 1.0000, 0.2140, 0.0830, 0.1280, 0.0696, 0.4900, 0.3000, 0.3850, 0.0840, 0.0830
0.2800, 0.0000, 0.3040, 0.0850, 0.1980, 0.1156, 0.6700, 0.3000, 0.4344, 0.0800, 0.1030
0.4700, 0.0000, 0.3160, 0.0840, 0.1540, 0.0880, 0.3000, 0.5100, 0.5199, 0.1050, 0.2720
0.2300, 0.0000, 0.1880, 0.0780, 0.1450, 0.0720, 0.6300, 0.2000, 0.3912, 0.0860, 0.0850
0.5000, 0.0000, 0.3100, 0.1230, 0.1780, 0.1050, 0.4800, 0.4000, 0.4828, 0.0880, 0.2800
0.5800, 1.0000, 0.3670, 0.1170, 0.1660, 0.0938, 0.4400, 0.4000, 0.4949, 0.1090, 0.3360
0.5500, 0.0000, 0.3210, 0.1100, 0.1640, 0.0842, 0.4200, 0.4000, 0.5242, 0.0900, 0.2810
0.6000, 1.0000, 0.2770, 0.1070, 0.1670, 0.1146, 0.3800, 0.4000, 0.4277, 0.0950, 0.1180
0.4100, 0.0000, 0.3080, 0.0810, 0.2140, 0.1520, 0.2800, 0.7600, 0.5136, 0.1230, 0.3170
0.6000, 1.0000, 0.2750, 0.1060, 0.2290, 0.1438, 0.5100, 0.4000, 0.5142, 0.0910, 0.2350
0.4000, 0.0000, 0.2690, 0.0920, 0.2030, 0.1198, 0.7000, 0.3000, 0.4190, 0.0810, 0.0600
0.5700, 1.0000, 0.3070, 0.0900, 0.2040, 0.1478, 0.3400, 0.6000, 0.4710, 0.0930, 0.1740
0.3700, 0.0000, 0.3830, 0.1130, 0.1650, 0.0946, 0.5300, 0.3000, 0.4466, 0.0790, 0.2590
0.4000, 1.0000, 0.3190, 0.0950, 0.1980, 0.1356, 0.3800, 0.5000, 0.4804, 0.0930, 0.1780
0.3300, 0.0000, 0.3500, 0.0890, 0.2000, 0.1304, 0.4200, 0.4760, 0.4927, 0.1010, 0.1280
0.3200, 1.0000, 0.2780, 0.0890, 0.2160, 0.1462, 0.5500, 0.4000, 0.4304, 0.0910, 0.0960
0.3500, 1.0000, 0.2590, 0.0810, 0.1740, 0.1024, 0.3100, 0.6000, 0.5313, 0.0820, 0.1260
0.5500, 0.0000, 0.3290, 0.1020, 0.1640, 0.1062, 0.4100, 0.4000, 0.4431, 0.0890, 0.2880
0.4900, 0.0000, 0.2600, 0.0930, 0.1830, 0.1002, 0.6400, 0.3000, 0.4543, 0.0880, 0.0880
0.3900, 1.0000, 0.2630, 0.1150, 0.2180, 0.1582, 0.3200, 0.7000, 0.4935, 0.1090, 0.2920
0.6000, 1.0000, 0.2230, 0.1130, 0.1860, 0.1258, 0.4600, 0.4000, 0.4263, 0.0940, 0.0710
0.6700, 1.0000, 0.2830, 0.0930, 0.2040, 0.1322, 0.4900, 0.4000, 0.4736, 0.0920, 0.1970
0.4100, 1.0000, 0.3200, 0.1090, 0.2510, 0.1706, 0.4900, 0.5000, 0.5056, 0.1030, 0.1860
0.4400, 0.0000, 0.2540, 0.0950, 0.1620, 0.0926, 0.5300, 0.3000, 0.4407, 0.0830, 0.0250
0.4800, 1.0000, 0.2330, 0.0893, 0.2120, 0.1428, 0.4600, 0.4610, 0.4754, 0.0980, 0.0840
0.4500, 0.0000, 0.2030, 0.0743, 0.1900, 0.1262, 0.4900, 0.3880, 0.4304, 0.0790, 0.0960
0.4700, 0.0000, 0.3040, 0.1200, 0.1990, 0.1200, 0.4600, 0.4000, 0.5106, 0.0870, 0.1950
0.4600, 0.0000, 0.2060, 0.0730, 0.1720, 0.1070, 0.5100, 0.3000, 0.4249, 0.0800, 0.0530
0.3600, 1.0000, 0.3230, 0.1150, 0.2860, 0.1994, 0.3900, 0.7000, 0.5472, 0.1120, 0.2170
0.3400, 0.0000, 0.2920, 0.0730, 0.1720, 0.1082, 0.4900, 0.4000, 0.4304, 0.0910, 0.1720
0.5300, 1.0000, 0.3310, 0.1170, 0.1830, 0.1190, 0.4800, 0.4000, 0.4382, 0.1060, 0.1310
0.6100, 0.0000, 0.2460, 0.1010, 0.2090, 0.1068, 0.7700, 0.3000, 0.4836, 0.0880, 0.2140
0.3700, 0.0000, 0.2020, 0.0810, 0.1620, 0.0878, 0.6300, 0.3000, 0.4025, 0.0880, 0.0590
0.3300, 1.0000, 0.2080, 0.0840, 0.1250, 0.0702, 0.4600, 0.3000, 0.3784, 0.0660, 0.0700
0.6800, 0.0000, 0.3280, 0.1057, 0.2050, 0.1164, 0.4000, 0.5130, 0.5493, 0.1170, 0.2200
0.4900, 1.0000, 0.3190, 0.0940, 0.2340, 0.1558, 0.3400, 0.7000, 0.5398, 0.1220, 0.2680
0.4800, 0.0000, 0.2390, 0.1090, 0.2320, 0.1052, 0.3700, 0.6000, 0.6107, 0.0960, 0.1520
0.5500, 1.0000, 0.2450, 0.0840, 0.1790, 0.1058, 0.6600, 0.3000, 0.3584, 0.0870, 0.0470
0.4300, 0.0000, 0.2210, 0.0660, 0.1340, 0.0772, 0.4500, 0.3000, 0.4078, 0.0800, 0.0740
0.6000, 1.0000, 0.3300, 0.0970, 0.2170, 0.1256, 0.4500, 0.5000, 0.5447, 0.1120, 0.2950
0.3100, 1.0000, 0.1900, 0.0930, 0.1370, 0.0730, 0.4700, 0.3000, 0.4443, 0.0780, 0.1010
0.5300, 1.0000, 0.2730, 0.0820, 0.1190, 0.0550, 0.3900, 0.3000, 0.4828, 0.0930, 0.1510
0.6700, 0.0000, 0.2280, 0.0870, 0.1660, 0.0986, 0.5200, 0.3000, 0.4344, 0.0920, 0.1270
0.6100, 1.0000, 0.2820, 0.1060, 0.2040, 0.1320, 0.5200, 0.4000, 0.4605, 0.0960, 0.2370
0.6200, 0.0000, 0.2890, 0.0873, 0.2060, 0.1272, 0.3300, 0.6240, 0.5434, 0.0990, 0.2250
0.6000, 0.0000, 0.2560, 0.0870, 0.2070, 0.1258, 0.6900, 0.3000, 0.4111, 0.0840, 0.0810
0.4200, 0.0000, 0.2490, 0.0910, 0.2040, 0.1418, 0.3800, 0.5000, 0.4796, 0.0890, 0.1510
0.3800, 1.0000, 0.2680, 0.1050, 0.1810, 0.1192, 0.3700, 0.5000, 0.4820, 0.0910, 0.1070
0.6200, 0.0000, 0.2240, 0.0790, 0.2220, 0.1474, 0.5900, 0.4000, 0.4357, 0.0760, 0.0640
0.6100, 1.0000, 0.2690, 0.1110, 0.2360, 0.1724, 0.3900, 0.6000, 0.4812, 0.0890, 0.1380
0.6100, 1.0000, 0.2310, 0.1130, 0.1860, 0.1144, 0.4700, 0.4000, 0.4812, 0.1050, 0.1850
0.5300, 0.0000, 0.2860, 0.0880, 0.1710, 0.0988, 0.4100, 0.4000, 0.5050, 0.0990, 0.2650
0.2800, 1.0000, 0.2470, 0.0970, 0.1750, 0.0996, 0.3200, 0.5000, 0.5380, 0.0870, 0.1010
0.2600, 1.0000, 0.3030, 0.0890, 0.2180, 0.1522, 0.3100, 0.7000, 0.5159, 0.0820, 0.1370
0.3000, 0.0000, 0.2130, 0.0870, 0.1340, 0.0630, 0.6300, 0.2000, 0.3689, 0.0660, 0.1430
0.5000, 0.0000, 0.2610, 0.1090, 0.2430, 0.1606, 0.6200, 0.4000, 0.4625, 0.0890, 0.1410
0.4800, 0.0000, 0.2020, 0.0950, 0.1870, 0.1174, 0.5300, 0.4000, 0.4419, 0.0850, 0.0790
0.5100, 0.0000, 0.2520, 0.1030, 0.1760, 0.1122, 0.3700, 0.5000, 0.4898, 0.0900, 0.2920
0.4700, 1.0000, 0.2250, 0.0820, 0.1310, 0.0668, 0.4100, 0.3000, 0.4754, 0.0890, 0.1780
0.6400, 1.0000, 0.2350, 0.0970, 0.2030, 0.1290, 0.5900, 0.3000, 0.4318, 0.0770, 0.0910
0.5100, 1.0000, 0.2590, 0.0760, 0.2400, 0.1690, 0.3900, 0.6000, 0.5075, 0.0960, 0.1160
0.3000, 0.0000, 0.2090, 0.1040, 0.1520, 0.0838, 0.4700, 0.3000, 0.4663, 0.0970, 0.0860
0.5600, 1.0000, 0.2870, 0.0990, 0.2080, 0.1464, 0.3900, 0.5000, 0.4727, 0.0970, 0.1220
0.4200, 0.0000, 0.2210, 0.0850, 0.2130, 0.1386, 0.6000, 0.4000, 0.4277, 0.0940, 0.0720
0.6200, 1.0000, 0.2670, 0.1150, 0.1830, 0.1240, 0.3500, 0.5000, 0.4788, 0.1000, 0.1290
0.3400, 0.0000, 0.3140, 0.0870, 0.1490, 0.0938, 0.4600, 0.3000, 0.3829, 0.0770, 0.1420
0.6000, 0.0000, 0.2220, 0.1047, 0.2210, 0.1054, 0.6000, 0.3680, 0.5628, 0.0930, 0.0900
0.6400, 0.0000, 0.2100, 0.0923, 0.2270, 0.1468, 0.6500, 0.3490, 0.4331, 0.1020, 0.1580
0.3900, 1.0000, 0.2120, 0.0900, 0.1820, 0.1104, 0.6000, 0.3000, 0.4060, 0.0980, 0.0390
0.7100, 1.0000, 0.2650, 0.1050, 0.2810, 0.1736, 0.5500, 0.5000, 0.5568, 0.0840, 0.1960
0.4800, 1.0000, 0.2920, 0.1100, 0.2180, 0.1516, 0.3900, 0.6000, 0.4920, 0.0980, 0.2220
0.7900, 1.0000, 0.2700, 0.1030, 0.1690, 0.1108, 0.3700, 0.5000, 0.4663, 0.1100, 0.2770
0.4000, 0.0000, 0.3070, 0.0990, 0.1770, 0.0854, 0.5000, 0.4000, 0.5338, 0.0850, 0.0990
0.4900, 1.0000, 0.2880, 0.0920, 0.2070, 0.1400, 0.4400, 0.5000, 0.4745, 0.0920, 0.1960
0.5100, 0.0000, 0.3060, 0.1030, 0.1980, 0.1066, 0.5700, 0.3000, 0.5148, 0.1000, 0.2020
0.5700, 0.0000, 0.3010, 0.1170, 0.2020, 0.1396, 0.4200, 0.5000, 0.4625, 0.1200, 0.1550
0.5900, 1.0000, 0.2470, 0.1140, 0.1520, 0.1048, 0.2900, 0.5000, 0.4511, 0.0880, 0.0770
0.5100, 0.0000, 0.2770, 0.0990, 0.2290, 0.1456, 0.6900, 0.3000, 0.4277, 0.0770, 0.1910
0.7400, 0.0000, 0.2980, 0.1010, 0.1710, 0.1048, 0.5000, 0.3000, 0.4394, 0.0860, 0.0700
0.6700, 0.0000, 0.2670, 0.1050, 0.2250, 0.1354, 0.6900, 0.3000, 0.4635, 0.0960, 0.0730
0.4900, 0.0000, 0.1980, 0.0880, 0.1880, 0.1148, 0.5700, 0.3000, 0.4394, 0.0930, 0.0490
0.5700, 0.0000, 0.2330, 0.0880, 0.1550, 0.0636, 0.7800, 0.2000, 0.4205, 0.0780, 0.0650
0.5600, 1.0000, 0.3510, 0.1230, 0.1640, 0.0950, 0.3800, 0.4000, 0.5043, 0.1170, 0.2630
0.5200, 1.0000, 0.2970, 0.1090, 0.2280, 0.1628, 0.3100, 0.8000, 0.5142, 0.1030, 0.2480
0.6900, 0.0000, 0.2930, 0.1240, 0.2230, 0.1390, 0.5400, 0.4000, 0.5011, 0.1020, 0.2960
0.3700, 0.0000, 0.2030, 0.0830, 0.1850, 0.1246, 0.3800, 0.5000, 0.4719, 0.0880, 0.2140
0.2400, 0.0000, 0.2250, 0.0890, 0.1410, 0.0680, 0.5200, 0.3000, 0.4654, 0.0840, 0.1850
0.5500, 1.0000, 0.2270, 0.0930, 0.1540, 0.0942, 0.5300, 0.3000, 0.3526, 0.0750, 0.0780
0.3600, 0.0000, 0.2280, 0.0870, 0.1780, 0.1160, 0.4100, 0.4000, 0.4654, 0.0820, 0.0930
0.4200, 1.0000, 0.2400, 0.1070, 0.1500, 0.0850, 0.4400, 0.3000, 0.4654, 0.0960, 0.2520
0.2100, 0.0000, 0.2420, 0.0760, 0.1470, 0.0770, 0.5300, 0.3000, 0.4443, 0.0790, 0.1500
0.4100, 0.0000, 0.2020, 0.0620, 0.1530, 0.0890, 0.5000, 0.3000, 0.4249, 0.0890, 0.0770
0.5700, 1.0000, 0.2940, 0.1090, 0.1600, 0.0876, 0.3100, 0.5000, 0.5333, 0.0920, 0.2080
0.2000, 1.0000, 0.2210, 0.0870, 0.1710, 0.0996, 0.5800, 0.3000, 0.4205, 0.0780, 0.0770
0.6700, 1.0000, 0.2360, 0.1113, 0.1890, 0.1054, 0.7000, 0.2700, 0.4220, 0.0930, 0.1080
0.3400, 0.0000, 0.2520, 0.0770, 0.1890, 0.1206, 0.5300, 0.4000, 0.4344, 0.0790, 0.1600
0.4100, 1.0000, 0.2490, 0.0860, 0.1920, 0.1150, 0.6100, 0.3000, 0.4382, 0.0940, 0.0530
0.3800, 1.0000, 0.3300, 0.0780, 0.3010, 0.2150, 0.5000, 0.6020, 0.5193, 0.1080, 0.2200
0.5100, 0.0000, 0.2350, 0.1010, 0.1950, 0.1210, 0.5100, 0.4000, 0.4745, 0.0940, 0.1540
0.5200, 1.0000, 0.2640, 0.0913, 0.2180, 0.1520, 0.3900, 0.5590, 0.4905, 0.0990, 0.2590
0.6700, 0.0000, 0.2980, 0.0800, 0.1720, 0.0934, 0.6300, 0.3000, 0.4357, 0.0820, 0.0900
0.6100, 0.0000, 0.3000, 0.1080, 0.1940, 0.1000, 0.5200, 0.3730, 0.5347, 0.1050, 0.2460
0.6700, 1.0000, 0.2500, 0.1117, 0.1460, 0.0934, 0.3300, 0.4420, 0.4585, 0.1030, 0.1240
0.5600, 0.0000, 0.2700, 0.1050, 0.2470, 0.1606, 0.5400, 0.5000, 0.5088, 0.0940, 0.0670
0.6400, 0.0000, 0.2000, 0.0747, 0.1890, 0.1148, 0.6200, 0.3050, 0.4111, 0.0910, 0.0720
0.5800, 1.0000, 0.2550, 0.1120, 0.1630, 0.1106, 0.2900, 0.6000, 0.4762, 0.0860, 0.2570
0.5500, 0.0000, 0.2820, 0.0910, 0.2500, 0.1402, 0.6700, 0.4000, 0.5366, 0.1030, 0.2620
0.6200, 1.0000, 0.3330, 0.1140, 0.1820, 0.1140, 0.3800, 0.5000, 0.5011, 0.0960, 0.2750
0.5700, 1.0000, 0.2560, 0.0960, 0.2000, 0.1330, 0.5200, 0.3850, 0.4318, 0.1050, 0.1770
0.2000, 1.0000, 0.2420, 0.0880, 0.1260, 0.0722, 0.4500, 0.3000, 0.3784, 0.0740, 0.0710
0.5300, 1.0000, 0.2210, 0.0980, 0.1650, 0.1052, 0.4700, 0.4000, 0.4159, 0.0810, 0.0470
0.3200, 1.0000, 0.3140, 0.0890, 0.1530, 0.0842, 0.5600, 0.3000, 0.4159, 0.0900, 0.1870
0.4100, 0.0000, 0.2310, 0.0860, 0.1480, 0.0780, 0.5800, 0.3000, 0.4094, 0.0600, 0.1250
0.6000, 0.0000, 0.2340, 0.0767, 0.2470, 0.1480, 0.6500, 0.3800, 0.5136, 0.0770, 0.0780
0.2600, 0.0000, 0.1880, 0.0830, 0.1910, 0.1036, 0.6900, 0.3000, 0.4522, 0.0690, 0.0510
0.3700, 0.0000, 0.3080, 0.1120, 0.2820, 0.1972, 0.4300, 0.7000, 0.5342, 0.1010, 0.2580
0.4500, 0.0000, 0.3200, 0.1100, 0.2240, 0.1342, 0.4500, 0.5000, 0.5412, 0.0930, 0.2150
0.6700, 0.0000, 0.3160, 0.1160, 0.1790, 0.0904, 0.4100, 0.4000, 0.5472, 0.1000, 0.3030
0.3400, 1.0000, 0.3550, 0.1200, 0.2330, 0.1466, 0.3400, 0.7000, 0.5568, 0.1010, 0.2430
0.5000, 0.0000, 0.3190, 0.0783, 0.2070, 0.1492, 0.3800, 0.5450, 0.4595, 0.0840, 0.0910
0.7100, 0.0000, 0.2950, 0.0970, 0.2270, 0.1516, 0.4500, 0.5000, 0.5024, 0.1080, 0.1500
0.5700, 1.0000, 0.3160, 0.1170, 0.2250, 0.1076, 0.4000, 0.6000, 0.5958, 0.1130, 0.3100
0.4900, 0.0000, 0.2030, 0.0930, 0.1840, 0.1030, 0.6100, 0.3000, 0.4605, 0.0930, 0.1530
0.3500, 0.0000, 0.4130, 0.0810, 0.1680, 0.1028, 0.3700, 0.5000, 0.4949, 0.0940, 0.3460
0.4100, 1.0000, 0.2120, 0.1020, 0.1840, 0.1004, 0.6400, 0.3000, 0.4585, 0.0790, 0.0630
0.7000, 1.0000, 0.2410, 0.0823, 0.1940, 0.1492, 0.3100, 0.6260, 0.4234, 0.1050, 0.0890
0.5200, 0.0000, 0.2300, 0.1070, 0.1790, 0.1237, 0.4250, 0.4210, 0.4159, 0.0930, 0.0500
0.6000, 0.0000, 0.2560, 0.0780, 0.1950, 0.0954, 0.9100, 0.2000, 0.3761, 0.0870, 0.0390
0.6200, 0.0000, 0.2250, 0.1250, 0.2150, 0.0990, 0.9800, 0.2000, 0.4500, 0.0950, 0.1030
0.4400, 1.0000, 0.3820, 0.1230, 0.2010, 0.1266, 0.4400, 0.5000, 0.5024, 0.0920, 0.3080
0.2800, 1.0000, 0.1920, 0.0810, 0.1550, 0.0946, 0.5100, 0.3000, 0.3850, 0.0870, 0.1160
0.5800, 1.0000, 0.2900, 0.0850, 0.1560, 0.1092, 0.3600, 0.4000, 0.3989, 0.0860, 0.1450
0.3900, 1.0000, 0.2400, 0.0897, 0.1900, 0.1136, 0.5200, 0.3650, 0.4804, 0.1010, 0.0740
0.3400, 1.0000, 0.2060, 0.0980, 0.1830, 0.0920, 0.8300, 0.2000, 0.3689, 0.0920, 0.0450
0.6500, 0.0000, 0.2630, 0.0700, 0.2440, 0.1662, 0.5100, 0.5000, 0.4898, 0.0980, 0.1150
0.6600, 1.0000, 0.3460, 0.1150, 0.2040, 0.1394, 0.3600, 0.6000, 0.4963, 0.1090, 0.2640
0.5100, 0.0000, 0.2340, 0.0870, 0.2200, 0.1088, 0.9300, 0.2000, 0.4511, 0.0820, 0.0870
0.5000, 1.0000, 0.2920, 0.1190, 0.1620, 0.0852, 0.5400, 0.3000, 0.4736, 0.0950, 0.2020
0.5900, 1.0000, 0.2720, 0.1070, 0.1580, 0.1020, 0.3900, 0.4000, 0.4443, 0.0930, 0.1270
0.5200, 0.0000, 0.2700, 0.0783, 0.1340, 0.0730, 0.4400, 0.3050, 0.4443, 0.0690, 0.1820
0.6900, 1.0000, 0.2450, 0.1080, 0.2430, 0.1364, 0.4000, 0.6000, 0.5808, 0.1000, 0.2410
0.5300, 0.0000, 0.2410, 0.1050, 0.1840, 0.1134, 0.4600, 0.4000, 0.4812, 0.0950, 0.0660
0.4700, 1.0000, 0.2530, 0.0980, 0.1730, 0.1056, 0.4400, 0.4000, 0.4762, 0.1080, 0.0940
0.5200, 0.0000, 0.2880, 0.1130, 0.2800, 0.1740, 0.6700, 0.4000, 0.5273, 0.0860, 0.2830
0.3900, 0.0000, 0.2090, 0.0950, 0.1500, 0.0656, 0.6800, 0.2000, 0.4407, 0.0950, 0.0640
0.6700, 1.0000, 0.2300, 0.0700, 0.1840, 0.1280, 0.3500, 0.5000, 0.4654, 0.0990, 0.1020
0.5900, 1.0000, 0.2410, 0.0960, 0.1700, 0.0986, 0.5400, 0.3000, 0.4466, 0.0850, 0.2000
0.5100, 1.0000, 0.2810, 0.1060, 0.2020, 0.1222, 0.5500, 0.4000, 0.4820, 0.0870, 0.2650
0.2300, 1.0000, 0.1800, 0.0780, 0.1710, 0.0960, 0.4800, 0.4000, 0.4905, 0.0920, 0.0940
0.6800, 0.0000, 0.2590, 0.0930, 0.2530, 0.1812, 0.5300, 0.5000, 0.4543, 0.0980, 0.2300
0.4400, 0.0000, 0.2150, 0.0850, 0.1570, 0.0922, 0.5500, 0.3000, 0.3892, 0.0840, 0.1810
0.6000, 1.0000, 0.2430, 0.1030, 0.1410, 0.0866, 0.3300, 0.4000, 0.4673, 0.0780, 0.1560
0.5200, 0.0000, 0.2450, 0.0900, 0.1980, 0.1290, 0.2900, 0.7000, 0.5298, 0.0860, 0.2330
0.3800, 0.0000, 0.2130, 0.0720, 0.1650, 0.0602, 0.8800, 0.2000, 0.4431, 0.0900, 0.0600
0.6100, 0.0000, 0.2580, 0.0900, 0.2800, 0.1954, 0.5500, 0.5000, 0.4997, 0.0900, 0.2190
0.6800, 1.0000, 0.2480, 0.1010, 0.2210, 0.1514, 0.6000, 0.4000, 0.3871, 0.0870, 0.0800
0.2800, 1.0000, 0.3150, 0.0830, 0.2280, 0.1494, 0.3800, 0.6000, 0.5313, 0.0830, 0.0680
0.6500, 1.0000, 0.3350, 0.1020, 0.1900, 0.1262, 0.3500, 0.5000, 0.4970, 0.1020, 0.3320
0.6900, 0.0000, 0.2810, 0.1130, 0.2340, 0.1428, 0.5200, 0.4000, 0.5278, 0.0770, 0.2480
0.5100, 0.0000, 0.2430, 0.0853, 0.1530, 0.0716, 0.7100, 0.2150, 0.3951, 0.0820, 0.0840
0.2900, 0.0000, 0.3500, 0.0983, 0.2040, 0.1426, 0.5000, 0.4080, 0.4043, 0.0910, 0.2000
0.5500, 1.0000, 0.2350, 0.0930, 0.1770, 0.1268, 0.4100, 0.4000, 0.3829, 0.0830, 0.0550
0.3400, 1.0000, 0.3000, 0.0830, 0.1850, 0.1072, 0.5300, 0.3000, 0.4820, 0.0920, 0.0850
0.6700, 0.0000, 0.2070, 0.0830, 0.1700, 0.0998, 0.5900, 0.3000, 0.4025, 0.0770, 0.0890
0.4900, 0.0000, 0.2560, 0.0760, 0.1610, 0.0998, 0.5100, 0.3000, 0.3932, 0.0780, 0.0310
0.5500, 1.0000, 0.2290, 0.0810, 0.1230, 0.0672, 0.4100, 0.3000, 0.4304, 0.0880, 0.1290
0.5900, 1.0000, 0.2510, 0.0900, 0.1630, 0.1014, 0.4600, 0.4000, 0.4357, 0.0910, 0.0830
0.5300, 0.0000, 0.3320, 0.0827, 0.1860, 0.1068, 0.4600, 0.4040, 0.5112, 0.1020, 0.2750
0.4800, 1.0000, 0.2410, 0.1100, 0.2090, 0.1346, 0.5800, 0.4000, 0.4407, 0.1000, 0.0650
0.5200, 0.0000, 0.2950, 0.1043, 0.2110, 0.1328, 0.4900, 0.4310, 0.4984, 0.0980, 0.1980
0.6900, 0.0000, 0.2960, 0.1220, 0.2310, 0.1284, 0.5600, 0.4000, 0.5451, 0.0860, 0.2360
0.6000, 1.0000, 0.2280, 0.1100, 0.2450, 0.1898, 0.3900, 0.6000, 0.4394, 0.0880, 0.2530
0.4600, 1.0000, 0.2270, 0.0830, 0.1830, 0.1258, 0.3200, 0.6000, 0.4836, 0.0750, 0.1240
0.5100, 1.0000, 0.2620, 0.1010, 0.1610, 0.0996, 0.4800, 0.3000, 0.4205, 0.0880, 0.0440
0.6700, 1.0000, 0.2350, 0.0960, 0.2070, 0.1382, 0.4200, 0.5000, 0.4898, 0.1110, 0.1720
0.4900, 0.0000, 0.2210, 0.0850, 0.1360, 0.0634, 0.6200, 0.2190, 0.3970, 0.0720, 0.1140
0.4600, 1.0000, 0.2650, 0.0940, 0.2470, 0.1602, 0.5900, 0.4000, 0.4935, 0.1110, 0.1420
0.4700, 0.0000, 0.3240, 0.1050, 0.1880, 0.1250, 0.4600, 0.4090, 0.4443, 0.0990, 0.1090
0.7500, 0.0000, 0.3010, 0.0780, 0.2220, 0.1542, 0.4400, 0.5050, 0.4779, 0.0970, 0.1800
0.2800, 0.0000, 0.2420, 0.0930, 0.1740, 0.1064, 0.5400, 0.3000, 0.4220, 0.0840, 0.1440
0.6500, 1.0000, 0.3130, 0.1100, 0.2130, 0.1280, 0.4700, 0.5000, 0.5247, 0.0910, 0.1630
0.4200, 0.0000, 0.3010, 0.0910, 0.1820, 0.1148, 0.4900, 0.4000, 0.4511, 0.0820, 0.1470
0.5100, 0.0000, 0.2450, 0.0790, 0.2120, 0.1286, 0.6500, 0.3000, 0.4522, 0.0910, 0.0970
0.5300, 1.0000, 0.2770, 0.0950, 0.1900, 0.1018, 0.4100, 0.5000, 0.5464, 0.1010, 0.2200
0.5400, 0.0000, 0.2320, 0.1107, 0.2380, 0.1628, 0.4800, 0.4960, 0.4913, 0.1080, 0.1900
0.7300, 0.0000, 0.2700, 0.1020, 0.2110, 0.1210, 0.6700, 0.3000, 0.4745, 0.0990, 0.1090
0.5400, 0.0000, 0.2680, 0.1080, 0.1760, 0.0806, 0.6700, 0.3000, 0.4956, 0.1060, 0.1910
0.4200, 0.0000, 0.2920, 0.0930, 0.2490, 0.1742, 0.4500, 0.6000, 0.5004, 0.0920, 0.1220
0.7500, 0.0000, 0.3120, 0.1177, 0.2290, 0.1388, 0.2900, 0.7900, 0.5724, 0.1060, 0.2300
0.5500, 1.0000, 0.3210, 0.1127, 0.2070, 0.0924, 0.2500, 0.8280, 0.6105, 0.1110, 0.2420
0.6800, 1.0000, 0.2570, 0.1090, 0.2330, 0.1126, 0.3500, 0.7000, 0.6057, 0.1050, 0.2480
0.5700, 0.0000, 0.2690, 0.0980, 0.2460, 0.1652, 0.3800, 0.7000, 0.5366, 0.0960, 0.2490
0.4800, 0.0000, 0.3140, 0.0753, 0.2420, 0.1516, 0.3800, 0.6370, 0.5568, 0.1030, 0.1920
0.6100, 1.0000, 0.2560, 0.0850, 0.1840, 0.1162, 0.3900, 0.5000, 0.4970, 0.0980, 0.1310
0.6900, 0.0000, 0.3700, 0.1030, 0.2070, 0.1314, 0.5500, 0.4000, 0.4635, 0.0900, 0.2370
0.3800, 0.0000, 0.3260, 0.0770, 0.1680, 0.1006, 0.4700, 0.4000, 0.4625, 0.0960, 0.0780
0.4500, 1.0000, 0.2120, 0.0940, 0.1690, 0.0968, 0.5500, 0.3000, 0.4454, 0.1020, 0.1350
0.5100, 1.0000, 0.2920, 0.1070, 0.1870, 0.1390, 0.3200, 0.6000, 0.4382, 0.0950, 0.2440
0.7100, 1.0000, 0.2400, 0.0840, 0.1380, 0.0858, 0.3900, 0.4000, 0.4190, 0.0900, 0.1990
0.5700, 0.0000, 0.3610, 0.1170, 0.1810, 0.1082, 0.3400, 0.5000, 0.5268, 0.1000, 0.2700
0.5600, 1.0000, 0.2580, 0.1030, 0.1770, 0.1144, 0.3400, 0.5000, 0.4963, 0.0990, 0.1640
0.3200, 1.0000, 0.2200, 0.0880, 0.1370, 0.0786, 0.4800, 0.3000, 0.3951, 0.0780, 0.0720
0.5000, 0.0000, 0.2190, 0.0910, 0.1900, 0.1112, 0.6700, 0.3000, 0.4078, 0.0770, 0.0960
0.4300, 0.0000, 0.3430, 0.0840, 0.2560, 0.1726, 0.3300, 0.8000, 0.5529, 0.1040, 0.3060
0.5400, 1.0000, 0.2520, 0.1150, 0.1810, 0.1200, 0.3900, 0.5000, 0.4701, 0.0920, 0.0910
0.3100, 0.0000, 0.2330, 0.0850, 0.1900, 0.1308, 0.4300, 0.4000, 0.4394, 0.0770, 0.2140
0.5600, 0.0000, 0.2570, 0.0800, 0.2440, 0.1516, 0.5900, 0.4000, 0.5118, 0.0950, 0.0950
0.4400, 0.0000, 0.2510, 0.1330, 0.1820, 0.1130, 0.5500, 0.3000, 0.4249, 0.0840, 0.2160
0.5700, 1.0000, 0.3190, 0.1110, 0.1730, 0.1162, 0.4100, 0.4000, 0.4369, 0.0870, 0.2630

Test data:


# diabetes_norm_test_100.txt
#
0.6400, 1.0000, 0.2840, 0.1110, 0.1840, 0.1270, 0.4100, 0.4000, 0.4382, 0.0970, 0.1780
0.4300, 0.0000, 0.2810, 0.1210, 0.1920, 0.1210, 0.6000, 0.3000, 0.4007, 0.0930, 0.1130
0.1900, 0.0000, 0.2530, 0.0830, 0.2250, 0.1566, 0.4600, 0.5000, 0.4719, 0.0840, 0.2000
0.7100, 1.0000, 0.2610, 0.0850, 0.2200, 0.1524, 0.4700, 0.5000, 0.4635, 0.0910, 0.1390
0.5000, 1.0000, 0.2800, 0.1040, 0.2820, 0.1968, 0.4400, 0.6000, 0.5328, 0.0950, 0.1390
0.5900, 1.0000, 0.2360, 0.0730, 0.1800, 0.1074, 0.5100, 0.4000, 0.4682, 0.0840, 0.0880
0.5700, 0.0000, 0.2450, 0.0930, 0.1860, 0.0966, 0.7100, 0.3000, 0.4522, 0.0910, 0.1480
0.4900, 1.0000, 0.2100, 0.0820, 0.1190, 0.0854, 0.2300, 0.5000, 0.3970, 0.0740, 0.0880
0.4100, 1.0000, 0.3200, 0.1260, 0.1980, 0.1042, 0.4900, 0.4000, 0.5412, 0.1240, 0.2430
0.2500, 1.0000, 0.2260, 0.0850, 0.1300, 0.0710, 0.4800, 0.3000, 0.4007, 0.0810, 0.0710
0.5200, 1.0000, 0.1970, 0.0810, 0.1520, 0.0534, 0.8200, 0.2000, 0.4419, 0.0820, 0.0770
0.3400, 0.0000, 0.2120, 0.0840, 0.2540, 0.1134, 0.5200, 0.5000, 0.6094, 0.0920, 0.1090
0.4200, 1.0000, 0.3060, 0.1010, 0.2690, 0.1722, 0.5000, 0.5000, 0.5455, 0.1060, 0.2720
0.2800, 1.0000, 0.2550, 0.0990, 0.1620, 0.1016, 0.4600, 0.4000, 0.4277, 0.0940, 0.0600
0.4700, 1.0000, 0.2330, 0.0900, 0.1950, 0.1258, 0.5400, 0.4000, 0.4331, 0.0730, 0.0540
0.3200, 1.0000, 0.3100, 0.1000, 0.1770, 0.0962, 0.4500, 0.4000, 0.5187, 0.0770, 0.2210
0.4300, 0.0000, 0.1850, 0.0870, 0.1630, 0.0936, 0.6100, 0.2670, 0.3738, 0.0800, 0.0900
0.5900, 1.0000, 0.2690, 0.1040, 0.1940, 0.1266, 0.4300, 0.5000, 0.4804, 0.1060, 0.3110
0.5300, 0.0000, 0.2830, 0.1010, 0.1790, 0.1070, 0.4800, 0.4000, 0.4788, 0.1010, 0.2810
0.6000, 0.0000, 0.2570, 0.1030, 0.1580, 0.0846, 0.6400, 0.2000, 0.3850, 0.0970, 0.1820
0.5400, 1.0000, 0.3610, 0.1150, 0.1630, 0.0984, 0.4300, 0.4000, 0.4682, 0.1010, 0.3210
0.3500, 1.0000, 0.2410, 0.0947, 0.1550, 0.0974, 0.3200, 0.4840, 0.4852, 0.0940, 0.0580
0.4900, 1.0000, 0.2580, 0.0890, 0.1820, 0.1186, 0.3900, 0.5000, 0.4804, 0.1150, 0.2620
0.5800, 0.0000, 0.2280, 0.0910, 0.1960, 0.1188, 0.4800, 0.4000, 0.4984, 0.1150, 0.2060
0.3600, 1.0000, 0.3910, 0.0900, 0.2190, 0.1358, 0.3800, 0.6000, 0.5421, 0.1030, 0.2330
0.4600, 1.0000, 0.4220, 0.0990, 0.2110, 0.1370, 0.4400, 0.5000, 0.5011, 0.0990, 0.2420
0.4400, 1.0000, 0.2660, 0.0990, 0.2050, 0.1090, 0.4300, 0.5000, 0.5580, 0.1110, 0.1230
0.4600, 0.0000, 0.2990, 0.0830, 0.1710, 0.1130, 0.3800, 0.4500, 0.4585, 0.0980, 0.1670
0.5400, 0.0000, 0.2100, 0.0780, 0.1880, 0.1074, 0.7000, 0.3000, 0.3970, 0.0730, 0.0630
0.6300, 1.0000, 0.2550, 0.1090, 0.2260, 0.1032, 0.4600, 0.5000, 0.5951, 0.0870, 0.1970
0.4100, 1.0000, 0.2420, 0.0900, 0.1990, 0.1236, 0.5700, 0.4000, 0.4522, 0.0860, 0.0710
0.2800, 0.0000, 0.2540, 0.0930, 0.1410, 0.0790, 0.4900, 0.3000, 0.4174, 0.0910, 0.1680
0.1900, 0.0000, 0.2320, 0.0750, 0.1430, 0.0704, 0.5200, 0.3000, 0.4635, 0.0720, 0.1400
0.6100, 1.0000, 0.2610, 0.1260, 0.2150, 0.1298, 0.5700, 0.4000, 0.4949, 0.0960, 0.2170
0.4800, 0.0000, 0.3270, 0.0930, 0.2760, 0.1986, 0.4300, 0.6420, 0.5148, 0.0910, 0.1210
0.5400, 1.0000, 0.2730, 0.1000, 0.2000, 0.1440, 0.3300, 0.6000, 0.4745, 0.0760, 0.2350
0.5300, 1.0000, 0.2660, 0.0930, 0.1850, 0.1224, 0.3600, 0.5000, 0.4890, 0.0820, 0.2450
0.4800, 0.0000, 0.2280, 0.1010, 0.1100, 0.0416, 0.5600, 0.2000, 0.4127, 0.0970, 0.0400
0.5300, 0.0000, 0.2880, 0.1117, 0.1450, 0.0872, 0.4600, 0.3150, 0.4078, 0.0850, 0.0520
0.2900, 1.0000, 0.1810, 0.0730, 0.1580, 0.0990, 0.4100, 0.4000, 0.4500, 0.0780, 0.1040
0.6200, 0.0000, 0.3200, 0.0880, 0.1720, 0.0690, 0.3800, 0.4000, 0.5784, 0.1000, 0.1320
0.5000, 1.0000, 0.2370, 0.0920, 0.1660, 0.0970, 0.5200, 0.3000, 0.4443, 0.0930, 0.0880
0.5800, 1.0000, 0.2360, 0.0960, 0.2570, 0.1710, 0.5900, 0.4000, 0.4905, 0.0820, 0.0690
0.5500, 1.0000, 0.2460, 0.1090, 0.1430, 0.0764, 0.5100, 0.3000, 0.4357, 0.0880, 0.2190
0.5400, 0.0000, 0.2260, 0.0900, 0.1830, 0.1042, 0.6400, 0.3000, 0.4304, 0.0920, 0.0720
0.3600, 0.0000, 0.2780, 0.0730, 0.1530, 0.1044, 0.4200, 0.4000, 0.3497, 0.0730, 0.2010
0.6300, 1.0000, 0.2410, 0.1110, 0.1840, 0.1122, 0.4400, 0.4000, 0.4935, 0.0820, 0.1100
0.4700, 1.0000, 0.2650, 0.0700, 0.1810, 0.1048, 0.6300, 0.3000, 0.4190, 0.0700, 0.0510
0.5100, 1.0000, 0.3280, 0.1120, 0.2020, 0.1006, 0.3700, 0.5000, 0.5775, 0.1090, 0.2770
0.4200, 0.0000, 0.1990, 0.0760, 0.1460, 0.0832, 0.5500, 0.3000, 0.3664, 0.0790, 0.0630
0.3700, 1.0000, 0.2360, 0.0940, 0.2050, 0.1388, 0.5300, 0.4000, 0.4190, 0.1070, 0.1180
0.2800, 0.0000, 0.2210, 0.0820, 0.1680, 0.1006, 0.5400, 0.3000, 0.4205, 0.0860, 0.0690
0.5800, 0.0000, 0.2810, 0.1110, 0.1980, 0.0806, 0.3100, 0.6000, 0.6068, 0.0930, 0.2730
0.3200, 0.0000, 0.2650, 0.0860, 0.1840, 0.1016, 0.5300, 0.4000, 0.4990, 0.0780, 0.2580
0.2500, 1.0000, 0.2350, 0.0880, 0.1430, 0.0808, 0.5500, 0.3000, 0.3584, 0.0830, 0.0430
0.6300, 0.0000, 0.2600, 0.0857, 0.1550, 0.0782, 0.4600, 0.3370, 0.5037, 0.0970, 0.1980
0.5200, 0.0000, 0.2780, 0.0850, 0.2190, 0.1360, 0.4900, 0.4000, 0.5136, 0.0750, 0.2420
0.6500, 1.0000, 0.2850, 0.1090, 0.2010, 0.1230, 0.4600, 0.4000, 0.5075, 0.0960, 0.2320
0.4200, 0.0000, 0.3060, 0.1210, 0.1760, 0.0928, 0.6900, 0.3000, 0.4263, 0.0890, 0.1750
0.5300, 0.0000, 0.2220, 0.0780, 0.1640, 0.0810, 0.7000, 0.2000, 0.4174, 0.1010, 0.0930
0.7900, 1.0000, 0.2330, 0.0880, 0.1860, 0.1284, 0.3300, 0.6000, 0.4812, 0.1020, 0.1680
0.4300, 0.0000, 0.3540, 0.0930, 0.1850, 0.1002, 0.4400, 0.4000, 0.5318, 0.1010, 0.2750
0.4400, 0.0000, 0.3140, 0.1150, 0.1650, 0.0976, 0.5200, 0.3000, 0.4344, 0.0890, 0.2930
0.6200, 1.0000, 0.3780, 0.1190, 0.1130, 0.0510, 0.3100, 0.4000, 0.5043, 0.0840, 0.2810
0.3300, 0.0000, 0.1890, 0.0700, 0.1620, 0.0918, 0.5900, 0.3000, 0.4025, 0.0580, 0.0720
0.5600, 0.0000, 0.3500, 0.0793, 0.1950, 0.1408, 0.4200, 0.4640, 0.4111, 0.0960, 0.1400
0.6600, 0.0000, 0.2170, 0.1260, 0.2120, 0.1278, 0.4500, 0.4710, 0.5278, 0.1010, 0.1890
0.3400, 1.0000, 0.2530, 0.1110, 0.2300, 0.1620, 0.3900, 0.6000, 0.4977, 0.0900, 0.1810
0.4600, 1.0000, 0.2380, 0.0970, 0.2240, 0.1392, 0.4200, 0.5000, 0.5366, 0.0810, 0.2090
0.5000, 0.0000, 0.3180, 0.0820, 0.1360, 0.0692, 0.5500, 0.2000, 0.4078, 0.0850, 0.1360
0.6900, 0.0000, 0.3430, 0.1130, 0.2000, 0.1238, 0.5400, 0.4000, 0.4710, 0.1120, 0.2610
0.3400, 0.0000, 0.2630, 0.0870, 0.1970, 0.1200, 0.6300, 0.3000, 0.4249, 0.0960, 0.1130
0.7100, 1.0000, 0.2700, 0.0933, 0.2690, 0.1902, 0.4100, 0.6560, 0.5242, 0.0930, 0.1310
0.4700, 0.0000, 0.2720, 0.0800, 0.2080, 0.1456, 0.3800, 0.6000, 0.4804, 0.0920, 0.1740
0.4100, 0.0000, 0.3380, 0.1233, 0.1870, 0.1270, 0.4500, 0.4160, 0.4318, 0.1000, 0.2570
0.3400, 0.0000, 0.3300, 0.0730, 0.1780, 0.1146, 0.5100, 0.3490, 0.4127, 0.0920, 0.0550
0.5100, 0.0000, 0.2410, 0.0870, 0.2610, 0.1756, 0.6900, 0.4000, 0.4407, 0.0930, 0.0840
0.4300, 0.0000, 0.2130, 0.0790, 0.1410, 0.0788, 0.5300, 0.3000, 0.3829, 0.0900, 0.0420
0.5500, 0.0000, 0.2300, 0.0947, 0.1900, 0.1376, 0.3800, 0.5000, 0.4277, 0.1060, 0.1460
0.5900, 1.0000, 0.2790, 0.1010, 0.2180, 0.1442, 0.3800, 0.6000, 0.5187, 0.0950, 0.2120
0.2700, 1.0000, 0.3360, 0.1100, 0.2460, 0.1566, 0.5700, 0.4000, 0.5088, 0.0890, 0.2330
0.5100, 1.0000, 0.2270, 0.1030, 0.2170, 0.1624, 0.3000, 0.7000, 0.4812, 0.0800, 0.0910
0.4900, 1.0000, 0.2740, 0.0890, 0.1770, 0.1130, 0.3700, 0.5000, 0.4905, 0.0970, 0.1110
0.2700, 0.0000, 0.2260, 0.0710, 0.1160, 0.0434, 0.5600, 0.2000, 0.4419, 0.0790, 0.1520
0.5700, 1.0000, 0.2320, 0.1073, 0.2310, 0.1594, 0.4100, 0.5630, 0.5030, 0.1120, 0.1200
0.3900, 1.0000, 0.2690, 0.0930, 0.1360, 0.0754, 0.4800, 0.3000, 0.4143, 0.0990, 0.0670
0.6200, 1.0000, 0.3460, 0.1200, 0.2150, 0.1292, 0.4300, 0.5000, 0.5366, 0.1230, 0.3100
0.3700, 0.0000, 0.2330, 0.0880, 0.2230, 0.1420, 0.6500, 0.3400, 0.4357, 0.0820, 0.0940
0.4600, 0.0000, 0.2110, 0.0800, 0.2050, 0.1444, 0.4200, 0.5000, 0.4533, 0.0870, 0.1830
0.6800, 1.0000, 0.2350, 0.1010, 0.1620, 0.0854, 0.5900, 0.3000, 0.4477, 0.0910, 0.0660
0.5100, 0.0000, 0.3150, 0.0930, 0.2310, 0.1440, 0.4900, 0.4700, 0.5252, 0.1170, 0.1730
0.4100, 0.0000, 0.2080, 0.0860, 0.2230, 0.1282, 0.8300, 0.3000, 0.4078, 0.0890, 0.0720
0.5300, 0.0000, 0.2650, 0.0970, 0.1930, 0.1224, 0.5800, 0.3000, 0.4143, 0.0990, 0.0490
0.4500, 0.0000, 0.2420, 0.0830, 0.1770, 0.1184, 0.4500, 0.4000, 0.4220, 0.0820, 0.0640
0.3300, 0.0000, 0.1950, 0.0800, 0.1710, 0.0854, 0.7500, 0.2000, 0.3970, 0.0800, 0.0480
0.6000, 1.0000, 0.2820, 0.1120, 0.1850, 0.1138, 0.4200, 0.4000, 0.4984, 0.0930, 0.1780
0.4700, 1.0000, 0.2490, 0.0750, 0.2250, 0.1660, 0.4200, 0.5000, 0.4443, 0.1020, 0.1040
0.6000, 1.0000, 0.2490, 0.0997, 0.1620, 0.1066, 0.4300, 0.3770, 0.4127, 0.0950, 0.1320
0.3600, 0.0000, 0.3000, 0.0950, 0.2010, 0.1252, 0.4200, 0.4790, 0.5130, 0.0850, 0.2200
0.3600, 0.0000, 0.1960, 0.0710, 0.2500, 0.1332, 0.9700, 0.3000, 0.4595, 0.0920, 0.0570

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