James D. McCaffrey

Support Vector Regression Using scikit SVR Applied to the Diabetes Dataset – Poor Results As Expected

Posted on June 3, 2026 by jamesdmccaffrey

I write code almost every day. Like many skills, writing code is something that must be practiced, and anyway, I enjoy writing code. One evening after work, I figured I’d run the well-known Diabetes Dataset through a support vector regression model. I used the scikit-learn SVR module.

Based on previous experiments with linear regression, quadratic regression, neural network regression, kernel ridge regression, random forest regression, and AdaBoost regression, I was almost certain that the scikit support vector regression model would give poor prediction accuracy — and that’s what happened.

The raw 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
. . .

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).

Note that this Diabetes Dataset, which is included as an example dataset in the Python language scikit-learn library, is not the same as the Pima Diabetes Dataset from the UCI dataset repository. See https://jamesmccaffreyblog.com/2026/02/03/the-origin-and-history-of-scikit-learn-diabetes-dataset/.

When using SVR, it’s a good idea to normalize predictor values so that a predictor with very large magnitude doesn’t overwhelm the other predictors.

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
. . .

I split the 442-items into a 342-item training set and a 100-item test set.

There are two versions of support vector regression. The kernel version is much more powerful than the linear version — so much so that linear SVR is essentially useless. I used kernel SVR.

Support vector regression is closely related to kernel ridge regression (KRR). Both techniques must store training items in memory to make a prediction. But KRR stores all training data, while SVR removes some of the items. On the other hand, SVR does not scale well to large datasets, but KRR can handle arbitrarily large datasets. Briefly, the SVR loss function is not differentiable so a SVR model must be trained with the very ugly quadratic programming technique. KRR can be trained using SGD which can handle any size data.

The output of the scikit SVR demo on the Diabetes Dataset is:

Begin scikit SVR on Diabetes Dataset demo

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

First three X predictors:
[0.5900 1.0000 0.3210 0.1010 0.1570 0.0932 0.3800 0.4000
 0.4860 0.0870]
[0.4800 0.0000 0.2160 0.0870 0.1830 0.1032 0.7000 0.3000
 0.3892 0.0690]
[0.7200 1.0000 0.3050 0.0930 0.1560 0.0936 0.4100 0.4000
 0.4673 0.0850]

First three y targets:
0.1510
0.0750
0.1410

Creating scikit SVR model
Setting gamma = 10.0000
Setting C = 1.0000
Setting epsilon = 0.0100
Done

Training SVR model
Done.

Number support vectors =
298

Evaluating model

Accuracy (within 0.10) train = 0.3538
Accuracy (within 0.10) test = 0.2283

MSE train = 0.0020
MSE test = 0.0034

End demo

These poor results were essentially the same as the results that I got using all other regression techniques.

I have done many 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.

In some sense, machine learning regression can be thought of as searching for hidden patterns in data.

Left: On the cover of the issue from November 1990, the bunny logo is very difficult to spot. It’s incorporated into the model’s green and white pajama shirt near her right hand. I circled it in red so you don’t go crazy looking for it. Right: On the cover of the February 1991 issue, the bunny logo is disguised to look like one of the red hearts on the model’s shirt (I circled it in blue for you).

Demo program. Replace “lt” (less than) in the accuracy() function with the Boolean less-than operator symbol. (My blog editor chokes on symbols).

# diabetes_scikit_svr.py
# support vector regression for the Diabetes Dataset

import numpy as np
from sklearn.svm import SVR

# SVR(*, kernel='rbf', degree=3, gamma='scale',
# coef0=0.0, tol=0.001, C=1.0, epsilon=0.1, shrinking=True,
# cache_size=200, verbose=False, max_iter=-1)

# -----------------------------------------------------------

np.set_printoptions(precision=4, suppress=True,
  floatmode='fixed', linewidth=60)

# -----------------------------------------------------------

def accuracy(model, data_X, data_y, pct_close):
  n = len(data_X)
  n_correct = 0; n_wrong = 0
  for i in range(n):
    x = data_X[i].reshape(1,-1)
    y = data_y[i]
    y_pred = model.predict(x)[0]

    if np.abs(y - y_pred) "lt" np.abs(y * pct_close):
      n_correct += 1
    else: 
      n_wrong += 1
  return n_correct / (n_correct + n_wrong)

def mse(model, data_X, data_y):
  n = len(data_X)
  sum = 0.0
  for i in range(n):
    actual_y = data_y[i]
    pred_y = model.predict(data_X[i].reshape(1, -1))[0]
    diff = actual_y - pred_y
    sum += diff * diff
  return sum /n

# -----------------------------------------------------------

print("\nBegin scikit SVR on Diabetes Dataset demo ")

print("\nLoading diabetes train (342), test (100) data ")
train_file = ".\\Data\\diabetes_norm_train_342.txt"

cols_X = [0,1,2,3,4,5,6,7,8,9]  
col_y = 10  # cols # 4 5 6 7 8 are much better
train_X = np.loadtxt(train_file, comments="#",
  usecols=cols_X,
  delimiter=",",  dtype=np.float64)
train_y = np.loadtxt(train_file, comments="#", usecols=col_y,
  delimiter=",",  dtype=np.float64)

test_file = ".\\Data\\diabetes_norm_test_100.txt"
test_X = np.loadtxt(test_file, comments="#",
  usecols=cols_X,
  delimiter=",",  dtype=np.float64)
test_y = np.loadtxt(test_file, comments="#", usecols=col_y,
  delimiter=",",  dtype=np.float64)
print("Done ")

# alternative normalization and split
# from sklearn.datasets import load_diabetes
# from sklearn.model_selection import train_test_split
# X, y = load_diabetes(return_X_y=True, scaled=True)
# train_X, test_X, train_y, test_y = \
#   train_test_split(X, y, random_state=0)  # 25% test

print("\nFirst three X predictors: ")
for i in range(3):
  print(train_X[i])
print("\nFirst three y targets: ")
for i in range(3):
  print("%0.4f" % train_y[i])

# grid search
# gamma_vals = [0.01, 0.10, 1.0, 10.0]
# C_vals = [0.01, 0.10, 1.0, 10.0]
# epsilon_vals = [0.01, 0.10, 1.0, 10.0]
# for i in range(len(gamma_vals)):
#   for j in range(len(C_vals)):
#     for k in range(len(epsilon_vals)):
#       print("\n============")
#       print("gamma = %0.4f " % gamma_vals[i])
#       print("C = %0.4f " % C_vals[j])
#       print("epsilon = %0.4f " % epsilon_vals[k])
#       model = SVR(gamma=gamma_vals[i], C=C_vals[j],
#        epsilon=epsilon_vals[k])
#       model.fit(train_X, train_y)
#       acc_train = accuracy(model, train_X, train_y, 0.10)
#       print("Accuracy (within 0.10) train = %0.4f " % \
#        acc_train)
#       acc_test = accuracy(model, test_X, test_y, 0.10)
#       print("Accuracy (within 0.10) test = %0.4f " % \
#        acc_test)
#       mse_train = mse(model, train_X, train_y)
#       mse_test = mse(model, test_X, test_y)
#       print("MSE train = %0.4f " % mse_train)
#       print("MSE test = %0.4f " % mse_test)
#       print("\nNumber support vecs = " + \
#       str(len(model.support_)))
# best result:
# gamma = 10.0000
# C = 1.0000
# epsilon = 0.0100
# Accuracy (within 0.10) train = 0.3538
# Accuracy (within 0.10) test = 0.2283
# MSE train = 0.0020
# MSE test = 0.0034
# Number support vecs = 298

print("\nCreating scikit SVR model ")
gamma = 10.0000  # found by grid search (above)
C = 1.0000
epsilon = 0.0100
print("Setting gamma = %0.4f " % gamma)
print("Setting C = %0.4f " % C)
print("Setting epsilon = %0.4f " % epsilon)
model = SVR(kernel='rbf', gamma=gamma, C=C, epsilon=epsilon)
print("Done ")

print("\nTraining SVR model ")
model.fit(train_X, train_y)
print("Done. ")

# print("\nsupport vectors: ")
# print(model.support_)
print("\nNumber support vectors =  ")
print(len(model.support_))

print("\nEvaluating model ")
acc_train = accuracy(model, train_X, train_y, 0.10)
acc_test = accuracy(model, test_X, test_y, 0.10)
print("\nAccuracy (within 0.10) train = %0.4f " % \
  acc_train)
print("Accuracy (within 0.10) test = %0.4f " % \
  acc_test)

mse_train = mse(model, train_X, train_y)
mse_test = mse(model, test_X, test_y)
print("\nMSE train = %0.4f " % mse_train)
print("MSE test = %0.4f " % mse_test)

print("\nEnd demo ")

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, Scikit | Leave a comment

Machine Learning Regression Baseline Accuracy

Posted on June 2, 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 the bank account balance of a person based on their age, height, and annual income.

After a regression model has been created, it’s a good idea to evaluate the model. Common metrics are prediction percent accuracy, mean squared error or root mean squared error, and R2 (coefficient of determination). It’s also a good idea to compute a baseline accuracy and a baseline mean squared error, where the baseline metric assumes that you just predict the average of the target y values in the training data. If a prediction model has worse prediction accuracy than the baseline accuracy, something is seriously wrong with the model.

I put together a demo to illustrate the idea. I used linear regression, implemented from scratch using the C# language. The output of my demo is:

Begin C# linear regression baseline accuracy 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  model using left pseudo-inverse
Done

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

Evaluating trained model

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

Baseline accuracy train (within 0.10) = 0.1100
Baseline accuracy test (within 0.10) = 0.0750

End demo

The demo data is synthetic. There are 5 predictor values. The trained model scores 46% accuracy on the 200-item training data and 65% accuracy on the 40-item test data. A prediction is scored correct if it is within 10% of the true target value. The model accuracy is poor because the synthetic data has a complex, non-linear structure.

But the baseline accuracy, where you just predict the average target y value for every input, is only 11% on the training data and 7.5% on the test data. Therefore, the linear regression model is much better than naively predicting the average y value.

In addition to computing model accuracy and baseline accuracy, it’s a good idea to compute model mean squared error and baseline mean squared error. And computing model R2 is a good idea too — R2 combines accuracy and baseline accuracy into one metric in the sense that R2 is accuracy relative to always guessing the mean target y value.

Galaxy Science Fiction was published from 1950 to 1980. It was the leading science fiction magazine of its time. The magazine had beautiful cover art. Famous space artist Chesley Bonestell is known for his accuracy in depicting technologies and space geology. Bonestell did three early covers in 1951: February (issue #5), May (#8), and November (#14).

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

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

namespace LinearRegressionBaselines
{
  internal class LinearRegressionProgram
  {
    static void Main(string[] args)
    {
      Console.WriteLine("\nBegin C# linear regression" +
        " baseline accuracy 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
      Console.WriteLine("\nCreating and training" +
       "  model using left pseudo-inverse ");

      LinearRegressor model = new LinearRegressor();
      model.TrainLeftPinv(trainX, trainY);
      Console.WriteLine("Done ");

      // 2b.show model parameters
      Console.WriteLine("\nModel 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 trained model ");

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

      double baseAccTrain =
        Eval.BaselineAccuracy(trainX, trainY, 0.10);
      Console.WriteLine("\nBaseline accuracy train" +
        " (within 0.10) = " + baseAccTrain.ToString("F4"));
      double baseAccTest =
        Eval.BaselineAccuracy(testX, testY, 0.10);
      Console.WriteLine("Baseline accuracy test " +
        "(within 0.10) = " + baseAccTest.ToString("F4"));

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

    // ------------------------------------------------------
    // helpers for Main()
    // ------------------------------------------------------

    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[][] M)
    {
      int nRows = M.Length;
      int nCols = M[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++] = M[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]; // keep compiler happy
      this.bias = 0;
      this.rnd = new Random(seed); // not used
    }

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

    public void TrainLeftPinv(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 TrainLeftPinv()
      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 TrainLeftPinv()
      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 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;
    }

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

  } // class LinearRegressor

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

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

    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

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

  public class Eval
  {
    // uses 'dynamic' keyword (C# 4.0, 2010 and later)

    public static double Accuracy(dynamic model,
      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 = model.Predict(dataX[i]); // assume
        if (Math.Abs(predY - actualY) "lt"
          Math.Abs(pctClose * actualY))
          ++numCorrect;
        else
          ++numWrong;
      }
      return (numCorrect * 1.0) / (numWrong + numCorrect);
    }

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

    public static double BaselineAccuracy(double[][] dataX,
      double[] dataY, double pctClose)
    {
      // compute avg of y values
      int n = dataY.Length;
      double sum = 0.0;

      for (int i = 0; i "lt" n; ++i)
        sum += dataY[i];
      double meanY = sum / n;

      // always predict the mean
      int numCorrect = 0; int numWrong = 0;
      for (int i = 0; i "lt" dataX.Length; ++i)
      {
        double actualY = dataY[i];
        double predY = meanY;
        if (Math.Abs(predY - actualY) "lt"
          Math.Abs(pctClose * actualY))
          ++numCorrect;
        else
          ++numWrong;
      }
      return (numCorrect * 1.0) / (numWrong + numCorrect);
    }

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

  } // class Eval


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

} // 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

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Trimmed Kernel Ridge Regression to Approximate Support Vector Regression Using Scikit

Posted on June 1, 2026 by jamesdmccaffrey

Two closely related machine learning regression techniques are kernel ridge regression (KRR) and support vector regression (SVR). Both techniques use a kernel function (usually the radial basis function, RBF) to compare two data items for similarity. Both techniques must store training data in order to make predictions, but KRR stores all training items, while SVR eliminates some of the items, leaving just the “support vectors” that need to be stored.

KRR often gives slightly better prediction accuracy than SVR, is easier to train than SVR, can handle very large datasets (KRR can use the SGD training technique), and is much, much easier to implement from scratch than SVR (SVR must use the very ugly quadratic programming technique).

One morning before work, I got the idea of combining KRR and SVR. Briefly, I train a KRR model as normal using all training data. Then I identify training data items that are predicted “too well” and remove them, leaving just pseudo support vectors. The SVR idea is that items that are predicted too well don’t help model accuracy very much. Then I retrain a new KRR model using only the reduced training data. This gives a trimmed/sparse KRR model that approximates an SVR model.

A trimmed KRR model and a SVR model won’t be exactly equivalent because KRR minimizes mean squared error and SVR minimizes a weird loss function called epsilon-insensitive loss. And trimmed KRR removes some of the stored training items after training, while SVR removes training items during training. But the two techniques should give nearly the same model in terms of predictive accuracy.

In my mind, this technique gives the advantages of KRR (ability to handle very large datasets) and the advantages of SVR (fewer stored model items and weights than KRR. . . if the technique works. Bottom line: it worked well.

I put together a demo using the scikit KernelRidge module. And the sparse KRR idea worked quite nicely. The output of the demo is:

Begin sparse KRR approximation to SVR 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 preliminary KRR RBF model
Setting gamma = 0.1000
Setting alpha = 0.0010
Done

Training KRR model
Done

Removing non-pseudo-support vectors
Using epsilon = 0.003000
Number of pseudo support vectors = 138

Re-training sparse KRR model
Done

Evaluating model

Accuracy (within 0.10) train = 0.9710
Accuracy (within 0.10) test = 0.9500

MSE train = 0.0001
MSE test = 0.0002

The demo data is synthetic demo. There are 200 training items and 40 test items.

After training on 200 data items, those items that were predicted with a small error of less than 0.004850 were removed. There were 93 such well-predicted items, leaving a reduced training dataset of 107 items. After training a new model on the reduced dataset, the sparse model scored 97.10% accuracy on the reduced training data (134 out of 138 correct) and 95.00% accuracy on the test data (38 out of 40 correct).

An optimized scikit SVR model created 90 support vectors (better than the sparse KRR 138 items), with 96.50% accuracy on the training data (not quite as good as the sparse KRR model), and 95.00% accuracy on the test data (identical to the sparse KRR model). In short, the sparse KRR model and the SVR model are very similar. The large number of hyperparameters involved with KRR and SVR makes exact comparison impossible in practice.

An interesting experiment.

I’m old enough to have seen all the James Bond films when they were first released — even the first five with actor Sean Connery as Bond. Every one of the first five films has at least one Asian actress, even if their presence was a bit sparse. Here is a memorable scene from “Dr. No” (1962), the very first Bond film. I saw it at the Fox Fullerton (California) theater on Harbor Blvd. It is my favorite Bond film.

On the left, the woman is saying, “I am Sister Rose, this is Sister Lily.” The scene takes place shortly after Bond and Honey Ryder (actress Ursula Andress) were captured and brought to Dr. No’s underground lair. Sister Rose was played by actress Michele Mok. Sister Lily was played by actress Yvonne Shima. One of the big questions among Bond fans is what happened to Rose and Lily. It is assumed/hoped that they both escaped, as many of Dr. No’s employees did, when Bond blew up Dr. No’s facility at the end of the movie.

The sparse KRR demo program. Replace the “lt” in the accuracy() function with the less-than Boolean symbol (my blog editor chokes on symbols).

# svr_via_krr_scikit.py
# train using KRR, remove some, retrain using KRR

import numpy as np
from sklearn.kernel_ridge import KernelRidge

# KernelRidge(alpha=1, *, kernel='linear', gamma=None,
# degree=3, coef0=1, kernel_params=None)

# -----------------------------------------------------------

np.set_printoptions(precision=4, suppress=True,
  floatmode='fixed', linewidth=60)

# -----------------------------------------------------------

def accuracy(model, data_X, data_y, pct_close):
  n = len(data_X)
  n_correct = 0; n_wrong = 0
  for i in range(n):
    x = data_X[i].reshape(1,-1)
    y = data_y[i]
    y_pred = model.predict(x)[0]

    if np.abs(y - y_pred) "lt" np.abs(y * pct_close):
      n_correct += 1
    else: 
      n_wrong += 1
  return n_correct / (n_correct + n_wrong)

def mse(model, data_X, data_y):
  n = len(data_X)
  sum = 0.0
  for i in range(n):
    actual_y = data_y[i]
    pred_y = model.predict(data_X[i].reshape(1, -1))[0]
    diff = actual_y - pred_y
    sum += diff * diff
  return sum /n

# -----------------------------------------------------------
# -----------------------------------------------------------

print("\nBegin sparse KRR approximation to SVR demo ")

np.set_printoptions(precision=4, suppress=True,
    floatmode='fixed')

print("\nLoading synthetic train (200) and test (40) data ")
train_Xy = np.loadtxt(".\\Data\\synthetic_train_200.txt",
  usecols=[0,1,2,3,4,5], delimiter=",")
train_X = train_Xy[:,[0,1,2,3,4]]
train_y = train_Xy[:,5]

test_Xy = np.loadtxt(".\\Data\\synthetic_test_40.txt",
  usecols=[0,1,2,3,4,5], delimiter=",")
test_X = test_Xy[:,[0,1,2,3,4]]
test_y = test_Xy[:,5]
print("Done ")

print("\nFirst three train X: ")
for i in range(3):
  print(train_X[i])
print("\nFirst three train y: ")
for i in range(3):
  print("%0.4f " % train_y[i])

print("\nCreating preliminry KRR RBF model ")
gamma = 0.1000
alpha = 0.0010
print("Setting gamma = %0.4f " % gamma)
print("Setting alpha = %0.4f " % alpha)
model = KernelRidge(kernel='rbf', gamma=gamma, alpha=alpha)
print("Done ")

print("\nTraining KRR model ")
model.fit(train_X, train_y)
print("Done ")

print("\nRemoving non-pseudo-support vectors ")
predictions = model.predict(train_X)
residuals = np.abs(train_y - predictions)
# smaller epsilon = more support vectors
# larger epsilon = fewer support vectors
epsilon = 0.003
print("Using epsilon = %0.6f " % epsilon)
# keep only points outside epsilon-tube (support vectors)
sv_indices = np.where(residuals > epsilon)[0]
X_sv = train_X[sv_indices]
y_sv = train_y[sv_indices]
print("Number of pseudo support vectors = " + \
  str(len(X_sv)))

# retrain
print("\nRe-training sparse KRR model ")
model = KernelRidge(kernel='rbf', gamma=gamma, alpha=alpha)
model.fit(X_sv, y_sv)
print("Done ")

print("\nEvaluating model ")
acc_train = accuracy(model, X_sv, y_sv, 0.10)
acc_test = accuracy(model, test_X, test_y, 0.10)
print("\nAccuracy (within 0.10) train = %0.4f " % \
  acc_train)
print("Accuracy (within 0.10) test = %0.4f " % \
  acc_test)

mse_train = mse(model, X_sv, y_sv)
mse_test = mse(model, test_X, test_y)
print("\nMSE train = %0.4f " % mse_train)
print("MSE test = %0.4f " % mse_test)

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, Scikit | Leave a comment

The Four Most Common Techniques to Train a Linear Regression or Quadratic Regression Model

Posted on May 29, 2026 by jamesdmccaffrey

The goal of a machine learning linear regression model is to predict a single numeric value. The general form of the prediction equation is y’ = (w0 * x0) + (w1 * x1) + . . . + b, where x = (x0, x1, . . xn) is the input predictor values, the wi are the model weights (aka coefficients) and b is the model bias (aka intercept).

For example, suppose you want to predict a person’s income from their age (x0), height (x1), and bank account balance (x2). The prediction equation might be something like y’ = income = (0.57 * age) + (0.33 * height) + (0.72 * balance) + 4.96.

Training a linear regression model is the process of finding values of the weights and the bias. You do this by using a set of training data that has known x input values and y target values, and using an optimization algorithm that finds values of the weights and the bias so that predicted y’ values (using the weights and bias) closely match the known correct target y values.

There are four main techniques (each has many variations) to train a linear regression model (or the closely related quadratic regression model). There are two iterative techniques, where the values of the weights and the bias are slowly estimated: stochastic gradient descent (SGD) and limited-memory Broyden–Fletcher–Goldfarb–Shanno (L-BFGS). There are two closed forms techniques, where the values of the weights and the bias are computed directly: left pseudo-inverse via normal equations, and relaxed Moore-Penrose pseudo-inverse.

Each of the four common techniques (there are lots of less common techniques) has pros and cons related to 1.) ability to deal with large training datasets, 2.) implementation complexity, 3.) ability to deal with unusual (“ill-conditioned”) training datasets, and 4.) difficulty to find training hyperparameter like a learning rate. If one training technque was superior in all situations, there would only be one technique used.

Here is a summary, but with the caution that there are many exceptions.

I. Iterative Training Techniques

 1.) L-BFGS
   handle large datasets = no
   implementation complexity = very high
   handle unusual data = no
   find parameter difficulty = low (max iterations, tolerance)

 2.) SGD
   handle large datasets = yes
   implementation complexity = very low
   handle unusual data = usually
   find parameter difficulty = medium (learn rate, max epochs)

II. Closed Form Training Techniques

 3.) left pseudo-inverse
   handle large datasets = no
   implementation complexity = medium
   handle unusual data = sometimes
   find parameter difficulty = very low (condition)

 4.) Moore-Penrose pseudo-inverse
   handle large datasets = no
   implementation complexity = extremely high
   handle unusual data = usually
   find parameter difficulty = very low (condition, SVD)

For implementing linear regression from scratch, using C# or other C-family language, I almost never use L-BFGS or Moore-Penrose pseudo-inverse because the implementation complexity is extremely high. For small and medium datasets, left pseudo-inverse training is my technique of choice. If the training dataset is too big (causing left pseudo-inverse training to fail) then SGD is my fallback.

It’s relatively easy to compare different techniques for machine learning training. It’s not so easy (for me anyway) to compare different art techniques.

Left: A beautiful illustration by artist Nikolai Nedbaylo (1940-2015).

Right: An AI-generated illustration. To me, this illustration technically beautiful, but it lacks the soul of the human-generated illustration.

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

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

namespace LinearRegressionLeftPinvAndSGD
{
  internal class LinearRegressionProgram
  {
    static void Main(string[] args)
    {
      Console.WriteLine("\nBegin C# linear regression" +
        " demo with SGD and left pinv training ");

      // 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
      Console.WriteLine("\nCreating and training" +
        "  model using SGD ");

      double lrnRate = 0.001;
      int maxEpochs = 1000;
      //int seed = 0;
      Console.WriteLine("\nSetting lrnRate = " +
        lrnRate.ToString("F4"));
      Console.WriteLine("Setting maxEpohcs = " +
        maxEpochs);

      LinearRegressor model =
        new LinearRegressor();
      model.TrainSGD(trainX, trainY, lrnRate, maxEpochs);
      Console.WriteLine("Done ");

      // 2b.show model parameters
      Console.WriteLine("\nSGD trained 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 SGD 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("MSE train = " +
        mseTrain.ToString("F4"));
      double mseTest = model.MSE(testX, testY);
      Console.WriteLine("MSE test = " +
        mseTest.ToString("F4"));
            
      //// 4. use SGD model
      //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("\nCreating and training" +
        "  model using left pseudo-inverse ");

      model = new LinearRegressor();
      model.TrainLeftPinv(trainX, trainY);
      Console.WriteLine("Done ");

      // 2b.show model parameters
      Console.WriteLine("\nLeft pinv trained 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 left pseudo-inverse" +
        " trained model ");

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

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

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

    // ------------------------------------------------------
    // helpers for Main()
    // ------------------------------------------------------

    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[][] M)
    {
      int nRows = M.Length;
      int nCols = M[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++] = M[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]; // keep compiler happy
      this.bias = 0;
      this.rnd = new Random(seed);
    }

    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];

      // initialize weights and bias
      double low = -0.01; double hi = 0.01;
      for (int i = 0; i "lt" dim; ++i)
        this.weights[i] = (hi - low) *
          this.rnd.NextDouble() + low;
      this.bias = (hi - low) *
          this.rnd.NextDouble() + low;

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

      for (int epoch = 0; epoch "lt" maxEpochs; ++epoch)
      {
        // shuffle order pf training data indices
        for (int i = 0; i "lt" indices.Length; ++i)
        {
          int ri = this.rnd.Next(i, indices.Length);
          int tmp = indices[i];
          indices[i] = indices[ri];
          indices[ri] = tmp;
        }

        for (int i = 0; i "lt" n; ++i) // each train item
        {
          int ii = indices[i];
          double[] x = trainX[ii];
          double predY = this.Predict(x);
          double actualY = trainY[ii];
          for (int j = 0; j "lt" dim; ++j) // each weight
            this.weights[j] -= lrnRate *
              (predY - actualY) * x[j];
          this.bias -= lrnRate * (predY - actualY);
        }
        if (epoch % (int)(maxEpochs / 5) == 0) // progress
        {
          double mse = this.MSE(trainX, trainY);
          string s = "";
          s += "epoch = " + epoch.ToString().PadLeft(5);
          s += "  MSE = " + mse.ToString("F4").PadLeft(8);
          Console.WriteLine(s);
        }
      }
    }

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

    public void TrainLeftPinv(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 TrainLeftPinv()
      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 TrainLeftPinv()
      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 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;
    }

  } // class LinearRegressor

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

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

    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 | 1 Comment

I Have Never Understood Imputing Missing Values for Machine Learning

Posted on May 28, 2026 by jamesdmccaffrey

The goal of a machine learning model is to predict a single numeric value (regression) or a single discreet value such as the poltical leaning of a person (classification and binary classification). To create a model you must have data. For example, suppose some data looks like:

F, 24, Michigan, 29500.00, liberal
M, 39, Oklahoma, 51200.00, moderate
F, 63, Nebraska, 75800.00, conservative
. . .

The fields are sex, age, State, income, politics. Using this data you could predict any of the variables from the other variables, for example, predict income from sex, age, State, and politics.

Real-life data often has missing values. For example:

F,       24, Michigan, missing,  liberal
M,       39, Oklahoma, 51200.00, moderate
missing, 63, Nebraska, 75800.00, conservative
. . .

The obvious, and best approach is to toss out data rows that have one or more missing values. But for some reason, a standard machine learning technique for missing data is to supply imputed values. For example, for the missing sex value in the third row, you could insert the most common sex, male or female. And for the missing income value in the first row, you could insert the average of the income values.

The scikit-learn library has a module for supplying imputed values, but I can’t think of any scenarios where using it would be a good idea.

Imputing missing values makes absolutely no sense to me from a principled point of view. At best, the resulting prediction model will be sketchy, and the model could be flat-out misleading.

There’s no big moral to this post other than common sense should always prevail.

Missing data in machine learning is always bad. But missing details in art is a good thing. I don’t like photo-realistic art — I much prefer a certain level of abstraction where detail is missing.

Posted in Machine Learning | Leave a comment

Gradient Boost Regression Using C# Applied to the Diabetes Dataset – Poor Results As Expected

Posted on May 27, 2026 by jamesdmccaffrey

I write code almost every day. Like many skills, writing code is something that must be practiced, and anyway, I just enjoy writing code. One morning before work, I figured I’d run the well-known Diabetes Dataset through a gradient boost regression model. Based on previous experiments with linear regression, quadratic regression, neural network regression, kernel ridge regression, random forest regression, and AdaBoost regression, I was almost certain that the C# gradient boost regression model would give poor prediction accuracy. And that’s what happened.

The raw 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 ensemble models like gradient boost regression that use decision trees, but normalization doesn’t hurt. I split the 442-items into a 342-item training set and a 100-item test set.

Gradient boosting is simple but very subtle. Gradient boost regression uses a collection of decision trees. As each tree in the collection is constructed, it predicts the residuals of the previous tree. A residual is the difference between actual y and predicted y. Mathematically, a residual is (almost) a gradient, hence the name of the technique. For a given input, a prediction starts out as the average of the target y values. The predicted residuals of each tree — some will be negative and some will be positive — are accumulated, and the final sum is the predicted y value. The idea is very clever and not at all obvious.

I implemented a gradient boost regression model, from scratch, using C#. I used 100 decision trees. I set the maximum depth of each tree to 3, the minimum samples parameter to 2 (standard default), and the minimum leaf parameter to 1 (standard default).

The output of the demo is:

Begin Gradient Boost regression on Diabetes Dataset

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

First three train X:
  0.5900  1.0000  0.3210  0.1010  0.1570
  0.0932  0.3800  0.4000  0.4860  0.0870

  0.4800  0.0000  0.2160  0.0870  0.1830
  0.1032  0.7000  0.3000  0.3892  0.0690

  0.7200  1.0000  0.3050  0.0930  0.1560
  0.0936  0.4100  0.4000  0.4673  0.0850

First three train y:
  0.1510
  0.0750
  0.1410

Setting numTrees = 100
Setting maxDepth = 3
Setting minSamples = 2
Setting minLeaf = 1
Setting lrnRate = 0.1000

Creating and training GradientBoostRegression model
Done

Evaluating model

Accuracy train (within 0.10) = 0.3450
Accuracy test (within 0.10) = 0.1848

MSE train = 0.0009
MSE test = 0.0036

R2 train = 0.8452
R2 test = 0.4014

Predicting for x =
   0.5900   1.0000   0.3210   0.1010   0.1570
   0.0932   0.3800   0.4000   0.4860   0.0870

Initial prediction: 0.1520
t =   0  pred_res = -0.0195  delta =  0.0020  pred =  0.1540
t =   1  pred_res = -0.0879  delta =  0.0088  pred =  0.1628
t =   2  pred_res = -0.0146  delta =  0.0015  pred =  0.1642
t =   3  pred_res = -0.0740  delta =  0.0074  pred =  0.1716
t =   4  pred_res = -0.0655  delta =  0.0065  pred =  0.1782
. . .
t =  98  pred_res =  0.0129  delta = -0.0013  pred =  0.1771
t =  99  pred_res =  0.0004  delta = -0.0000  pred =  0.1771
Predicted y = 0.1771

End demo

These poor results were essentially the same as the results I got using the scikit GradientBoostingRegressor module (there were slight differences because gradient boost is extremely complicated and no two implementations will be identical, and there is a random component when examining columns of the training data to determine decision tree split values).

In some sense, you can think of machine learning regression as a search for the underlying pattern(s) in a set of data.

Every cover of Playboy Magazine, except for the very first one (December 1953) has the company bunny logo somewhere. On most covers, the logo is clear and easy to see. But on some covers, the logo cleverly hidden. Here are two covers featuring actress Farrah Fawcett (1947-2009), separated by over 20 years. Left: On the December 1978 cover, the bunny logo is on the top part of the cocktail pick she is holding. Right: On the July 1997 cover, the logo is part of the graffiti in the background, below the ‘Y’ in the title.

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 GradientBoostRegression
{
  internal class GradientBoostRegressionProgram
  {
    static void Main(string[] args)
    {
      Console.WriteLine("\nBegin Gradient Boost" +
              " regression on Diabetes Dataset ");

      // 1. load data
      Console.WriteLine("\nLoading diabetes train" +
        " (342) and test (100) normalized 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 model
      int numTrees = 100;
      int maxDepth = 3;
      int minSamples = 2;
      int minLeaf = 1;
      int numSplitCols = -1; // use all columns
      double lrnRate = 0.10;

      Console.WriteLine("\nSetting numTrees = " +
        numTrees);
      Console.WriteLine("Setting maxDepth = " +
        maxDepth);
      Console.WriteLine("Setting minSamples = " +
        minSamples);
      Console.WriteLine("Setting minLeaf = " +
        minLeaf);
      Console.WriteLine("Setting lrnRate = " +
        lrnRate.ToString("F4"));

      Console.WriteLine("\nCreating and training" +
        " GradientBoostRegression model ");
      GradientBoostRegressor gbr =
        new GradientBoostRegressor(numTrees, maxDepth,
        minSamples, minLeaf, numSplitCols, lrnRate);
      gbr.Train(trainX, trainY);
      Console.WriteLine("Done ");

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

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

      double r2Train = gbr.R2(trainX, trainY);
      Console.WriteLine("\nR2 train = " +
        r2Train.ToString("F4"));
      double r2Test = gbr.R2(testX, testY);
      Console.WriteLine("R2 test = " +
        r2Test.ToString("F4"));

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

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

    // ------------------------------------------------------
    // helpers for Main()
    // ------------------------------------------------------

    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 GradientBoostRegressor
  {
    public double lrnRate;
    public int nTrees;
    public int maxDepth;
    public int minSamples;
    public int minLeaf;
    public int numSplitCols;
    public List"lt"DecisionTreeRegressor"gt" trees;
    public double pred0;  // initial prediction

    public GradientBoostRegressor(int nTrees, int maxDepth,
      int minSamples, int minLeaf, int numSplitCols,
      double lrnRate)
    {
      this.nTrees = nTrees;
      this.maxDepth = maxDepth;
      this.minSamples = minSamples;
      this.minLeaf = minLeaf;
      this.numSplitCols = numSplitCols;
      this.trees = new List"lt"DecisionTreeRegressor"gt"();
      this.lrnRate = lrnRate;
    }

    public void Train(double[][] trainX, double[] trainY)
    {
      int n = trainX.Length;
      this.pred0 = Mean(trainY);

      double[] preds = new double[n]; //each data item
      for (int i = 0; i "lt" n; ++i)
        preds[i] = this.pred0;

      for (int t = 0; t "lt" this.nTrees; ++t) // each tree
      {
        double[] residuals = new double[n]; // for curr tree
        for (int i = 0; i "lt" n; ++i)
          residuals[i] = preds[i] - trainY[i];

        DecisionTreeRegressor dtr =
          new DecisionTreeRegressor(this.maxDepth,
          this.minSamples, this.minLeaf, this.numSplitCols);
        dtr.Train(trainX, residuals); // predict residuals

        for (int i = 0; i "lt" n; ++i)
        {
          double predResidual = dtr.Predict(trainX[i]);
          preds[i] -= this.lrnRate * predResidual;
        }
        this.trees.Add(dtr);
      }
    } // Train

    public double Predict(double[] x, bool verbose = false)
    {
      double result = this.pred0;
      if (verbose == true)
      {
        Console.WriteLine("\nInitial prediction: " +
        result.ToString("F4"));
      }
      for (int t = 0; t "lt" this.nTrees; ++t)
      {
        double predResidual = this.trees[t].Predict(x);
        double delta = -this.lrnRate * predResidual;
        result += delta;

        if (verbose == true)
        {
          if (t "gte" 0 && 
              t "lte" 4 || 
              t "gte" this.nTrees - 2 &&
              t "lte" this.nTrees - 1)
          {
            Console.Write("t = " + t.ToString().PadLeft(3) +
              "  pred_res = " + predResidual.ToString("F4").
              PadLeft(7));
            Console.Write(" delta = " + delta.ToString("F4").
              PadLeft(7));
            Console.WriteLine("  pred = " +
              result.ToString("F4").PadLeft(7));
          }
          if (t == 5)
            Console.WriteLine(". . . ");
        }
      }
      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 = Predict(dataX[i]);
        if (Math.Abs(predY - actualY) "lt"
          (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 R2(double[][] dataX, double[] dataY)
    {
      // coefficient of determination
      int n = dataX.Length;
      double sum = 0.0;

      for (int i = 0; i "lt" n; ++i)
        sum += dataY[i];
      double meanActual = sum / n;

      double sumTop = 0.0;
      double sumBot = 0.0;
      for (int i = 0; i "lt" n; ++i)
      {
        double predY = this.Predict(dataX[i]);
        sumTop += (dataY[i] - predY) * (dataY[i] - predY);
        sumBot += (dataY[i] - meanActual) *
          (dataY[i] - meanActual);
      }
      return 1.0 - (sumTop / sumBot);
    }


    private static double Mean(double[] data)
    {
      int n = data.Length;
      double sum = 0.0;
      for (int i = 0; i "lt" n; ++i)
        sum += data[i];
      return sum / n;
    }

  } // class GradientBoostRegression

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

  // simplified list-based tree

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

  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;  // 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 = 1)
    {
      // 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().
    // helpers: MakeTree(), BestSplit(), TreeTargetMean(),
    //   TreeTargetVariance().
    // ------------------------------------------------------

    public void Train(double[][] trainX, double[] trainY)
    {
      this.trainX = trainX; // 
      this.trainY = trainY;
      this.MakeTree();
      // if Tree is part of an ensemble, optionally delete
      // the row information in each Node, to save space
      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;
    }

    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)  // unable split, is a leaf
        {
          currNode.isLeaf = true;
          continue;
        }

        // complete the fields for curr node
        currNode.colIdx = colIdx;
        currNode.thresh = splitVal;

        // construct the children, 
        // except for colIdx and thresh
        // which will be supplied in amin loop
        Node leftNode = new Node();
        Node rightNode = new Node();

        // construct 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);
        }

        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

Posted in Machine Learning | Leave a comment

An Example of LARS (Least Angle Regression) Regression Using the Scikit Library

Posted on May 26, 2026 by jamesdmccaffrey

I try to learn something new every day. That usually means writing some computer code. Over the past few years, I have run into LARS (least angle regression) a few times, but never took the time to try and understand it. So, one evening after work, I figured I’d start an exploration using the scikit-learn LassoLars module.

Least Angle Regression (LARS) is a variation of linear regression. It uses stepwise regression — a technique that adds one predictor variable at a time, skipping over variables that don’t help. It is intended for use with high-dimensional datasets, where the number of features outnumbers the observations.

The “lasso” part of the scikit LassoLars, adds L1 regularization.

I see two immediate problems with LARS. First, LARS is just a linear model, which means it cannot handle complex data. Second, scenarios where the number of predictor variables is greater than the number of training items, are very rare.

After a few hours of experimentation, I started to understand LARS, but I still have more things to figure out. My initial thoughts are that LARS with lasso (aka L1 regularization) is very similar to standard linear regression with lasso except that the model coefficients and bias are computed in a different way. Of course, there’s a lot more than that but I don’t want to put down possibly incorrect information in this post.

The output of one run (of many) of my experiments is:

train_X:
[[ 2.10 -0.64  0.19 -0.19  1.69  0.05 -0.75 -0.89]
 [ 0.59 -0.35 -0.21  0.12 -0.35 -1.14  0.30  0.62]
 [-1.10 -0.38  1.13  0.32 -2.06 -0.32  1.46 -0.25]
 [-0.30  1.25  0.51  0.84  0.89 -0.75  0.29  0.93]
 [-0.50 -1.40 -1.44  0.49  1.52  2.19  1.13 -0.08]
 [ 0.76  0.83  0.23  0.16 -2.02 -0.31  0.32  0.88]
 [ 0.50  1.14  0.90 -0.17  0.58 -1.10  0.04 -0.88]]

train_y:
[  26.51   18.68 -137.94  200.07  242.04  -92.10  -24.09]

test_X:
[[ 0.74  0.23  1.66 -0.69 -0.01 -1.12 -0.67 -0.85]
 [-0.40  0.53 -0.69  0.90 -0.94 -0.27 -0.12 -0.68]
 [-0.76 -2.30  1.74  1.62 -1.07  0.87 -0.53 -0.61]]

test_y:
[-143.33 -161.28 -214.44]

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

Creating LARS model alpha = 0.0100
Done

LARS model coefficients:
[-39.92   7.95 -12.94   0.00  87.53  20.06   0.00  84.51]
LARS model bias = 43.7840

LARS model R2 on train data = 1.0000
LARS model acc (0.10) train = 1.0000

LARS model R2 on test data = -7.7915
LARS model acc (0.10) test = 0.0000

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

Creating Lasso model alpha = 0.0100
Done

Lasso model coefficients:
[-39.92   7.97 -12.99   0.00  87.52  20.05   0.00  84.49]
Lasso model bias = 43.7917

Lasso model R2 on train data = 1.0000
Lasso model accuracy (0.10) train = 1.0000

Lasso model R2 on test data = -7.7875
Lasso model accuracy (0.10) test = 0.0000

End demo

There is a lot going on here. The synthetic data has 8 predictors but only 2 contribute to the target y values. Notice both LARS with lasso and regular linear regression with lasso drive two of the model coefficients to 0.

OK. An interesting start but there’s a lot more exploring to do before I can say that I understand least angle regression.

Some linear regression results need no explanation.

Demo program. Replace the “lt” in the accuracy() function with the Boolean less-than operator (my blog editor chokes on symbols).

# lars_scikit_explore.py

import numpy as np
from sklearn.datasets import make_regression
from sklearn import linear_model

np.set_printoptions(precision=2, suppress=True,
  floatmode='fixed')

# -----------------------------------------------------------

def accuracy(model, data_X, data_y, pct_close):
  n = len(data_X)
  n_correct = 0; n_wrong = 0
  for i in range(n):
    x = data_X[i].reshape(1,-1)
    y = data_y[i]
    y_pred = model.predict(x)[0]

    if np.abs(y - y_pred) < np.abs(y * pct_close):
      n_correct += 1
    else: 
      n_wrong += 1
  # print("Correct = " + str(n_correct))
  # print("Wrong   = " + str(n_wrong))
  return n_correct / (n_correct + n_wrong)

# -----------------------------------------------------------

X, y = make_regression(n_samples=10,
  n_features=8, n_informative=6, noise=0.01,
  random_state=1)

train_X = X[0:7,:]
train_y = y[0:7]
test_X = X[7:10,:]
test_y = y[7:10]

print("\ntrain_X: ")
print(train_X)

print("\ntrain_y: ")
print(train_y)

print("\ntest_X: ")
print(test_X)

print("\ntest_y: ")
print(test_y)

# LassoLars(alpha=1.0, *, fit_intercept=True,
# verbose=False, precompute='auto', max_iter=500,
# eps=np.float64(2.220446049250313e-16), copy_X=True,
# fit_path=True, positive=False, jitter=None,
# random_state=None)

print("\n=========================== ")

alpha = 0.01
print("\nCreating LARS model alpha = %0.4f " % alpha)
lars_model = linear_model.LassoLars(alpha=alpha)
lars_model.fit(train_X, train_y)
print("Done")

print("\nLARS model coefficients: ")
print(lars_model.coef_)
print("LARS model bias = %0.4f " % lars_model.intercept_)

train_r2 = lars_model.score(train_X, train_y)
print("\nLARS model R2 on train data = %0.4f " % train_r2)

train_acc = accuracy(lars_model, train_X, train_y, 0.10)
print("LARS model acc (0.10) train = %0.4f " % train_acc)

test_r2 = lars_model.score(test_X, test_y)
print("\nLARS model R2 on test data = %0.4f " % test_r2)

test_acc = accuracy(lars_model, test_X, test_y, 0.10)
print("LARS model acc (0.10) test = %0.4f " % test_acc)

print("\n=========================== ")

print("\nCreating Lasso model alpha = %0.4f " % alpha)
lasso_model = linear_model.Lasso(alpha=alpha, max_iter=10000)
lasso_model.fit(train_X, train_y)
print("Done")

print("\nLasso model coefficients: ")
print(lasso_model.coef_)
print("Lasso model bias = %0.4f " % lasso_model.intercept_)

train_r2 = lasso_model.score(train_X, train_y)
print("\nLasso model R2 on train data = %0.4f " % train_r2)

train_acc = accuracy(lasso_model, train_X, train_y, 0.10)
print("Lasso model accuracy (0.10) train = %0.4f " % train_acc)

test_r2 = lasso_model.score(test_X, test_y)
print("\nLasso model R2 on test data = %0.4f " % test_r2)

test_acc = accuracy(lasso_model, test_X, test_y, 0.10)
print("Lasso model accuracy (0.10) test = %0.4f " % test_acc)

print("\nEnd demo ")

Posted in Machine Learning, Scikit | Leave a comment

Matrix Inverse Using Cholesky Decomposition: Two Approaches Using C#

Posted on May 25, 2026 by jamesdmccaffrey

Computing the inverse of a matrix using Cholesky decomposition illustrates many factors in low level software design. I put together two versions of a matrix inverse function, using C#.

The first version uses seven helper functions and has a total of about 170 lines of code. The second version computes the inverse directly, without using any helper functions. It has about 60 lines of code. The first version is easier to understand, easier to test, and easier to modify. The second version is more efficient and has significantly fewer lines of code.

The output of the demo is:

Begin matrix inverse using Cholesky decmposition

Generating square symmetic positive definite matrix M

Matrix M:
   120.0000    46.0000    82.0000
    46.0000    75.0000   -14.0000
    82.0000   -14.0000   127.0000

Cholesky inverse M (direct):
     0.0387    -0.0290    -0.0282
    -0.0290     0.0354     0.0226
    -0.0282     0.0226     0.0286

Cholesky inverse (helpers):
     0.0387    -0.0290    -0.0282
    -0.0290     0.0354     0.0226
    -0.0282     0.0226     0.0286

The check matrix (M * Minv) should be I:
     1.0000     0.0000    -0.0000
     0.0000     1.0000    -0.0000
     0.0000     0.0000     1.0000

End demo

Computing the inverse of a matrix using Cholesky inverse applies only to matrices that are square, symmetric, positive definite. In machine learning, this occurs mostly in two scenarios: 1.) solving for model weights using left pseudo-inverse via normal equations (linear regression, quadratic regression, etc.), 2.) solving for model weights using a kernel covariance matrix (kernel ridge regression, Gaussian process regression, etc.)

Here’s the short version that uses helpers:

static double[][] MatInvCholesky2(double[][] A)
{
  // inv(A) = inv(L * Lt) = inv(Lt) * inv(L)
  double[][] L = MatDecompCholesky(A);
  double[][] Lt = MatTranspose(L);
  double[][] invL = MatInvLowerTri(L);
  double[][] invLt = MatInvUpperTri(Lt);
  double[][] result = MatProd(invLt, invL);
  return result;
}

The long version that uses no helpers looks like:

static double[][] MatInvCholesky1(double[][] A)
{
  // 1. decompose to L
  int m = A.Length; int n = A[0].Length;  // m == n
  double[][] L = new double[n][];
  . . . .
  // about 170  lines of tricky code here
  return result;
}

There’s no big moral to the story. But understanding design decisions like this are an important part of software engineering, even in a world where AI generates the code.

There’s an element of subjectivity when it comes to software design. In animated films, character design is important. Three of my favorite stop-motion animated films have (in my opinion) excellent character design.

Left: “Coraline” (2009) tells the story ofa young girl who discovers a gateway to a strange world, which at first appears prefect, but hides a dark truth. I give this movie my personal solid A grade.

Center: “Isle of Dogs” (2018) tells the story of Atari Kobayashi, a young boy who is looking for his dog, in a world where all dogs have been exiled to an island. Wildly creative story. I give this movie my personal A- grade.

Right: “Rango” (2011) tells the story of a pet chameleon who has adventures in the Old West. Very entertaining movie. I always thought this was a stop-motion film, but it’s actually 100% digital. I give the movie my personal B+ grade.

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 MatrixInverseCholesky
{
  internal class Program
  {
    static void Main(string[] args)
    {
      Console.WriteLine("\nBegin matrix inverse" +
        " using Cholesky decmposition ");

      double[][] A = new double[4][];
      A[0] = new double[] { 4.0, 7.0, 1.0 };
      A[1] = new double[] { 6.0, 0.0, 3.0 };
      A[2] = new double[] { 8.0, 1.0, 9.0 };
      A[3] = new double[] { 2.0, 5.0, -6.0 };

      Console.WriteLine("\nGenerating square symmetic " +
        "positive definite matrix M ");

      double[][] M = MatProd(MatTranspose(A), A);
      for (int i = 0; i "lt" M.Length; ++i)
        M[i][i] += 1.0e-8;
      Console.WriteLine("\nMatrix M: ");
      MatShow(M, 4, 11);

      double[][] Minv1 = MatInvCholesky1(M);
      Console.WriteLine("\nCholesky inverse M (direct): ");
      MatShow(Minv1, 4, 11);

      double[][] Minv2 = MatInvCholesky2(M);
      Console.WriteLine("\nCholesky inverse (helpers): ");
      MatShow(Minv2, 4, 11);

      double[][] C = MatProd(M, Minv1);
      Console.WriteLine("\nThe check matrix " +
        "(M * Minv) should be I: ");
      MatShow(C, 4, 11);

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

    } // Main()

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

    static double[][] MatInvCholesky1(double[][] A)
    {
      // no helper functions version
      // A must be square, symmetric, positive definite
      // 1. decompose to L
      int m = A.Length; int n = A[0].Length;  // m == n
      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()

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

    static double[][] MatInvCholesky2(double[][] A)
    {
      // version with helper functions
      // A must be square symmetric positive definite
      // inv(A) = inv(L * Lt) = inv(Lt) * inv(L)
      // calls MatDecompCholesky, MatTranspose,
      // MatInvLowerTri, MatInvUpperTri, MatProd
      // MatIdentity, MatMake

      double[][] L = MatDecompCholesky(A);
      double[][] Lt = MatTranspose(L);
      double[][] invL = MatInvLowerTri(L);
      double[][] invLt = MatInvUpperTri(Lt);
      double[][] result = MatProd(invLt, invL);
      return result;
    }

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

    static double[][] MatInvLowerTri(double[][] lower)
      {
        // inverse of lower triangular non-fancy version
        int n = lower.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[k][j] -= result[i][j] * lower[k][i];
            }
            result[k][j] /= lower[k][k];
          }
        }
        return result;
      }

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

    static double[][] MatInvUpperTri(double[][] U)
      {
        int n = U.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] * U[i][k];
            }
            result[j][k] /= U[k][k];
          }
        }
        return result;
      }

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

    static double[][] MatDecompCholesky(double[][] M)
    {
      // Cholesky decomposition (Banachiewicz algorithm)
      // M is square, symmetric, positive definite
      // (conditioned too)
      int n = M.Length;
      double[][] result = MatMake(n, n);  // all 0.0
      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 += result[i][k] * result[j][k];
          if (i == j)
          {
            double tmp = M[i][i] - sum;
            if (tmp "lt" 0.0)
              throw new
                Exception("MatDecompCholesky fatal");
            result[i][j] = Math.Sqrt(tmp);
          }
          else
          {
            if (result[j][j] == 0.0)
              throw new
                Exception("MatDecompCholesky fatal ");
            result[i][j] =
              (1.0 / result[j][j] * (M[i][j] - sum));
          }
        } // j
      } // i
      return result;
    } // MatDecompCholesky

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

    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;
    }

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

    // helpers for Main to set up problem, show result

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

    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;
    }

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

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

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

    static double[][] MatProd(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;
    }

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

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

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

    // function to load from file -- not used this demo

    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();
    }

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

  } // Program

} // ns

Posted in Machine Learning | Leave a comment

Why You Shouldn’t Use Drop-First Encoding for Neural Network Categorical Predictor Variables

Posted on May 22, 2026 by jamesdmccaffrey

Bottom line: For a neural network regressor, if you have categorical predictor data, you should use standard one-hot encoding rather than the drop-first encoding that is usually needed for a linear regression model. Drop-first encoding works for a neural network, but drop-first has no advantage over one-hot, and nobody ever uses drop-first with neural networks.

Suppose you have a categorical predictor variable, such as color with possible values red, blue, green. If you are creating a neural network regression model, you should use one-hot encoding: red = 1 0 0, blue = 0 1 0, green = 0 0 1. But if you are creating a linear regression model, and you intend to use closed form training (via Moore-Penrose pseudo inverse, or left pseudo-inverse via normal equations) you must use drop-first encoding: red = 0 0, blue = 1 0, green = 0 1 because if you use one-hot encoding, the matrix inverse operation will likely fail due to collinearity in the training data.

(If you intend to use stochastic gradient descent, SGD, for linear regression, you can use either one-hot or drop-first encoding but drop-first encoding is recommended because it will work regardless of training algorithm used).

I had never seen an example where drop-first encoding was used for a neural network. I put together a demo. I wasn’t sure what to expect, but the drop-first encoding worked slightly worse than standard one-hot encoding. One example isn’t conclusive, but the results suggest there’s no reason to even consider drop-first encoding for a neural network regressor.

For my demo, I used one of my standard synthetic datasets. The raw data looks like:

F, 24, Michigan, 29,500.00, liberal
M, 39, Oklahoma, 51,200.00, moderate
F, 63, Nebraska, 75,800.00, conservative

The fields are sex (M, F), age, State (only Michigan, Nebraska, Oklahoma), income, politics (conservative, moderate, liberal). The goal is to predict income from sex, age, state, and political leaning. There are 200 training items and 40 test items.

The one-hot normalized and encoded data looks like:

1, 0.24, 1,0,0, 0.2950, 0,0,1
0, 0.39, 0,0,1, 0.5120, 0,1,0
1, 0.63, 0,1,0, 0.7580, 1,0,0
. . .

The drop-first normalized and encoded data looks like:

1, 0.24, 0,0, 0.2950, 0,1
0, 0.39, 0,1, 0.5120, 1,0
1, 0.63, 1,0, 0.7580, 0,0
. . .

I use the scikit-learn MLPRegressor (“multi-layer perceptron regressor”) module. It has a large number of parameters but I tried to keep things as simple as possible by using a single hidden layer of 100 nodes, tanh hidden activation, SGD training, and so on.

The output of my demo is:

Scikit NN regression (one-hot)
Predict income from sex, age, State, politics

Loading one-hot data into memory

Training X data:
[[1.0000 0.2400 1.0000 0.0000 0.0000 0.0000 0.0000 1.0000]
 [0.0000 0.3900 0.0000 0.0000 1.0000 0.0000 1.0000 0.0000]
 [1.0000 0.6300 0.0000 1.0000 0.0000 1.0000 0.0000 0.0000]]
. . .

Training y data:
[0.2950 0.5120 0.7580]
. . .

Creating 8-(100)-1 tanh NN regressor

Training with bat sz = 10 lrn rate = 0.01 max_iter = 200
Done

Accuracy train (within 0.10): 0.9200
Accuracy test (within 0.10): 0.9200

MSE train: 0.000692
MSE test: 0.000692

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

Loading drop-first data into memory

Training X data:
[[1.0000 0.2400 0.0000 0.0000 0.0000 1.0000]
 [0.0000 0.3900 0.0000 1.0000 1.0000 0.0000]
 [1.0000 0.6300 1.0000 0.0000 0.0000 0.0000]]
. . .

Training y data:
[0.2950 0.5120 0.7580]
. . .

Creating 6-(100)-1 tanh NN regressor

Starting training
Done

Accuracy train (within 0.10): 0.8900
Accuracy test (within 0.10): 0.8900

MSE train: 0.000741
MSE test: 0.000741

End scikit NN one-hot demo

The conclusion is when using neural network regression, for categorical predictor data, standard one-hot encoding is preferable to drop-first encoding, because drop-first has no technical advantage over one-hot, and one-hot encoding is universally used. An interesting experiment.

I’ve always been fascinated by the competition between ideas in machine learning. And I’ve always been fascinated by military competitions too.

Left column: The Lockheed XF-90 jet (top) lost a competition to the McDonnell XF-88 (bottom) in 1948. The XF-90 was very beautiful but had underpowered engines.

Right column: The Boeing X-32 jet (top) lost a competition to the Lockheed X-35 jet (bottom) in 2001. The X-35 was superior to the X-32 in almost every way, including looks. The X-32 was an incredibly ugly plane featuring a huge gaping mouth. The X-32 was nicknamed “Monica” in reference to Monica Lewinsky who gave frequent mouth service to U.S. President Bill Clinton from 1995-1997.

Demo program. Replace the “lt” in the accuracy() function with the less-than Boolean operator symbol.

# people_income_nn.py

# predict income 
# from sex, age, state, politics
# standard one-hot encoding

# sex  age    state    income   politics
#  0   0.27   0  1  0   0.7610   0  0  1
#  1   0.19   0  0  1   0.6550   1  0  0
# state: michigan = 100, nebraska = 010, oklahoma = 001
# politics: conservative, moderate, liberal

# Anaconda3-2025.12.1  Python 3.13.9  scikit 1.7.2
# Windows 11

import numpy as np 
from sklearn.neural_network import MLPRegressor

# import warnings
# warnings.filterwarnings('ignore')  # early-stop warnings

# -----------------------------------------------------------
# -----------------------------------------------------------

def accuracy(model, data_X, data_y, pct_close):
  n = len(data_X)
  n_correct = 0; n_wrong = 0
  for i in range(n):
    x = data_X[i].reshape(1,-1)
    y = data_y[i]
    y_pred = model.predict(x)[0]

    if np.abs(y - y_pred) "lt" np.abs(y * pct_close):
      n_correct += 1
    else: 
      n_wrong += 1
  # print("Correct = " + str(n_correct))
  # print("Wrong   = " + str(n_wrong))
  return n_correct / (n_correct + n_wrong)

# -----------------------------------------------------------

def MSE(model, data_X, data_y):
  n = len(data_X)
  sum = 0.0
  for i in range(n):
    x = data_X[i].reshape(1,-1)
    y = data_y[i]
    y_pred = model.predict(x)[0]
    sum += (y - y_pred) * (y - y_pred)

  return sum / n

# -----------------------------------------------------------
# -----------------------------------------------------------

def main():
  # 0. get ready
  print("\nScikit NN regression (one-hot) ")
  print("Predict income from sex, age, State, politics ")
  np.random.seed(1)
  np.set_printoptions(precision=4, suppress=True,
    floatmode='fixed')

  # 1. load data
  print("\nLoading one-hot data into memory ")
  train_file = ".\\Data\\people_train_one_hot.txt"
  train_xy = np.loadtxt(train_file, 
    usecols=[0,1,2,3,4,5,6,7,8], delimiter=",",
    comments="#",  dtype=np.float32) 
  train_X = train_xy[:,[0,1,2,3,4,6,7,8]]
  train_y = train_xy[:,5]

  test_file = ".\\Data\\people_test_one_hot.txt"
  test_xy = np.loadtxt(test_file,
    usecols=[0,1,2,3,4,5,6,7,8], delimiter=",",
    comments="#",  dtype=np.float32) 
  test_X = train_xy[:,[0,1,2,3,4,6,7,8]]
  test_y = train_xy[:,5]

  print("\nTraining X data:")
  print(train_X[0:3])
  print(". . . ")
  print("\nTraining y data: ")
  print(train_y[0:3])
  print(". . . ")

# -----------------------------------------------------------

  # 2. create network 
  # sklearn.neural_network.MLPRegressor(loss='squared_error',
  # hidden_layer_sizes=(100,), activation='relu', *, 
  # solver='adam', alpha=0.0001, batch_size='auto',
  # learning_rate='constant', learning_rate_init=0.001,
  # power_t=0.5, max_iter=200, shuffle=True, 
  # random_state=None, tol=0.0001, verbose=False, 
  # warm_start=False, momentum=0.9, nesterovs_momentum=True,
  # early_stopping=False, validation_fraction=0.1,
  # beta_1=0.9, beta_2=0.999, epsilon=1e-08, 
  # n_iter_no_change=10, max_fun=15000)

  params = { 'hidden_layer_sizes' : [100],
    'activation' : 'tanh',
    'solver' : 'sgd',
    'alpha' : 0.001,
    'batch_size' : 10,
    'random_state' : 0,
    'tol' : 0.0001,
    'nesterovs_momentum' : False,
    'early_stopping' : False,
    'learning_rate' : 'constant',
    'learning_rate_init' : 0.01,
    'max_iter' : 200,
    'shuffle' : True,
    'n_iter_no_change' : 50,
    'verbose' : False }
       
  print("\nCreating 8-(100)-1 tanh NN regressor ")
  net = MLPRegressor(**params)

# -----------------------------------------------------------

  # 3. train
  print("\nTraining with bat sz = " + \
    str(params['batch_size']) + " lrn rate = " + \
    str(params['learning_rate_init']) + \
    " max_iter = " + str(params['max_iter']))
  net.fit(train_X, train_y)
  print("Done ")

# -----------------------------------------------------------

  # 4. evaluate model
  acc_train = accuracy(net, train_X, train_y, 0.10)
  print("\nAccuracy train (within 0.10): %0.4f " % acc_train)
  acc_test = accuracy(net, test_X, test_y, 0.10)
  print("Accuracy test (within 0.10): %0.4f " % acc_test)

  mse_train = MSE(net, train_X, train_y)
  print("\nMSE train: %0.6f " % mse_train)
  mse_test = MSE(net, test_X, test_y)
  print("MSE test: %0.6f " % mse_test)

# -----------------------------------------------------------
# drop-first version
# -----------------------------------------------------------

# sex  age   state   income   politics
#  0   0.27   1  0   0.7610   0  1
#  1   0.19   0  1   0.6550   0  0

  print("\n===================================== ")

  print("\nLoading drop-first data into memory ")
  train_file = ".\\Data\\people_train_drop_first.txt"
  train_xy = np.loadtxt(train_file, 
    usecols=[0,1,2,3,4,5,6], delimiter=",",
    comments="#",  dtype=np.float32) 
  train_X = train_xy[:,[0,1,2,3,5,6]]
  train_y = train_xy[:,4]

  test_file = ".\\Data\\people_test_drop_first.txt"
  test_xy = np.loadtxt(test_file,
    usecols=[0,1,2,3,4,5,6], delimiter=",",
    comments="#",  dtype=np.float32) 
  test_X = train_xy[:,[0,1,2,3,5,6]]
  test_y = train_xy[:,4]

  print("\nTraining X data:")
  print(train_X[0:3])
  print(". . . ")
  print("\nTraining y data: ")
  print(train_y[0:3])
  print(". . . ")

  print("\nCreating 6-(100)-1 tanh NN regressor ")
  net = MLPRegressor(**params)

  print("\nStarting training ")
  net.fit(train_X, train_y)
  print("Done ")

  acc_train = accuracy(net, train_X, train_y, 0.10)
  print("\nAccuracy train (within 0.10): %0.4f " % acc_train)
  acc_test = accuracy(net, test_X, test_y, 0.10)
  print("Accuracy test (within 0.10): %0.4f " % acc_test)

  mse_train = MSE(net, train_X, train_y)
  print("\nMSE train: %0.6f " % mse_train)
  mse_test = MSE(net, test_X, test_y)
  print("MSE test: %0.6f " % mse_test)

  print("\nEnd scikit NN one-hot demo ")

if __name__ == "__main__":
  main()

One-hot training data:

# people_train_one_hot.txt
# sex (0 = male, 1 = female) - dependent variable
# age (div 100),
# state (michigan = 100, nebraska = 010, oklahoma = 001),
# income (div $100,000),
# politics type (conservative, moderate, liberal)
#
1,0.24,1,0,0,0.2950,0,0,1
0,0.39,0,0,1,0.5120,0,1,0
1,0.63,0,1,0,0.7580,1,0,0
0,0.36,1,0,0,0.4450,0,1,0
1,0.27,0,1,0,0.2860,0,0,1
1,0.50,0,1,0,0.5650,0,1,0
1,0.50,0,0,1,0.5500,0,1,0
0,0.19,0,0,1,0.3270,1,0,0
1,0.22,0,1,0,0.2770,0,1,0
0,0.39,0,0,1,0.4710,0,0,1
1,0.34,1,0,0,0.3940,0,1,0
0,0.22,1,0,0,0.3350,1,0,0
1,0.35,0,0,1,0.3520,0,0,1
0,0.33,0,1,0,0.4640,0,1,0
1,0.45,0,1,0,0.5410,0,1,0
1,0.42,0,1,0,0.5070,0,1,0
0,0.33,0,1,0,0.4680,0,1,0
1,0.25,0,0,1,0.3000,0,1,0
0,0.31,0,1,0,0.4640,1,0,0
1,0.27,1,0,0,0.3250,0,0,1
1,0.48,1,0,0,0.5400,0,1,0
0,0.64,0,1,0,0.7130,0,0,1
1,0.61,0,1,0,0.7240,1,0,0
1,0.54,0,0,1,0.6100,1,0,0
1,0.29,1,0,0,0.3630,1,0,0
1,0.50,0,0,1,0.5500,0,1,0
1,0.55,0,0,1,0.6250,1,0,0
1,0.40,1,0,0,0.5240,1,0,0
1,0.22,1,0,0,0.2360,0,0,1
1,0.68,0,1,0,0.7840,1,0,0
0,0.60,1,0,0,0.7170,0,0,1
0,0.34,0,0,1,0.4650,0,1,0
0,0.25,0,0,1,0.3710,1,0,0
0,0.31,0,1,0,0.4890,0,1,0
1,0.43,0,0,1,0.4800,0,1,0
1,0.58,0,1,0,0.6540,0,0,1
0,0.55,0,1,0,0.6070,0,0,1
0,0.43,0,1,0,0.5110,0,1,0
0,0.43,0,0,1,0.5320,0,1,0
0,0.21,1,0,0,0.3720,1,0,0
1,0.55,0,0,1,0.6460,1,0,0
1,0.64,0,1,0,0.7480,1,0,0
0,0.41,1,0,0,0.5880,0,1,0
1,0.64,0,0,1,0.7270,1,0,0
0,0.56,0,0,1,0.6660,0,0,1
1,0.31,0,0,1,0.3600,0,1,0
0,0.65,0,0,1,0.7010,0,0,1
1,0.55,0,0,1,0.6430,1,0,0
0,0.25,1,0,0,0.4030,1,0,0
1,0.46,0,0,1,0.5100,0,1,0
0,0.36,1,0,0,0.5350,1,0,0
1,0.52,0,1,0,0.5810,0,1,0
1,0.61,0,0,1,0.6790,1,0,0
1,0.57,0,0,1,0.6570,1,0,0
0,0.46,0,1,0,0.5260,0,1,0
0,0.62,1,0,0,0.6680,0,0,1
1,0.55,0,0,1,0.6270,1,0,0
0,0.22,0,0,1,0.2770,0,1,0
0,0.50,1,0,0,0.6290,1,0,0
0,0.32,0,1,0,0.4180,0,1,0
0,0.21,0,0,1,0.3560,1,0,0
1,0.44,0,1,0,0.5200,0,1,0
1,0.46,0,1,0,0.5170,0,1,0
1,0.62,0,1,0,0.6970,1,0,0
1,0.57,0,1,0,0.6640,1,0,0
0,0.67,0,0,1,0.7580,0,0,1
1,0.29,1,0,0,0.3430,0,0,1
1,0.53,1,0,0,0.6010,1,0,0
0,0.44,1,0,0,0.5480,0,1,0
1,0.46,0,1,0,0.5230,0,1,0
0,0.20,0,1,0,0.3010,0,1,0
0,0.38,1,0,0,0.5350,0,1,0
1,0.50,0,1,0,0.5860,0,1,0
1,0.33,0,1,0,0.4250,0,1,0
0,0.33,0,1,0,0.3930,0,1,0
1,0.26,0,1,0,0.4040,1,0,0
1,0.58,1,0,0,0.7070,1,0,0
1,0.43,0,0,1,0.4800,0,1,0
0,0.46,1,0,0,0.6440,1,0,0
1,0.60,1,0,0,0.7170,1,0,0
0,0.42,1,0,0,0.4890,0,1,0
0,0.56,0,0,1,0.5640,0,0,1
0,0.62,0,1,0,0.6630,0,0,1
0,0.50,1,0,0,0.6480,0,1,0
1,0.47,0,0,1,0.5200,0,1,0
0,0.67,0,1,0,0.8040,0,0,1
0,0.40,0,0,1,0.5040,0,1,0
1,0.42,0,1,0,0.4840,0,1,0
1,0.64,1,0,0,0.7200,1,0,0
0,0.47,1,0,0,0.5870,0,0,1
1,0.45,0,1,0,0.5280,0,1,0
0,0.25,0,0,1,0.4090,1,0,0
1,0.38,1,0,0,0.4840,1,0,0
1,0.55,0,0,1,0.6000,0,1,0
0,0.44,1,0,0,0.6060,0,1,0
1,0.33,1,0,0,0.4100,0,1,0
1,0.34,0,0,1,0.3900,0,1,0
1,0.27,0,1,0,0.3370,0,0,1
1,0.32,0,1,0,0.4070,0,1,0
1,0.42,0,0,1,0.4700,0,1,0
0,0.24,0,0,1,0.4030,1,0,0
1,0.42,0,1,0,0.5030,0,1,0
1,0.25,0,0,1,0.2800,0,0,1
1,0.51,0,1,0,0.5800,0,1,0
0,0.55,0,1,0,0.6350,0,0,1
1,0.44,1,0,0,0.4780,0,0,1
0,0.18,1,0,0,0.3980,1,0,0
0,0.67,0,1,0,0.7160,0,0,1
1,0.45,0,0,1,0.5000,0,1,0
1,0.48,1,0,0,0.5580,0,1,0
0,0.25,0,1,0,0.3900,0,1,0
0,0.67,1,0,0,0.7830,0,1,0
1,0.37,0,0,1,0.4200,0,1,0
0,0.32,1,0,0,0.4270,0,1,0
1,0.48,1,0,0,0.5700,0,1,0
0,0.66,0,0,1,0.7500,0,0,1
1,0.61,1,0,0,0.7000,1,0,0
0,0.58,0,0,1,0.6890,0,1,0
1,0.19,1,0,0,0.2400,0,0,1
1,0.38,0,0,1,0.4300,0,1,0
0,0.27,1,0,0,0.3640,0,1,0
1,0.42,1,0,0,0.4800,0,1,0
1,0.60,1,0,0,0.7130,1,0,0
0,0.27,0,0,1,0.3480,1,0,0
1,0.29,0,1,0,0.3710,1,0,0
0,0.43,1,0,0,0.5670,0,1,0
1,0.48,1,0,0,0.5670,0,1,0
1,0.27,0,0,1,0.2940,0,0,1
0,0.44,1,0,0,0.5520,1,0,0
1,0.23,0,1,0,0.2630,0,0,1
0,0.36,0,1,0,0.5300,0,0,1
1,0.64,0,0,1,0.7250,1,0,0
1,0.29,0,0,1,0.3000,0,0,1
0,0.33,1,0,0,0.4930,0,1,0
0,0.66,0,1,0,0.7500,0,0,1
0,0.21,0,0,1,0.3430,1,0,0
1,0.27,1,0,0,0.3270,0,0,1
1,0.29,1,0,0,0.3180,0,0,1
0,0.31,1,0,0,0.4860,0,1,0
1,0.36,0,0,1,0.4100,0,1,0
1,0.49,0,1,0,0.5570,0,1,0
0,0.28,1,0,0,0.3840,1,0,0
0,0.43,0,0,1,0.5660,0,1,0
0,0.46,0,1,0,0.5880,0,1,0
1,0.57,1,0,0,0.6980,1,0,0
0,0.52,0,0,1,0.5940,0,1,0
0,0.31,0,0,1,0.4350,0,1,0
0,0.55,1,0,0,0.6200,0,0,1
1,0.50,1,0,0,0.5640,0,1,0
1,0.48,0,1,0,0.5590,0,1,0
0,0.22,0,0,1,0.3450,1,0,0
1,0.59,0,0,1,0.6670,1,0,0
1,0.34,1,0,0,0.4280,0,0,1
0,0.64,1,0,0,0.7720,0,0,1
1,0.29,0,0,1,0.3350,0,0,1
0,0.34,0,1,0,0.4320,0,1,0
0,0.61,1,0,0,0.7500,0,0,1
1,0.64,0,0,1,0.7110,1,0,0
0,0.29,1,0,0,0.4130,1,0,0
1,0.63,0,1,0,0.7060,1,0,0
0,0.29,0,1,0,0.4000,1,0,0
0,0.51,1,0,0,0.6270,0,1,0
0,0.24,0,0,1,0.3770,1,0,0
1,0.48,0,1,0,0.5750,0,1,0
1,0.18,1,0,0,0.2740,1,0,0
1,0.18,1,0,0,0.2030,0,0,1
1,0.33,0,1,0,0.3820,0,0,1
0,0.20,0,0,1,0.3480,1,0,0
1,0.29,0,0,1,0.3300,0,0,1
0,0.44,0,0,1,0.6300,1,0,0
0,0.65,0,0,1,0.8180,1,0,0
0,0.56,1,0,0,0.6370,0,0,1
0,0.52,0,0,1,0.5840,0,1,0
0,0.29,0,1,0,0.4860,1,0,0
0,0.47,0,1,0,0.5890,0,1,0
1,0.68,1,0,0,0.7260,0,0,1
1,0.31,0,0,1,0.3600,0,1,0
1,0.61,0,1,0,0.6250,0,0,1
1,0.19,0,1,0,0.2150,0,0,1
1,0.38,0,0,1,0.4300,0,1,0
0,0.26,1,0,0,0.4230,1,0,0
1,0.61,0,1,0,0.6740,1,0,0
1,0.40,1,0,0,0.4650,0,1,0
0,0.49,1,0,0,0.6520,0,1,0
1,0.56,1,0,0,0.6750,1,0,0
0,0.48,0,1,0,0.6600,0,1,0
1,0.52,1,0,0,0.5630,0,0,1
0,0.18,1,0,0,0.2980,1,0,0
0,0.56,0,0,1,0.5930,0,0,1
0,0.52,0,1,0,0.6440,0,1,0
0,0.18,0,1,0,0.2860,0,1,0
0,0.58,1,0,0,0.6620,0,0,1
0,0.39,0,1,0,0.5510,0,1,0
0,0.46,1,0,0,0.6290,0,1,0
0,0.40,0,1,0,0.4620,0,1,0
0,0.60,1,0,0,0.7270,0,0,1
1,0.36,0,1,0,0.4070,0,0,1
1,0.44,1,0,0,0.5230,0,1,0
1,0.28,1,0,0,0.3130,0,0,1
1,0.54,0,0,1,0.6260,1,0,0

One-hot test data:

# people_test_one_hot.txt
#
0,0.51,1,0,0,0.6120,0,1,0
0,0.32,0,1,0,0.4610,0,1,0
1,0.55,1,0,0,0.6270,1,0,0
1,0.25,0,0,1,0.2620,0,0,1
1,0.33,0,0,1,0.3730,0,0,1
0,0.29,0,1,0,0.4620,1,0,0
1,0.65,1,0,0,0.7270,1,0,0
0,0.43,0,1,0,0.5140,0,1,0
0,0.54,0,1,0,0.6480,0,0,1
1,0.61,0,1,0,0.7270,1,0,0
1,0.52,0,1,0,0.6360,1,0,0
1,0.30,0,1,0,0.3350,0,0,1
1,0.29,1,0,0,0.3140,0,0,1
0,0.47,0,0,1,0.5940,0,1,0
1,0.39,0,1,0,0.4780,0,1,0
1,0.47,0,0,1,0.5200,0,1,0
0,0.49,1,0,0,0.5860,0,1,0
0,0.63,0,0,1,0.6740,0,0,1
0,0.30,1,0,0,0.3920,1,0,0
0,0.61,0,0,1,0.6960,0,0,1
0,0.47,0,0,1,0.5870,0,1,0
1,0.30,0,0,1,0.3450,0,0,1
0,0.51,0,0,1,0.5800,0,1,0
0,0.24,1,0,0,0.3880,0,1,0
0,0.49,1,0,0,0.6450,0,1,0
1,0.66,0,0,1,0.7450,1,0,0
0,0.65,1,0,0,0.7690,1,0,0
0,0.46,0,1,0,0.5800,1,0,0
0,0.45,0,0,1,0.5180,0,1,0
0,0.47,1,0,0,0.6360,1,0,0
0,0.29,1,0,0,0.4480,1,0,0
0,0.57,0,0,1,0.6930,0,0,1
0,0.20,1,0,0,0.2870,0,0,1
0,0.35,1,0,0,0.4340,0,1,0
0,0.61,0,0,1,0.6700,0,0,1
0,0.31,0,0,1,0.3730,0,1,0
1,0.18,1,0,0,0.2080,0,0,1
1,0.26,0,0,1,0.2920,0,0,1
0,0.28,1,0,0,0.3640,0,0,1
0,0.59,0,0,1,0.6940,0,0,1

Drop-first training data:

# people_train_drop_first.txt
# sex (0 = male, 1 = female) - dependent variable
# age (div 100),
# state (michigan = 00, nebraska = 10, oklahoma = 01),
# income (div $100,000),
# politics type (conservative, moderate, liberal)
#
1,0.24,0,0,0.2950,0,1
0,0.39,0,1,0.5120,1,0
1,0.63,1,0,0.7580,0,0
0,0.36,0,0,0.4450,1,0
1,0.27,1,0,0.2860,0,1
1,0.50,1,0,0.5650,1,0
1,0.50,0,1,0.5500,1,0
0,0.19,0,1,0.3270,0,0
1,0.22,1,0,0.2770,1,0
0,0.39,0,1,0.4710,0,1
1,0.34,0,0,0.3940,1,0
0,0.22,0,0,0.3350,0,0
1,0.35,0,1,0.3520,0,1
0,0.33,1,0,0.4640,1,0
1,0.45,1,0,0.5410,1,0
1,0.42,1,0,0.5070,1,0
0,0.33,1,0,0.4680,1,0
1,0.25,0,1,0.3000,1,0
0,0.31,1,0,0.4640,0,0
1,0.27,0,0,0.3250,0,1
1,0.48,0,0,0.5400,1,0
0,0.64,1,0,0.7130,0,1
1,0.61,1,0,0.7240,0,0
1,0.54,0,1,0.6100,0,0
1,0.29,0,0,0.3630,0,0
1,0.50,0,1,0.5500,1,0
1,0.55,0,1,0.6250,0,0
1,0.40,0,0,0.5240,0,0
1,0.22,0,0,0.2360,0,1
1,0.68,1,0,0.7840,0,0
0,0.60,0,0,0.7170,0,1
0,0.34,0,1,0.4650,1,0
0,0.25,0,1,0.3710,0,0
0,0.31,1,0,0.4890,1,0
1,0.43,0,1,0.4800,1,0
1,0.58,1,0,0.6540,0,1
0,0.55,1,0,0.6070,0,1
0,0.43,1,0,0.5110,1,0
0,0.43,0,1,0.5320,1,0
0,0.21,0,0,0.3720,0,0
1,0.55,0,1,0.6460,0,0
1,0.64,1,0,0.7480,0,0
0,0.41,0,0,0.5880,1,0
1,0.64,0,1,0.7270,0,0
0,0.56,0,1,0.6660,0,1
1,0.31,0,1,0.3600,1,0
0,0.65,0,1,0.7010,0,1
1,0.55,0,1,0.6430,0,0
0,0.25,0,0,0.4030,0,0
1,0.46,0,1,0.5100,1,0
0,0.36,0,0,0.5350,0,0
1,0.52,1,0,0.5810,1,0
1,0.61,0,1,0.6790,0,0
1,0.57,0,1,0.6570,0,0
0,0.46,1,0,0.5260,1,0
0,0.62,0,0,0.6680,0,1
1,0.55,0,1,0.6270,0,0
0,0.22,0,1,0.2770,1,0
0,0.50,0,0,0.6290,0,0
0,0.32,1,0,0.4180,1,0
0,0.21,0,1,0.3560,0,0
1,0.44,1,0,0.5200,1,0
1,0.46,1,0,0.5170,1,0
1,0.62,1,0,0.6970,0,0
1,0.57,1,0,0.6640,0,0
0,0.67,0,1,0.7580,0,1
1,0.29,0,0,0.3430,0,1
1,0.53,0,0,0.6010,0,0
0,0.44,0,0,0.5480,1,0
1,0.46,1,0,0.5230,1,0
0,0.20,1,0,0.3010,1,0
0,0.38,0,0,0.5350,1,0
1,0.50,1,0,0.5860,1,0
1,0.33,1,0,0.4250,1,0
0,0.33,1,0,0.3930,1,0
1,0.26,1,0,0.4040,0,0
1,0.58,0,0,0.7070,0,0
1,0.43,0,1,0.4800,1,0
0,0.46,0,0,0.6440,0,0
1,0.60,0,0,0.7170,0,0
0,0.42,0,0,0.4890,1,0
0,0.56,0,1,0.5640,0,1
0,0.62,1,0,0.6630,0,1
0,0.50,0,0,0.6480,1,0
1,0.47,0,1,0.5200,1,0
0,0.67,1,0,0.8040,0,1
0,0.40,0,1,0.5040,1,0
1,0.42,1,0,0.4840,1,0
1,0.64,0,0,0.7200,0,0
0,0.47,0,0,0.5870,0,1
1,0.45,1,0,0.5280,1,0
0,0.25,0,1,0.4090,0,0
1,0.38,0,0,0.4840,0,0
1,0.55,0,1,0.6000,1,0
0,0.44,0,0,0.6060,1,0
1,0.33,0,0,0.4100,1,0
1,0.34,0,1,0.3900,1,0
1,0.27,1,0,0.3370,0,1
1,0.32,1,0,0.4070,1,0
1,0.42,0,1,0.4700,1,0
0,0.24,0,1,0.4030,0,0
1,0.42,1,0,0.5030,1,0
1,0.25,0,1,0.2800,0,1
1,0.51,1,0,0.5800,1,0
0,0.55,1,0,0.6350,0,1
1,0.44,0,0,0.4780,0,1
0,0.18,0,0,0.3980,0,0
0,0.67,1,0,0.7160,0,1
1,0.45,0,1,0.5000,1,0
1,0.48,0,0,0.5580,1,0
0,0.25,1,0,0.3900,1,0
0,0.67,0,0,0.7830,1,0
1,0.37,0,1,0.4200,1,0
0,0.32,0,0,0.4270,1,0
1,0.48,0,0,0.5700,1,0
0,0.66,0,1,0.7500,0,1
1,0.61,0,0,0.7000,0,0
0,0.58,0,1,0.6890,1,0
1,0.19,0,0,0.2400,0,1
1,0.38,0,1,0.4300,1,0
0,0.27,0,0,0.3640,1,0
1,0.42,0,0,0.4800,1,0
1,0.60,0,0,0.7130,0,0
0,0.27,0,1,0.3480,0,0
1,0.29,1,0,0.3710,0,0
0,0.43,0,0,0.5670,1,0
1,0.48,0,0,0.5670,1,0
1,0.27,0,1,0.2940,0,1
0,0.44,0,0,0.5520,0,0
1,0.23,1,0,0.2630,0,1
0,0.36,1,0,0.5300,0,1
1,0.64,0,1,0.7250,0,0
1,0.29,0,1,0.3000,0,1
0,0.33,0,0,0.4930,1,0
0,0.66,1,0,0.7500,0,1
0,0.21,0,1,0.3430,0,0
1,0.27,0,0,0.3270,0,1
1,0.29,0,0,0.3180,0,1
0,0.31,0,0,0.4860,1,0
1,0.36,0,1,0.4100,1,0
1,0.49,1,0,0.5570,1,0
0,0.28,0,0,0.3840,0,0
0,0.43,0,1,0.5660,1,0
0,0.46,1,0,0.5880,1,0
1,0.57,0,0,0.6980,0,0
0,0.52,0,1,0.5940,1,0
0,0.31,0,1,0.4350,1,0
0,0.55,0,0,0.6200,0,1
1,0.50,0,0,0.5640,1,0
1,0.48,1,0,0.5590,1,0
0,0.22,0,1,0.3450,0,0
1,0.59,0,1,0.6670,0,0
1,0.34,0,0,0.4280,0,1
0,0.64,0,0,0.7720,0,1
1,0.29,0,1,0.3350,0,1
0,0.34,1,0,0.4320,1,0
0,0.61,0,0,0.7500,0,1
1,0.64,0,1,0.7110,0,0
0,0.29,0,0,0.4130,0,0
1,0.63,1,0,0.7060,0,0
0,0.29,1,0,0.4000,0,0
0,0.51,0,0,0.6270,1,0
0,0.24,0,1,0.3770,0,0
1,0.48,1,0,0.5750,1,0
1,0.18,0,0,0.2740,0,0
1,0.18,0,0,0.2030,0,1
1,0.33,1,0,0.3820,0,1
0,0.20,0,1,0.3480,0,0
1,0.29,0,1,0.3300,0,1
0,0.44,0,1,0.6300,0,0
0,0.65,0,1,0.8180,0,0
0,0.56,0,0,0.6370,0,1
0,0.52,0,1,0.5840,1,0
0,0.29,1,0,0.4860,0,0
0,0.47,1,0,0.5890,1,0
1,0.68,0,0,0.7260,0,1
1,0.31,0,1,0.3600,1,0
1,0.61,1,0,0.6250,0,1
1,0.19,1,0,0.2150,0,1
1,0.38,0,1,0.4300,1,0
0,0.26,0,0,0.4230,0,0
1,0.61,1,0,0.6740,0,0
1,0.40,0,0,0.4650,1,0
0,0.49,0,0,0.6520,1,0
1,0.56,0,0,0.6750,0,0
0,0.48,1,0,0.6600,1,0
1,0.52,0,0,0.5630,0,1
0,0.18,0,0,0.2980,0,0
0,0.56,0,1,0.5930,0,1
0,0.52,1,0,0.6440,1,0
0,0.18,1,0,0.2860,1,0
0,0.58,0,0,0.6620,0,1
0,0.39,1,0,0.5510,1,0
0,0.46,0,0,0.6290,1,0
0,0.40,1,0,0.4620,1,0
0,0.60,0,0,0.7270,0,1
1,0.36,1,0,0.4070,0,1
1,0.44,0,0,0.5230,1,0
1,0.28,0,0,0.3130,0,1
1,0.54,0,1,0.6260,0,0

Drop-first test data:

# people_test_drop_first.txt
#
0,0.51,0,0,0.6120,1,0
0,0.32,1,0,0.4610,1,0
1,0.55,0,0,0.6270,0,0
1,0.25,0,1,0.2620,0,1
1,0.33,0,1,0.3730,0,1
0,0.29,1,0,0.4620,0,0
1,0.65,0,0,0.7270,0,0
0,0.43,1,0,0.5140,1,0
0,0.54,1,0,0.6480,0,1
1,0.61,1,0,0.7270,0,0
1,0.52,1,0,0.6360,0,0
1,0.30,1,0,0.3350,0,1
1,0.29,0,0,0.3140,0,1
0,0.47,0,1,0.5940,1,0
1,0.39,1,0,0.4780,1,0
1,0.47,0,1,0.5200,1,0
0,0.49,0,0,0.5860,1,0
0,0.63,0,1,0.6740,0,1
0,0.30,0,0,0.3920,0,0
0,0.61,0,1,0.6960,0,1
0,0.47,0,1,0.5870,1,0
1,0.30,0,1,0.3450,0,1
0,0.51,0,1,0.5800,1,0
0,0.24,0,0,0.3880,1,0
0,0.49,0,0,0.6450,1,0
1,0.66,0,1,0.7450,0,0
0,0.65,0,0,0.7690,0,0
0,0.46,1,0,0.5800,0,0
0,0.45,0,1,0.5180,1,0
0,0.47,0,0,0.6360,0,0
0,0.29,0,0,0.4480,0,0
0,0.57,0,1,0.6930,0,1
0,0.20,0,0,0.2870,0,1
0,0.35,0,0,0.4340,1,0
0,0.61,0,1,0.6700,0,1
0,0.31,0,1,0.3730,1,0
1,0.18,0,0,0.2080,0,1
1,0.26,0,1,0.2920,0,1
0,0.28,0,0,0.3640,0,1
0,0.59,0,1,0.6940,0,1

Posted in Machine Learning, Scikit | Leave a comment

An Example of Isotonic Regression Using the scikit Library

Posted on May 21, 2026 by jamesdmccaffrey

Isotonic regression is a very niche machine learning technique. The basic scenario is you have a single predictor variable (for example, the size of something) and a single target value to predict (for example, the porosity of the something), where the values of the predicted targets consistently increase or decrease (with a few exceptions allowed).

I put together a demo using the scikit-learn IsotonicRegression module. But what I found most interesting was that, when I did my research, I found a lot of conflicting, contradictory, and just plain incorrect information on the Internet. Briefly, I tracked down the primary source research papers and discovered that isotonic regression is quite complicated — much more complicated than most of the Internet resources indicated.

The following graph illustrates my demo. The artificial training data has 10 x values: (0.0, 1.0, 2.0, . . 9.0). The training y values increase with just one exception: (3.0, 9.0, 14.0, 18.0, 21.0, 23.0, 24.0, 20.0, 25.0, 27.0). The 10 training data items are the large red dots. I generated 40 training x data items and used the trained model to compute the 40 predicted y values. They are the medium size blue dots on the graph. And to illustrate why isotonic regression might be used, I added a simple linear regression line (the small green dots).

There’s no significant moral to this post/story except maybe to point out that just because some information is on the Internet, it doesn’t mean that information is accurate. (Including this blog post!)

Two pages from a research paper that explains how isotonic regression works. Complicated stuff!

Demo program.

# isotonic_regression_scikit.py

import numpy as np
from sklearn.isotonic import IsotonicRegression

np.set_printoptions(precision=1, suppress=True)

# training data
X = np.array([0,1,2,3,4,5,6,7,8,9],
  dtype=np.float64)
y = np.array([3, 9, 14, 18, 21, 23,
  24, 20, 25, 27], dtype=np.float32)

print(X); input()
print(y); input()

iso_reg = IsotonicRegression(out_of_bounds='clip')
iso_reg.fit(X, y)
pred = iso_reg.predict(X)
print(pred); input()

x = -1.0
for i in range(60):
 y_pred = iso_reg.predict([x])
 print("%0.1f  %0.1f" % (x, y_pred[0]))
 x += 0.25

print("\nEnd demo ")

Posted in Machine Learning, Scikit | Leave a comment