James D. McCaffrey

Decision Tree Regression on the Diabetes Dataset Using the scikit Library

Posted on April 1, 2026 by jamesdmccaffrey

I had been working on a decision tree regression system, implemented from scratch, using the C# language. In order to validate from from-scratch implementation, I figured I’d run some data through my from-scratch implementation and the scikit DecisionTreeRegressor module to make sure I got the same results.

For my investigation, I decided to use the well-known diabetes dataset. The goal of the dataset is to predict a diabetes score from 10 predictor variables. The data 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
. . .

The 10 predictor variables are age, sex, body mass index, blood pressure, serum-cholesterol, low-density lipoproteins, high-density lipoproteins, total-cholesterol, triglycerides, blood-sugar. The target diabetes score is in last column.

There are 442 items in the diabetes dataset. I split the data into a 342-item training set and a 100-item test set. I did not normalize the data.

The output of the scikit demo is:

Decision tree regression using scikit

Loading diabetes train (340), test (100) data
Done

First three X predictors:
[ 59.0000   2.0000  32.1000 . . .   87.0000]
[ 48.0000   1.0000  21.6000  . . .  69.0000]
[ 72.0000   2.0000  30.5000  . . .  85.0000]

First three y targets:
151.0000
75.0000
141.0000

Setting max_depth = 12

Accuracy on train (within 0.10) = 0.8304
Accuracy on test (within 0.10) = 0.1200

MSE on train = 190.5995
MSE on test = 6936.7650

Predicting for:
[[ 59.0000   2.0000  32.1000 . . .  87.0000]]
Predicted y = 151.0000

Done

I set the DecisionTreeRegressor max-depth parameter to 12, and left all other parameters with default values, in particular min_samples_split=2 and min_samples_leaf=1.

The results show the key weakness of decision tree regression: the model almost always overfits the training data and therefore gives poor prediction accuracy on new, previously unseen data. This is why decision tree regression is rarely used by itself — instead many decision trees are used together in common ensemble techniques: bagging tree (bootstrap aggregation), random forest tree, adaptive boosting, gradient boosting.

The output of my from-scratch C# implementation was almost the same:

Begin decision tree regression (no stack construction)

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

First three train X:
 59.0000  2.0000 32.1000 . . . 87.0000
 48.0000  1.0000 21.6000 . . . 69.0000
 72.0000  2.0000 30.5000 . . . 85.0000

First three train y:
151.0000
 75.0000
141.0000

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

Creating and training tree
Done

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

MSE train = 190.5995
MSE test = 6936.0606

Predicting for trainX[0] =
  59.0000   2.0000  32.1000 . . . 87.0000
Predicted y = 151.0000

IF
column 8  >    4.8203 AND
column 3  <= 112.0000 AND
column 9  <=  98.0000 AND
column 2  <=  32.1000 AND
column 3  >   83.0000 AND
column 5  >   84.2000 AND
column 2  >   30.0000 AND
column 0  >   40.0000 AND
column 8  <=   5.2470 AND
column 6  <=  38.0000 AND
THEN
predicted = 151.0000

End demo

The two systems (scikit version and C# version) don't give identical results because they use slightly different algorithms for splitting subtrees when constructing the decision tree.

Good fun.

Each node in a decision tree has a left child and a right child. Tree children are neither sons not daughters.

I am a huge fan of 1950s science fiction movies. A surprising number of these movies feature a daughter or granddaughter who plays a key role. Here are three examples, all from 1957 (a good year for science fiction movies).

Left: In "20 Million Miles to Earth" (1957), a secret U.S. mission to Venus returns to Earth but crash lands off the coast of Italy. The spacecraft has a small egg that is discovered by scientist Dr. Leonardo. Leonardo's granddaughter Marisa (actress Joan Taylor) is a medical student who is called to take care of the injured spacemen. The egg hatches and a lizard like creature emerges, and soo grows to an enormous size. A pretty good movie. I grade it my personal solid B.

Center: In "The Brain from Planet Arous" (1957), as you might expect, an evil alien brain creature from the planet Arous lands on Earth. The alien has mind control powers and takes over the body of scientist Steve March. Steve's fiancee Sally (actress Joyce Meadows) is the daughter of older scientist John Fallon. The brain is defeated. This movie is known for the creative floating brain alien with glowing eyes. I give it a B- grade.

Right: In "Monster from Green Hell" (1957), the U.S. space program is sending animals and insects into space. One rocket that is carrying wasps malfunctions and crash lands in Africa. Wasps + cosmic radiation = giant wasps. Scientist Dr. Lorentz and his daughter Lorna (actress Barbara Turner) are in the area and help U.S. scientist Dr. Quent Brady to try and deal with the wasps. Luckily, a well-timed volcanic eruption solves the wasp problem.

Demo code. Replace the "lt" with the Boolean less-than operator.

# decision_tree_scikit.py

import numpy as np
from sklearn.datasets import load_diabetes
from sklearn.tree import DecisionTreeRegressor

np.set_printoptions(precision=4, suppress=True,
  floatmode='fixed', linewidth=120)

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

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)

    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]
    # print(y_pred); input()
    sum += (y - y_pred) * (y - y_pred)

  return sum / n

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

# class sklearn.tree.DecisionTreeRegressor(*,
# criterion='squared_error', splitter='best',
# max_depth=None, min_samples_split=2,
# min_samples_leaf=1, min_weight_fraction_leaf=0.0,
# max_features=None, random_state=None,
# max_leaf_nodes=None, min_impurity_decrease=0.0,
# ccp_alpha=0.0, monotonic_cst=None

print("\nDecision tree regression using scikit ")

print("\nLoading diabetes train (342), test (100) data ")
train_file = ".\\Data\\diabetes_train_342.txt"
train_X = np.loadtxt(train_file, comments="#",
  usecols=[0,1,2,3,4,5,6,7,8,9],
  delimiter=",",  dtype=np.float64)
train_y = np.loadtxt(train_file, comments="#", usecols=10,
  delimiter=",",  dtype=np.float64)

test_file = ".\\Data\\diabetes_test_100.txt"
test_X = np.loadtxt(test_file, comments="#",
  usecols=[0,1,2,3,4,5,6,7,8,9],
  delimiter=",",  dtype=np.float64)
test_y = np.loadtxt(test_file, comments="#", usecols=10,
  delimiter=",",  dtype=np.float64)
print("Done ")

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])

maxd = 12
print("\nSetting max_depth = " + str(maxd))
model = DecisionTreeRegressor(max_depth=maxd,
  random_state=0)
model.fit(train_X, train_y)

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

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

x = train_X[0].reshape(1,-1)
print("\nPredicting for: ")
print(x)
y_pred = model.predict(x)[0]
print("Predicted y = %0.4f " % y_pred)

print("\nDone ")

Training data:

# diabetes_train_342.txt
# 10 predictors, target y
# 342 items
# www4.stat.ncsu.edu/~boos/var.select/diabetes.tab.txt
#
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
24, 1, 25.3, 84.00, 198, 131.4, 40, 5.00, 4.8903, 89, 206
50, 1, 23.0, 101.00, 192, 125.4, 52, 4.00, 4.2905, 80, 135
23, 1, 22.6, 89.00, 139, 64.8, 61, 2.00, 4.1897, 68, 97
36, 2, 22.0, 90.00, 160, 99.6, 50, 3.00, 3.9512, 82, 138
66, 2, 26.2, 114.00, 255, 185.0, 56, 4.55, 4.2485, 92, 63
60, 2, 32.1, 83.00, 179, 119.4, 42, 4.00, 4.4773, 94, 110
29, 1, 30.0, 85.00, 180, 93.4, 43, 4.00, 5.3845, 88, 310
22, 1, 18.6, 97.00, 114, 57.6, 46, 2.00, 3.9512, 83, 101
56, 2, 28.0, 85.00, 184, 144.8, 32, 6.00, 3.5835, 77, 69
53, 1, 23.7, 92.00, 186, 109.2, 62, 3.00, 4.3041, 81, 179
50, 2, 26.2, 97.00, 186, 105.4, 49, 4.00, 5.0626, 88, 185
61, 1, 24.0, 91.00, 202, 115.4, 72, 3.00, 4.2905, 73, 118
34, 2, 24.7, 118.00, 254, 184.2, 39, 7.00, 5.0370, 81, 171
47, 1, 30.3, 109.00, 207, 100.2, 70, 3.00, 5.2149, 98, 166
68, 2, 27.5, 111.00, 214, 147.0, 39, 5.00, 4.9416, 91, 144
38, 1, 25.4, 84.00, 162, 103.0, 42, 4.00, 4.4427, 87, 97
41, 1, 24.7, 83.00, 187, 108.2, 60, 3.00, 4.5433, 78, 168
35, 1, 21.1, 82.00, 156, 87.8, 50, 3.00, 4.5109, 95, 68
25, 2, 24.3, 95.00, 162, 98.6, 54, 3.00, 3.8501, 87, 49
25, 1, 26.0, 92.00, 187, 120.4, 56, 3.00, 3.9703, 88, 68
61, 2, 32.0, 103.67, 210, 85.2, 35, 6.00, 6.1070, 124, 245
31, 1, 29.7, 88.00, 167, 103.4, 48, 4.00, 4.3567, 78, 184
30, 2, 25.2, 83.00, 178, 118.4, 34, 5.00, 4.8520, 83, 202
19, 1, 19.2, 87.00, 124, 54.0, 57, 2.00, 4.1744, 90, 137
42, 1, 31.9, 83.00, 158, 87.6, 53, 3.00, 4.4659, 101, 85
63, 1, 24.4, 73.00, 160, 91.4, 48, 3.00, 4.6347, 78, 131
67, 2, 25.8, 113.00, 158, 54.2, 64, 2.00, 5.2933, 104, 283
32, 1, 30.5, 89.00, 182, 110.6, 56, 3.00, 4.3438, 89, 129
42, 1, 20.3, 71.00, 161, 81.2, 66, 2.00, 4.2341, 81, 59
58, 2, 38.0, 103.00, 150, 107.2, 22, 7.00, 4.6444, 98, 341
57, 1, 21.7, 94.00, 157, 58.0, 82, 2.00, 4.4427, 92, 87
53, 1, 20.5, 78.00, 147, 84.2, 52, 3.00, 3.9890, 75, 65
62, 2, 23.5, 80.33, 225, 112.8, 86, 2.62, 4.8752, 96, 102
52, 1, 28.5, 110.00, 195, 97.2, 60, 3.00, 5.2417, 85, 265
46, 1, 27.4, 78.00, 171, 88.0, 58, 3.00, 4.8283, 90, 276
48, 2, 33.0, 123.00, 253, 163.6, 44, 6.00, 5.4250, 97, 252
48, 2, 27.7, 73.00, 191, 119.4, 46, 4.00, 4.8520, 92, 90
50, 2, 25.6, 101.00, 229, 162.2, 43, 5.00, 4.7791, 114, 100
21, 1, 20.1, 63.00, 135, 69.0, 54, 3.00, 4.0943, 89, 55
32, 2, 25.4, 90.33, 153, 100.4, 34, 4.50, 4.5326, 83, 61
54, 1, 24.2, 74.00, 204, 109.0, 82, 2.00, 4.1744, 109, 92
61, 2, 32.7, 97.00, 177, 118.4, 29, 6.00, 4.9972, 87, 259
56, 2, 23.1, 104.00, 181, 116.4, 47, 4.00, 4.4773, 79, 53
33, 1, 25.3, 85.00, 155, 85.0, 51, 3.00, 4.5539, 70, 190
27, 1, 19.6, 78.00, 128, 68.0, 43, 3.00, 4.4427, 71, 142
67, 2, 22.5, 98.00, 191, 119.2, 61, 3.00, 3.9890, 86, 75
37, 2, 27.7, 93.00, 180, 119.4, 30, 6.00, 5.0304, 88, 142
58, 1, 25.7, 99.00, 157, 91.6, 49, 3.00, 4.4067, 93, 155
65, 2, 27.9, 103.00, 159, 96.8, 42, 4.00, 4.6151, 86, 225
34, 1, 25.5, 93.00, 218, 144.0, 57, 4.00, 4.4427, 88, 59
46, 1, 24.9, 115.00, 198, 129.6, 54, 4.00, 4.2767, 103, 104
35, 1, 28.7, 97.00, 204, 126.8, 64, 3.00, 4.1897, 93, 182
37, 1, 21.8, 84.00, 184, 101.0, 73, 3.00, 3.9120, 93, 128
37, 1, 30.2, 87.00, 166, 96.0, 40, 4.15, 5.0106, 87, 52
41, 1, 20.5, 80.00, 124, 48.8, 64, 2.00, 4.0254, 75, 37
60, 1, 20.4, 105.00, 198, 78.4, 99, 2.00, 4.6347, 79, 170
66, 2, 24.0, 98.00, 236, 146.4, 58, 4.00, 5.0626, 96, 170
29, 1, 26.0, 83.00, 141, 65.2, 64, 2.00, 4.0775, 83, 61
37, 2, 26.8, 79.00, 157, 98.0, 28, 6.00, 5.0434, 96, 144
41, 2, 25.7, 83.00, 181, 106.6, 66, 3.00, 3.7377, 85, 52
39, 1, 22.9, 77.00, 204, 143.2, 46, 4.00, 4.3041, 74, 128
67, 2, 24.0, 83.00, 143, 77.2, 49, 3.00, 4.4308, 94, 71
36, 2, 24.1, 112.00, 193, 125.0, 35, 6.00, 5.1059, 95, 163
46, 2, 24.7, 85.00, 174, 123.2, 30, 6.00, 4.6444, 96, 150
60, 2, 25.0, 89.67, 185, 120.8, 46, 4.02, 4.5109, 92, 97
59, 2, 23.6, 83.00, 165, 100.0, 47, 4.00, 4.4998, 92, 160
53, 1, 22.1, 93.00, 134, 76.2, 46, 3.00, 4.0775, 96, 178
48, 1, 19.9, 91.00, 189, 109.6, 69, 3.00, 3.9512, 101, 48
48, 1, 29.5, 131.00, 207, 132.2, 47, 4.00, 4.9345, 106, 270
66, 2, 26.0, 91.00, 264, 146.6, 65, 4.00, 5.5683, 87, 202
52, 2, 24.5, 94.00, 217, 149.4, 48, 5.00, 4.5850, 89, 111
52, 2, 26.6, 111.00, 209, 126.4, 61, 3.00, 4.6821, 109, 85
46, 2, 23.5, 87.00, 181, 114.8, 44, 4.00, 4.7095, 98, 42
40, 2, 29.0, 115.00, 97, 47.2, 35, 2.77, 4.3041, 95, 170
22, 1, 23.0, 73.00, 161, 97.8, 54, 3.00, 3.8286, 91, 200
50, 1, 21.0, 88.00, 140, 71.8, 35, 4.00, 5.1120, 71, 252
20, 1, 22.9, 87.00, 191, 128.2, 53, 4.00, 3.8918, 85, 113
68, 1, 27.5, 107.00, 241, 149.6, 64, 4.00, 4.9200, 90, 143
52, 2, 24.3, 86.00, 197, 133.6, 44, 5.00, 4.5747, 91, 51
44, 1, 23.1, 87.00, 213, 126.4, 77, 3.00, 3.8712, 72, 52
38, 1, 27.3, 81.00, 146, 81.6, 47, 3.00, 4.4659, 81, 210
49, 1, 22.7, 65.33, 168, 96.2, 62, 2.71, 3.8918, 60, 65
61, 1, 33.0, 95.00, 182, 114.8, 54, 3.00, 4.1897, 74, 141
29, 2, 19.4, 83.00, 152, 105.8, 39, 4.00, 3.5835, 83, 55
61, 1, 25.8, 98.00, 235, 125.8, 76, 3.00, 5.1120, 82, 134
34, 2, 22.6, 75.00, 166, 91.8, 60, 3.00, 4.2627, 108, 42
36, 1, 21.9, 89.00, 189, 105.2, 68, 3.00, 4.3694, 96, 111
52, 1, 24.0, 83.00, 167, 86.6, 71, 2.00, 3.8501, 94, 98
61, 1, 31.2, 79.00, 235, 156.8, 47, 5.00, 5.0499, 96, 164
43, 1, 26.8, 123.00, 193, 102.2, 67, 3.00, 4.7791, 94, 48
35, 1, 20.4, 65.00, 187, 105.6, 67, 2.79, 4.2767, 78, 96
27, 1, 24.8, 91.00, 189, 106.8, 69, 3.00, 4.1897, 69, 90
29, 1, 21.0, 71.00, 156, 97.0, 38, 4.00, 4.6540, 90, 162
64, 2, 27.3, 109.00, 186, 107.6, 38, 5.00, 5.3083, 99, 150
41, 1, 34.6, 87.33, 205, 142.6, 41, 5.00, 4.6728, 110, 279
49, 2, 25.9, 91.00, 178, 106.6, 52, 3.00, 4.5747, 75, 92
48, 1, 20.4, 98.00, 209, 139.4, 46, 5.00, 4.7707, 78, 83
53, 1, 28.0, 88.00, 233, 143.8, 58, 4.00, 5.0499, 91, 128
53, 2, 22.2, 113.00, 197, 115.2, 67, 3.00, 4.3041, 100, 102
23, 1, 29.0, 90.00, 216, 131.4, 65, 3.00, 4.5850, 91, 302
65, 2, 30.2, 98.00, 219, 160.6, 40, 5.00, 4.5218, 84, 198
41, 1, 32.4, 94.00, 171, 104.4, 56, 3.00, 3.9703, 76, 95
55, 2, 23.4, 83.00, 166, 101.6, 46, 4.00, 4.5218, 96, 53
22, 1, 19.3, 82.00, 156, 93.2, 52, 3.00, 3.9890, 71, 134
56, 1, 31.0, 78.67, 187, 141.4, 34, 5.50, 4.0604, 90, 144
54, 2, 30.6, 103.33, 144, 79.8, 30, 4.80, 5.1417, 101, 232
59, 2, 25.5, 95.33, 190, 139.4, 35, 5.43, 4.3567, 117, 81
60, 2, 23.4, 88.00, 153, 89.8, 58, 3.00, 3.2581, 95, 104
54, 1, 26.8, 87.00, 206, 122.0, 68, 3.00, 4.3820, 80, 59
25, 1, 28.3, 87.00, 193, 128.0, 49, 4.00, 4.3820, 92, 246
54, 2, 27.7, 113.00, 200, 128.4, 37, 5.00, 5.1533, 113, 297
55, 1, 36.6, 113.00, 199, 94.4, 43, 4.63, 5.7301, 97, 258
40, 2, 26.5, 93.00, 236, 147.0, 37, 7.00, 5.5607, 92, 229
62, 2, 31.8, 115.00, 199, 128.6, 44, 5.00, 4.8828, 98, 275
65, 1, 24.4, 120.00, 222, 135.6, 37, 6.00, 5.5094, 124, 281
33, 2, 25.4, 102.00, 206, 141.0, 39, 5.00, 4.8675, 105, 179
53, 1, 22.0, 94.00, 175, 88.0, 59, 3.00, 4.9416, 98, 200
35, 1, 26.8, 98.00, 162, 103.6, 45, 4.00, 4.2047, 86, 200
66, 1, 28.0, 101.00, 195, 129.2, 40, 5.00, 4.8598, 94, 173
62, 2, 33.9, 101.00, 221, 156.4, 35, 6.00, 4.9972, 103, 180
50, 2, 29.6, 94.33, 300, 242.4, 33, 9.09, 4.8122, 109, 84
47, 1, 28.6, 97.00, 164, 90.6, 56, 3.00, 4.4659, 88, 121
47, 2, 25.6, 94.00, 165, 74.8, 40, 4.00, 5.5255, 93, 161
24, 1, 20.7, 87.00, 149, 80.6, 61, 2.00, 3.6109, 78, 99
58, 2, 26.2, 91.00, 217, 124.2, 71, 3.00, 4.6913, 68, 109
34, 1, 20.6, 87.00, 185, 112.2, 58, 3.00, 4.3041, 74, 115
51, 1, 27.9, 96.00, 196, 122.2, 42, 5.00, 5.0689, 120, 268
31, 2, 35.3, 125.00, 187, 112.4, 48, 4.00, 4.8903, 109, 274
22, 1, 19.9, 75.00, 175, 108.6, 54, 3.00, 4.1271, 72, 158
53, 2, 24.4, 92.00, 214, 146.0, 50, 4.00, 4.4998, 97, 107
37, 2, 21.4, 83.00, 128, 69.6, 49, 3.00, 3.8501, 84, 83
28, 1, 30.4, 85.00, 198, 115.6, 67, 3.00, 4.3438, 80, 103
47, 1, 31.6, 84.00, 154, 88.0, 30, 5.10, 5.1985, 105, 272
23, 1, 18.8, 78.00, 145, 72.0, 63, 2.00, 3.9120, 86, 85
50, 1, 31.0, 123.00, 178, 105.0, 48, 4.00, 4.8283, 88, 280
58, 2, 36.7, 117.00, 166, 93.8, 44, 4.00, 4.9488, 109, 336
55, 1, 32.1, 110.00, 164, 84.2, 42, 4.00, 5.2417, 90, 281
60, 2, 27.7, 107.00, 167, 114.6, 38, 4.00, 4.2767, 95, 118
41, 1, 30.8, 81.00, 214, 152.0, 28, 7.60, 5.1358, 123, 317
60, 2, 27.5, 106.00, 229, 143.8, 51, 4.00, 5.1417, 91, 235
40, 1, 26.9, 92.00, 203, 119.8, 70, 3.00, 4.1897, 81, 60
57, 2, 30.7, 90.00, 204, 147.8, 34, 6.00, 4.7095, 93, 174
37, 1, 38.3, 113.00, 165, 94.6, 53, 3.00, 4.4659, 79, 259
40, 2, 31.9, 95.00, 198, 135.6, 38, 5.00, 4.8040, 93, 178
33, 1, 35.0, 89.00, 200, 130.4, 42, 4.76, 4.9273, 101, 128
32, 2, 27.8, 89.00, 216, 146.2, 55, 4.00, 4.3041, 91, 96
35, 2, 25.9, 81.00, 174, 102.4, 31, 6.00, 5.3132, 82, 126
55, 1, 32.9, 102.00, 164, 106.2, 41, 4.00, 4.4308, 89, 288
49, 1, 26.0, 93.00, 183, 100.2, 64, 3.00, 4.5433, 88, 88
39, 2, 26.3, 115.00, 218, 158.2, 32, 7.00, 4.9345, 109, 292
60, 2, 22.3, 113.00, 186, 125.8, 46, 4.00, 4.2627, 94, 71
67, 2, 28.3, 93.00, 204, 132.2, 49, 4.00, 4.7362, 92, 197
41, 2, 32.0, 109.00, 251, 170.6, 49, 5.00, 5.0562, 103, 186
44, 1, 25.4, 95.00, 162, 92.6, 53, 3.00, 4.4067, 83, 25
48, 2, 23.3, 89.33, 212, 142.8, 46, 4.61, 4.7536, 98, 84
45, 1, 20.3, 74.33, 190, 126.2, 49, 3.88, 4.3041, 79, 96
47, 1, 30.4, 120.00, 199, 120.0, 46, 4.00, 5.1059, 87, 195
46, 1, 20.6, 73.00, 172, 107.0, 51, 3.00, 4.2485, 80, 53
36, 2, 32.3, 115.00, 286, 199.4, 39, 7.00, 5.4723, 112, 217
34, 1, 29.2, 73.00, 172, 108.2, 49, 4.00, 4.3041, 91, 172
53, 2, 33.1, 117.00, 183, 119.0, 48, 4.00, 4.3820, 106, 131
61, 1, 24.6, 101.00, 209, 106.8, 77, 3.00, 4.8363, 88, 214
37, 1, 20.2, 81.00, 162, 87.8, 63, 3.00, 4.0254, 88, 59
33, 2, 20.8, 84.00, 125, 70.2, 46, 3.00, 3.7842, 66, 70
68, 1, 32.8, 105.67, 205, 116.4, 40, 5.13, 5.4931, 117, 220
49, 2, 31.9, 94.00, 234, 155.8, 34, 7.00, 5.3982, 122, 268
48, 1, 23.9, 109.00, 232, 105.2, 37, 6.00, 6.1070, 96, 152
55, 2, 24.5, 84.00, 179, 105.8, 66, 3.00, 3.5835, 87, 47
43, 1, 22.1, 66.00, 134, 77.2, 45, 3.00, 4.0775, 80, 74
60, 2, 33.0, 97.00, 217, 125.6, 45, 5.00, 5.4467, 112, 295
31, 2, 19.0, 93.00, 137, 73.0, 47, 3.00, 4.4427, 78, 101
53, 2, 27.3, 82.00, 119, 55.0, 39, 3.00, 4.8283, 93, 151
67, 1, 22.8, 87.00, 166, 98.6, 52, 3.00, 4.3438, 92, 127
61, 2, 28.2, 106.00, 204, 132.0, 52, 4.00, 4.6052, 96, 237
62, 1, 28.9, 87.33, 206, 127.2, 33, 6.24, 5.4337, 99, 225
60, 1, 25.6, 87.00, 207, 125.8, 69, 3.00, 4.1109, 84, 81
42, 1, 24.9, 91.00, 204, 141.8, 38, 5.00, 4.7958, 89, 151
38, 2, 26.8, 105.00, 181, 119.2, 37, 5.00, 4.8203, 91, 107
62, 1, 22.4, 79.00, 222, 147.4, 59, 4.00, 4.3567, 76, 64
61, 2, 26.9, 111.00, 236, 172.4, 39, 6.00, 4.8122, 89, 138
61, 2, 23.1, 113.00, 186, 114.4, 47, 4.00, 4.8122, 105, 185
53, 1, 28.6, 88.00, 171, 98.8, 41, 4.00, 5.0499, 99, 265
28, 2, 24.7, 97.00, 175, 99.6, 32, 5.00, 5.3799, 87, 101
26, 2, 30.3, 89.00, 218, 152.2, 31, 7.00, 5.1591, 82, 137
30, 1, 21.3, 87.00, 134, 63.0, 63, 2.00, 3.6889, 66, 143
50, 1, 26.1, 109.00, 243, 160.6, 62, 4.00, 4.6250, 89, 141
48, 1, 20.2, 95.00, 187, 117.4, 53, 4.00, 4.4188, 85, 79
51, 1, 25.2, 103.00, 176, 112.2, 37, 5.00, 4.8978, 90, 292
47, 2, 22.5, 82.00, 131, 66.8, 41, 3.00, 4.7536, 89, 178
64, 2, 23.5, 97.00, 203, 129.0, 59, 3.00, 4.3175, 77, 91
51, 2, 25.9, 76.00, 240, 169.0, 39, 6.00, 5.0752, 96, 116
30, 1, 20.9, 104.00, 152, 83.8, 47, 3.00, 4.6634, 97, 86
56, 2, 28.7, 99.00, 208, 146.4, 39, 5.00, 4.7274, 97, 122
42, 1, 22.1, 85.00, 213, 138.6, 60, 4.00, 4.2767, 94, 72
62, 2, 26.7, 115.00, 183, 124.0, 35, 5.00, 4.7875, 100, 129
34, 1, 31.4, 87.00, 149, 93.8, 46, 3.00, 3.8286, 77, 142
60, 1, 22.2, 104.67, 221, 105.4, 60, 3.68, 5.6276, 93, 90
64, 1, 21.0, 92.33, 227, 146.8, 65, 3.49, 4.3307, 102, 158
39, 2, 21.2, 90.00, 182, 110.4, 60, 3.00, 4.0604, 98, 39
71, 2, 26.5, 105.00, 281, 173.6, 55, 5.00, 5.5683, 84, 196
48, 2, 29.2, 110.00, 218, 151.6, 39, 6.00, 4.9200, 98, 222
79, 2, 27.0, 103.00, 169, 110.8, 37, 5.00, 4.6634, 110, 277
40, 1, 30.7, 99.00, 177, 85.4, 50, 4.00, 5.3375, 85, 99
49, 2, 28.8, 92.00, 207, 140.0, 44, 5.00, 4.7449, 92, 196
51, 1, 30.6, 103.00, 198, 106.6, 57, 3.00, 5.1475, 100, 202
57, 1, 30.1, 117.00, 202, 139.6, 42, 5.00, 4.6250, 120, 155
59, 2, 24.7, 114.00, 152, 104.8, 29, 5.00, 4.5109, 88, 77
51, 1, 27.7, 99.00, 229, 145.6, 69, 3.00, 4.2767, 77, 191
74, 1, 29.8, 101.00, 171, 104.8, 50, 3.00, 4.3944, 86, 70
67, 1, 26.7, 105.00, 225, 135.4, 69, 3.00, 4.6347, 96, 73
49, 1, 19.8, 88.00, 188, 114.8, 57, 3.00, 4.3944, 93, 49
57, 1, 23.3, 88.00, 155, 63.6, 78, 2.00, 4.2047, 78, 65
56, 2, 35.1, 123.00, 164, 95.0, 38, 4.00, 5.0434, 117, 263
52, 2, 29.7, 109.00, 228, 162.8, 31, 8.00, 5.1417, 103, 248
69, 1, 29.3, 124.00, 223, 139.0, 54, 4.00, 5.0106, 102, 296
37, 1, 20.3, 83.00, 185, 124.6, 38, 5.00, 4.7185, 88, 214
24, 1, 22.5, 89.00, 141, 68.0, 52, 3.00, 4.6540, 84, 185
55, 2, 22.7, 93.00, 154, 94.2, 53, 3.00, 3.5264, 75, 78
36, 1, 22.8, 87.00, 178, 116.0, 41, 4.00, 4.6540, 82, 93
42, 2, 24.0, 107.00, 150, 85.0, 44, 3.00, 4.6540, 96, 252
21, 1, 24.2, 76.00, 147, 77.0, 53, 3.00, 4.4427, 79, 150
41, 1, 20.2, 62.00, 153, 89.0, 50, 3.00, 4.2485, 89, 77
57, 2, 29.4, 109.00, 160, 87.6, 31, 5.00, 5.3327, 92, 208
20, 2, 22.1, 87.00, 171, 99.6, 58, 3.00, 4.2047, 78, 77
67, 2, 23.6, 111.33, 189, 105.4, 70, 2.70, 4.2195, 93, 108
34, 1, 25.2, 77.00, 189, 120.6, 53, 4.00, 4.3438, 79, 160
41, 2, 24.9, 86.00, 192, 115.0, 61, 3.00, 4.3820, 94, 53
38, 2, 33.0, 78.00, 301, 215.0, 50, 6.02, 5.1930, 108, 220
51, 1, 23.5, 101.00, 195, 121.0, 51, 4.00, 4.7449, 94, 154
52, 2, 26.4, 91.33, 218, 152.0, 39, 5.59, 4.9053, 99, 259
67, 1, 29.8, 80.00, 172, 93.4, 63, 3.00, 4.3567, 82, 90
61, 1, 30.0, 108.00, 194, 100.0, 52, 3.73, 5.3471, 105, 246
67, 2, 25.0, 111.67, 146, 93.4, 33, 4.42, 4.5850, 103, 124
56, 1, 27.0, 105.00, 247, 160.6, 54, 5.00, 5.0876, 94, 67
64, 1, 20.0, 74.67, 189, 114.8, 62, 3.05, 4.1109, 91, 72
58, 2, 25.5, 112.00, 163, 110.6, 29, 6.00, 4.7622, 86, 257
55, 1, 28.2, 91.00, 250, 140.2, 67, 4.00, 5.3660, 103, 262
62, 2, 33.3, 114.00, 182, 114.0, 38, 5.00, 5.0106, 96, 275
57, 2, 25.6, 96.00, 200, 133.0, 52, 3.85, 4.3175, 105, 177
20, 2, 24.2, 88.00, 126, 72.2, 45, 3.00, 3.7842, 74, 71
53, 2, 22.1, 98.00, 165, 105.2, 47, 4.00, 4.1589, 81, 47
32, 2, 31.4, 89.00, 153, 84.2, 56, 3.00, 4.1589, 90, 187
41, 1, 23.1, 86.00, 148, 78.0, 58, 3.00, 4.0943, 60, 125
60, 1, 23.4, 76.67, 247, 148.0, 65, 3.80, 5.1358, 77, 78
26, 1, 18.8, 83.00, 191, 103.6, 69, 3.00, 4.5218, 69, 51
37, 1, 30.8, 112.00, 282, 197.2, 43, 7.00, 5.3423, 101, 258
45, 1, 32.0, 110.00, 224, 134.2, 45, 5.00, 5.4116, 93, 215
67, 1, 31.6, 116.00, 179, 90.4, 41, 4.00, 5.4723, 100, 303
34, 2, 35.5, 120.00, 233, 146.6, 34, 7.00, 5.5683, 101, 243
50, 1, 31.9, 78.33, 207, 149.2, 38, 5.45, 4.5951, 84, 91
71, 1, 29.5, 97.00, 227, 151.6, 45, 5.00, 5.0239, 108, 150
57, 2, 31.6, 117.00, 225, 107.6, 40, 6.00, 5.9584, 113, 310
49, 1, 20.3, 93.00, 184, 103.0, 61, 3.00, 4.6052, 93, 153
35, 1, 41.3, 81.00, 168, 102.8, 37, 5.00, 4.9488, 94, 346
41, 2, 21.2, 102.00, 184, 100.4, 64, 3.00, 4.5850, 79, 63
70, 2, 24.1, 82.33, 194, 149.2, 31, 6.26, 4.2341, 105, 89
52, 1, 23.0, 107.00, 179, 123.7, 42.5, 4.21, 4.1589, 93, 50
60, 1, 25.6, 78.00, 195, 95.4, 91, 2.00, 3.7612, 87, 39
62, 1, 22.5, 125.00, 215, 99.0, 98, 2.00, 4.4998, 95, 103
44, 2, 38.2, 123.00, 201, 126.6, 44, 5.00, 5.0239, 92, 308
28, 2, 19.2, 81.00, 155, 94.6, 51, 3.00, 3.8501, 87, 116
58, 2, 29.0, 85.00, 156, 109.2, 36, 4.00, 3.9890, 86, 145
39, 2, 24.0, 89.67, 190, 113.6, 52, 3.65, 4.8040, 101, 74
34, 2, 20.6, 98.00, 183, 92.0, 83, 2.00, 3.6889, 92, 45
65, 1, 26.3, 70.00, 244, 166.2, 51, 5.00, 4.8978, 98, 115
66, 2, 34.6, 115.00, 204, 139.4, 36, 6.00, 4.9628, 109, 264
51, 1, 23.4, 87.00, 220, 108.8, 93, 2.00, 4.5109, 82, 87
50, 2, 29.2, 119.00, 162, 85.2, 54, 3.00, 4.7362, 95, 202
59, 2, 27.2, 107.00, 158, 102.0, 39, 4.00, 4.4427, 93, 127
52, 1, 27.0, 78.33, 134, 73.0, 44, 3.05, 4.4427, 69, 182
69, 2, 24.5, 108.00, 243, 136.4, 40, 6.00, 5.8081, 100, 241
53, 1, 24.1, 105.00, 184, 113.4, 46, 4.00, 4.8122, 95, 66
47, 2, 25.3, 98.00, 173, 105.6, 44, 4.00, 4.7622, 108, 94
52, 1, 28.8, 113.00, 280, 174.0, 67, 4.00, 5.2730, 86, 283
39, 1, 20.9, 95.00, 150, 65.6, 68, 2.00, 4.4067, 95, 64
67, 2, 23.0, 70.00, 184, 128.0, 35, 5.00, 4.6540, 99, 102
59, 2, 24.1, 96.00, 170, 98.6, 54, 3.00, 4.4659, 85, 200
51, 2, 28.1, 106.00, 202, 122.2, 55, 4.00, 4.8203, 87, 265
23, 2, 18.0, 78.00, 171, 96.0, 48, 4.00, 4.9053, 92, 94
68, 1, 25.9, 93.00, 253, 181.2, 53, 5.00, 4.5433, 98, 230
44, 1, 21.5, 85.00, 157, 92.2, 55, 3.00, 3.8918, 84, 181
60, 2, 24.3, 103.00, 141, 86.6, 33, 4.00, 4.6728, 78, 156
52, 1, 24.5, 90.00, 198, 129.0, 29, 7.00, 5.2983, 86, 233
38, 1, 21.3, 72.00, 165, 60.2, 88, 2.00, 4.4308, 90, 60
61, 1, 25.8, 90.00, 280, 195.4, 55, 5.00, 4.9972, 90, 219
68, 2, 24.8, 101.00, 221, 151.4, 60, 4.00, 3.8712, 87, 80
28, 2, 31.5, 83.00, 228, 149.4, 38, 6.00, 5.3132, 83, 68
65, 2, 33.5, 102.00, 190, 126.2, 35, 5.00, 4.9698, 102, 332
69, 1, 28.1, 113.00, 234, 142.8, 52, 4.00, 5.2781, 77, 248
51, 1, 24.3, 85.33, 153, 71.6, 71, 2.15, 3.9512, 82, 84
29, 1, 35.0, 98.33, 204, 142.6, 50, 4.08, 4.0431, 91, 200
55, 2, 23.5, 93.00, 177, 126.8, 41, 4.00, 3.8286, 83, 55
34, 2, 30.0, 83.00, 185, 107.2, 53, 3.00, 4.8203, 92, 85
67, 1, 20.7, 83.00, 170, 99.8, 59, 3.00, 4.0254, 77, 89
49, 1, 25.6, 76.00, 161, 99.8, 51, 3.00, 3.9318, 78, 31
55, 2, 22.9, 81.00, 123, 67.2, 41, 3.00, 4.3041, 88, 129
59, 2, 25.1, 90.00, 163, 101.4, 46, 4.00, 4.3567, 91, 83
53, 1, 33.2, 82.67, 186, 106.8, 46, 4.04, 5.1120, 102, 275
48, 2, 24.1, 110.00, 209, 134.6, 58, 4.00, 4.4067, 100, 65
52, 1, 29.5, 104.33, 211, 132.8, 49, 4.31, 4.9836, 98, 198
69, 1, 29.6, 122.00, 231, 128.4, 56, 4.00, 5.4510, 86, 236
60, 2, 22.8, 110.00, 245, 189.8, 39, 6.00, 4.3944, 88, 253
46, 2, 22.7, 83.00, 183, 125.8, 32, 6.00, 4.8363, 75, 124
51, 2, 26.2, 101.00, 161, 99.6, 48, 3.00, 4.2047, 88, 44
67, 2, 23.5, 96.00, 207, 138.2, 42, 5.00, 4.8978, 111, 172
49, 1, 22.1, 85.00, 136, 63.4, 62, 2.19, 3.9703, 72, 114
46, 2, 26.5, 94.00, 247, 160.2, 59, 4.00, 4.9345, 111, 142
47, 1, 32.4, 105.00, 188, 125.0, 46, 4.09, 4.4427, 99, 109
75, 1, 30.1, 78.00, 222, 154.2, 44, 5.05, 4.7791, 97, 180
28, 1, 24.2, 93.00, 174, 106.4, 54, 3.00, 4.2195, 84, 144
65, 2, 31.3, 110.00, 213, 128.0, 47, 5.00, 5.2470, 91, 163
42, 1, 30.1, 91.00, 182, 114.8, 49, 4.00, 4.5109, 82, 147
51, 1, 24.5, 79.00, 212, 128.6, 65, 3.00, 4.5218, 91, 97
53, 2, 27.7, 95.00, 190, 101.8, 41, 5.00, 5.4638, 101, 220
54, 1, 23.2, 110.67, 238, 162.8, 48, 4.96, 4.9127, 108, 190
73, 1, 27.0, 102.00, 211, 121.0, 67, 3.00, 4.7449, 99, 109
54, 1, 26.8, 108.00, 176, 80.6, 67, 3.00, 4.9558, 106, 191
42, 1, 29.2, 93.00, 249, 174.2, 45, 6.00, 5.0039, 92, 122
75, 1, 31.2, 117.67, 229, 138.8, 29, 7.90, 5.7236, 106, 230
55, 2, 32.1, 112.67, 207, 92.4, 25, 8.28, 6.1048, 111, 242
68, 2, 25.7, 109.00, 233, 112.6, 35, 7.00, 6.0568, 105, 248
57, 1, 26.9, 98.00, 246, 165.2, 38, 7.00, 5.3660, 96, 249
48, 1, 31.4, 75.33, 242, 151.6, 38, 6.37, 5.5683, 103, 192
61, 2, 25.6, 85.00, 184, 116.2, 39, 5.00, 4.9698, 98, 131
69, 1, 37.0, 103.00, 207, 131.4, 55, 4.00, 4.6347, 90, 237
38, 1, 32.6, 77.00, 168, 100.6, 47, 4.00, 4.6250, 96, 78
45, 2, 21.2, 94.00, 169, 96.8, 55, 3.00, 4.4543, 102, 135
51, 2, 29.2, 107.00, 187, 139.0, 32, 6.00, 4.3820, 95, 244
71, 2, 24.0, 84.00, 138, 85.8, 39, 4.00, 4.1897, 90, 199
57, 1, 36.1, 117.00, 181, 108.2, 34, 5.00, 5.2679, 100, 270
56, 2, 25.8, 103.00, 177, 114.4, 34, 5.00, 4.9628, 99, 164
32, 2, 22.0, 88.00, 137, 78.6, 48, 3.00, 3.9512, 78, 72
50, 1, 21.9, 91.00, 190, 111.2, 67, 3.00, 4.0775, 77, 96
43, 1, 34.3, 84.00, 256, 172.6, 33, 8.00, 5.5294, 104, 306
54, 2, 25.2, 115.00, 181, 120.0, 39, 5.00, 4.7005, 92, 91
31, 1, 23.3, 85.00, 190, 130.8, 43, 4.00, 4.3944, 77, 214
56, 1, 25.7, 80.00, 244, 151.6, 59, 4.00, 5.1180, 95, 95
44, 1, 25.1, 133.00, 182, 113.0, 55, 3.00, 4.2485, 84, 216
57, 2, 31.9, 111.00, 173, 116.2, 41, 4.00, 4.3694, 87, 263

Test data:

# diabetes_test_100.txt
#
64, 2, 28.4, 111.00, 184, 127.0, 41, 4.00, 4.3820, 97, 178
43, 1, 28.1, 121.00, 192, 121.0, 60, 3.00, 4.0073, 93, 113
19, 1, 25.3, 83.00, 225, 156.6, 46, 5.00, 4.7185, 84, 200
71, 2, 26.1, 85.00, 220, 152.4, 47, 5.00, 4.6347, 91, 139
50, 2, 28.0, 104.00, 282, 196.8, 44, 6.00, 5.3279, 95, 139
59, 2, 23.6, 73.00, 180, 107.4, 51, 4.00, 4.6821, 84, 88
57, 1, 24.5, 93.00, 186, 96.6, 71, 3.00, 4.5218, 91, 148
49, 2, 21.0, 82.00, 119, 85.4, 23, 5.00, 3.9703, 74, 88
41, 2, 32.0, 126.00, 198, 104.2, 49, 4.00, 5.4116, 124, 243
25, 2, 22.6, 85.00, 130, 71.0, 48, 3.00, 4.0073, 81, 71
52, 2, 19.7, 81.00, 152, 53.4, 82, 2.00, 4.4188, 82, 77
34, 1, 21.2, 84.00, 254, 113.4, 52, 5.00, 6.0936, 92, 109
42, 2, 30.6, 101.00, 269, 172.2, 50, 5.00, 5.4553, 106, 272
28, 2, 25.5, 99.00, 162, 101.6, 46, 4.00, 4.2767, 94, 60
47, 2, 23.3, 90.00, 195, 125.8, 54, 4.00, 4.3307, 73, 54
32, 2, 31.0, 100.00, 177, 96.2, 45, 4.00, 5.1874, 77, 221
43, 1, 18.5, 87.00, 163, 93.6, 61, 2.67, 3.7377, 80, 90
59, 2, 26.9, 104.00, 194, 126.6, 43, 5.00, 4.8040, 106, 311
53, 1, 28.3, 101.00, 179, 107.0, 48, 4.00, 4.7875, 101, 281
60, 1, 25.7, 103.00, 158, 84.6, 64, 2.00, 3.8501, 97, 182
54, 2, 36.1, 115.00, 163, 98.4, 43, 4.00, 4.6821, 101, 321
35, 2, 24.1, 94.67, 155, 97.4, 32, 4.84, 4.8520, 94, 58
49, 2, 25.8, 89.00, 182, 118.6, 39, 5.00, 4.8040, 115, 262
58, 1, 22.8, 91.00, 196, 118.8, 48, 4.00, 4.9836, 115, 206
36, 2, 39.1, 90.00, 219, 135.8, 38, 6.00, 5.4205, 103, 233
46, 2, 42.2, 99.00, 211, 137.0, 44, 5.00, 5.0106, 99, 242
44, 2, 26.6, 99.00, 205, 109.0, 43, 5.00, 5.5797, 111, 123
46, 1, 29.9, 83.00, 171, 113.0, 38, 4.50, 4.5850, 98, 167
54, 1, 21.0, 78.00, 188, 107.4, 70, 3.00, 3.9703, 73, 63
63, 2, 25.5, 109.00, 226, 103.2, 46, 5.00, 5.9506, 87, 197
41, 2, 24.2, 90.00, 199, 123.6, 57, 4.00, 4.5218, 86, 71
28, 1, 25.4, 93.00, 141, 79.0, 49, 3.00, 4.1744, 91, 168
19, 1, 23.2, 75.00, 143, 70.4, 52, 3.00, 4.6347, 72, 140
61, 2, 26.1, 126.00, 215, 129.8, 57, 4.00, 4.9488, 96, 217
48, 1, 32.7, 93.00, 276, 198.6, 43, 6.42, 5.1475, 91, 121
54, 2, 27.3, 100.00, 200, 144.0, 33, 6.00, 4.7449, 76, 235
53, 2, 26.6, 93.00, 185, 122.4, 36, 5.00, 4.8903, 82, 245
48, 1, 22.8, 101.00, 110, 41.6, 56, 2.00, 4.1271, 97, 40
53, 1, 28.8, 111.67, 145, 87.2, 46, 3.15, 4.0775, 85, 52
29, 2, 18.1, 73.00, 158, 99.0, 41, 4.00, 4.4998, 78, 104
62, 1, 32.0, 88.00, 172, 69.0, 38, 4.00, 5.7838, 100, 132
50, 2, 23.7, 92.00, 166, 97.0, 52, 3.00, 4.4427, 93, 88
58, 2, 23.6, 96.00, 257, 171.0, 59, 4.00, 4.9053, 82, 69
55, 2, 24.6, 109.00, 143, 76.4, 51, 3.00, 4.3567, 88, 219
54, 1, 22.6, 90.00, 183, 104.2, 64, 3.00, 4.3041, 92, 72
36, 1, 27.8, 73.00, 153, 104.4, 42, 4.00, 3.4965, 73, 201
63, 2, 24.1, 111.00, 184, 112.2, 44, 4.00, 4.9345, 82, 110
47, 2, 26.5, 70.00, 181, 104.8, 63, 3.00, 4.1897, 70, 51
51, 2, 32.8, 112.00, 202, 100.6, 37, 5.00, 5.7746, 109, 277
42, 1, 19.9, 76.00, 146, 83.2, 55, 3.00, 3.6636, 79, 63
37, 2, 23.6, 94.00, 205, 138.8, 53, 4.00, 4.1897, 107, 118
28, 1, 22.1, 82.00, 168, 100.6, 54, 3.00, 4.2047, 86, 69
58, 1, 28.1, 111.00, 198, 80.6, 31, 6.00, 6.0684, 93, 273
32, 1, 26.5, 86.00, 184, 101.6, 53, 4.00, 4.9904, 78, 258
25, 2, 23.5, 88.00, 143, 80.8, 55, 3.00, 3.5835, 83, 43
63, 1, 26.0, 85.67, 155, 78.2, 46, 3.37, 5.0370, 97, 198
52, 1, 27.8, 85.00, 219, 136.0, 49, 4.00, 5.1358, 75, 242
# diabetes_test_100.txt
# 10 predictors, target y
# 100 items
#
65, 2, 28.5, 109.00, 201, 123.0, 46, 4.00, 5.0752, 96, 232
42, 1, 30.6, 121.00, 176, 92.8, 69, 3.00, 4.2627, 89, 175
53, 1, 22.2, 78.00, 164, 81.0, 70, 2.00, 4.1744, 101, 93
79, 2, 23.3, 88.00, 186, 128.4, 33, 6.00, 4.8122, 102, 168
43, 1, 35.4, 93.00, 185, 100.2, 44, 4.00, 5.3181, 101, 275
44, 1, 31.4, 115.00, 165, 97.6, 52, 3.00, 4.3438, 89, 293
62, 2, 37.8, 119.00, 113, 51.0, 31, 4.00, 5.0434, 84, 281
33, 1, 18.9, 70.00, 162, 91.8, 59, 3.00, 4.0254, 58, 72
56, 1, 35.0, 79.33, 195, 140.8, 42, 4.64, 4.1109, 96, 140
66, 1, 21.7, 126.00, 212, 127.8, 45, 4.71, 5.2781, 101, 189
34, 2, 25.3, 111.00, 230, 162.0, 39, 6.00, 4.9767, 90, 181
46, 2, 23.8, 97.00, 224, 139.2, 42, 5.00, 5.3660, 81, 209
50, 1, 31.8, 82.00, 136, 69.2, 55, 2.00, 4.0775, 85, 136
69, 1, 34.3, 113.00, 200, 123.8, 54, 4.00, 4.7095, 112, 261
34, 1, 26.3, 87.00, 197, 120.0, 63, 3.00, 4.2485, 96, 113
71, 2, 27.0, 93.33, 269, 190.2, 41, 6.56, 5.2417, 93, 131
47, 1, 27.2, 80.00, 208, 145.6, 38, 6.00, 4.8040, 92, 174
41, 1, 33.8, 123.33, 187, 127.0, 45, 4.16, 4.3175, 100, 257
34, 1, 33.0, 73.00, 178, 114.6, 51, 3.49, 4.1271, 92, 55
51, 1, 24.1, 87.00, 261, 175.6, 69, 4.00, 4.4067, 93, 84
43, 1, 21.3, 79.00, 141, 78.8, 53, 3.00, 3.8286, 90, 42
55, 1, 23.0, 94.67, 190, 137.6, 38, 5.00, 4.2767, 106, 146
59, 2, 27.9, 101.00, 218, 144.2, 38, 6.00, 5.1874, 95, 212
27, 2, 33.6, 110.00, 246, 156.6, 57, 4.00, 5.0876, 89, 233
51, 2, 22.7, 103.00, 217, 162.4, 30, 7.00, 4.8122, 80, 91
49, 2, 27.4, 89.00, 177, 113.0, 37, 5.00, 4.9053, 97, 111
27, 1, 22.6, 71.00, 116, 43.4, 56, 2.00, 4.4188, 79, 152
57, 2, 23.2, 107.33, 231, 159.4, 41, 5.63, 5.0304, 112, 120
39, 2, 26.9, 93.00, 136, 75.4, 48, 3.00, 4.1431, 99, 67
62, 2, 34.6, 120.00, 215, 129.2, 43, 5.00, 5.3660, 123, 310
37, 1, 23.3, 88.00, 223, 142.0, 65, 3.40, 4.3567, 82, 94
46, 1, 21.1, 80.00, 205, 144.4, 42, 5.00, 4.5326, 87, 183
68, 2, 23.5, 101.00, 162, 85.4, 59, 3.00, 4.4773, 91, 66
51, 1, 31.5, 93.00, 231, 144.0, 49, 4.70, 5.2523, 117, 173
41, 1, 20.8, 86.00, 223, 128.2, 83, 3.00, 4.0775, 89, 72
53, 1, 26.5, 97.00, 193, 122.4, 58, 3.00, 4.1431, 99, 49
45, 1, 24.2, 83.00, 177, 118.4, 45, 4.00, 4.2195, 82, 64
33, 1, 19.5, 80.00, 171, 85.4, 75, 2.00, 3.9703, 80, 48
60, 2, 28.2, 112.00, 185, 113.8, 42, 4.00, 4.9836, 93, 178
47, 2, 24.9, 75.00, 225, 166.0, 42, 5.00, 4.4427, 102, 104
60, 2, 24.9, 99.67, 162, 106.6, 43, 3.77, 4.1271, 95, 132
36, 1, 30.0, 95.00, 201, 125.2, 42, 4.79, 5.1299, 85, 220
36, 1, 19.6, 71.00, 250, 133.2, 97, 3.00, 4.5951, 92, 57

Posted in Machine Learning | Leave a comment

Updated Decision Tree Regression From Scratch Using JavaScript Without Pointers or Recursion

Posted on March 31, 2026 by jamesdmccaffrey

Decision tree regression is a machine learning technique that incorporates a set of if-then rules in a tree data structure to predict a single numeric value. For example, a decision tree regression model prediction might be, “If employee age is greater than 29.0 and age is less than or equal to 32.5 and years-experience is less than or equal to 4.0 and height is greater than 67.0 then bank account balance is $655.17.”

This blog post presents decision tree regression, implemented from scratch with JavaScript, using list storage for tree nodes (no pointers/references), simple list iteration to build the tree (no recursion and no stack), weighted variance minimization for the node split function, and saves associated row indices in each node.

The demo data looks like:

 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
. . .

The first five values on each line are the x predictors. The last value on each line is the target y variable to predict. The data is synthetic and was generated by a 5-10-1 neural network with random weights and bias. Therefore, the data has an underlying structure which can be predicted. There are 200 training items and 40 test items.

The key parts of the output of the demo program are:

JavaScript decision tree regression

Loading synthetic train (200), test (40)
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:
0.484 0.1568 0.8054

Setting maxDepth = 3
Setting minSamples = 2
Setting minLeaf = 18
Using default numSplitCols = -1

Creating and training tree
Done

ID   0 | col  0 | v -0.2102 | L  1 | R  2 | y 0.3493 | leaf F
ID   1 | col  4 | v  0.1431 | L  3 | R  4 | y 0.5345 | leaf F
ID   2 | col  0 | v  0.3915 | L  5 | R  6 | y 0.2382 | leaf F
ID   3 | col  0 | v -0.6553 | L  7 | R  8 | y 0.6358 | leaf F
ID   4 | col -1 | v  0.0000 | L  9 | R 10 | y 0.4123 | leaf T
ID   5 | col  4 | v -0.2987 | L 11 | R 12 | y 0.3032 | leaf F
ID   6 | col  2 | v  0.3777 | L 13 | R 14 | y 0.1701 | leaf F
ID   7 | col -1 | v  0.0000 | L -1 | R -1 | y 0.6952 | leaf T
ID   8 | col -1 | v  0.0000 | L -1 | R -1 | y 0.5598 | leaf T
ID  11 | col -1 | v  0.0000 | L -1 | R -1 | y 0.4101 | leaf T
ID  12 | col -1 | v  0.0000 | L -1 | R -1 | y 0.2613 | leaf T
ID  13 | col -1 | v  0.0000 | L -1 | R -1 | y 0.1882 | leaf T
ID  14 | col -1 | v  0.0000 | L -1 | R -1 | y 0.1381 | leaf T

Evaluating tree model

Train acc (within 0.10) = 0.3750
Test acc (within 0.10) = 0.4750

Train MSE = 0.0048
Test MSE = 0.0054

Predicting for x =
-0.1660   0.4406  -0.9998  -0.3953  -0.7065
y = 0.4101

IF
column 0  >   -0.2102 AND
column 0  <=   0.3915 AND
column 4  <=  -0.2987 AND
THEN
predicted = 0.4101

End decision tree regression demo

If you compare this output with the visual representation, most of the ideas of decision tree regression will become clear:

The demo decision tree has maxDepth = 3. This creates a tree with 15 nodes (some of which could be empty). In general, if a tree has maxDepth = n, then it has 2^(n+1) - 1 nodes. These tree nodes could be stored as JavaScript program-defined Node objects and connected via pointers/references. But the architecture used by the demo decision tree is to create a List collection with size/length = 15, where each item in the List is a Node object.

With this design, if the root node is at index [0], then the left child is at [1] and the right child is at [2]. In general, if a node is at index [i], then the left child is at index [2*i+1] and the right child is at index [2*i+2].

The tree splitting part of constructing a decision tree regression system is perhaps best understood by looking at a concrete example. The root node of the demo decision tree is associated with all 200 rows of the training data. The splitting process selects some of the 200 rows to be assigned to the left child node, and the remaining rows to be assigned to the right child node.

For simplicity, suppose that instead of the demo training data with 200 rows and 5 columns of predictors, a tree node is associated with just 5 rows of data, and the data has just 3 columns of predictors:

     X                    y
[0] 0.97  0.25  0.75     3.0
[1] 0.53  0.41  0.00     9.0
[2] 0.86  0.64  0.86     7.0
[3] 0.14  0.37  0.25     2.0
[4] 0.53  0.86  0.37     6.0
     [0]   [1]   [2]

The split algorithm will select some of the five rows to go to the left child and the remaining rows to go to the right child. The idea is to select the two sets of rows in a way so that their associated y values are close together. The demo implementation does this by finding the split that minimizes the weighted variance of the target y values.

The splitting algorithm examines every possible x value in every row and every column. For each possible candidate split value (also called the threshold), the weighted variance of the y values of the resulting split is computed. For example, for x = 0.37 in column [1], the rows where the values in column [1] are less than or equal to 0.37 are rows [3] and [0] with associated y values (2.0, 3.0). The other rows are [1], [2], [4] with associated y values (9.0, 7.0, 6.0).

The variance of a set of y values is the average of the sum of the squared differences between the values and their mean (average).

For this proposed split, the variance of y values (2.0, 3.0) is computed as 0.25. The mean of (2.0, 3.0) = (2.0 + 3.0) / 2 = 2.5 and so the variance is ((2.0 - 2.5)^2 + (3.0 - 2.5)^2) / 2 = 0.25.

The mean of y values (9.0, 7.0, 6.0) = (9.0 + 7.0 + 6.0) / 3 = 7.33 and the variance is ((9.0 - 7.33)^2 + (7.0 -7.33)^2 + (6.0 - 7.33)^2) / 3 = 2.33.

Because the proposed split has different numbers of rows (two rows for the left child and three rows for the right child), the weighted variance of the proposed split is used and is ((2 * 0.25) + (3 * 2.33)) / 5 = 1.50.

This process is repeated for every x value in the training data. The x threshold value and its column that generate the smallest weighted variance define the split. In practice it's common to keep track of which values in a given column have already been checked, to avoid unnecessary work computing weighted variance.

After a best split is found, the predicted y value for a leaf node (no further splits) is the average of the y values associated with the node. The demo program computes predicted y values for internal, non-leaf nodes, but those predicted values are not used.

The demo does not use recursion to build the tree. Instead, the demo uses a stack data structure. In high-level pseudo-code:

create a list of empty nodes
create root node, place it at index [0]
for-each node in list
  get curr node
  if at maxDepth or not enough rows data then
    node is a leaf, predicted = avg of associated Y values
  compute split value and split column using the
  associated rows stored in currNode
  if unable to split then
    node is a leaf, predicted = avg of associated Y values
  compute left-rows, right-rows
  create left rows, left node
  create right rows, right node
  add left node to tree list
  add right node to tree list   
end-for

The build-tree algorithm is short but very tricky. The design used in this blog post is well-suited for implementing a tree-based ensemble system.

I'm a big fan of old science fiction movies from the 1950s. Actor Richard Carlson (1912-1977) starred in three of my favorites.

Left: In "The Magnetic Monster" (1953), a scientist accidentally creates a new radioactive and magnetic element that doubles its mass every 11 hours. Unless it can be stopped, it will eventually throw the Earth out of orbit. Carllson plays the lead scientist who devises a plan to stop the menace. My personal grade = B.

Center: In "It Came from Outer Space" (1953), Carlson plays a scientist who witnesses a object crashing into the desert. It's an alien spacecraft. The aliens, who turn out to be friendly, can assume the form of humans so they can gather supplies to repair their ship. My grade = B+.

Right: In "Riders to the Stars" (1954), Carlson plays a scientist who is recruited along with 11 other men for a top secret government program to fly into space to capture a meteor so it can be analyzed to build better rockets. Carlson's character ends up flying out of control to deep space and he dies, but another character captures the meteor. My grade = B.

Carlson also starred in science fiction films "The Maze" (1953, my grade = B-) and "Creature from the Black Lagoon" (1954, my grade = B).

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

// decision_tree_regression.js
// node.js v22.16.0

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

let FS = require('fs');  // file load

class DecisionTreeRegressor
{
  // --------------------------------------------------------

  constructor(maxDepth, minSamples,
    minLeaf, numSplitCols, seed)
  {
    // if maxDepth = n, list has 2^(n+1) - 1 nodes
    this.maxDepth = maxDepth;
    this.minSamples = minSamples;
    this.minLeaf = minLeaf;
    this.numSplitCols = numSplitCols; // for random forest

    // create full tree with null nodes
    this.tree = [];  // a list of Node objects
    let numNodes = Math.pow(2, (maxDepth + 1)) - 1;
    for (let i = 0; i "lt" numNodes; ++i) {
      //let n = new this.Node(i, -1, 0.0, -1,
      //  -1, 0.0, false, []);
      //this.tree[i] = n; // dummy nodes
      this.tree[i] = null;  // empty nodes
    }

    this.seed = seed + 0.5;  // quasi random
    this.trainX = null;  // supplied in train()
    this.trainY = null;  
  }

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

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

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

  // core methods: 
  // train(), predict(), explain(), accuracy(),
  //   mse(), display()

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

  train(trainX, trainY)
  {
    this.trainX = trainX;  // by ref
    this.trainY = trainY;
    this.makeTree();
    // optionally delete rows in each Node to save space
    // when tree is part of an ensemble (random forest, etc.)
    // for (let i = 0; i "lt" this.tree.length; ++i)
    //   if (this.tree[i] != null)
    //     this.tree[i].rows = null;
  }

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

  predict(x)
  {
    let p = 0;
    let currNode = this.tree[p];
    while (currNode != null &&
      currNode.isLeaf == false &&
      p "lt" this.tree.length) {
      if (x[currNode.colIdx] "lte" currNode.thresh)
        p = currNode.left;
      else
        p = currNode.right;
      currNode = this.tree[p];
    }
    return this.tree[p].value;
  }

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

  explain(x)
  {
    let p = 0;
    console.log("\nIF ");
    let currNode = this.tree[p];
    while (currNode.isLeaf == false) {
      process.stdout.write("column ");
      process.stdout.write(currNode.colIdx + " ");
      if (x[currNode.colIdx] "lte" currNode.thresh) {
        process.stdout.write(" "lte" ");
        console.log(currNode.thresh.toFixed(4).
        toString().padStart(8) + " AND ");
        p = currNode.left;
        currNode = this.tree[p];
      }
      else {
        process.stdout.write(" "gt"  ");
        console.log(currNode.thresh.toFixed(4).
        toString().padStart(8) + " AND ");
        p = currNode.right;
        currNode = this.tree[p];
      }
    }
    console.log("THEN \npredicted = " +
      currNode.value.toFixed(4).toString());
  }

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

  accuracy(dataX, dataY, pctClose)
  {
    let nCorrect = 0; let nWrong = 0;
    for (let i = 0; i "lt" dataX.length; ++i) {
      let x = dataX[i];
      let actualY = dataY[i];
      let predY = this.predict(x);
      if (Math.abs(predY - actualY) "lt" 
        Math.abs(pctClose * actualY)) {
        ++nCorrect;
      }
      else {
        ++nWrong;
      }
    }
    return (nCorrect * 1.0) / (nCorrect + nWrong);
  }

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

  mse(dataX, dataY)
  {
    let n = dataX.length;
    let sum = 0.0;
    for (let i = 0; i "lt" n; ++i) {
      let x = dataX[i];
      let actualY = dataY[i];
      let predY = this.predict(x);
      sum += (actualY - predY) * (actualY - predY);
    }
    return sum / n;
  }

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

  display(showRows)
  {
    let size = this.tree.length;
    for (let i = 0; i "lt" size; ++i) { // each node
      let n = this.tree[i]; // covenience
      if (n == null) continue;
      if (n.colIdx == -1 && n.isLeaf == false) continue;

      let s = "";
      s += "ID " + n.id.toString().padStart(3) + " ";
      s += "| col " + n.colIdx.toString().padStart(2) + " ";
      s += "| v " + n.thresh.toFixed(4).
        toString().padStart(8) + " ";
      s += "| L " + n.left.toString().padStart(2) + " ";
      s += "| R " + n.right.toString().padStart(2) + " ";
      s += "| y " + n.value.toFixed(4).toString() + " ";
      let tf = n.isLeaf == true ? "T" : "F";
      s += "| leaf " + tf;

      if (showRows == true) {
        s += "\nrows: ";
        for (let k = 0; k "lt" n.rows.length; ++k) {
          if (k "gt" 0 && k % 20 == 0)
              s += "\n";
          s += n.rows[k].toString() + " ";
        }
      }
      console.log(s);
      if (showRows == true) console.log("");
    }
  } // display()

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

  // helpers for train(): makeTree(), bestSplit(), next(),
  //   nextInt(), shuffle(), treeTargetMean(),
  //   treeTargetVariance()

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

  makeTree()
  {
    if (this.numSplitCols == -1)  // use all cols
      this.numSplitCols = this.trainX[0].length;

    let allRows = [];
    for (let i = 0; i "lt" this.trainX.length; ++i)
      allRows.push(i);
    let grandMean = this.treeTargetMean(allRows);

    let root = new this.Node();
    root.id = 0;
    root.left = 1;
    root.right = 2;
    root.value = grandMean;
    root.isLeaf = false;
    root.rows = allRows;
    this.tree[0] = root;

    for (let i = 0; i "lt" this.tree.length; ++i) {
      let currNode = this.tree[i];

      // 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 == null || currNode.rows.length == 0)
        continue;

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

      // parent has enough rows to try to split
      let splitInfo = this.bestSplit(currNode.rows);
      let colIdx = splitInfo[0];
      let splitVal = splitInfo[1]; 

      if (colIdx == -1) { // unable to split, parent is a leaf
        currNode.isLeaf = true;
        continue;
      }

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

      // construct the children, except colIdx and thresh
      let leftNode = new this.Node();
      let rightNode = new this.Node();

      let leftIdxs = [];
      let rightIdxs = [];
      for (let k = 0; k "lt" currNode.rows.length; ++k) {
        let r = currNode.rows[k];
        if (this.trainX[r][colIdx] "lte" splitVal)
          leftIdxs.push(r);
        else
          rightIdxs.push(r);
      }

      // assign -1 to children if out of range
      leftNode.id = currNode.id * 2 + 1;
      if (leftNode.id "gt" Math.pow(2, 
        (this.maxDepth + 1)) - 2)
        leftNode.id = -1;
      leftNode.left = leftNode.id * 2 + 1;
      if (leftNode.left "gt" Math.pow(2, 
        (this.maxDepth + 1)) - 2)
        leftNode.left = -1;
      leftNode.right = leftNode.id * 2 + 2;
      if (leftNode.right "gt" Math.pow(2, 
        (this.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" Math.pow(2, 
        (this.maxDepth + 1)) - 2)
        rightNode.id = -1;
      rightNode.left = rightNode.id * 2 + 1;
      if (rightNode.left "gt" Math.pow(2, 
         (this.maxDepth + 1)) - 2)
        rightNode.left = -1;
      rightNode.right = rightNode.id * 2 + 2;
      if (rightNode.right "gt" Math.pow(2, 
        (this.maxDepth + 1)) - 2)
        rightNode.right = -1;
      rightNode.rows = rightIdxs;
      rightNode.value = this.treeTargetMean(rightNode.rows);
      this.tree[rightNode.id] = rightNode;

    } // i
    return;
  } // makeTree()

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

  bestSplit(rows)
  {
    // result[0] = best col idx (as double)
    // result[1] = best split value

    let bestColIdx = -1;  // indicates bad split
    let bestThresh = 0.0;
    let bestVar = Number.MAX_VALUE;  // smaller is better

    let nRows = rows.length;
    let nCols = this.trainX[0].length;

    if (nRows == 0)
      console.log("FATAL: empty data in bestSplit()");

    // process cols in scrambled order
    let colIndices = [];
    for (let k = 0; k "lt" nCols; ++k)
      colIndices[k] = k;
    this.shuffle(colIndices);

    // each column of trainX
    for (let j = 0; j "lt" this.numSplitCols; ++j) {
      let colIdx = colIndices[j];
      let examineds = [];

      for (let i = 0; i "lt" nRows; ++i) {  // each row
        // if curr thresh been seen, skip it
        let thresh = this.trainX[rows[i]][colIdx];
        if (examineds.includes(thresh)) continue;
        examineds.push(thresh);

        // get row idxs where x is lte, gt thresh
        let leftIdxs = [];
        let rightIdxs = [];
        for (let k = 0; k "lt" nRows; ++k) {
          if (this.trainX[rows[k]][colIdx] "lte" thresh)
            leftIdxs.push(rows[k]);
          else
            rightIdxs.push(rows[k]);
        }

        // Check if proposed split has too few values
        if (leftIdxs.length "lt" this.minLeaf || 
        rightIdxs.length "lt" this.minLeaf) 
          continue;  // to next row

        let leftVar = this.treeTargetVariance(leftIdxs);
        let rightVar = this.treeTargetVariance(rightIdxs);
        let weightedVar = (leftIdxs.length * leftVar +
          rightIdxs.length * rightVar) / nRows;

        if (weightedVar "lt" bestVar) {
          bestColIdx = colIdx;
          bestThresh = thresh;
          bestVar = weightedVar;
        }
      } // each row
    } // j each col

    let result = [-1, -1];
    result[0] = bestColIdx;
    result[1] = bestThresh;
    return result;
  } // bestSplit()

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

  next()
  {
    // return sort-of-random in [0.0, 1.0)
    let x = Math.sin(this.seed) * 1000;
    let result = x - Math.floor(x);  // [0.0,1.0)
    this.seed = result;  // for next call
    return result;
  }

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

  nextInt(lo, hi)
  {
    let x = this.next();
    return Math.trunc((hi - lo) * x + lo);
  }

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

  shuffle(indices)
  {
    // Fisher-Yates
    for (let i = 0; i "lt" indices.length; ++i) {
      let ri = this.nextInt(i, indices.length);
      let tmp = indices[ri];
      indices[ri] = indices[i];
      indices[i] = tmp;
    }
  }

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

  treeTargetMean(rows)
  {
    let sum = 0.0;
    for (let i = 0; i "lt" rows.length; ++i) {
      let r = rows[i];
      sum += this.trainY[r];
    }
    return sum / rows.length;
  }

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

  treeTargetVariance(rows)
  {
    let mean = this.treeTargetMean(rows);
    let sum = 0.0;
    for (let i = 0; i "lt" rows.length; ++i) {
      let r = rows[i];
      sum += (this.trainY[r] - mean) *
        (this.trainY[r] - mean);
    }
    return sum / rows.length;
  }

} // class DecisionTreeRegressor

// ----------------------------------------------------------
// helper functions for main(): loadTxt(), vecShow()
// ----------------------------------------------------------

function loadTxt(fn, delimit, usecols, comment) {
  // load numeric matrix from text file
  let all = FS.readFileSync(fn, "utf8");  // giant string
  all = all.trim();  // strip final crlf in file
  let lines = all.split("\n");  // array of lines

  // count number non-comment lines
  let nRows = 0;
  for (let i = 0; i "lt" lines.length; ++i) {
    if (!lines[i].startsWith(comment))
      ++nRows;
  }
  nCols = usecols.length;
  //let result = matMake(nRows, nCols, 0.0);
  let result = [];
  for (let i = 0; i "lt" nRows; ++i) {
    result[i] = [];
    for (let j = 0; j "lt" nCols; ++j) {
      result[i][j] = 0.0;
    }
  }
 
  let r = 0;  // into lines
  let i = 0;  // into result[][]
  while (r "lt" lines.length) {
    if (lines[r].startsWith(comment)) {
      ++r;  // next row
    }
    else {
      let tokens = lines[r].split(delimit);
      for (let j = 0; j "lt" nCols; ++j) {
        result[i][j] = parseFloat(tokens[usecols[j]]);
      }
      ++r;
      ++i;
    }
  }

  if (usecols.length "gt" 1)
    return result;

  // if length of usecols is just 1, convert matrix to vector
  // the curr matrix is shape nRows x 1
  if (usecols.length == 1) {
    let vec = [];
    for (let i = 0; i "lt" nRows; ++i)
      vec[i] = result[i][0];
    return vec;
  }
}

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

function vecShow(v, dec, len)
{
  for (let i = 0; i "lt" v.length; ++i) {
    if (i != 0 && i % len == 0) {
      process.stdout.write("\n");
    }
    if (v[i] "gte" 0.0) {
      process.stdout.write(" ");  // + or - space
    }
    process.stdout.write(v[i].toFixed(dec));
    process.stdout.write("  ");
  }
  process.stdout.write("\n");
}

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

function main()
{
  console.log("\nJavaScript decision tree regression ");

  // 1. load data
  console.log("\nLoading synthetic train (200), test (40)");
  let trainFile = ".\\Data\\synthetic_train_200.txt";
  let testFile = ".\\Data\\synthetic_test_40.txt";

  let trainX = loadTxt(trainFile, ",", [0,1,2,3,4], "#");
  let trainY = loadTxt(trainFile, ",", [5], "#");
  let testX = loadTxt(testFile, ",", [0,1,2,3,4], "#");
  let testY = loadTxt(testFile, ",", [5], "#");
  console.log("Done ");

  console.log("\nFirst three train x: ");
  for (let i = 0; i "lt" 3; ++i)
    vecShow(trainX[i], 4, 8);  // 4 decimals 8 wide
  console.log("\nFirst three train y: ");
  for (let i = 0; i "lt" 3; ++i)
    process.stdout.write(trainY[i].toString() + " ");
  console.log("");

  // 2. create and train tree
  let maxDepth = 3;
  let minSamples = 2;
  let minLeaf = 18;  // 18
  let numSplitCols = -1;  // use all columns
  // let numSplitCols = 4;  // for random forest
  let seed = 0;
  console.log("\nSetting maxDepth = " +
    maxDepth.toString());
  console.log("Setting minSamples = " +
    minSamples.toString());
  console.log("Setting minLeaf = " +
    minLeaf.toString());
  console.log("Using default numSplitCols = -1 ");

  console.log("\nCreating and training tree ");
  let dtr = 
    new DecisionTreeRegressor(maxDepth, minSamples,
      minLeaf, numSplitCols, seed);

  dtr.train(trainX, trainY);
  console.log("Done \n");
  dtr.display(false); // show rows or not

  // 3. evaluate tree
  console.log("\nEvaluating tree model ");
  let trainAcc = dtr.accuracy(trainX, trainY, 0.10);
  let testAcc = dtr.accuracy(testX, testY, 0.10);
  console.log("\nTrain acc (within 0.10) = " +
    trainAcc.toFixed(4).toString());
  console.log("Test acc (within 0.10) = " +
    testAcc.toFixed(4).toString());

  let trainMSE = dtr.mse(trainX, trainY);
  let testMSE = dtr.mse(testX, testY);
  console.log("\nTrain MSE = " +
    trainMSE.toFixed(4).toString());
  console.log("Test MSE = " +
    testMSE.toFixed(4).toString());

  // 4. use tree to make prediction
  let x = trainX[0];
  console.log("\nPredicting for x = ");
  vecShow(x, 4, 9);
  let predY = dtr.predict(x);
  console.log("y = " + predY.toFixed(4).toString());

  dtr.explain(x);

  console.log("\nEnd decision tree regression demo ");
}

main();

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 JavaScript, Machine Learning | Leave a comment

Linear Regression With Pseudo-Inverse Training (QR Modified Gram-Schmidt) With C#

Posted on March 30, 2026 by jamesdmccaffrey

The goal of a machine learning regression problem is to predict a single numeric value. For example, you might want to predict the credit score of a person based on age, bank account balance, annual salary, and so on.

The simplest type of regression technique is linear regression. The prediction equation is y’ = (w0 * x0) + (w1 * x1) + . . + b, where the xi are predictor values, and the wi are constants called weights (or coefficients), and the b is a constant called the bias (or intercept).

Training is the process of finding values of the weights and the bias so that predicted y’ values closely match actual target y values in a set of training data. There are several ways to train a linear regression model. Two of the most common are stochastic gradient descent (SGD) training, and pseudo-inverse training.

With SGD training, the weights and bias are initialized to small random values and then iteratively modified to get closer and closer to optimal values, where optimal means minimal mean squared error between predicted y’ values and actual y values. SGD requires a learning rate (typically about 0.01) that moderates how quickly the weights and bias change, and a maximum epochs value (typically about 100 or 1000). The learning rate and maximum epochs must be determined by trial and error.

With pseudo-inverse training, the pseudo-inverse of the matrix of training x values is computed, and then the weights and bias values are computed by multiplying the pseudo-inverse times the target y values. This approach does not require any parameters but computing the pseudo-inverse of a matrix is much more complicated than SGD training.

There are two main approaches to compute a pseudo-inverse: singular value decomposition (SVD), and QR decomposition.

There are two main categories of algorithms to compute an SVD pseudo-inverse: bidiagonalization techniques and Jacobi techniques, and both have many variations.

There are three main algorithms to compute a QR pseudo-inverse: Householder, modified Gram-Schmidt, and Givens. Each has several variations.

In short, there are dozens of ways to compute a pseudo-inverse for linear regression training. The techniques vary in complexity, precision, and performance. There is no single best way to do linear regression training because if there was one best way, there’d be only one way, not dozens.

I put together a demo of linear regression that uses pseudo-inverse training via QR decomposition using the modified Gram-Schmidt technique. This approach has medium complexity, medium precision, and medium performance and is usually a good approach for training datasets that have fewer than 2,000 items. SGD training works for very large datasets but then you have to find good values for the learning rate and maximum epochs.

For my demo, I used a set of synthetic data that was generated by a neural network with small random weights and biases. The data looks like:

-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
. . .

The first five values on each line are predictors. The last value on each line is the target y value to predict. There are 200 training items and 40 test items.

The output of my demo is:

Begin C# linear regression using pseudo-inverse
 (QR Gram-Schmidt) training

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

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

First three train y:
  0.4840
  0.1568
  0.8054

Creating and training Linear Regression model using QR p-inverse
Done

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

Evaluating model

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

MSE train = 0.0026
MSE test = 0.0020

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

Predicted y = 0.5329

End demo

The accuracy of the linear regression model is poor because the synthetic data has complex, non-linear interactions between variables. Linear regression doesn’t always work well, but it’s almost always a good way to start a regression analysis. In the very worst case, linear regression provides a baseline result for comparison with more powerful, but complicated, techniques such as kernel ridge regression, gradient boost regression, and neural network regression.

The TrainPinv() method is self-contained so that it can be swapped out by an SGD version:

public void TrainPinv(double[][] trainX, double[] trainY)
{
  int dim = trainX[0].Length;
  this.weights = new double[dim];  // w = pinv(dX) * y

  // 1. compute desgn matrix X from trainX
  // 2. compute pseudo-inv of X using QR
  //   a. compute Q and R
  //   b. compute inv(Q) and inv(R)
  //   c. compute Xpinv = Qinv * Rinv
  // 3. compute wts-bias vector = Xpinv * trainY
  // 4. extract and store wts and bias from the vector
}

The design matrix code adds a leading column of 1.0 values to the trainX matrix to account for the bias. The pseudo-inverse code does a lot of work. After multiplying the pseudo-inverse of the design matrix times the vector of training y values, the resulting vector holds the bias at cell [0] (because of the column of 1.0 values) and the weights in cells [1], [2] . . etc.

When linear regression training via pseudo-inverse works, it’s preferable to SGD training because pseudo-inverse doesn’t require parameters (learning rate, max epochs) that must be determined by trial and error. However, computing the pseudo-inverse is very tricky and it can fail (numeric overflow, or underflow) for pathological cases of training data.

Good fun.

My favorite series of science fiction books is the Mars series by Edgar Rice Burroughs. I like the simple, linear story lines.

The fourth book in the series is “Thuvia, Maid of Mars” (1916). The story is about Cathoris, the son of John Carter and Dejah Thoris, as he sets out to rescue Princess Thuvia who has been kidnapped.

Left: Cover art by Robert Abbett. Center: Cover art by Roy Krenkel. Right: Cover art by Michael Whelan.

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 LinearRegressionPinv
{
  internal class LinearRegressionPinvProgram
  {
    static void Main(string[] args)
    {
      Console.WriteLine("\nBegin C# linear regression" +
        " using pseudo-inverse (QR-GS) 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 using pseudo-inverse
      Console.WriteLine("\nCreating and training" +
        " Linear Regression model using QR p-inverse ");
      LinearRegressor model = new LinearRegressor();
      model.TrainPinv(trainX, trainY);
      Console.WriteLine("Done ");

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

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

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

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

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

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

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

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

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

  } // class Program

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

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

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

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

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

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

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

    public void TrainPinv(double[][] trainX, double[] trainY)
    {
      int dim = trainX[0].Length;
      this.weights = new double[dim];  // w = pinv(dX) * y

      // 1. make design matrix
      int nRows = trainX.Length;
      int nCols = trainX[0].Length;
      double[][] X = new double[nRows][];
      for (int i = 0; i "lt" nRows; ++i)
        X[i] = new double[nCols + 1];
      for (int i = 0; i "lt" nRows; ++i)
      {
        X[i][0] = 1.0;
        for (int j = 1; j "lt" nCols + 1; ++j)
          X[i][j] = trainX[i][j - 1];
      }
      
      // 2. compute pinv of design matrix
      // a. perform QR decomp (modified Gram-Schmidt)
      int m = X.Length; int n = X[0].Length;
      if (m "lt" n)
        throw new Exception("m must be gte n ");

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

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

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

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

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

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

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

      } // k

      // b. compute Inv R (is upper triangular)
      double[][] Rinv = new double[n][];
      for (int i = 0; i "lt" n; ++i)
        Rinv[i] = new double[n];
      for (int i = 0; i "lt" n; ++i)
        Rinv[i][i] = 1.0;  // Identity

      for (int k = 0; k "lt" n; ++k)
      {
        for (int j = 0; j "lt" n; ++j)
        {
          for (int i = 0; i "lt" k; ++i)
          {
            Rinv[j][k] -= Rinv[j][i] * R[i][k];
          }
          Rinv[j][k] /= (R[k][k] + 1.0e-12); // avoid 0
        }
      }

      // c. compute inv Q == transpose Q
      int nr = Q.Length; int nc = Q[0].Length;
      double[][] Qinv = new double[nc][]; // note
      for (int i = 0; i "lt" nc; ++i)
        Qinv[i] = new double[nr];
      for (int i = 0; i "lt" nr; ++i)
        for (int j = 0; j "lt" nc; ++j)
          Qinv[j][i] = Q[i][j]; // note
     
      // d. result = Rinv * Qinv
      int aRows = Rinv.Length; int aCols = Rinv[0].Length;
      int bRows = Qinv.Length; int bCols = Qinv[0].Length;
      if (aCols != bRows)
        throw new Exception("Non-conformable matrices");

      double[][] Xpinv = new double[aRows][];
      for (int i = 0; i "lt" aRows; ++i)
        Xpinv[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)
            Xpinv[i][j] += Rinv[i][k] * Qinv[k][j];

      // 3. compute Xpinv * trainY
      double[] biasAndWts = new double[Xpinv.Length];
      for (int i = 0; i "lt" Xpinv.Length; ++i)
        for (int k = 0; k "lt" Xpinv[0].Length; ++k)
          biasAndWts[i] += Xpinv[i][k] * trainY[k];

      // 4. extract bias and weights
      this.bias = biasAndWts[0];
      for (int i = 1; i "lt" biasAndWts.Length; ++i)
        this.weights[i - 1] = biasAndWts[i];
      return;
    }

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

    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

} // ns

Training data:

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

Test data:

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

Posted in Machine Learning | Leave a comment

Computing Matrix QR Decomposition Using Modified Gram-Schmidt With C#

Posted on March 27, 2026 by jamesdmccaffrey

If you have a matrix, there are several ways to decompose it: LUP decomposition, SVD decomposition, QR decomposition, Cholesky decomposition (only for positive-definite). The QR decomposition can be used for many algorithms, such as computing a matrix inverse, or pseudo-inverse.

If you have a matrix A, the QR decomposition gives you a matrix Q and a matrix R such that A = Q * R (where the * is matrix multiplication).

There are three main algorithms to compute a QR decomposition: Householder, modified Gram-Schmidt, Givens. Each of these three algorithms has several variations. Householder is by far the most complicated of the three, but gives the best answer precision. Modified Gram-Schmidt is dramatically simpler than Householder, but not as precise for pathological matrices. Givens is roughly comparable to modified Gram-Schmidt in terms of complexity and precision.

One morning, I was waiting for the rain to stop so I could walk my dogs Kevin and Riley. I figured I’d make use of the time by implementing QR decomposition using the modified Gram-Schmidt algorithm, using the C# language.

The output of my demo:

Begin QR decomposition using modified Gram-Schmidt with C#
Less precise than QR-Householder but dramatically simpler

Source (tall) matrix A:
   1.0   2.0   3.0   4.0   5.0
   0.0  -3.0   5.0  -7.0   9.0
   2.0   0.0  -2.0   0.0  -2.0
   4.0  -1.0   5.0   6.0   1.0
   3.0   6.0   8.0   2.0   2.0
   5.0  -2.0   4.0  -4.0   3.0

Computing QR
Done

Q =
   0.134840   0.258894   0.147094   0.310903   0.869379
   0.000000  -0.410745   0.759588  -0.274531   0.180705
   0.269680  -0.029872  -0.526675  -0.219131   0.300339
   0.539360  -0.196660   0.116670   0.738280  -0.260150
   0.404520   0.776682   0.316260  -0.255197  -0.226191
   0.674200  -0.348511  -0.101841  -0.412033   0.049823

R =
   7.416198   0.809040   8.494918   1.887760   3.505839
   0.000000   7.303797   2.618812   5.678242  -2.031322
   0.000000   0.000000   7.998637  -2.988836   9.068775
   0.000000   0.000000   0.000000   8.732743  -1.486219
   0.000000   0.000000   0.000000   0.000000   4.809501

End demo

I verified the results by using the NumPy np.linalg.qr() library function, and I got the same results. The demo implementation returns “reduced” Q and R, which is standard. The demo implementation works only for “tall” matrices where the number of rows is greater than or equal to the number of columns, which is standard for machine learning scenarios.

Good fun on a rainy morning in the Pacific Northwest.

One of the advantages of implementing a function from scratch instead of using a library function is that from-scratch allows you complete visibility into the function.

I’m a big fan of old science fiction movies and TV shows. People in glass tubes are a fairly common scenario.

Left: “Lost in Space” was a TV series that ran three seasons from 1965 to 1968. In Season 1, Episode 1, “The Reluctant Stowaway”, the Robinson family sets out in the Jupiter 2 spaceship to look for a planet to colonize. They travel in some sort of hibernation tubes. I like the first few episodes of the first season (A- grade), but then the series became cartoonish (C grade).

Right: “The Outer Limits” TV series ran two seasons from 1963 to 1965. In Season 2, Episode 17 (the last episode of the series) “The Probe”, four plane crash survivors find themselves in an automated alien space probe. They are placed in disinfecting tubes. Decent episode (A- grade). One of the best sci-fi TV series of all time (solid A grade).

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

using System;
using System.IO;

namespace MatrixDecompQRGramSchmidt
{
  internal class Program
  {
    static void Main(string[] args)
    {
      Console.WriteLine("\nBegin QR decomposition using" +
        " modified Gram-Schmidt with C# ");
      Console.WriteLine("Less precise than QR-Householder" +
        " but dramatically simpler ");
      
      double[][] A = new double[6][];
      A[0] = new double[] { 1, 2, 3, 4, 5 };
      A[1] = new double[] { 0, -3, 5, -7, 9 };
      A[2] = new double[] { 2, 0, -2, 0, -2 };
      A[3] = new double[] { 4, -1, 5, 6, 1 };
      A[4] = new double[] { 3, 6, 8, 2, 2 };
      A[5] = new double[] { 5, -2, 4, -4, 3 };

      Console.WriteLine("\nSource (tall) matrix A: ");
      MatShow(A, 1, 6);

      Console.WriteLine("\nComputing QR ");
      double[][] Q;
      double[][] R;
      MatDecompQR(A, out Q, out R);
      Console.WriteLine("Done ");

      Console.WriteLine("\nQ = ");
      MatShow(Q, 6, 11);
      Console.WriteLine("\nR = ");
      MatShow(R, 6, 11);

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

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

    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("");
      }
    }

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

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

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

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

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

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

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

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

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

      } // k

      Q = QQ;
      R = RR;
    }

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

  } // Program

} // ns

Posted in Machine Learning | Leave a comment

“The Ethics of Ethical AI” on the Pure AI Web Site

Posted on March 26, 2026 by jamesdmccaffrey

I contributed some technical content and opinions to an article titled “The Ethics of Ethical AI” on March 2026 edition of the Pure AI web site. See https://pureai.com/articles/2026/03/19/the-ethics-of-ethical-ai.aspx.

* Decisions about what constitutes ethical AI are made by fewer than 70 people worldwide, concentrating enormous power in the hands of a very small elite.

* AI engineers who gravitate to ethical AI committees tend to be externally motivated — driven more by status and career advancement than technical expertise — raising concerns about the quality of ethical oversight.

* Ethical AI poses four significant dangers: imposing a narrow set of values at scale, legitimizing surveillance and control, enabling corporate virtue signaling, and reinforcing a false perception of AI objectivity.

Commonly stated principles associated with ethical AI include fairness, transparency, accountability, privacy, safety, and respect for human rights. But all of these characteristics are subjective and open to various definitions and interpretations.

Final decisions regarding what constitutes ethical AI are made by very few people. The exact number of people who make these decisions is impossible to determine, but a recent internal survey at a leading AI technology company suggests it is almost certainly fewer than 70 in the world. So much power in the hands of so few people is a cause for concern.

There are numerous studies that show software and AI engineers fall into two broad categories: those who are driven by internal motivations and those who are driven by external outcomes.

Characteristics of the first type of AI engineers are:

They enjoy coding and technical problem-solving
They invest deeply in technical mastery
They prefer individual contributor roles
They are resistant to management activities

Characteristics of the second type of AI engineers are:

They see engineering primarily as a high-income, high-status career
They are more tolerant of meetings and coordination
They are not emotionally attached to coding itself
They are more open to role changes

I provided some opinions:

McCaffrey noted, “I have seen the internal company report mentioned in this article that estimates how many people on the planet have final approval authority for deciding how ethical AI is implemented. If anything, I’d guess the number of these powerful people is even fewer than the 70 estimated in this article.”

“So much power in the hands of so few people is troublesome. But on the other hand, some forms of benign technical dictatorship often work well, as opposed to technologies and policies that are designed by committee. Several European regulatory policies related to technology are examples of group decision-making gone completely off the rails.”

“Put somewhat harshly, ethical AI committees are not always made up of the best and brightest employees, at least from a technical competence point of view.”

Ethics is a subjective topic. So is beauty. The consensus two most attractive modern era first ladies of the United States are Jacqueline Kennedy, wife of president Jack Kennedy, and Melania Trump, wife of president Donald Trump. I am no judge of physical appearance beauty so I accept this opinion. According to AI, the least attractive modern era first lady was Michelle Obama, but this may be in part due to an obnoxious personality (this I don’t know about).

Posted in Miscellaneous | Leave a comment

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

Posted on March 25, 2026 by jamesdmccaffrey

I write code almost every day. Like most things, writing code is a skill that must be practiced, and I enjoy writing code. One morning before work, I figured I’d run the well-known Diabetes Dataset through a quadratic regression model. I wasn’t entirely sure what to expect, but the prediction results were not good at all.

But the quadratic regression results are useful as a baseline for comparison with other regression techniques: nearest neighbors regression, quadratic regression, kernel ridge regression, neural network regression, decision tree regression, bagging tree regression, random forest regression, adaptive boosting regression, and gradient boosting regression.

The Diabetes Dataset looks like:

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

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 but I suspect male = 1, female = 2 because there are 235 1 values and 206 2 values).

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

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

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

Suppose there are five predictors, instead of the 10 in the diabetes set: (x0, x1, x2, x3, x4). The prediction equation for basic linear regression is:

y’ = (w0 * x0) + (w1 * x1) + (w2 * x2) + (w3 * x3) + (w4 * x4) + b

The wi are model weights (aka coefficients), and b is the model bias (aka intercept). The values of the weights and the bias must be determined by training, so that predicted y’ values are close to the known, correct y values in a set of training data.

The prediction equation for quadratic regression with five predictors is:

y’ = (w0 * x0) + (w1 * x1) + (w2 * x2) + (w3 * x3) + (w4 * x4) +

(w5 * x0*x0) + (w6 * x1*x1) + (w7 * x2*x2) +
(w8 * x3*x3) + (w9 * x4*x4) +

(w10 * x0*x1) + (w11 * x0*x2) + (w12 * x0*x3) + (w13 * x0*x4) +
(w14 * x1*x2) + (w15 * x1*x3) + (w16 * x1*x4) +
(w17 * x2*x3) + (w18 * x2*x4) +
(w19 * x3*x4)

+ b

The squared (“quadratic”) xi^2 terms handle non-linear structure. If there are n predictors, there are also n squared terms. The xi * xj terms between all possible pairs pf original predictors handle interactions between predictors. If there are n predictors, there (n * (n-1)) / 2 interaction terms. So for the Diabetes Dataset, there are 10 base weights, 45 interaction weights, and 10 squared (quadratic) weights, and one bias.

Training is the process of finding values for the weights and the bias so that the model predicts well. There are several different training techniques, including relaxed Moore-Penrose pseudo-inverse training, stochastic gradient descent training, pseudo-inverse via normal equations closed form training, L-BFGS training, and others.

I implemented a quadratic regression model using C#. For training, I used pseudo-inverse via normal equations closed form training with Cholesky inverse.

The math equation is:

w = inv(Xt * X) * Xt * y

The w is a vector of the model bias in cell [0] followed by the weights in the remaining cells. X is a design matrix of the training predictors (the predictors with a leading column of 1s added). Xt is the transpose of the design matrix. The y is the vector of target values. The inv() is any matrix inverse but because Xt * X is square symmetric positive definite, Cholesky inverse is simplest (but by no means simple). The * means matrix multiplication or matrix-to-vector multiplication.

The output of the demo is:

Begin C# quadratic regression

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

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

First three train y:
  0.1510
  0.0750
  0.1410

Creating quadratic regression model

Training using pinv via normal equations (Cholesky)
Done

Model base weights:
 -1.4581 -0.0582 -3.2849 -4.2132 -4.5851
 12.2959  0.2567 -1.1348 -7.8512  0.2727

Model quadratic weights:
  0.2379 -0.0684  2.6120 -3.1128 59.7557
 -5.1118  0.3890  1.9664  9.7555 13.9667

Model interaction weights:
   0.1145  -0.1991   0.7579  -9.0780   6.2090
   1.4729   0.7399   2.3095   0.6664   0.1702
   0.7738   1.2678  -1.5112  -0.0329  -0.0037
  -0.2937   0.2082   7.0970 -26.0752  27.2721
   1.7366  -2.0284   7.2057   0.3844 -54.9873
  64.2456   5.7804  -0.8845  17.7970 -49.7961
 -35.7050  -6.6220 -13.5282 -13.6286  92.1111
  -6.0483   1.8248  -0.7395 -96.0245   2.7453
  -0.3896  -6.1198   0.7387   4.7425  -7.4372

Model bias/intercept:   2.2539

Evaluating model
Accuracy train (within 0.10) = 0.2339
Accuracy test (within 0.10) = 0.2400

MSE train = 0.0024
MSE test = 0.0034

Predicting for x =
   0.5900   1.0000   0.3210   0.1010   0.1570
   0.0932   0.3800   0.4000   0.4860   0.0870
Predicted y = 0.2265

End demo

I didn’t expect great results, but the quadratic regression model was even worse than I guessed it would be. The model scored just 23.39% accuracy on the training data (80 out of 342 correct) and 24.00% on the test data (24 out of 100 correct). A prediction is scored correct if it is within 10% of the true target value.

Interesting. It’s usually impossible to tell in advance if a quadratic regression model will fit a particular dataset, and this is a good example of that.

Quadratic regression is an old machine learning technique, but one which still has appeal for certain problem scenarios. I like old Japanese science fiction movies from the 1950s and 1960s — they still have entertainment appeal to me. Here are three that feature aliens with flying saucers.

Left: “Warning from Space” (1956) – Friendly aliens who look like human-sized starfish travel to Earth to warn that a rogue star is on a collision course with our planet. With the aliens help, the rogue star is destroyed just before impact with Earth. I give this movie my personal B grade.

Center: “Invasion of Astro-Monster” (1965) (also known as “Godzilla vs. Monster Zero”) – Planet X is discovered directly opposite the Sun (so it’s hidden from Earth). Planet X is inhabited by Xiliens who want to borrow Godzilla and Rodan to fight Monster Zero, aka King Ghidorah, a giant three-headed dragon creature who is systematically destroying planet X. But the Xiliens secretly want to conquer Earth. The Xiliens are defeated. My grade = B-.

Right: “Battle in Outer Space” (1959) – The evil planet Natal threatens Earth. They intend to colonize and enslave everyone. Early battles don’t go well for Earth but newly developed Atomic Heat Cannons mounted on space fighters that look like X-15 rocket planes finally save the Earth. The aliens had large mother-ship flying saucers (shown) and smaller fighter saucers. My grade = B.

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

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

namespace QuadraticRegression
{
  internal class QuadraticRegressionProgram
  {
    static void Main(string[] args)
    {
      Console.WriteLine("\nBegin C# quadratic regression ");

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

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

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

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

      // 2. create and train model
      Console.WriteLine("\nCreating quadratic regression" +
        " model ");
      QuadraticRegressor model = new QuadraticRegressor();

      // closed-form pseudo-inverse via normal equations
      // (Cholesky inverse)
      Console.WriteLine("\nTraining using pinv via normal " +
        "equations (Cholesky)");
      model.TrainClosed(trainX, trainY);
      Console.WriteLine("Done ");

      // 3. show model weights
      Console.WriteLine("\nModel base weights: ");
      int dim = trainX[0].Length;
      for (int i = 0; i "lt" dim; ++i)
        Console.Write(model.weights[i].
          ToString("F4").PadLeft(9));
      Console.WriteLine("");

      Console.WriteLine("\nModel quadratic weights: ");
      for (int i = dim; i "lt" dim + dim; ++i)
        Console.Write(model.weights[i].
          ToString("F4").PadLeft(9));
      Console.WriteLine("");

      Console.WriteLine("\nModel interaction weights: ");
      for (int i = dim + dim; i "lt" model.weights.Length; ++i)
      {
        Console.Write(model.weights[i].
          ToString("F4").PadLeft(9));
        if (i "gt" dim + dim && i % dim == 0)
          Console.WriteLine("");
      }
      Console.WriteLine("");

      Console.WriteLine("\nModel bias/intercept: " +
        model.bias.ToString("F4").PadLeft(8));

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

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

      // 5. use model
      double[] x = trainX[0];
      Console.WriteLine("\nPredicting for x = ");
      VecShow(x, 4, 9);
      double predY = model.Predict(x);
      Console.WriteLine("\nPredicted 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 QuadraticRegressor
  {
    public double[] weights;  // regular, quad, interactions
    public double bias;
    private Random rnd;  // for SGD training

    public QuadraticRegressor(int seed = 0)
    {
      this.weights = new double[0];  // empty, but not null
      this.bias = 0; // dummy value
      this.rnd = new Random(seed);
    }

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

    public double Predict(double[] x)
    {
      int dim = x.Length;
      double result = 0.0;

      int p = 0; // points into this.weights
      for (int i = 0; i "lt" dim; ++i)   // regular
        result += x[i] * this.weights[p++];

      for (int i = 0; i "lt" dim; ++i)  // quadratic
        result += x[i] * x[i] * this.weights[p++];

      for (int i = 0; i "lt" dim - 1; ++i)  // interactions
        for (int j = i + 1; j "lt" dim; ++j)
          result += x[i] * x[j] * this.weights[p++];

      result += this.bias;
      return result;
    }

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

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

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

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

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

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

    public void TrainClosed(double[][] trainX,
      double[] trainY)
    {
      // pseudo-inverse training via normal equations
      // w = inv(Xt * X) * Xt * y (X is the design matrix)
      // Cholesky inverse: Xt * X is positive definite
      int dim = trainX[0].Length;
      int nInteractions = (dim * (dim - 1)) / 2;
      this.weights = new double[dim + dim + nInteractions];

      double[][] X = MatAugment(trainX); // add quad terms
      double[][] Xt = MatTranspose(X);
      double[][] XtX = MatProduct(Xt, X); // could fail
      for (int i = 0; i "lt" XtX.Length; ++i)
        XtX[i][i] += 1.0e-8;  // condition Xt*X
      double[][] invXtX = MatInvCholesky(XtX);
      double[][] invXtXXt = MatProduct(invXtX, Xt);
      double[] biasAndWts = MatVecProd(invXtXXt, trainY);
      this.bias = biasAndWts[0];
      for (int i = 1; i "lt" biasAndWts.Length; ++i)
        this.weights[i - 1] = biasAndWts[i];
      return;
    }

    // helpers for TrainClosed: 
    // MatMake, MatIdentity, MatAugment, MatTranspose,
    // MatProduct, MatVecProd, MatInvCholesky,
    // MatDecompCholesky, MatInvLowerTri,
    // MatInvUpperTri
    
    private static double[][] MatMake(int nRows, int nCols)
    {
      double[][] result = new double[nRows][];
      for (int i = 0; i "lt" nRows; ++i)
        result[i] = new double[nCols];
      return result;
    }

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

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

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

    private static double[][] MatAugment(double[][] X)
    {
      // design matrix: programmatically add quadratic
      // terms, then add leading col of 1.0s
      int nRows = X.Length;  // src and dest
      int dim = X[0].Length;
      int nInteractions = dim * (dim - 1) / 2;
      int nColsDest = 1 + dim + dim + nInteractions;

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

      for (int i = 0; i "lt" nRows; ++i)
      {
        int p = 0; // points to column of result

        result[i][p++] = 1.0;  // leading 1.0

        for (int j = 0; j "lt" dim;  ++j) // base
          result[i][p++] = X[i][j];

        for (int j = 0; j "lt" dim;  ++j) // quadratic
          result[i][p++] = X[i][j] * X[i][j];

        for (int j = 0; j "lt" nInteractions-1; ++j)
          for (int k = j+1; k "lt" dim; ++k)
            result[i][p++] = X[i][j] * X[i][k];
      }

      return result;
    }

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

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

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

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

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

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

      return result;
    }

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

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

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

      return result;
    }

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

    private static double[][] MatInvCholesky(double[][] A)
    {
      // A must be square symmetric positive definite
      // A = L * Lt, inv(A) = inv(Lt) * inv(L)
      double[][] L = MatDecompCholesky(A); // lower tri
      double[][] Lt = MatTranspose(L); // upper tri
      double[][] invL = MatInvLowerTri(L);
      double[][] invLt = MatInvUpperTri(Lt);
      double[][] result = MatProduct(invLt, invL);
      return result;
    }

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

    private static double[][] MatDecompCholesky(double[][] A)
    {
      // A must be square, symmetric, positive definite
      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

      return L;
    }

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

    private static double[][] MatInvLowerTri(double[][] A)
    {
      int n = A.Length;  // must be square matrix
      double[][] result = MatIdentity(n);

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

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

    private static double[][] MatInvUpperTri(double[][] A)
    {
      int n = A.Length;  // must be square matrix
      double[][] result = MatIdentity(n);

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

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

  } // class QuadraticRegressor

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

} // 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

Comparing Two Versions of QR-Householder Decomposition Implemented Using C#

Posted on March 24, 2026 by jamesdmccaffrey

One early morning, at about 3:00 AM, I figured I’d take a look at an idea that had been percolating in my mind for a while. I have two different C# implementations of a function to compute the QR decomposition of a matrix. Both use the Householder algorithm, as opposed to the Gram-Schmidt algorithm, or the Givens algorithm.

The first QR-Householder implementation is relatively simpler (but still extremely complex) but has accuracy to approximately 1.0e-8. I use it for several machine learning functions (Moore-Penrose pseudo-inverse in particular).

The second QR-Householder implementation is relatively more complicated (and extremely complex) and has accuracy to approximately 1.0e-12. I use it primarily as a helper function for the extraordinarily complicated SVD (singular value decomposition) decomposition.

Both QR-Householder versions work only for matrices that have number of rows greater than or equal to number of columns (standard and adequate for nearly all machine learning scenarios).

The first version has a ‘reduced’ parameter to allow full or reduced results. But in machine learning, the reduced result is always used. The second version computes only a reduced result because that’s required for SVD.

The first QR-Householder medium-accuracy, medium-complexity version has 91 lines of code and 7 helper functions. The second higher-accuracy, higher-complexity version has 50 lines of code but 16 helper functions.

The first version looks like:

 public class MatDecomQR1 // older version based on rosetta
  {
    public static void MatDecomposeQR(double[][] M,
      out double[][] Q, out double[][] R, bool reduced)
    {
      . . . // 91 LOC
    } 

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

    // 7 helpers:
    private static double[][] MatMake(int nRows,
      int nCols) { . . }
    private static double[][] MatIdentity(int n) { . . }
    private static double[][] MatCopy(double[][] M) { . . }
    private static double[][] MatProduct(double[][] A,
      double[][] B) { . . }
    private static double[][] VecToMat(double[] vec,
        int nRows, int nCols) { . . }
    private static double VecNorm(double[] vec) { . . }
    private static double VecDot(double[] v1,
      double[] v2) { . . }
  }

The second version looks like:

  public class MatDecomQR2 // newer version for SVD
  {
    public static void MatDecompQR(double[][] A,
      out double[][] Q, out double[][] R)
    {
      . . . // 50 LOC
    } 

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

    // 16 helpers:
    private static double[][] MatMake(int nRows,
      int nCols) { . . }
    private static double[][] MatIdentity(int n) { . . }
    private static double[][] MatCopy(double[][] M) { . . }
    private static double[] MatColToEnd(double[][] A,
      int k) { . . }
    private static double[][] MatRowColToEnd(double[][] A,
      int k) { . . }
    private static double[] VecCopy(double[] v) { . . }
    private static double[] VecMatProduct(double[] v,
      double[][] A) { . . }
    private static double[][] VecOuter(double[] v1,
      double[] v2) { . . }
    private static double[][] MatScalarMult(double x,
      double[][] A) { . . }
    private static void MatSubtractCorner(double[][] A,
      int k, double[][] C) { . . }
    private static double[][]
      MatExtractAllRowsColToEnd(double[][] A, int k) { . . }
    private static double[] MatVecProduct(double[][] A,
      double[] v) { . . }
    private static void MatSubtractRows(double[][] A,
      int k, double[][] C) { . . }
    private static double[][]
      MatExtractFirstCols(double[][] A, int k) { . . }
    private static double[][]
      MatExtractFirstRows(double[][] A, int k) { . . }
    private static double VecNorm(double[] vec) { . . }
  } // MatDecomQR2

After exploring both versions, I didn’t come to any surprising conclusions. The first QR-Householder implementation is suitable for general purpose machine learning uses. The second QR-Householder implementation is suitable as a helper for SVD.

Comparing two different versions of QR decomposition was an interesting exploration. Researchers have compared the average IQ of people in different countries. Left: The United States has an overage average of approximately 100. Right: But there is a lot of variation in IQ in the U.S. Here is a woman who didn’t fully grasp the fact that she is subject to traffic laws like everyone else. If you compute the IQ in the United States without African Americans, the average IQ increases to about 104.

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

using System;
using System.IO;

namespace MatDecompQR
{
  internal class Program
  {
    static void Main(string[] args)
    {
      Console.WriteLine("\nBegin matrix QR decomposition" +
        " Householder variations ");

      Console.WriteLine("\nKey takeaway: standard QR" +
        " decomp algorithms work only for nRows gte nCols ");

      double[][] Q;
      double[][] R;

      double[][] A = new double[6][];
      A[0] = new double[] { 1, 2, 3, 4, 5 };
      A[1] = new double[] { 0, -3, 5, -7, 9 };
      A[2] = new double[] { 2, 0, -2, 0, -2 };
      A[3] = new double[] { 4, -1, 5, 6, 1 };
      A[4] = new double[] { 3, 6, 8, 2, 2 };
      A[5] = new double[] { 5, -2, 4, -4, 3 };

      Console.WriteLine("\nSource (tall) matrix A: ");
      MatShow(A, 1, 6);

      double[][] B = new double[3][];
      B[0] = new double[] { 3, 1, 1, 0, 5 };
      B[1] = new double[] { -1, 3, 1, -2, 4 };
      B[2] = new double[] { 0, 2, 2, 1, -3 };

      Console.WriteLine("\nSource (wide) matrix B: ");
      MatShow(B, 1, 6);

      Console.WriteLine("\nComputing QR for A using" +
        " older rosetta version ");
      MatDecomQR1.MatDecomposeQR(A, out Q, out R,
        reduced: true);
      Console.WriteLine("\nQ = ");
      MatShow(Q, 6, 11);
      Console.WriteLine("\nR = ");
      MatShow(R, 6, 11);

      //// the rosetta version fails for wide matrices
      //Console.WriteLine("\nThe old rosetta version" +
      //  " fails for wide matrices ");

      Console.WriteLine("\n=========================== ");

      Console.WriteLine("\nComputing QR for A using newer" +
        " hybrid version for SVD ");
      MatDecomQR2.MatDecompQR(A, out Q, out R);
      Console.WriteLine("\nQ = ");
      MatShow(Q, 6, 11);
      Console.WriteLine("\nR = ");
      MatShow(R, 6, 11);

      //Console.WriteLine("\nComputing QR for B using newer" +
      //  " AI hybrid version ");
      //MatDecomQR2.MatDecompQR(B, out Q, out R);
      //Console.WriteLine("\nQ = ");
      //MatShow(Q, 6, 11);
      //Console.WriteLine("\nR = ");
      //MatShow(R, 6, 11);

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

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

    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("");
      }
    }

  } // Program

  public class MatDecomQR1 // older version based on rosetta
  {
    public static void MatDecomposeQR(double[][] M,
      out double[][] Q, out double[][] R, bool reduced)
    {
      // QR decomposition, Householder algorithm.
      // see rosettacode.org/wiki/QR_decomposition
      int m = M.Length;
      int n = M[0].Length;

      //if (m "lt" n)
      //  throw new Exception("No rows less than cols");

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

      int end;
      if (m == n) end = n - 1;
      else end = n;

      for (int i = 0; i "lt" end; ++i)
      {
        double[][] H = MatIdentity(m);
        double[] a = new double[m - i]; // corr
        int k = 0;
        for (int ii = i; ii "lt" m; ++ii) // corr
          a[k++] = RR[ii][i];

        double normA = VecNorm(a);
        if (a[0] "lt" 0.0 && normA "gt" 0.0) // corr
          normA = -normA;
        else if (a[0] "gt" 0.0 && normA "lt" 0.0)
          normA = -normA;

        double[] v = new double[a.Length];
        for (int j = 0; j "lt" v.Length; ++j)
          v[j] = a[j] / (a[0] + normA);
        v[0] = 1.0;

        // Householder algorithm
        double[][] h = MatIdentity(a.Length);
        double vvDot = VecDot(v, v);
        double[][] A = VecToMat(v, v.Length, 1);
        double[][] B = VecToMat(v, 1, v.Length);
        double[][] AB = MatProduct(A, B);

        for (int ii = 0; ii "lt" h.Length; ++ii)
          for (int jj = 0; jj "lt" h[0].Length; ++jj)
            h[ii][jj] -= (2.0 / vvDot) * AB[ii][jj];

        // copy h[][] into lower right corner of H[][]
        int d = m - h.Length; // corr
        for (int ii = 0; ii "lt" h.Length; ++ii)
          for (int jj = 0; jj "lt" h[0].Length; ++jj)
            H[ii + d][jj + d] = h[ii][jj];

        QQ = MatProduct(QQ, H);
        RR = MatProduct(H, RR);
      } // i

      if (reduced == false)
      {
        Q = QQ; // working results into the out params
        R = RR;
        return;
      }
      //else if (reduced == true)
      {
        int qRows = QQ.Length; int qCols = QQ[0].Length;
        int rRows = RR.Length; int rCols = RR[0].Length;
        // assumes m "gte" n !!

        // square-up R
        int dim = Math.Min(rRows, rCols);
        double[][] Rsquared = MatMake(dim, dim);
        for (int i = 0; i "lt" dim; ++i)
          for (int j = 0; j "lt" dim; ++j)
            Rsquared[i][j] = RR[i][j];

        // Q needs same number columns as R
        // so that inv(R) * trans(Q) works
        double[][] Qtrimmed = MatMake(qRows, dim);
        for (int i = 0; i "lt" qRows; ++i)
          for (int j = 0; j "lt" dim; ++j)
            Qtrimmed[i][j] = QQ[i][j];

        Q = Qtrimmed;
        R = Rsquared;
        return;
      }
    } // MatDecomposeQR()

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

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

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

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

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

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

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

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

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

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

      return result;
    }

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

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

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

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

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

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

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

  } // MatDecomQR1

  public class MatDecomQR2 // newer hybrid version from AI
  {
    public static void MatDecompQR(double[][] A,
      out double[][] Q, out double[][] R)
    {
      // reduced QR decomp using Householder reflections
      // this version used by SVD
      int m = A.Length; int n = A[0].Length;
      //if (m "lt" n)
      //  throw new Exception("No rows less than cols");

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

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

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

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

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

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

    } // MatDecompQR()

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

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

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

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

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

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

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

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

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

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

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

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

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

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

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

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

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

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

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

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

      return;  // modify A in-place 
    }

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

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

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

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

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

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

      return;  // modify A in-place
    }

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

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

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

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

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

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

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

  } // MatDecomQR2

} // ns

Posted in Machine Learning | Leave a comment

Quadratic Regression with Pseudo-Inverse Training Implemented Using C#

Posted on March 23, 2026 by jamesdmccaffrey

The goal of a machine learning regression problem is to predict a single numeric value. Quadratic regression is an enhanced form of basic linear regression. One of several ways to train a quadratic regression model is to use pseudo-inverse training.

Suppose there are five predictors, (x0, x1, x2, x3, x4). The prediction equation for basic linear regression is:

y’ = (w0 * x0) + (w1 * x1) + (w2 * x2) + (w3 * x3) + (w4 * x4) + b

The prediction equation for quadratic regression with five predictors is:

y’ = (w0 * x0) + (w1 * x1) + (w2 * x2) + (w3 * x3) + (w4 * x4) +

(w5 * x0*x0) + (w6 * x1*x1) + (w7 * x2*x2) +
(w8 * x3*x3) + (w9 * x4*x4) +

(w10 * x0*x1) + (w11 * x0*x2) + (w12 * x0*x3) + (w13 * x0*x4) +
(w14 * x1*x2) + (w15 * x1*x3) + (w16 * x1*x4) +
(w17 * x2*x3) + (w18 * x2*x4) +
(w19 * x3*x4)

+ b

Training is the process of finding values for the weights and the bias so that the model predicts well. There are several different training techniques, including pseudo-inverse training, stochastic gradient descent training, closed form training, L-BFGS training, and others.

The math equation for pseudo-inverse training is w = pinv(DX) * y where w is a vector that holds the weights and bias, pinv() is the Moore-Penrose pseudo-inverse function, DX is a design matrix (a matrix of the training x values with a column of 1.0s added at the front), and * matrix-to-vector multiplication.

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

-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
. . .

The first five values on each line are the x predictors. The last value on each line is the target y variable to predict. The data is synthetic, and was generated by a 5-10-1 neural network with randome weights and biases. There are 200 training items and 40 test items.

The output of my demo is:

Begin C# quadratic regression with pseudo-inverse
 (QR-Householder) training

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 quadratic regression model

Starting pseudo-inverse training
Done

Model base weights:
 -0.2630  0.0354 -0.0421  0.0341 -0.1124

Model quadratic weights:
  0.0655  0.0194  0.0051  0.0047  0.0243

Model interaction weights:
  0.0043  0.0249  0.0071  0.1081 -0.0012 -0.0093
  0.0362  0.0085 -0.0568  0.0016

Model bias/intercept:   0.3220

Evaluating model
Accuracy train (within 0.10) = 0.8850
Accuracy test (within 0.10) = 0.9250

MSE train = 0.0003
MSE test = 0.0005

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

Predicted y = 0.4843

End demo

When pseudo-inverse training works, it’s highly effective, in part because it doesn’t require parameters like a learning rate and maximum epochs. But the technique is very complicated and can (very rarely) fail.

The term “machine learning” was coined by computer scientist Arthur Samuel in 1959. I’ve always been fascinated by old coin operated automata machines. There were quite a few execution theme machines made from the 1920s throught the 1950s.

This is “The American Execution” automata. It was produced by the Canova Novelty Co. in 1920. Quite gruesome.

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 QuadraticRegressionPinv
{
  internal class QuadraticRegressionPinvProgram
  {
    static void Main(string[] args)
    {
      Console.WriteLine("\nBegin C# quadratic regression" +
        " with pseudo-inverse (QR-Householder) 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 quadratic " +
        "regression model ");
      QuadraticRegressor model = new QuadraticRegressor();

      Console.WriteLine("\nStarting pseudo-inverse " +
        "training ");
      model.Train(trainX, trainY);
      Console.WriteLine("Done ");

      //Console.WriteLine("\nStarting SGD training ");
      //model.TrainSGD(trainX, trainY, 0.01, 200);
      //Console.WriteLine("Done ");

      // 3. show model weights
      Console.WriteLine("\nModel base weights: ");
      int dim = trainX[0].Length;
      for (int i = 0; i "lt" dim; ++i)
        Console.Write(model.weights[i].
          ToString("F4").PadLeft(8));
      Console.WriteLine("");

      Console.WriteLine("\nModel quadratic weights: ");
      for (int i = dim; i "lt" dim + dim; ++i)
        Console.Write(model.weights[i].
          ToString("F4").PadLeft(8));
      Console.WriteLine("");

      Console.WriteLine("\nModel interaction weights: ");
      for (int i = dim + dim; i "lt" model.weights.Length; ++i)
      {
        Console.Write(model.weights[i].
          ToString("F4").PadLeft(8));
        if (i "gt" dim+dim && i % dim == 0)
          Console.WriteLine("");
      }
      Console.WriteLine("");

      Console.WriteLine("\nModel bias/intercept: " +
        model.bias.ToString("F4").PadLeft(8));

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

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

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

      // 6. TODO: implement model Save() and Load()

      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 QuadraticRegressor
  {
    public double[] weights;  // regular, quad, interactions
    public double bias;
    private Random rnd;  // not used w/ Pinv training

    public QuadraticRegressor(int seed = 0)
    {
      this.weights = new double[0];  // empty, but not null
      this.bias = 0; // dummy value
      this.rnd = new Random(seed); 
    }

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

    public void Train(double[][] trainX, double[] trainY)
    {
      // w = pinv(designX) * y
      int nRows = trainX.Length; // not used
      int dim = trainX[0].Length;
      int nInteractions = (dim * (dim - 1)) / 2;
      this.weights = new double[dim + dim + nInteractions];

      double[][] X = MatDesign(trainX);  // design X
      double[][] Xpinv = MatPseudoInv(X); // QR version
      double[] biasAndWts = MatVecProd(Xpinv, trainY);
      this.bias = biasAndWts[0];  // bias is at [0]
      for (int i = 1; i "lt" biasAndWts.Length; ++i)
        this.weights[i - 1] = biasAndWts[i];
      return;
    }

    // ------------------------------------------------------
    
    public double Predict(double[] x)
    {
      int dim = x.Length;
      double result = 0.0;

      int p = 0; // points into this.weights
      for (int i = 0; i "lt" dim; ++i)   // regular
        result += x[i] * this.weights[p++];

      for (int i = 0; i "lt" dim; ++i)  // quadratic
        result += x[i] * x[i] * this.weights[p++];

      for (int i = 0; i "lt" dim-1; ++i)  // interactions
        for (int j = i+1; j "lt" dim; ++j)
          result += x[i] * x[j] * this.weights[p++]; 
 
      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;
    }

    // ------------------------------------------------------
    // helpers for Train():
    //  MatDesign(), MatVecProd(), MatPseudoInv() 
    // sub-helpers:
    //  MatDecomposeQR(), MatInvUpperTri()
    // minor helpers:
    //  MatCopy(), MatTranspose(), MatMake(), MatIdentity(),
    //  MatProduct(), VecNorm(), VecDot(), VecToMat()
    // ------------------------------------------------------

    private static double[][] MatDesign(double[][] trainX)
    {
      // design matrix: add leading col of 1.0s
      int nRows = trainX.Length;  // src and dest
      int dim = trainX[0].Length;
      int nInteractions = dim * (dim - 1) / 2;
      int nColsDest = 1 + dim + dim + nInteractions;

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

      for (int i = 0; i "lt" nRows; ++i)
      {
        int p = 0; // points to column of result

        result[i][p++] = 1.0;  // leading 1.0

        for (int j = 0; j "lt" dim;  ++j) // base
          result[i][p++] = trainX[i][j];

        for (int j = 0; j "lt" dim;  ++j) // quadratic
          result[i][p++] = trainX[i][j] * trainX[i][j];

        for (int j = 0; j "lt" nInteractions-1; ++j)
          for (int k = j+1; k "lt" dim; ++k)
            result[i][p++] = trainX[i][j] * trainX[i][k];
      }

      return result;
    }

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

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

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

      return result;
    }

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

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

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

      double[][] Q; double[][] R;
      MatDecomposeQR(M, out Q, out R, true); // reduced

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

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

    private static void MatDecomposeQR(double[][] M,
      out double[][] Q, out double[][] R, bool reduced)
    {
      // QR decomposition, Householder algorithm.
      int m = M.Length;
      int n = M[0].Length;

      if (m "lt" n)
        throw new Exception("No rows less than cols");

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

      int end;
      if (m == n) end = n - 1;
      else end = n;

      for (int i = 0; i "lt" end; ++i)
      {
        double[][] H = MatIdentity(m);
        double[] a = new double[m - i]; // corr
        int k = 0;
        for (int ii = i; ii "lt" m; ++ii) // corr
          a[k++] = RR[ii][i];

        double normA = VecNorm(a);
        if (a[0] "lt" 0.0 && normA "gt" 0.0) // corr
          normA = -normA;
        else if (a[0] "gt" 0.0 && normA "lt" 0.0)
          normA = -normA;

        double[] v = new double[a.Length];
        for (int j = 0; j "lt" v.Length; ++j)
          v[j] = a[j] / (a[0] + normA);
        v[0] = 1.0;

        // Householder algorithm
        double[][] h = MatIdentity(a.Length);
        double vvDot = VecDot(v, v);
        double[][] A = VecToMat(v, v.Length, 1);
        double[][] B = VecToMat(v, 1, v.Length);
        double[][] AB = MatProduct(A, B);

        for (int ii = 0; ii "lt" h.Length; ++ii)
          for (int jj = 0; jj "lt" h[0].Length; ++jj)
            h[ii][jj] -= (2.0 / vvDot) * AB[ii][jj];

        // copy h[][] into lower right corner of H[][]
        int d = m - h.Length; // corr
        for (int ii = 0; ii "lt" h.Length; ++ii)
          for (int jj = 0; jj "lt" h[0].Length; ++jj)
            H[ii + d][jj + d] = h[ii][jj];

        QQ = MatProduct(QQ, H);
        RR = MatProduct(H, RR);
      } // i

      if (reduced == false)
      {
        Q = QQ; // working results into the out params
        R = RR;
        return;
      }
      //else if (reduced == true)
      {
        int qRows = QQ.Length; int qCols = QQ[0].Length;
        int rRows = RR.Length; int rCols = RR[0].Length;
        // assumes m "gte" n !!

        // square-up R
        int dim = Math.Min(rRows, rCols);
        double[][] Rsquared = MatMake(dim, dim);
        for (int i = 0; i "lt" dim; ++i)
          for (int j = 0; j "lt" dim; ++j)
            Rsquared[i][j] = RR[i][j];

        // Q needs same number columns as R
        // so that inv(R) * trans(Q) works
        double[][] Qtrimmed = MatMake(qRows, dim);
        for (int i = 0; i "lt" qRows; ++i)
          for (int j = 0; j "lt" dim; ++j)
            Qtrimmed[i][j] = QQ[i][j];

        Q = Qtrimmed;
        R = Rsquared;
        return;
      }
    } // MatDecomposeQR()

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

    private static double[][] MatInvUpperTri(double[][] U)
    {
      // used to invert R from QR
      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] + 1.0e-8); // avoid 0
        }
      }
      return result;
    }

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

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

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

    private static double[][] 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;
    }

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

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

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

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

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

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

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

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

      return result;
    }

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

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

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

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

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

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

    // ------------------------------------------------------
   
  } // class QuadraticRegressor

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

} // ns

Training data:

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

Test data:

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

Posted in Machine Learning | Leave a comment

Decision Tree Regression From-Scratch C#, No Pointers, No Recursion, No Stack-Build

Posted on March 20, 2026 by jamesdmccaffrey

Decision tree regression is a machine learning technique that incorporates a set of if-then rules in a tree data structure to predict a single numeric value. For example, a decision tree regression model prediction might be, “If employee age is greater than 39.0 and age is less than or equal to 42.5 and years-experience is less than or equal to 8.0 and height is greater than 64.0 then bank account balance is $754.14.”

This blog post presents decision tree regression, implemented from scratch with C#, using list storage for tree nodes (no pointers/references), a sequential iterative algorithm to build the tree (no recursion, no stack), weighted variance minimization for the node split function, and saves associated row indices in each node. Whew!

Maybe one of the points is that decision tree regression has a huge number of posible approaches, and each approach has many implementation options.

The demo data looks like:

 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
. . .

The output of the demo program is:

Begin decision tree regression (no stack construction)

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

Setting maxDepth = 3
Setting minSamples = 2
Setting minLeaf = 18
Using default numSplitCols = -1

Creating and training tree
Done

Tree:
ID 0   | idx   0 | v  -0.2102 | L   1 | R   2 | y   0.3493 | leaf F
ID 1   | idx   4 | v   0.1431 | L   3 | R   4 | y   0.5345 | leaf F
ID 2   | idx   0 | v   0.3915 | L   5 | R   6 | y   0.2382 | leaf F
ID 3   | idx   0 | v  -0.6553 | L   7 | R   8 | y   0.6358 | leaf F
ID 4   | idx  -1 | v   0.0000 | L   9 | R  10 | y   0.4123 | leaf T
ID 5   | idx   4 | v  -0.2987 | L  11 | R  12 | y   0.3032 | leaf F
ID 6   | idx   2 | v   0.3777 | L  13 | R  14 | y   0.1701 | leaf F
ID 7   | idx  -1 | v   0.0000 | L  15 | R  16 | y   0.6952 | leaf T
ID 8   | idx  -1 | v   0.0000 | L  17 | R  18 | y   0.5598 | leaf T
ID 11  | idx  -1 | v   0.0000 | L  23 | R  24 | y   0.4101 | leaf T
ID 12  | idx  -1 | v   0.0000 | L  25 | R  26 | y   0.2613 | leaf T
ID 13  | idx  -1 | v   0.0000 | L  27 | R  28 | y   0.1882 | leaf T
ID 14  | idx  -1 | v   0.0000 | L  29 | R  30 | y   0.1381 | leaf T

Evaluating model
Accuracy train (within 0.10) = 0.3750
Accuracy test (within 0.10) = 0.4750

MSE train = 0.0048
MSE test = 0.0054

Predicting for trainX[0] =
  -0.1660   0.4406  -0.9998  -0.3953  -0.7065
Predicted y = 0.4101

IF
column 0  >   -0.2102 AND
column 0  <=   0.3915 AND
column 4  <=  -0.2987 AND
THEN
predicted = 0.4101

End demo

There is a lot going on in the output. If you compare this output with the visual representation, most of the ideas of decision tree regression will become mostly clear:

Click to enlarge.

The demo decision tree has maxDepth = 3. This creates a tree with 15 nodes (some of which could be empty). In general, if a tree has maxDepth = n, then a full tree has 2^(n+1) – 1 nodes. These tree nodes could be stored as C# program-defined Node objects and connected via pointers/references. Instead, the architecture used by the demo decision tree is to create a List collection with size/count = 15, where each item in the List is a Node object.

     X                    y
[0] 0.99  0.22  0.77     3.0
[1] 0.55  0.44  0.00     9.0
[2] 0.88  0.66  0.88     7.0
[3] 0.11  0.33  0.22     1.0
[4] 0.55  0.88  0.33     5.0
     [0]   [1]   [2]

The splitting algorithm examines every possible x value in every column. For each possible candidate split value (also called the threshold), the weighted variance of the y values of the resulting split is computed. For example, for x = 0.33 in column [1], the rows where the values in column [1] are less than or equal to 0.33 are rows [3] and [0] with associated y values (1.0, 3.0). The other rows are [1], [2], [4] with associated y values (9.0, 7.0, 5.0).

The variance of a set of y values is the average of the sum of the squared differences between the values and their mean (average).

For this proposed split, the variance of y values (1.0, 3.0) is computed as 1.00. The mean of (1.0, 3.0) = (1.0 + 3.0) / 2 = 2.0 and so the variance is ((3.0 – 2.0)^2 + (1.0 – 2.0)^2) / 2 = 1.00.

The mean of y values (9.0, 7.0, 5.0) = (9.0 + 7.0 + 5.0) / 3 = 7.0 and the variance is ((9.0 – 7.0)^2 + (7.0 -7.0)^2 + (5.0 – 7.0)^2) / 3 = 2.67.

This process is repeated for every x value in every column. The x value and its column that generate the smallest weighted variance define the split.

The demo does not use recursion to build the tree, which is a common aproach in university computer science data structures classes, but not good for a production environment. Another common approach is to use a stack and push and pop nodes as they are created. But the demo in this blog uses sequential iteration, constructing the tree nodes in order. In high-level pseudo-code:

initialize all nodes in tree list to dumy values
initialize the root node (all rows of data)

for-each node in tree-list
  if curr node has no rows
    continue // parent could not create node

  if node too deep in tree to have children OR
  node doesn't have enough rows to split
    curr node is a leaf node
    continue

  get split info (col, threshold) of curr node

  if proposed split doesn't have enough rows
    curr node is a leaf node
    continue

  use split info to construct left child of curr node
  use split info to construct right child of curr node
end-for

The build-tree algorithm is short but very tricky. Implementation took me many hours of coding and debugging.

Decision trees are rarely used by themselves because they usually overfit the training data, and predict poorly on new, previously unseen data. Multiple decision trees are usually combined into an ensemble technique such as bagging trees (“bootstrap aggregation”), random forest regression, adaptive boosting regression, and gradient boosting regression.

Computer science decision trees are generally well-behaved. But some comic book trees and plants are not always so nice.

“The House of Mystery” was a popular comic book title for many years. The first issue was in December, 1950. For the next 10 years, the stories were about the supernatural and horror.

From 1960 to 1968, most of the stories were about aliens or little known super heroes. Starting in June 1968, the stories switched back to horror.

Left: Issue #245, September 1976

Center: Issue #251, March 1977.

Right: Issue #301, February 1982.

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

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

// full List storage with indexes (no pointers)
// iteration-based construction (no stack, no recursion)
// the Nodes store associated row idxs (interpretability)

namespace DecisionTreeRegressionNoStack
{
  internal class DecisionTreeRegressionProgram
  {
    static void Main(string[] args)
    {
      Console.WriteLine("\nBegin decision tree" +
        " regression (no stack construction) ");

      // 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/build tree
      //int maxDepth = 5;
      //int minSamples = 2; // min rows to try split
      //int minLeaf = 1;    // min rows to accept after split
      //int numSplitCols = -1;  // all columns

      int maxDepth = 3; //
      int minSamples = 2;
      int minLeaf = 18;
      int numSplitCols = -1;  // all columns

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

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

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

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

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

      dtr.Explain(x);

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

    } // Main()

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

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

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

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

  } // class Program

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

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

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

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

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

      public Node(int id, int colIdx, double thresh,
        int left, int right, double value, bool isLeaf,
        List"lt"int"gt" rows)
      {
        this.id = id;
        this.colIdx = colIdx;
        this.thresh = thresh;
        this.left = left;
        this.right = right;
        this.value = value;
        this.isLeaf = isLeaf;

        this.rows = rows;
      }
    } // class Node

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

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

      // create full tree List with dummy nodes
      int numNodes = (int)Math.Pow(2, (maxDepth + 1)) - 1;
      for (int i = 0; i "lt" numNodes; ++i)
      {
        //this.tree.Add(null); // OK, but let's avoid ptrs
        Node n = new Node(i, -1, 0.0, -1, -1, 0.0,
          false, new List"lt"int"gt"());
        this.tree.Add(n); // dummy node
      }
      this.rnd = new Random(seed);
    }

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

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

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

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

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

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

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

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

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

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

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

    public void Display(bool showRows)
    {
      for (int i = 0; i "lt" this.tree.Count; ++i)
      {
        Node n = this.tree[i];
        // check for empty nodes
        if (n == null) continue; // never happen
        // this condition identifies an empty node
        if (n.colIdx == -1 && n.isLeaf == false) continue;

        string s1 = "ID " +
          n.id.ToString().PadRight(3) + " | ";
        string s2 = "idx " +
          n.colIdx.ToString().PadLeft(3) + " | ";
        string s3 = "v " +
          n.thresh.ToString("F4").PadLeft(8) + " | ";
        string s4 = "L " +
          n.left.ToString().PadLeft(3) + " | ";
        string s5 = "R " +
          n.right.ToString().PadLeft(3) + " | ";
        string s6 = "y " +
          n.value.ToString("F4").PadLeft(8) + " | ";
        string s7 = "leaf " + (n.isLeaf == true ? "T" : "F");
          //n.isLeaf.ToString().PadLeft(6);

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

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

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

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

      // all nodes have en init to
      // new Node(i, -1, 0.0, -1, -1, 0.0, false, []
      // id is set, but colIdx, thresh, leftIdx,
      // rightIdx, predY, isLeaf, rows must be computed

      // 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);

      Node root = new Node(0, -1, 0.0, 1, 2,
        grandMean, false, allRows);
      this.tree[0] = root; // still need colIdx, thresh, val

      for (int i = 0; i "lt" this.tree.Count; ++i)
      {
        Node currNode = this.tree[i];
        List"lt"int"gt" currRows = currNode.rows;

        // this can happen using sequential traversal
        // parent was unable to create node; it is empty
        if (currRows.Count == 0) { continue; }

        // curr node too deep to have children OR
        // curr node not enough rows to split
        if (currNode.id "gte" (int)Math.Pow(2,
          (this.maxDepth)) - 1 ||
          currRows.Count "lt" this.minSamples)
        {
          currNode.value = this.TreeTargetMean(currRows);
          currNode.isLeaf = true;
          continue;
        }

        double[] splitInfo = this.BestSplit(currRows);
        int colIdx = (int)splitInfo[0];
        double thresh = splitInfo[1];

        if (colIdx == -1)  // unable to split
        {
          currNode.value = this.TreeTargetMean(currRows);
          currNode.isLeaf = true;
          continue;
        }

        // got good split so at internal, non-leaf node
        currNode.colIdx = colIdx;
        currNode.thresh = thresh;

        // make the data splits for children
        // find left rows and right rows
        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" currRows.Count; ++k)
        {
          int r = currRows[k];
          if (this.trainX[r][colIdx] "lte" thresh)
            leftIdxs.Add(r);
          else
            rightIdxs.Add(r);
        }

        int leftID = currNode.id * 2 + 1;
        Node currNodeLeft = new Node(leftID, -1, 0.0,
          2 * leftID + 1, 2 * leftID + 2,
          this.TreeTargetMean(leftIdxs), false, leftIdxs);
        this.tree[leftID] = currNodeLeft;

        int rightID = currNode.id * 2 + 2;
        Node currNodeRight = new Node(rightID, -1, 0.0,
          2 * rightID + 1, 2 * rightID + 2,
          this.TreeTargetMean(rightIdxs), false, rightIdxs);
        this.tree[rightID] = currNodeRight;
      } // 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 is 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:

# 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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“Random Forest Regression Using C#” in Visual Studio Magazine

Posted on March 19, 2026 by jamesdmccaffrey

I wrote an article titled “Random Forest Regression Using C#” in the March 2026 edition of Microsoft Visual Studio Magazine. See https://visualstudiomagazine.com/articles/2026/03/18/random-forest-regression-using-csharp.aspx.

The goal of a machine learning regression problem is to predict a single numeric value. For example, you might want to predict the price of a house based on its square footage, number of bedrooms, property tax rate, and so on.

A simple decision tree regressor encodes a virtual set of if-then rules to make a prediction. For example, “if house-age is greater than 10.0 and house-age is less than or equal to 13.5 and bedrooms greater than 3.0 then price is $525,665.38.” Simple decision trees usually overfit their training data, and then the tree predicts poorly on new, previously unseen data.

A random forest is a collection of simple decision tree regressors that have been trained on different random subsets of the source training data. This process usually goes a long way toward limiting the overfitting problem.

To make a prediction for an input vector x, each tree in the forest makes a prediction and the final predicted y value is the average of the predictions. A bagging (“bootstrap aggregation”) regression system is a specific type of random forest system where all columns/predictors of the source training data are always used to construct the training data subsets.

The VSM article presents a complete demo of random forest regression using the C# language. The output of the demo is:

Begin C# Random Forest regression demo

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

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

First three train y:
  0.4840
  0.1568
  0.8054

Setting nTrees = 100
Setting maxDepth = 6
Setting minSamples = 2
Setting minLeaf = 1
Setting nCols = 5
Setting nRows = 150

Creating and training random forest regression model
Done

Accuracy train (within 0.10) = 0.8050
Accuracy test (within 0.10) = 0.5750

MSE train = 0.0006
MSE test = 0.0016

Predicting for x =
  -0.1660   0.4406  -0.9998  -0.3953  -0.7065
y = 0.4728

End demo

The demo data is synthetic. It was generated by a 5-10-1 neural network with random weights and bias values. The idea here is that the synthetic data does have an underlying, but complex, structure which can be predicted.

When using decision trees for regression, it’s not necessary to normalize the training data predictor values because no distance between data items is computed. However, it’s not a bad idea to normalize the predictors just in case you want to send the data to other regression algorithms that do require normalization.

Random forest regression is most often used with data that has strictly numeric predictor variables. It is possible to use random forest regression with mixed categorical and numeric data, by using ordinal encoding on the categorical data. In theory, ordinal encoding shouldn’t work well. For example, if you have a predictor variable color with possible encoded values red = 0, blue = 1, green = 2, then red will always be less-than-or-equal to any other color value in the decision tree construction process. However, in practice, ordinal encoding for random forest regression often works well.

The motivation for combining many simple decision tree regressors into a forest is the fact that a simple decision tree will always overfit training data if the tree is deep enough. By using a collection of trees that have been trained on different random subsets of the source data, the averaged prediction of the collection is much less likely to overfit.

Random forest regression is conceptually related to bagging (bootstrap aggregation) regression, adaptive boosting regression, and gradient boosting regression. I’m a big fan of 1950s science fiction movies. To my eye, several of the actresses in my favorite films seem to have somewhat similar physical appearances.

Left: Actress Julie Adams (1926-2019) is best known for her lead role in “Creature from the Black Lagoon” (1954).

Center: Actress Joan Taylor (1929-2012) had lead roles in “Earth vs. the Flying Saucers” (1956) and “20 Million Miles to Earth” (1957).

Right: Actress Joan Weldon (1930-2021) was in “Them!” (1954) — the well-known giant ant movie.

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