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98 lines
5.0 KiB
PHP
98 lines
5.0 KiB
PHP
<?php namespace DNW\Skills\Tests\Numerics;
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use DNW\Skills\Numerics\BasicMath;
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use DNW\Skills\Numerics\GaussianDistribution;
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use DNW\Skills\Tests\TestCase;
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class GaussianDistributionTest extends TestCase
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{
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const ERROR_TOLERANCE = 0.000001;
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public function testCumulativeTo()
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{
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// Verified with WolframAlpha
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// (e.g. http://www.wolframalpha.com/input/?i=CDF%5BNormalDistribution%5B0%2C1%5D%2C+0.5%5D )
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$this->assertEquals(0.691462, GaussianDistribution::cumulativeTo(0.5), '', GaussianDistributionTest::ERROR_TOLERANCE);
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}
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public function testAt()
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{
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// Verified with WolframAlpha
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// (e.g. http://www.wolframalpha.com/input/?i=PDF%5BNormalDistribution%5B0%2C1%5D%2C+0.5%5D )
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$this->assertEquals(0.352065, GaussianDistribution::at(0.5), '', GaussianDistributionTest::ERROR_TOLERANCE);
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}
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public function testMultiplication()
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{
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// I verified this against the formula at http://www.tina-vision.net/tina-knoppix/tina-memo/2003-003.pdf
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$standardNormal = new GaussianDistribution(0, 1);
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$shiftedGaussian = new GaussianDistribution(2, 3);
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$product = GaussianDistribution::multiply($standardNormal, $shiftedGaussian);
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$this->assertEquals(0.2, $product->getMean(), '', GaussianDistributionTest::ERROR_TOLERANCE);
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$this->assertEquals(3.0 / sqrt(10), $product->getStandardDeviation(), '', GaussianDistributionTest::ERROR_TOLERANCE);
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$m4s5 = new GaussianDistribution(4, 5);
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$m6s7 = new GaussianDistribution(6, 7);
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$product2 = GaussianDistribution::multiply($m4s5, $m6s7);
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$expectedMean = (4 * BasicMath::square(7) + 6 * BasicMath::square(5)) / (BasicMath::square(5) + BasicMath::square(7));
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$this->assertEquals($expectedMean, $product2->getMean(), '', GaussianDistributionTest::ERROR_TOLERANCE);
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$expectedSigma = sqrt(((BasicMath::square(5) * BasicMath::square(7)) / (BasicMath::square(5) + BasicMath::square(7))));
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$this->assertEquals($expectedSigma, $product2->getStandardDeviation(), '', GaussianDistributionTest::ERROR_TOLERANCE);
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}
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public function testDivision()
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{
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// Since the multiplication was worked out by hand, we use the same numbers but work backwards
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$product = new GaussianDistribution(0.2, 3.0 / sqrt(10));
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$standardNormal = new GaussianDistribution(0, 1);
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$productDividedByStandardNormal = GaussianDistribution::divide($product, $standardNormal);
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$this->assertEquals(2.0, $productDividedByStandardNormal->getMean(), '', GaussianDistributionTest::ERROR_TOLERANCE);
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$this->assertEquals(3.0, $productDividedByStandardNormal->getStandardDeviation(), '', GaussianDistributionTest::ERROR_TOLERANCE);
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$product2 = new GaussianDistribution((4 * BasicMath::square(7) + 6 * BasicMath::square(5)) / (BasicMath::square(5) + BasicMath::square(7)), sqrt(((BasicMath::square(5) * BasicMath::square(7)) / (BasicMath::square(5) + BasicMath::square(7)))));
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$m4s5 = new GaussianDistribution(4, 5);
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$product2DividedByM4S5 = GaussianDistribution::divide($product2, $m4s5);
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$this->assertEquals(6.0, $product2DividedByM4S5->getMean(), '', GaussianDistributionTest::ERROR_TOLERANCE);
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$this->assertEquals(7.0, $product2DividedByM4S5->getStandardDeviation(), '', GaussianDistributionTest::ERROR_TOLERANCE);
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}
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public function testLogProductNormalization()
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{
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// Verified with Ralf Herbrich's F# implementation
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$standardNormal = new GaussianDistribution(0, 1);
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$lpn = GaussianDistribution::logProductNormalization($standardNormal, $standardNormal);
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$this->assertEquals(-1.2655121234846454, $lpn, '', GaussianDistributionTest::ERROR_TOLERANCE);
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$m1s2 = new GaussianDistribution(1, 2);
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$m3s4 = new GaussianDistribution(3, 4);
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$lpn2 = GaussianDistribution::logProductNormalization($m1s2, $m3s4);
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$this->assertEquals(-2.5168046699816684, $lpn2, '', GaussianDistributionTest::ERROR_TOLERANCE);
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}
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public function testLogRatioNormalization()
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{
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// Verified with Ralf Herbrich's F# implementation
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$m1s2 = new GaussianDistribution(1, 2);
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$m3s4 = new GaussianDistribution(3, 4);
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$lrn = GaussianDistribution::logRatioNormalization($m1s2, $m3s4);
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$this->assertEquals(2.6157405972171204, $lrn, '', GaussianDistributionTest::ERROR_TOLERANCE);
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}
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public function testAbsoluteDifference()
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{
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// Verified with Ralf Herbrich's F# implementation
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$standardNormal = new GaussianDistribution(0, 1);
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$absDiff = GaussianDistribution::absoluteDifference($standardNormal, $standardNormal);
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$this->assertEquals(0.0, $absDiff, '', GaussianDistributionTest::ERROR_TOLERANCE);
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$m1s2 = new GaussianDistribution(1, 2);
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$m3s4 = new GaussianDistribution(3, 4);
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$absDiff2 = GaussianDistribution::absoluteDifference($m1s2, $m3s4);
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$this->assertEquals(0.4330127018922193, $absDiff2, '', GaussianDistributionTest::ERROR_TOLERANCE);
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}
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} |