GBN::evaluate prototype code works
Frank Dellaert
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8d4dc3d880
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@ -1,6 +1,6 @@
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/* ----------------------------------------------------------------------------
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* GTSAM Copyright 2010, Georgia Tech Research Corporation,
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* GTSAM Copyright 2010-2022, Georgia Tech Research Corporation,
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* Atlanta, Georgia 30332-0415
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* All Rights Reserved
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* Authors: Frank Dellaert, et al. (see THANKS for the full author list)
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@ -67,6 +67,69 @@ TEST( GaussianBayesNet, Matrix )
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EXPECT(assert_equal(d,d1));
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}
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/* ************************************************************************* */
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/**
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* Calculate log-density for given values `x`:
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* -0.5*(error + n*log(2*pi) + log det(Sigma))
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* where x is the vector of values, and Sigma is the covariance matrix.
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*/
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double logDensity(const GaussianConditional::shared_ptr& gc,
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const VectorValues& x) {
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constexpr double log2pi = 1.8378770664093454835606594728112;
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size_t n = gc->d().size();
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// log det(Sigma)) = - 2 * gc->logDeterminant()
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double sum = gc->error(x) + n * log2pi - 2 * gc->logDeterminant();
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return -0.5 * sum;
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}
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/**
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* Calculate probability density for given values `x`:
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* exp(-0.5*error(x)) / sqrt((2*pi)^n*det(Sigma))
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* where x is the vector of values, and Sigma is the covariance matrix.
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*/
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double evaluate(const GaussianConditional::shared_ptr& gc,
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const VectorValues& x) {
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return exp(logDensity(gc, x));
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}
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/** Calculate probability for given values `x` */
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double evaluate(const GaussianBayesNet& gbn, const VectorValues& x) {
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double density = 1.0;
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for (const auto& conditional : gbn) {
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if (conditional) density *= evaluate(conditional, x);
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}
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return density;
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}
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// Check that the evaluate function matches direct calculation with R.
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TEST(GaussianBayesNet, Evaluate1) {
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// Let's evaluate at the mean
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const VectorValues mean = smallBayesNet.optimize();
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// We get the matrix, which has noise model applied!
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const Matrix R = smallBayesNet.matrix().first;
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const Matrix invSigma = R.transpose() * R;
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// The Bayes net is a Gaussian density ~ exp (-0.5*(Rx-d)'*(Rx-d))
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// which at the mean is 1.0! So, the only thing we need to calculate is
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// the normalization constant 1.0/sqrt((2*pi*Sigma).det()).
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// The covariance matrix inv(Sigma) = R'*R, so the determinant is
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const double expected = sqrt((invSigma / (2 * M_PI)).determinant());
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const double actual = evaluate(smallBayesNet, mean);
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EXPECT_DOUBLES_EQUAL(expected, actual, 1e-9);
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}
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// Check the evaluate with non-unit noise.
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TEST(GaussianBayesNet, Evaluate2) {
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// See comments in test above.
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const VectorValues mean = noisyBayesNet.optimize();
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const Matrix R = noisyBayesNet.matrix().first;
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const Matrix invSigma = R.transpose() * R;
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const double expected = sqrt((invSigma / (2 * M_PI)).determinant());
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const double actual = evaluate(noisyBayesNet, mean);
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EXPECT_DOUBLES_EQUAL(expected, actual, 1e-9);
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}
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/* ************************************************************************* */
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TEST( GaussianBayesNet, NoisyMatrix )
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{
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