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source: branches/HeuristicLab.Problems.GrammaticalOptimization-gkr/HeuristicLab.Distributions/GaussianModel.cs @ 13820

Last change on this file since 13820 was 12390, checked in by gkronber, 10 years ago

#2283: fixed a potential exception and reduced iterations for unit-tests

File size: 6.3 KB
Line 
1using System;
2using HeuristicLab.Common;
3
4namespace HeuristicLab.Algorithms.Bandits.Models {
5  // bayesian estimation of a Gaussian with
6  // 1) unknown mean and known variance
7  // 2) unknown mean and unknown variance
8  public class GaussianModel : IModel {
9
10    private OnlineMeanAndVarianceEstimator estimator = new OnlineMeanAndVarianceEstimator();
11
12    // parameters of Gaussian prior for mean
13    private readonly double meanPriorMu;
14    private readonly double meanPriorVariance;
15
16    private readonly bool knownVariance;
17    private readonly double rewardVariance = 0.1; // assumed know reward variance
18
19    // parameters of Gamma prior for precision (= inverse variance)
20    private readonly int precisionPriorAlpha;
21    private readonly double precisionPriorBeta;
22
23    // non-informative prior
24    private const double priorK = 1.0;
25
26    // this constructor assumes the variance is known
27    public GaussianModel(double meanPriorMu, double meanPriorVariance, double rewardVariance = 0.1) {
28      this.meanPriorMu = meanPriorMu;
29      this.meanPriorVariance = meanPriorVariance;
30
31      this.knownVariance = true;
32      this.rewardVariance = rewardVariance;
33    }
34
35    // this constructor assumes the variance is also unknown
36    // uses Murphy 2007: Conjugate Bayesian analysis of the Gaussian distribution equation 85 - 89
37    public GaussianModel(double meanPriorMu, double meanPriorVariance, int precisionPriorAlpha, double precisionPriorBeta) {
38      this.meanPriorMu = meanPriorMu;
39      this.meanPriorVariance = meanPriorVariance;
40     
41      this.knownVariance = false;
42      this.precisionPriorAlpha = precisionPriorAlpha;
43      this.precisionPriorBeta = precisionPriorBeta;
44    }
45
46
47    public double Sample(Random random) {
48      if (knownVariance) {
49        return SampleExpectedRewardKnownVariance(random);
50      } else {
51        return SampleExpectedRewardUnknownVariance(random);
52      }
53    }
54
55    private double SampleExpectedRewardKnownVariance(Random random) {
56      // expected values for reward
57      // calculate posterior mean and variance (for mean reward)
58
59      // see Murphy 2007: Conjugate Bayesian analysis of the Gaussian distribution (http://www.cs.ubc.ca/~murphyk/Papers/bayesGauss.pdf)
60      var posteriorMeanVariance = 1.0 / (estimator.N / rewardVariance + 1.0 / meanPriorVariance);
61      var posteriorMeanMean = posteriorMeanVariance * (meanPriorMu / meanPriorVariance + estimator.Sum / rewardVariance);
62
63      // sample a mean from the posterior
64      var posteriorMeanSample = Rand.RandNormal(random) * Math.Sqrt(posteriorMeanVariance) + posteriorMeanMean;
65      // theta already represents the expected reward value => nothing else to do
66      return posteriorMeanSample;
67
68      // return 0.99-quantile value
69      //return alglib.invnormaldistribution(0.99) * Math.Sqrt(rewardVariance + posteriorMeanVariance) + posteriorMeanMean;
70    }
71
72    // see Murphy 2007: Conjugate Bayesian analysis of the Gaussian distribution page 6 onwards (http://www.cs.ubc.ca/~murphyk/Papers/bayesGauss.pdf)
73    private double SampleExpectedRewardUnknownVariance(Random random) {
74
75      var posteriorMean = (priorK * meanPriorMu + estimator.Sum) / (priorK + estimator.N);
76      var posteriorK = priorK + estimator.N;
77      var posteriorAlpha = precisionPriorAlpha + estimator.N / 2.0;
78      double posteriorBeta;
79      if (estimator.N > 0) {
80        posteriorBeta = precisionPriorBeta + 0.5 * estimator.N * estimator.Variance + priorK * estimator.N * Math.Pow(estimator.Avg - meanPriorMu, 2) / (2.0 * (priorK + estimator.N));
81      } else {
82        posteriorBeta = precisionPriorBeta;
83      }
84
85
86      // sample from the posterior marginal for mu (expected value) equ. 91
87      // p(µ|D) = T2αn (µ| µn, βn/(αnκn))
88
89      var t2alpha = alglib.invstudenttdistribution((int)(2 * posteriorAlpha), Math.Max(random.NextDouble(), 0.00001));
90
91      var theta = t2alpha * posteriorBeta / (posteriorAlpha * posteriorK) + posteriorMean;
92      return theta;
93
94
95      /*
96       * value function : 0.99-quantile
97      // sample posterior mean and posterior variance independently
98      var sampledPrec = Rand.GammaRand(random, posteriorAlpha) * posteriorBeta;
99      var t2alpha = alglib.invstudenttdistribution((int)(2 * posteriorAlpha), random.NextDouble());
100      var sampledMean = t2alpha * posteriorBeta / (posteriorAlpha * posteriorK) + posteriorMean;
101
102      return alglib.invnormaldistribution(0.99) / Math.Sqrt(sampledPrec) + sampledMean;
103       */
104    }
105
106
107    public void Update(double reward) {
108      estimator.UpdateReward(reward);
109    }
110
111    public void Reset() {
112      estimator.Reset();
113    }
114
115    public object Clone() {
116      if (knownVariance)
117        return new GaussianModel(meanPriorMu, meanPriorVariance, rewardVariance);
118      else
119        return new GaussianModel(meanPriorMu, meanPriorVariance, precisionPriorAlpha, precisionPriorBeta);
120    }
121
122    public override string ToString() {
123      if (knownVariance) {
124        var posteriorMeanVariance = 1.0 / (estimator.N / rewardVariance + 1.0 / meanPriorVariance);
125        var posteriorMeanMean = posteriorMeanVariance * (meanPriorMu / meanPriorVariance + estimator.Sum / rewardVariance);
126        return string.Format("Gaussian(mu, var=0.1), mu ~ Gaussian(mu'={0:F3}, var'={1:F3})", posteriorMeanMean, posteriorMeanVariance);
127      } else {
128        var posteriorMean = (priorK * meanPriorMu + estimator.Sum) / (priorK + estimator.N);
129        var posteriorK = priorK + estimator.N;
130        var posteriorAlpha = precisionPriorAlpha + estimator.N / 2.0;
131        double posteriorBeta;
132        if (estimator.N > 0) {
133          posteriorBeta = precisionPriorBeta + 0.5 * estimator.N * estimator.Variance + priorK * estimator.N * Math.Pow(estimator.Avg - meanPriorMu, 2) / (2.0 * (priorK + estimator.N));
134        } else {
135          posteriorBeta = precisionPriorBeta;
136        }
137        var nu = (int)(2 * posteriorAlpha);
138        var meanVariance = posteriorBeta / (posteriorAlpha * posteriorK) * (nu / (double)(nu - 2));
139        return string.Format("Gaussian(mu, var), mu ~ T{0}(mu'={1:F3}, var'={2:F3}), 1.0/var ~ Gamma(mu={3:F3}, var={4:F3})",
140          nu, posteriorMean, meanVariance,
141          posteriorAlpha / posteriorBeta, posteriorAlpha / (posteriorBeta * posteriorBeta));
142      }
143    }
144  }
145}
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