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Empirical estimation of entropy functionals with confidence

Statistics Theory 2012-02-28 v3 Machine Learning Statistics Theory

Abstract

This paper introduces a class of k-nearest neighbor (kk-NN) estimators called bipartite plug-in (BPI) estimators for estimating integrals of non-linear functions of a probability density, such as Shannon entropy and R\'enyi entropy. The density is assumed to be smooth, have bounded support, and be uniformly bounded from below on this set. Unlike previous kk-NN estimators of non-linear density functionals, the proposed estimator uses data-splitting and boundary correction to achieve lower mean square error. Specifically, we assume that TT i.i.d. samples XiRd{X}_i \in \mathbb{R}^d from the density are split into two pieces of cardinality MM and NN respectively, with MM samples used for computing a k-nearest-neighbor density estimate and the remaining NN samples used for empirical estimation of the integral of the density functional. By studying the statistical properties of k-NN balls, explicit rates for the bias and variance of the BPI estimator are derived in terms of the sample size, the dimension of the samples and the underlying probability distribution. Based on these results, it is possible to specify optimal choice of tuning parameters M/TM/T, kk for maximizing the rate of decrease of the mean square error (MSE). The resultant optimized BPI estimator converges faster and achieves lower mean squared error than previous kk-NN entropy estimators. In addition, a central limit theorem is established for the BPI estimator that allows us to specify tight asymptotic confidence intervals.

Keywords

Cite

@article{arxiv.1012.4188,
  title  = {Empirical estimation of entropy functionals with confidence},
  author = {Kumar Sricharan and Raviv Raich and Alfred O. Hero},
  journal= {arXiv preprint arXiv:1012.4188},
  year   = {2012}
}

Comments

Version 3 changes : Additional results on bias correction factors for specifically estimating Shannon and Renyi entropy in Section 5

R2 v1 2026-06-21T17:01:13.792Z