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A Review of Shannon and Differential Entropy Rate Estimation

Andrew Feutrill, Matthew Roughan

2021Entropy78 citationsDOIOpen Access PDF

Abstract

In this paper, we present a review of Shannon and differential entropy rate estimation techniques. Entropy rate, which measures the average information gain from a stochastic process, is a measure of uncertainty and complexity of a stochastic process. We discuss the estimation of entropy rate from empirical data, and review both parametric and non-parametric techniques. We look at many different assumptions on properties of the processes for parametric processes, in particular focussing on Markov and Gaussian assumptions. Non-parametric estimation relies on limit theorems which involve the entropy rate from observations, and to discuss these, we introduce some theory and the practical implementations of estimators of this type.

Topics & Concepts

Entropy rateDifferential entropyJoint entropyMathematicsParametric statisticsShannon's source coding theoremEstimatorEntropy (arrow of time)Rényi entropyApplied mathematicsMaximum entropy probability distributionMarkov processEntropy estimationMarkov chainStatistical physicsPrinciple of maximum entropyMaximum entropy thermodynamicsStatisticsBinary entropy functionQuantum mechanicsPhysicsStatistical Mechanics and EntropyNeural Networks and ApplicationsControl Systems and Identification
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