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Entropy Estimators for Markovian Sequences: A Comparative Analysis

Juan De Gregorio, David Sánchez, Raúl Toral

2024Entropy11 citationsDOIOpen Access PDF

Abstract

Entropy estimation is a fundamental problem in information theory that has applications in various fields, including physics, biology, and computer science. Estimating the entropy of discrete sequences can be challenging due to limited data and the lack of unbiased estimators. Most existing entropy estimators are designed for sequences of independent events and their performances vary depending on the system being studied and the available data size. In this work, we compare different entropy estimators and their performance when applied to Markovian sequences. Specifically, we analyze both binary Markovian sequences and Markovian systems in the undersampled regime. We calculate the bias, standard deviation, and mean squared error for some of the most widely employed estimators. We discuss the limitations of entropy estimation as a function of the transition probabilities of the Markov processes and the sample size. Overall, this paper provides a comprehensive comparison of entropy estimators and their performance in estimating entropy for systems with memory, which can be useful for researchers and practitioners in various fields.

Topics & Concepts

EstimatorEntropy (arrow of time)Entropy estimationMarkov processJoint entropyMaximum-entropy Markov modelMarkov chainBinary numberPrinciple of maximum entropyEntropy rateComputer scienceStatistical physicsMathematicsBinary entropy functionMaximum entropy probability distributionSample entropyApplied mathematicsStatisticsMarkov modelVariable-order Markov modelTime seriesPhysicsArithmeticQuantum mechanicsTime Series Analysis and ForecastingBayesian Modeling and Causal InferenceNeural Networks and Applications