Properties of Shannon and Rényi entropies of the Poisson distribution as the functions of intensity parameter

Volodymyr Braiman; Anatoliy Malyarenko; Yuliya Mishura; Yevheniia Anastasiia Rudyk

doi:10.15388/namc.2024.29.35560

Nonlinear Analysis (Jul 2024)

Properties of Shannon and Rényi entropies of the Poisson distribution as the functions of intensity parameter

Volodymyr Braiman,
Anatoliy Malyarenko,
Yuliya Mishura,
Yevheniia Anastasiia Rudyk

Affiliations

Volodymyr Braiman: Taras Shevchenko National University of Kyiv
Anatoliy Malyarenko: Mälardalen University
Yuliya Mishura: Taras Shevchenko National University of Kyiv
Yevheniia Anastasiia Rudyk

DOI: https://doi.org/10.15388/namc.2024.29.35560
Journal volume & issue: Vol. 29, no. 4

Abstract

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We consider two types of entropy, namely, Shannon and Rényi entropies of the Poisson distribution, and establish their properties as the functions of intensity parameter. More precisely, we prove that both entropies increase with intensity. While for Shannon entropy the proof is comparatively simple, for Rényi entropy, which depends on additional parameter α > 0, we can characterize it as nontrivial. The proof is based on application of Karamata’s inequality to the terms of Poisson distribution.

Published in Nonlinear Analysis

ISSN: 1392-5113 (Print); 2335-8963 (Online)
Publisher: Vilnius University Press
Country of publisher: Lithuania
LCC subjects: Science: Mathematics: Analysis
Website: http://www.journals.vu.lt/nonlinear-analysis

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