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Autori principali: Grigorenko, Theo, Grigorenko, Leo
Natura: Preprint
Pubblicazione: 2024
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Accesso online:https://arxiv.org/abs/2410.07146
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author Grigorenko, Theo
Grigorenko, Leo
author_facet Grigorenko, Theo
Grigorenko, Leo
contents By employing various empirical estimators for the Mutual Information (MI) measure, we calculate and compare the estimates and their confidence intervals for both normal and non-normal bivariate data samples. We find that certain nonlinear invertible transformations of the random variables can significantly affect both the estimated MI value and the precision and asymptotic behavior of its confidence intervals. Generally, for non-normal samples, the confidence intervals are larger than those for normal samples, and the convergence of the confidence intervals is slower even as the data sample size increases. In some cases, due to strong biases, the estimated confidence interval may not contain the true value at all. We discuss various strategies to improve the precision of the estimated Mutual Information.
format Preprint
id arxiv_https___arxiv_org_abs_2410_07146
institution arXiv
publishDate 2024
record_format arxiv
spellingShingle Estimation and Confidence Intervals for Mutual Information: Issues in Convergence for Non-Normal Distributions
Grigorenko, Theo
Grigorenko, Leo
Information Theory
By employing various empirical estimators for the Mutual Information (MI) measure, we calculate and compare the estimates and their confidence intervals for both normal and non-normal bivariate data samples. We find that certain nonlinear invertible transformations of the random variables can significantly affect both the estimated MI value and the precision and asymptotic behavior of its confidence intervals. Generally, for non-normal samples, the confidence intervals are larger than those for normal samples, and the convergence of the confidence intervals is slower even as the data sample size increases. In some cases, due to strong biases, the estimated confidence interval may not contain the true value at all. We discuss various strategies to improve the precision of the estimated Mutual Information.
title Estimation and Confidence Intervals for Mutual Information: Issues in Convergence for Non-Normal Distributions
topic Information Theory
url https://arxiv.org/abs/2410.07146