A note on the maximum probability of ultra log-concave distributions

Abstract

Jakimiuk et al. (2024) have proved that, if X is an ultra log-concave random variable with integral mean, then n P\X=n\ ≥ n P \Z=n\\,, where Z is a Poisson random variable with the parameter E[X]. In this note, we show that this inequality does not always hold true when X is ultra log-concave with E[X]>1.

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