On a Conjecture of Feige for Discrete Log-Concave Distributions
Abstract
A remarkable conjecture of Feige (2006) asserts that for any collection of n independent non-negative random variables X1, X2, …, Xn, each with expectation at most 1, P(X < E[X] + 1) ≥ 1e, where X = Σi=1n Xi. In this paper, we investigate this conjecture for the class of discrete log-concave probability distributions and we prove a strengthened version. More specifically, we show that the conjectured bound 1/e holds when Xi's are independent discrete log-concave with arbitrary expectation.
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