The infimum values of the probability functions for some infinitely divisible distributions motivated by Chv\'atal's theorem

Abstract

Let B(n,p) denote a binomial random variable with parameters n and p. Chv\'atal's theorem says that for any fixed n≥ 2, as m ranges over \0,…,n\, the probability qm:=P(B(n,m/n)≤ m) is the smallest when m is closest to 2n3. Motivated by this theorem, in this paper we consider the infimum value of the probability P(X≤ E[X]), where is a positive real number, and X is a random variable whose distribution belongs to some infinitely divisible distributions including the inverse Gaussian, log-normal, Gumbel and logistic distributions.