Some inequalities on Binomial and Poisson probabilities

Abstract

Let S and X be independent random variables, assuming values in the set of non-negative integers, and suppose further that both E(S) and E(X) are integers satisfying E(S) E(X). We establish a sufficient condition for the tail probability P(S E(S)) to be larger than P(S+X E(S+X)). We also apply this result to sums of independent binomial and Poisson random variables.