On maximal tail probability of sums of nonnegative, independent and identically distributed random variables

Abstract

We consider the problem of finding the optimal upper bound for the tail probability of a sum of k nonnegative, independent and identically distributed random variables with given mean x. For k=1 the answer is given by Markov's inequality and for k=2 the solution was found by Hoeffding and Shrikhande in 1955. We solve the problem for k=3 as well as for general k and x≤1/(2k-1) by showing that it follows from the fractional version of an extremal graph theory problem of Erdos on matchings in hypergraphs.