On the Expectations of Maxima of Sets of Independent Random Variables

Abstract

Let X1, ..., Xk and Y1, ..., Ym be jointly independent copies of random variables X and Y, respectively. For a fixed total number n of random variables, we aim at maximising M(k,m):= E \X1, ..., Xk, Y1, >..., Ym \ in k = n-m 0, which corresponds to maximising the expected lifetime of an n-component parallel system whose components can be chosen from two different types. We show that the lattice \M(k,m): k, m 0\ is concave, give sufficient conditions on X and Y for M(n,0) to be always or ultimately maximal and derive a bound on the number of sign changes in the sequence M(n,0)-M(0,n), n 1. The results are applied to a mixed population of Bienayme-Galton-Watson processes, with the objective to derive the optimal initial composition to maximise the expected time to extinction.