Randomly stopped maximum and maximum of sums with consistently varying distributions

Abstract

Let \1,2,…\ be a sequence of independent random variables, and η be a counting random variable independent of this sequence. In addition, let S0:=0 and Sn:=1+2+·s+n for n≥slant1. We consider conditions for random variables \1,2,…\ and η under which the distribution functions of the random maximum (η):=\0,1,2,…,η\ and of the random maximum of sums S(η):=\S0,S1,S2,…,Sη\ belong to the class of consistently varying distributions. In our consideration the random variables \1,2,…\ are not necessarily identically distributed.