On the rates of convergence in weak limit theorems for geometric random sums of the strictly stationary sequence of m-dependent random variables

Abstract

In this paper, we consider a strictly stationary sequence of m-dependent random variables through a compatible sequence of independent and identically distributed random variables by the moving averages processes. Using the Zolotarev distance, we estimate some rates of convergence in the weak limit theorems for normalized geometric random sums of the strictly stationary sequence of m-dependent random variables. The obtained results are extensions and generalizations of several known results on geometric random sums of independent and identically distributed random variables.