Convergence of series of moments on general exponential inequality

Abstract

For an array \Xn,j, \, 1 ≤slant j ≤slant kn, n ≥slant 1 \ of random variables and a sequence \cn \ of positive numbers, sufficient conditions are given under which, for all > 0, Σn=1∞ cn E [ 1 ≤slant i ≤slant kn Σj=1i (Xn,j - E \, Xn,j I\ Xn,j ≤slant δ \) - ]+p < ∞, where x+ denotes the positive part of x and p ≥slant 1, δ > 0. Our statements are announced in a general setting allowing to conclude the previous convergence for well-known dependent structures. As an application, we study complete consistency and consistency in the rth mean of cumulative sum type estimators of the change in the mean of dependent observations.