Strong laws of large numbers for arrays of row-wise extended negatively dependent random variables

Abstract

The main purpose of this paper is to obtain strong laws of large numbers for arrays or weighted sums of random variables under a scenario of dependence. Namely, for triangular arrays \Xn,k, \, 1 ≤slant k ≤slant n, \, n ≥slant 1 \ of row-wise extended negatively dependent random variables weakly mean dominated by a random variable X ∈ L1 and sequences \bn \ of positive constants, conditions are given to ensure Σk=1n (Xn,k - E \, Xn,k )/bn a.s. 0. Our statements also allow us to improve recent results about complete convergence.