An approach to complete convergence theorems for dependent random fields via application of Fuk Nagaev inequality

Abstract

Let \ X n, n∈ Nd \ be a random field i.e. a family of random variables indexed by Nd , d 2. Complete convergence, convergence rates for non identically distributed, negatively dependent and martingale random fields are studied by application of Fuk-Nagaev inequality. The results are proved in asymmetric convergence case i.e. for the norming sequence equal n1α1· n2α2·…· ndαd, where (n1,n2,…, nd)=n ∈ Nd and 1≤ i ≤ dαi ≥ 12.