Some deviation inequalities for sums of negatively associated random variables

Abstract

Let \Xi,i≥1\ be a sequence of negatively associated random variables, and let \Xi,i≥ 1\ be a sequence of independent random variables such that Xi and Xi have the same distribution for each i. Denote by Sk=Σi=1kXi and Sk=Σi=1kXi for k≥ 1. The well-known results of Shao Shao2000 sates that Ef(Sn)≤ Ef(Sn) for any nondecreasing convex function. Using this very strong property, we obtain a large variety of deviation inequalities for Sn