Berry-Esseen and Edgeworth approximations for the tail of an infinite sum of weighted gamma random variables

Abstract

Consider the sum Z = Σn=1∞ λn (ηn - Eηn), where ηn are i.i.d.~gamma random variables with shape parameter r > 0, and the λn's are predetermined weights. We study the asymptotic behavior of the tail Σn=M∞ λn (ηn - Eηn) which is asymptotically normal under certain conditions. We derive a Berry-Essen bound and Edgeworth expansions for its distribution function. We illustrate the effectiveness of these expansions on an infinite sum of weighted chi-squared distributions.