On almost sure limit theorems for heavy-tailed products of long-range dependent linear processes

Abstract

Marcinkiewicz strong law of large numbers, n-1pΣk=1n (dk- d)→ 0\ almost surely with p∈(1,2), are developed for products dk=Πr=1s xk(r), where the xk(r) = Σl=-∞∞ck-l(r)l(r) are two-sided linear processes with coefficients \cl(r)\l∈ Z and i.i.d. zero-mean innovations \l(r)\l∈ Z. The decay of the coefficients cl(r) as |l|∞, can be slow enough for \xk(r)\ to have long memory while \dk\ can have heavy tails. The long-range dependence and heavy tails for \dk\ are handled simultaneously and a decoupling property shows the convergence rate is dictated by the worst of long-range dependence and heavy tails, but not their combination. The Marcinkiewicz strong law of large numbers is also extended to the multivariate linear process case.