Marcinkiewicz Law of Large Numbers for Outer-products of Heavy-tailed, Long-range Dependent Data

Abstract

The Marcinkiewicz Strong Law, n∞1n1pΣk=1n (Dk- D)=0 a.s. with p∈(1,2), is studied for outer products Dk=XkXkT, where \Xk\,\Xk\ are both two-sided (multivariate) linear processes ( with coefficient matrices (Cl), (Cl) and i.i.d.\ zero-mean innovations \\, \\). Matrix sequences Cl and Cl can decay slowly enough (as |l|∞) that \Xk,Xk\ have long-range dependence while \Dk\ can have heavy tails. In particular, the heavy-tail and long-range-dependence phenomena for \Dk\ are handled simultaneously and a new decoupling property is proved that shows the convergence rate is determined by the worst of the heavy-tails or the long-range dependence, but not the combination. The main result is applied to obtain Marcinkiewicz Strong Law of Large Numbers for stochastic approximation, non-linear functions forms and autocovariances.