A Strong Law of Large Numbers with Applications to Self-Similar Stable Processes

Abstract

Let p ∈ (0, ∞) be a constant and let \n\ ⊂ Lp(, F, ) be a sequence of random variables. For any integers m, n 0, denote Sm, n = Σk=mm + n k. It is proved that, if there exist a nondecreasing function : + + (which satisfies a mild regularity condition) and an appropriately chosen integer a 2 such that Σn=0∞ k 0 |Sk, an (an) |p < ∞, Then n ∞ S0, n (n) = 0 a.s. This extends Theorem 1 in Levental, Chobanyan and Salehi chobanyan-l-s and can be applied conveniently to a wide class of self-similar processes with stationary increments including stable processes.