On the (p,q)-type Strong Law of Large Numbers for Sequences of Independent Random Variables

Abstract

Li, Qi, and Rosalsky (Trans. Amer. Math. Soc., 2016) introduced a refinement of the Marcinkiewicz--Zygmund strong law of large numbers (SLLN), so-called the (p,q)-type SLLN, where 0<p<2 and q>0. They obtained sets of necessary and sufficient conditions for this new type SLLN for two cases: 0<p<1, q>p, and 1 p<2,q 1. This paper gives a complete solution to open problems raised by Li, Qi, and Rosalsky by providing the necessary and sufficient conditions for the (p,q)-type SLLN for the cases where 0<q p<1 and 0<q<1 p<2. We consider random variables taking values in a real separable Banach space B, but the results are new even when B is the real line. Furthermore, the conditions for a sequence of random variables \Xn, n 1\ satisfying the (p, q)-type SLLN are shown to provide an exact characterization of stable type p Banach spaces.