On a new concept of stochastic domination and the laws of large numbers
Abstract
Consider a sequence of positive integers \kn,n1\, and an array of nonnegative real numbers \an,i,1 i kn,n1\ satisfying n 1Σi=1knan,i=C0∈ (0,∞). This paper introduces the concept of \an,i\-stochastic domination. We develop some techniques concerning this concept and apply them to remove an assumption in a strong law of large numbers of Chandra and Ghosal [Acta. Math. Hungarica, 1996]. As a by-product, a considerable extension of a recent result of Boukhari [J. Theoret. Probab., 2021] is established and proved by a different method. The results on laws of large numbers are new even when the summands are independent. Relationships between the concept of \an,i\-stochastic domination and the concept of \an,i\-uniform integrability are presented. Two open problems are also discussed.
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