Majorization and Semi-Doubly Stochastic Operators on L1(X)

Abstract

This article is devoted to a study of majorization based on semi-doubly stochastic operators (denoted by SD(L1)) on L1(X) when X is a σ-finite measure space. We answered Mirsky's question and characterized the majorization by means of semi-doubly stochastic maps on L1(X). We collect some results of semi-doubly stochastic operators such as a strong relation of semi-doubly stochastic operators and integral stochastic operators, and relatively weakly compactness of Sf=\Sf: ~S∈ SD(L1)\ when f is a fixed element in L1(X) by proving equi-integrability of Sf.

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