Spaces of operator-valued functions measurable with respect to the strong operator topology

Abstract

Let X and Y be Banach spaces and (,,μ) a finite measure space. In this note we introduce the space Lp[μ;L(X,Y)] consisting of all (equivalence classes of) functions : L(X,Y) such that ω (ω)x is strongly μ-measurable for all x∈ X and ω (ω)f(ω) belongs to L1(μ;Y) for all f∈ Lp'(μ;X), 1/p+1/p'=1. We show that functions in Lp[μ;(X,Y)] define operator-valued measures with bounded p-variation and use these spaces to obtain an isometric characterization of the space of all L(X,Y)-valued multipliers acting boundedly from Lp(μ;X) into Lq(μ;Y), 1 q< p<∞.