On conditional expectations in Lp(mu;Lq(nu;X))

Abstract

Let (A,A,μ) and (B,B,) be probability spaces, let F be a sub-σ-algebra of the product σ-algebra A×B, let X be a Banach space, and let 1< p,q< ∞. We obtain necessary and sufficient conditions in order that the conditional expectation with respect to F defines a bounded linear operator from Lp(μ;Lq(;X)) onto LpF(μ;Lq(;X)), the closed subspace in Lp(μ;Lq(;X)) of all functions having a strongly F-measurable representative.