A Diestel-Faires type result for multimeasures

Abstract

Let X be a real Banach space and let Y ⊂eq X* be a linear subspace having the Orlicz-Thomas property, that is, for each σ-algebra and for each map : X, the countable additivity of the composition x* for all x*∈ Y implies the countable additivity of . We show that the Orlicz-Thomas property allows to test countable additivity of set-valued maps. Namely, if M is a map defined on a σ-algebra whose values are convex, σ(X,Y)-compact, bounded non-empty subsets of X, then the following statements are equivalent: (i) M is a strong multimeasure, that is, for every disjoint sequence (An)n in the series of sets Σn M(An) is unconditionally convergent and the equality M(n An)=Σn M(An) holds. (ii) M is a multimeasure, that is, for every x*∈ X* the support map s(x*,M): R defined by s(x*,M)(A):= \x*(x):x∈ M(A)\ is countably additive. (iii) s(x*,M) is countably additive for every x*∈ Y. As an application, we give a result on the factorization of multimeasures through reflexive Banach spaces.