On integration in Banach spaces and total sets

Abstract

Let X be a Banach space and ⊂eq X* a total linear subspace. We study the concept of -integrability for X-valued functions f defined on a complete probability space, i.e. an analogue of Pettis integrability by dealing only with the compositions x*,f for x*∈ . We show that -integrability and Pettis integrability are equivalent whenever X has Plichko's property (D') (meaning that every w*-sequentially closed subspace of X* is w*-closed). This property is enjoyed by many Banach spaces including all spaces with w*-angelic dual as well as all spaces which are w*-sequentially dense in their bidual. A particular case of special interest arises when considering =T*(Y*) for some injective operator T:X Y. Within this framework, we show that if T:X Y is a semi-embedding, X has property (D') and Y has the Radon-Nikod\'ym property, then X has the weak Radon-Nikod\'ym property. This extends earlier results by Delbaen (for separable X) and Diestel and Uhl (for weakly K-analytic X).