Almost everywhere convergent sequences of weak*-to-norm continuous operators

Abstract

Let X and Y be Banach spaces, and T:X* Y be an operator. We prove that if X is Asplund and Y has the approximation property, then for each Radon probability μ on (BX*,w*) there is a sequence of w*-to-norm continuous operators Tn:X* Y such that \|Tn(x*)-T(x*)\| 0 for μ-a.e. x*∈ BX*; if Y has the λ-bounded approximation property for some λ≥ 1, then the sequence can be chosen in such a way that \|Tn\|≤ λ\|T\| for all n∈ N. The same conclusions hold if X contains no subspace isomorphic to 1, Y has the approximation property (resp., λ-bounded approximation property) and T has separable range. This extends to the non-separable setting a result by Mercourakis and Stamati.