On operators that preserve the Radon-Nikodým propertys

Abstract

We consider a certain class ℛ𝒩+ of operators that preserve the Radon-Nikodým property. Conjugate operators in ℛ𝒩 + can be characterized as those operators 𝑇 such that the kernel 𝑁(𝑇*+K*) has the Radon-Nikodým property for every compact operator K. A construction by J. Bourgain involving infinite convolution products of measures in the Cantor group provides examples of operators 𝑇 : L₁ → L₁ in the class ℛ𝒩 +. As an application, we show the existence of Banach spaces which are ℒ₁-spaces, have the Radon- Nikodým property and contain infinite-dimensional reflexive subspaces.