Several remarks on norm attaining in tensor product spaces

Abstract

The aim of this note is to obtain results about when the norm of a projective tensor product is strongly subdifferentiable. We prove that if Xπ Y is strongly subdifferentiable and either X or Y has the metric approximation property then every bounded operator from X to Y* is compact. We also prove that (p(I)π q(J))* has the w*-Kadec-Klee property for every non-empty sets I,J and every 2<p,q<∞, obtaining in particular that the norm of the space p(I)π q(J) is strongly subdifferentiable. This extends several results of Dantas, Kim, Lee and Mazzitelli. We also find examples of spaces X and Y for which the set of norm-attaining tensors in X Y is dense but whose complement is dense too.