On the strong subdifferentiability of the homogeneous polynomials and (symmetric) tensor products

Abstract

In this paper, we study the (uniform) strong subdifferentiability of the norms of the Banach spaces P(N X, Y*), X π ·s π X and πs,N X. Among other results, we characterize when the norms of the spaces P(N p, q), P(N lM1, lM2), and P(N d(w,p), lM2) are strongly subdifferentiable. Analogous results for multilinear mappings are also obtained. Since strong subdifferentiability of a dual space implies reflexivity, we improve some known results on the reflexivity of spaces of N-homogeneous polynomials and N-linear mappings. Concerning the projective (symmetric) tensor norms, we provide positive results on the subsets U and Us of elementary tensors on the unit spheres of X π ·s π X and πs,N X, respectively. Specifically, we prove that πs,N 2 and 2 π ·s π 2 are uniformly strongly subdifferentiable on Us and U, respectively, and that c0 πs c0 and c0 π c0 are strongly subdifferentiable on Us and U, respectively, in the complex case.