Strong extensions for q-summing operators acting in p-convex Banach function spaces for 1 p q

Abstract

Let 1 p q<∞ and let X be a p-convex Banach function space over a σ-finite measure μ. We combine the structure of the spaces Lp(μ) and Lq() for constructing the new space SXp\,q(), where is a probability Radon measure on a certain compact set associated to X. We show some of its properties, and the relevant fact that every q-summing operator T defined on X can be continuously (strongly) extended to SXp\,q(). This result turns out to be a mixture of the Pietsch and Maurey-Rosenthal factorization theorems, which provide (strong) factorizations for q-summing operators through Lq-spaces when 1 q p. Thus, our result completes the picture, showing what happens in the complementary case 1 p q, opening the door to the study of the multilinear versions of q-summing operators also in these cases.