Nonlinear variants of a theorem of Kwapie\'n

Abstract

A famous result of S. Kwapie\'n asserts that a linear operator from a Banach space to a Hilbert space is absolutely 1-summing whenever its adjoint is absolutely q-summing for some 1≤ q<∞; this result was recently extended to Lipschitz operators by Chen and Zheng. In the present paper we show that Kwapie\'n's and Chen--Zheng theorems hold in a very relaxed nonlinear environment, under weaker hypotheses. Even when restricted to the original linear case, our result generalizes Kwapie\'n's theorem because it holds when the adjoint is just almost summing. In addition, a variant for Lp-spaces, with p≥2, instead of Hilbert spaces is provided.