Weak compactness of operators acting on o-O type spaces

TL;DR

This paper characterizes weakly compact operators on certain Banach spaces defined by big-O and little-o conditions, showing they are close to being completely continuous and developing methods to extract c_0 subsequences, with applications to function spaces.

Contribution

It provides a new characterization of weakly compact operators on M_0 and M spaces, linking them to a weaker norm and introducing a method to extract c_0 subsequences.

Findings

Weakly compact operators are close to completely continuous operators.

A method to extract c_0 subsequences from sequences in M_0.

Applications to weighted analytic function spaces and classical spaces like BMOA and Bloch.

Abstract

We consider operators T : M_0 -> Z and T : M -> Z, where Z is a Banach space and (M_0, M) is a pair of Banach spaces belonging to a general construction in which M is defined by a "big-O" condition and M_0 is given by the corresponding "little-o" condition. Prototype examples of such spaces M are given by $\ell^\infty$, weighted spaces of functions or their derivatives, bounded mean oscillation, Lipschitz-H\"older spaces, and many others. The main result characterizes the weakly compact operators T in terms of a certain norm naturally attached to M, weaker than the M-norm, and shows that weakly compact operators T : M_0 -> Z are already quite close to being completely continuous. Further, we develop a method to extract c_0-subsequences from sequences in M_0. Applications are given to the characterizations of the weakly compact composition and Volterra-type integral operators on weighted spaces of analytic functions, BMOA, VMOA, and the Bloch space.