Banach actions preserving unconditional convergence
Abstract
Let be Banach spaces and , , be a continuous bilinear function, called a *Banach action*. We say that this action *preserves unconditional convergence* if for every bounded sequence in and unconditionally convergent series in the series is unconditionally convergent. We prove that a Banach action preserves unconditional convergence if and only if for any linear functional the operator , , is absolutely summing. Combining this characterization with the famous Grothendieck theorem on the absolute summability of operators from to , we prove that a Banach action preserves unconditional convergence if is a Hilbert space possessing an orthonormal basis such that for every the series is weakly absolutely convergent. Applying known results of Garling on the absolute summability of diagonal operators between sequence spaces, we prove that for (finite or infinite) numbers with , the coordinatewise multplication preserves unconditional convergence if and only if one of the following conditions holds: (i) and , (ii) , (iii) , (iv) , (v) , (vi) and .
Cite
@article{arxiv.2111.14253,
title = {Banach actions preserving unconditional convergence},
author = {Taras Banakh and Vladimir Kadets},
journal= {arXiv preprint arXiv:2111.14253},
year = {2022}
}
Comments
10 pages