Relative weak compactness in infinite-dimensional Fefferman-Meyer duality
Abstract
Let be a Banach space such that has the Radon-Nikod\'ym property. The aim of this work is to connect relative weak compactness in the -valued martingale Hardy space to a convex compactness criterion in a weaker topology, such as the topology of uniform convergence on compacts in measure. These results represent a dynamic version of the deep result of Diestel, Ruess, and Schachermayer on relative weak compactness in . In the reflexive case, we obtain a Kadec-Pe{\l}czy\'nski dichotomy for -bounded sequences, which decomposes a subsequence into a relatively weakly compact part, a pointwise weakly convexly convergent part, and a null part converging to zero uniformly on compacts in measure. As a corollary, we investigate a parameterized version of the vector-valued Koml\'os theorem without the assumption of -boundedness.
Cite
@article{arxiv.2404.13416,
title = {Relative weak compactness in infinite-dimensional Fefferman-Meyer duality},
author = {Vasily Melnikov},
journal= {arXiv preprint arXiv:2404.13416},
year = {2024}
}
Comments
Revision from reviewer comments