$T$-admissible processes and noncommutative weighted ergodic theorems
Abstract
In this article, we study the bilaterally almost uniform (b.a.u.) convergence of weighted averages of a positive Dunford-Schwartz operator on the noncommutative -spaces associated to a semifinite von Neumann algebra by a large number of weighting sequences. We do this by extending the classical "subsequence argument" to the noncommutative setting. This is then used to establish a large number of sequences satisfying a certain decay condition as good weights for the noncommutative individual ergodic theorem. This class includes those sequences generated by bounded i.i.d. sequences and the M\"{o}bius function. We also study similar problems for -admissible processes on a semifinite von Neumann algebra, showing that if a Wiener-Wintner type ergodic theorem holds for a class of weights for -additive process, then it also holds for strongly -bounded -admissible processes, assuming that the duality holds and that is a normal -preserving -automorphism.
Cite
@article{arxiv.2604.26224,
title = {$T$-admissible processes and noncommutative weighted ergodic theorems},
author = {Morgan O'Brien},
journal= {arXiv preprint arXiv:2604.26224},
year = {2026}
}
Comments
27 pages