An uncountable ergodic Roth theorem and applications
Abstract
We establish an uncountable amenable ergodic Roth theorem, in which the acting group is not assumed to be countable and the space need not be separable. This generalizes a previous result of Bergelson, McCutcheon and Zhang, and complements a result of Zorin-Kranich. We establish the following two additional results: First, a combinatorial application about triangular patterns in certain subsets of the Cartesian square of arbitrary amenable groups, extending a result of Bergelson, McCutcheon and Zhang for countable amenable groups. Second, a new uniformity aspect in the double recurrence theorem for -systems for arbitrary uniformly amenable groups . Our uncountable Roth theorem is crucial in the proof of both of these results.
Keywords
Cite
@article{arxiv.2101.00685,
title = {An uncountable ergodic Roth theorem and applications},
author = {Polona Durcik and Rachel Greenfeld and Annina Iseli and Asgar Jamneshan and José Madrid},
journal= {arXiv preprint arXiv:2101.00685},
year = {2023}
}
Comments
35 pages, final version, accepted for publication in DCDS-A