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Bibliographic Details
Main Author: Cherry, Cash
Format: Preprint
Published: 2024
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Online Access:https://arxiv.org/abs/2407.00276
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author Cherry, Cash
author_facet Cherry, Cash
contents The focus of this paper is to better understand the coexistence of rigidity, weak mixing, and recurrence by constructing thin sets in the product of countably many copies of the finite cyclic group of order q. A Kronecker-type set K is a subset of this group on which every continuous function into the complex unit circle equals the restriction, to K, of a character in the group's Pontryagin dual. Ackelsberg proves that if, for all q > 1, there exists a perfect Kronecker-type set generating a dense subgroup, then there exist large rigidity sequences for weak mixing systems of actions by countable discrete abelian groups. Ackelsberg shows the existence of such sets for prime values of q, while we construct them for all q > 1.
format Preprint
id arxiv_https___arxiv_org_abs_2407_00276
institution arXiv
publishDate 2024
record_format arxiv
spellingShingle Rigid-Recurrent Sequences for Actions of Finite Exponent Groups
Cherry, Cash
Dynamical Systems
43A46
The focus of this paper is to better understand the coexistence of rigidity, weak mixing, and recurrence by constructing thin sets in the product of countably many copies of the finite cyclic group of order q. A Kronecker-type set K is a subset of this group on which every continuous function into the complex unit circle equals the restriction, to K, of a character in the group's Pontryagin dual. Ackelsberg proves that if, for all q > 1, there exists a perfect Kronecker-type set generating a dense subgroup, then there exist large rigidity sequences for weak mixing systems of actions by countable discrete abelian groups. Ackelsberg shows the existence of such sets for prime values of q, while we construct them for all q > 1.
title Rigid-Recurrent Sequences for Actions of Finite Exponent Groups
topic Dynamical Systems
43A46
url https://arxiv.org/abs/2407.00276