Twisted conjugacy in soluble arithmetic groups
Abstract
Reidemeister numbers of group automorphisms encode the number of twisted conjugacy classes of groups and might yield information about self-maps of spaces related to the given objects. Here we address a question posed by Gon\c{c}alves and Wong in the mid 2000s: we construct an infinite series of compact connected solvmanifolds (that are not nilmanifolds) of strictly increasing dimensions and all of whose self-homotopy equivalences have vanishing Nielsen number. To this end, we establish a sufficient condition for a prominent (infinite) family of soluble linear groups to have the so-called property . In particular, we generalize or complement earlier results due to Dekimpe, Gon\c{c}alves, Kochloukova, Nasybullov, Taback, Tertooy, Van den Bussche, and Wong, showing that many soluble -arithmetic groups have and suggesting a conjecture in this direction.
Cite
@article{arxiv.2007.02988,
title = {Twisted conjugacy in soluble arithmetic groups},
author = {Paula Macedo Lins de Araujo and Yuri Santos Rego},
journal= {arXiv preprint arXiv:2007.02988},
year = {2025}
}
Comments
35 pages, 1 figure. v3: Final version, to appear in Mathematische Nachrichten. Incorporated referee's comments, slight correction in Theorem 1.1, corrected (proof of) Proposition 3.9, other minor improvements