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Main Authors: Fel'shtyn, Alexander, Slomiany, Mateusz
Format: Preprint
Published: 2026
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Online Access:https://arxiv.org/abs/2603.08527
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author Fel'shtyn, Alexander
Slomiany, Mateusz
author_facet Fel'shtyn, Alexander
Slomiany, Mateusz
contents In the present paper, taking a dynamical point on view, we study the growth rate and asymptotic behavior of the sequences of the Reidemeister numbers and the sequences of the Reidemeister and the Nielsen coincidence numbers. We also prove the Gauss congruences for the sequence $\{R(φ^n,ψ^n)\}$ of the Reidemeister coincidence numbers of the tame pair $(φ,ψ)$ of endomorphisms of a torsion-free nilpotent group~$G$ of finite Prüfer rank. Furthermore, we prove the rationality of the Nielsen coincidence zeta function, the Gauss congruences for the sequence $\{N(f^n, g^n)\}$ of the Nielsen coincidence numbers and show that the growth rate exists for the sequence \{$N(f^n, g^n)\}$ of tame pair of maps $(f,g)$ of a compact nilmanifold to itself.
format Preprint
id arxiv_https___arxiv_org_abs_2603_08527
institution arXiv
publishDate 2026
record_format arxiv
spellingShingle The Reidemeister and the Nielsen numbers: growth rate, asymptotic behavior, dynamical zeta functions and the Gauss congruences
Fel'shtyn, Alexander
Slomiany, Mateusz
Dynamical Systems
Algebraic Topology
Group Theory
Number Theory
37C25, 37C30, 22D10
In the present paper, taking a dynamical point on view, we study the growth rate and asymptotic behavior of the sequences of the Reidemeister numbers and the sequences of the Reidemeister and the Nielsen coincidence numbers. We also prove the Gauss congruences for the sequence $\{R(φ^n,ψ^n)\}$ of the Reidemeister coincidence numbers of the tame pair $(φ,ψ)$ of endomorphisms of a torsion-free nilpotent group~$G$ of finite Prüfer rank. Furthermore, we prove the rationality of the Nielsen coincidence zeta function, the Gauss congruences for the sequence $\{N(f^n, g^n)\}$ of the Nielsen coincidence numbers and show that the growth rate exists for the sequence \{$N(f^n, g^n)\}$ of tame pair of maps $(f,g)$ of a compact nilmanifold to itself.
title The Reidemeister and the Nielsen numbers: growth rate, asymptotic behavior, dynamical zeta functions and the Gauss congruences
topic Dynamical Systems
Algebraic Topology
Group Theory
Number Theory
37C25, 37C30, 22D10
url https://arxiv.org/abs/2603.08527