Gespeichert in:
Bibliographische Detailangaben
1. Verfasser: Kapovich, Ilya
Format: Preprint
Veröffentlicht: 2026
Schlagworte:
Online-Zugang:https://arxiv.org/abs/2606.01290
Tags: Tag hinzufügen
Keine Tags, Fügen Sie den ersten Tag hinzu!
_version_ 1866917552584654848
author Kapovich, Ilya
author_facet Kapovich, Ilya
contents We study the behavior of Dehn functions of finitely presentable groups for presentations with finite generating sets and possibly infinite sets of defining relators. For the free abelian group $\mathbb Z^2$ of rank two on generators $a,b$, we prove that the infinite presentation $\langle a,b \mid [a^{2^k},b],\ k=0,1,2,\ldots\rangle$ has Dehn function of order $n\log n$. We also prove that, for every $0<α<2$, the group $\mathbb Z^2$ admits an infinite presentation on the same two generators whose Dehn function satisfies a global upper bound $δ(n) \le C n^α+ C$ and has matching $n^α$-order lower-bound peaks along an infinite sequence of lengths. For a finite presentation $G=\langle X \mid R\rangle$, let $F(X)$ be the free group on $X$, let $N=\ker(F(X)\to G)$, and let $χ:N\to\mathbb Z$ be a conjugacy-invariant relation invariant with suitable polynomial growth on words in $N$. We prove that then $G$ admits infinite presentations on the same generating set with logarithmic Dehn function in a fine asymptotic sense, and more generally with prescribed polynomial-envelope upper bounds and matching peaks. The general construction gives the stated $\mathbb Z^2$ examples via signed area and gives analogous surface-group examples for every $0<α<1$. In particular, these examples show that, in contrast with the finite-presentation setting, infinite presentations of a fixed finitely generated group on a fixed generating set can exhibit continuum many distinct fine filling-growth behaviors.
format Preprint
id arxiv_https___arxiv_org_abs_2606_01290
institution arXiv
publishDate 2026
record_format arxiv
spellingShingle On Dehn functions for infinite group presentations
Kapovich, Ilya
Group Theory
Geometric Topology
20F65
We study the behavior of Dehn functions of finitely presentable groups for presentations with finite generating sets and possibly infinite sets of defining relators. For the free abelian group $\mathbb Z^2$ of rank two on generators $a,b$, we prove that the infinite presentation $\langle a,b \mid [a^{2^k},b],\ k=0,1,2,\ldots\rangle$ has Dehn function of order $n\log n$. We also prove that, for every $0<α<2$, the group $\mathbb Z^2$ admits an infinite presentation on the same two generators whose Dehn function satisfies a global upper bound $δ(n) \le C n^α+ C$ and has matching $n^α$-order lower-bound peaks along an infinite sequence of lengths. For a finite presentation $G=\langle X \mid R\rangle$, let $F(X)$ be the free group on $X$, let $N=\ker(F(X)\to G)$, and let $χ:N\to\mathbb Z$ be a conjugacy-invariant relation invariant with suitable polynomial growth on words in $N$. We prove that then $G$ admits infinite presentations on the same generating set with logarithmic Dehn function in a fine asymptotic sense, and more generally with prescribed polynomial-envelope upper bounds and matching peaks. The general construction gives the stated $\mathbb Z^2$ examples via signed area and gives analogous surface-group examples for every $0<α<1$. In particular, these examples show that, in contrast with the finite-presentation setting, infinite presentations of a fixed finitely generated group on a fixed generating set can exhibit continuum many distinct fine filling-growth behaviors.
title On Dehn functions for infinite group presentations
topic Group Theory
Geometric Topology
20F65
url https://arxiv.org/abs/2606.01290