Hyperbolicity and bounded-valued cohomology

Nansen Petrosyan; Vlad Vankov

doi:10.1007/s00208-024-02871-3

Hyperbolicity and bounded-valued cohomology

Nansen Petrosyan^*, Vlad Vankov

^*Corresponding author for this work

School of Mathematics

Research output: Contribution to journal › Article (Academic Journal) › peer-review

Abstract

We generalise a theorem of Gersten on surjectivity of the restriction map in ∞-cohomology of groups. This leads to applications on subgroups of hyperbolic groups, quasi-isometric distinction of finitely generated groups and ∞-cohomology calculations for some well-known classes of groups. Along the way, we obtain hyperbolicity criteria for groups of type F P2(Q) and for those satisfying a rational homological linear isoperimetric inequality, answering a question of Arora and Martínez-Pedroza

Original language	English
Pages (from-to)	4701-4727
Number of pages	27
Journal	Mathematische Annalen
Volume	390
Issue number	3
Early online date	26 Apr 2024
DOIs	https://doi.org/10.1007/s00208-024-02871-3
Publication status	Published - 1 Nov 2024

Bibliographical note

Publisher Copyright:
© The Author(s) 2024.

Research Groups and Themes

Pure Mathematics
geometric group theory

Keywords

hyperbolic group
group cohomology
bounded valued cohomology

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abstract = "We generalise a theorem of Gersten on surjectivity of the restriction map in ∞-cohomology of groups. This leads to applications on subgroups of hyperbolic groups, quasi-isometric distinction of finitely generated groups and ∞-cohomology calculations for some well-known classes of groups. Along the way, we obtain hyperbolicity criteria for groups of type F P2(Q) and for those satisfying a rational homological linear isoperimetric inequality, answering a question of Arora and Mart{\'i}nez-Pedroza",

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T1 - Hyperbolicity and bounded-valued cohomology

AU - Petrosyan, Nansen

AU - Vankov, Vlad

PY - 2024/11/1

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N2 - We generalise a theorem of Gersten on surjectivity of the restriction map in ∞-cohomology of groups. This leads to applications on subgroups of hyperbolic groups, quasi-isometric distinction of finitely generated groups and ∞-cohomology calculations for some well-known classes of groups. Along the way, we obtain hyperbolicity criteria for groups of type F P2(Q) and for those satisfying a rational homological linear isoperimetric inequality, answering a question of Arora and Martínez-Pedroza

AB - We generalise a theorem of Gersten on surjectivity of the restriction map in ∞-cohomology of groups. This leads to applications on subgroups of hyperbolic groups, quasi-isometric distinction of finitely generated groups and ∞-cohomology calculations for some well-known classes of groups. Along the way, we obtain hyperbolicity criteria for groups of type F P2(Q) and for those satisfying a rational homological linear isoperimetric inequality, answering a question of Arora and Martínez-Pedroza

KW - hyperbolic group

KW - group cohomology

KW - bounded valued cohomology

U2 - 10.1007/s00208-024-02871-3

DO - 10.1007/s00208-024-02871-3

M3 - Article (Academic Journal)

SN - 0025-5831

VL - 390

SP - 4701

EP - 4727

JO - Mathematische Annalen

JF - Mathematische Annalen

IS - 3

ER -

Hyperbolicity and bounded-valued cohomology

Abstract

Bibliographical note

Research Groups and Themes

Keywords

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