Brown's criterion and classifying spaces for families

Let G be a group and F be a family of subgroups closed under conjugation and subgroups. A model for the classifying space EFG is a G-CW-complex X such that every isotropy group belongs to F, and for all H∈F the fixed point subspace XH is contractible. The group G is of type F-Fn if it admits a model...

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Bibliographic Details
Published inJournal of pure and applied algebra Vol. 224; no. 10; p. 106377
Main Authors Martínez-Pedroza, Eduardo, Sánchez Saldaña, Luis Jorge
Format Journal Article
LanguageEnglish
Published Elsevier B.V 01.10.2020
Subjects
Brown's criterion
Classifying spaces for families
Finiteness properties
secondary
Brown's criterion
Primary
Finiteness properties
Classifying spaces for families
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Summary:Let G be a group and F be a family of subgroups closed under conjugation and subgroups. A model for the classifying space EFG is a G-CW-complex X such that every isotropy group belongs to F, and for all H∈F the fixed point subspace XH is contractible. The group G is of type F-Fn if it admits a model for EFG with n-skeleton with compact orbit space. The main result of the article provides is a characterization of F-Fn analogue to Brown's criterion for FPn. As applications we provide criteria for this type of finiteness properties with respect to families to be preserved by finite extensions, a result that contrast with examples of Leary and Nucinkis. We also recover Lück's characterization of property F_n in terms of the finiteness properties of the Weyl groups.
ISSN:0022-4049
1873-1376
DOI:10.1016/j.jpaa.2020.106377