2012
DOI: 10.4171/ggd/164
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Cohomology computations for Artin groups, Bestvina–Brady groups, and graph products

Abstract: We compute:• the cohomology with group ring coefficients of Artin groups (or actually, of their associated Salvetti complexes), Bestvina-Brady groups, and graph products of groups,• the L 2 -Betti numbers of Bestvina-Brady groups and of graph products of groups,• the weighted L 2 -Betti numbers of graph products of Coxeter groups.In the case of arbitrary graph products there is an additional proviso: either all factors are infinite or all are finite. (However, for graph products of Coxeter groups this proviso … Show more

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Cited by 29 publications
(36 citation statements)
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“…In , Davis and Okun computed the cohomology with compact supports and the 2‐cohomology of Xt for each finite flag complex L and any non‐integer t. (Throughout this section we will write X instead of XL to simplify the notation.)…”
Section: Compactly Supported and ℓ2‐cohomologymentioning
confidence: 99%
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“…In , Davis and Okun computed the cohomology with compact supports and the 2‐cohomology of Xt for each finite flag complex L and any non‐integer t. (Throughout this section we will write X instead of XL to simplify the notation.)…”
Section: Compactly Supported and ℓ2‐cohomologymentioning
confidence: 99%
“…The case S=Z of the following theorem is [, Theorem 4.4]. Theorem The 2‐Betti numbers of the space Xtfalse(Sfalse) for tZ are given in terms of the ordinary reduced Betti numbers of vertex links in L as follows: 0trueβfalse(2false)n(Xt(S);GLfalse(Sfalse))=vL0βn( St Lfalse(vfalse), Lk Lfalse(vfalse))=vL0β¯n1( Lk Lfalse(vfalse)).In the case when both L and trueL are double-struckQ‐acyclic, these are the 2‐Betti numbers of the group GLfalse(Sfalse), and so β(2)nfalse(GL(S)false) does not depend on S.…”
Section: Compactly Supported and ℓ2‐cohomologymentioning
confidence: 99%
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“…Its octahedralization OK is defined to be the inverse image of K in O(V): OK:=p1false(Kfalse)Ofalse(Vfalse).Thus, each simplex of OK is of the form (σ,ε), where σ is a simplex of K and ε:Vertσ{±1} is a function. (This terminology comes from or [, § 8].) We also say that OK is the result of doubling the vertices of K.…”
Section: Configurations Of Standard Abelian Subgroupsmentioning
confidence: 99%