Dieter Degrijse scite author profile

By studying commensurators of virtually cyclic groups, we prove that every elementary amenable group of finite Hirsch length h and cardinality ℵn admits a finite-dimensional classifying space with virtually cyclic stabilizers of dimension n + h + 2. We also provide a criterion for groups that fit into an extension with torsion-free quotient to admit a finite-dimensional classifying space with virtually cyclic stabilizers. Finally, we exhibit examples of integral linear groups of type F whose geometric dimension for the family of virtually cyclic subgroups is finite but arbitrarily larger than the geometric dimension for proper actions. This answers a question posed by W. Lück. Contents

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Bredon cohomological dimensions for groups acting on $\mathrm{CAT}(0)$-spaces

Degrijse¹,

Petrosyan²

2015

Groups Geom. Dyn.

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Let G be a group acting isometrically with discrete orbits on a separable complete CAT(0)-space of bounded topological dimension. Under certain conditions, we give upper bounds for the Bredon cohomological dimension of G for the families of finite and virtually cyclic subgroups. As an application, we prove that the mapping class group of any closed, connected, and orientable surface of genus g ≥ 2 admits a (9g − 8)-dimensional classifying space with virtually cyclic stabilizers. In addition, our results apply to fundamental groups of graphs of groups and groups acting on Euclidean buildings. In particular, we show that all finitely generated linear groups of positive characteristic have a finite dimensional classifying space for proper actions and a finite dimensional classifying space for the family of virtually cyclic subgroups. We also show that every generalized Baumslag-Solitar group has a 3-dimensional model for the classifying space with virtually cyclic stabilizers.

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Dimension invariants for groups admitting a cocompact model for proper actions

Degrijse

Martı́nez-Pérez

2014

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Let G be a group that admits a cocompact classifying space for proper actions X. We derive a formula for the Bredon cohomological dimension for proper actions of G in terms of the relative cohomology with compact support of certain pairs of subcomplexes of X. We use this formula to compute the Bredon cohomological dimension for proper actions of fundamental groups of non-positively curved simple complexes of finite groups. As an application we show that if a virtually torsion-free group acts properly and chamber transitively on a building, its virtual cohomological dimension coincides with its Bredon cohomological dimension. This covers the case of Coxeter groups and graph products of finite groups.

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Geometric dimension of lattices in classical simple Lie groups

Aramayona¹,

Degrijse²,

Martı́nez-Pérez³

et al. 2015

Preprint

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Dieter Degrijse

Geometric dimension of lattices in classical simple Lie groups

Geometric dimension of groups for the family of virtually cyclic subgroups

Bredon cohomological dimensions for groups acting on $\mathrm{CAT}(0)$-spaces

Dimension invariants for groups admitting a cocompact model for proper actions

Geometric dimension of lattices in classical simple Lie groups

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