English

On Bestvina-Mess Formula

Group Theory 2007-05-23 v1 Algebraic Topology

Abstract

Bestvina and Mess [BM] proved a remarkable formula for torsion free hyperbolic groups dimLΓ=cdLΓ1 \dim_L\partial\Gamma=cd_L\Gamma-1 connecting the cohomological dimension of a group Γ\Gamma with the cohomological dimension of its boundary Γ\partial\Gamma. In [Be] Bestvina introduced a notion of \sZ\sZ-structure on a discrete group and noticed that his formula holds true for all torsion free groups with \sZ\sZ-structure. Bestvina's notion of \sZ\sZ-structure can be extended to groups containing torsion by replacing the covering space action in the definition by the geometric action. Though the Bestvina-Mess formula trivially is not valid for groups with torsion, we show that it still holds in the following modified form: {\it The cohomological dimension of a \sZ\sZ-boundary of a group Γ\Gamma equals its global cohomological dimension for every PID LL as the coefficient group} dimLΓ=gcdL(Γ). \dim_L\partial\Gamma=gcd_L(\partial\Gamma). Using this formula we show that the cohomological dimension of the boundary dimLΓ\dim_{L}\partial\Gamma is a quasi-isometry invariant of a group.

Cite

@article{arxiv.math/0503018,
  title  = {On Bestvina-Mess Formula},
  author = {A. N. Dranishnikov},
  journal= {arXiv preprint arXiv:math/0503018},
  year   = {2007}
}

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10 pages