Mathematical Research Letters
Volume 8, Issue 4, July 2001 pp. 557-567.
Length Functions, Curvature and the Dimension of Discrete GroupsAuthors: Martin R.Bridson
Author institution: Mathematical Institute
Summary: We work with the class of groups that act properly by semisimple isometries on complete $\CAT(0)$ spaces. Define $\dim_{ss}\Gamma$ to be the minimal dimension in which $\Gamma$ admits such an action. By examining the nature of translation length functions we show that there exist finitely-presented, torsion-free groups $\Gamma$ for which $\dim_{ss}\Gamma$ is greater than the cohomological dimension of $\Gamma$. We also show that $\dim_{ss}\Gamma$ can decrease when one passes to a subgroup of finite index.
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