Volume vs. Complexity of Hyperbolic Groups
Abstract
We prove that for a one-ended hyperbolic graph X, the size of the quotient X/G by a group G acting freely and cocompactly bounds from below the number of simplices in an Eilenberg-MacLane space for G. We apply this theorem to show that one-ended hyperbolic cubulated groups (or more generally, one-ended hyperbolic groups with globally stable cylinders \`a la Rips-Sela) cannot contain isomorphic finite-index subgroups of different indices.
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