Isoperimetric inequalities for Poincar\'e duality groups
Abstract
We show that every oriented n-dimensional Poincar\'e duality group over a *-ring R is amenable or satisfies a linear homological isoperimetric inequality in dimension n-1. As an application, we prove the Tits alternative for such groups when n=2. We then deduce a new proof of the fact that when n=2 and R = Z then the group in question is a surface group.
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