Coexact 1-Laplacian spectral gap and exponential growth of a group
Abstract
Let be a discrete finitely presented group. Pick any system S of generators in . In Cayley graph Cay()=Cay(, S) with edge set E, glue with oriented polygons all the group relations translated to all the points of ; denote the obtained simply connected complex by Cay(2)(). We study non-negative Hodge--Laplace operator 1 on edge functions which is defined via complex Cay(2)(); 1 acts on 20,c(E):= clos2(E) \finitely supported closed 1-(co)chains in Cay()\. We prove the following implication in the spirit of Kesten Theorem: if 1|_0,c2(E) has a spectral gap then either has exponential growth or is virtually Z.
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