Cogrowth and spectral gap of generic groups
Abstract
We prove that that for all , having cogrowth exponent at most 1/2+ (in base 2m-1 with m the number of generators) is a generic property of groups in the density model of random groups. This generalizes a theorem of Grigorchuk and Champetier. More generally we show that the cogrowth of a random quotient of a torsion-free hyperbolic group stays close to that of this group. This proves in particular that the spectral gap of a generic group is as large as it can be.
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