Product set growth in groups and hyperbolic geometry
Abstract
Generalising results of Razborov and Safin, and answering a question of Button, we prove that for every hyperbolic group there exists a constant α >0 such that for every finite subset U that is not contained in a virtually cyclic subgroup |Un|≥slant (α |U|)[(n+1)/2]. Similar estimates are established for groups acting acylindrically on trees or hyperbolic spaces.
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