Growth of Approximate Groups in Hyperbolic Groups

Abstract

We prove a growth dichotomy for infinite approximate groups, and more generally approximate semigroups, in hyperbolic groups. If \(G\) is a finitely generated hyperbolic group and \(A⊂eq G\) is infinite with \[ A2⊂eq AX \] for some finite \(X⊂eq G\), then either \( A\) is virtually cyclic, or \(A\) has positive exponential growth in the ambient word metric. We also introduce a product-growth criterion for the existence of growth rates of approximate semigroups. The criterion applies to hyperbolic groups: if \(G\) is hyperbolic with finite generating set \(S\), then there is a constant \(cG,S>0\) such that \[ |UV| ≥ cG,S\,|U||V|n+k+1, U⊂eq Bn,\; V⊂eq Bk. \] The linear loss is optimal in order whenever \(G\) contains an element of infinite order. In the free group with its standard generating set one may take \(cG,S=1/4\). We also prove that, in a free group, if \(U⊂eq Sn\) and \(V⊂eq Sk\), then \[ |UV|≥ (23+13· 4\n,k\)|U||V|, \] and this constant is sharp for all \(n,k\).