Pinched exponential volume growth implies an infinite dimensional isoperimetric inequality

Abstract

Let G be a graph which satisfies c-1 ar |B(v,r)| c ar, for some constants c,a>1, every vertex v and every radius r. We prove that this implies the isoperimetric inequality |∂ A| C |A| / (2+ |A|) for some constant C=C(a,c) and every finite set of vertices A.

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