Uniform finite presentation for groups of polynomial growth

Abstract

We prove a quantitative refinement of the statement that groups of polynomial growth are finitely presented. Let G be a group with finite generating set S and let Gr(r) be the volume of the ball of radius r in the associated Cayley graph. For each k ≥ 0, let Rk be the set of words of length at most 2k in the free group FS that are equal to the identity in G, and let Rk be the normal subgroup of FS generated by Rk, so that the quotient map FS/ Rk G induces a covering map of the associated Cayley graphs that has injectivity radius at least 2k-1-1. Given a non-negative integer k, we say that (G,S) has a new relation on scale k if Rk+1 ≠ Rk . We prove that for each K<∞ there exist constants n0 and C depending only on K and |S| such that if Gr(3n)≤ K Gr(n) for some n≥ n0, then there exist at most C scales k≥ 2 (n) on which G has a new relation. We apply this result in a forthcoming paper as part of our proof of Schramm's locality conjecture in percolation theory.