On metric approximate subgroups

Abstract

Let G be a group with a metric d invariant under left and right translations, and let Dr be the ball of radius r around the identity. A (k,r)-metric approximate subgroup is a symmetric subset X of G such that the pairwise product set XX is covered by at most k translates of XDr. This notion was introduced in arXiv:math/0601431 along with the version for discrete groups (approximate subgroups). In arXiv:0909.2190, it was shown for the discrete case that, at the asymptotic limit of X finite but large, the "approximateness" (or need for more than one translate) can be attributed to a canonically associated Lie group. Here we prove an analogous result in the metric setting, under a certain finite covering assumption on X replacing finiteness. In particular, if G has bounded exponent, we show that any (k,r)-metric approximate subgroup is close to a (1,r')-metric approximate subgroup for an appropriate r'.