Abelian groups are polynomially stable

Abstract

In recent years, there has been a considerable amount of interest in stability of equations and their corresponding groups. Here, we initiate the systematic study of the quantitative aspect of this theory. We develop a novel method, inspired by the Ornstein-Weiss quasi-tiling technique, to prove that abelian groups are polynomially stable with respect to permutations, under the normalized Hamming metrics on the groups Sym(n). In particular, this means that there exists D≥ 1 such that for A,B∈ Sym(n), if AB is δ-close to BA, then A and B are ε-close to a commuting pair of permutations, where ε≤ O(δ1/D). We also observe a property-testing reformulation of this result, yielding efficient testers for certain permutation properties.