A group version of stable regularity
Abstract
We prove that, given ε>0 and k≥ 1, there is an integer n such that the following holds. Suppose G is a finite group and A⊂eq G is k-stable. Then there is a normal subgroup H≤ G of index at most n, and a set Y⊂eq G, which is a union of cosets of H, such that |A Y|≤ε|H|. It follows that, for any coset C of H, either |C A|≤ ε|H| or |C A|≤ ε|H|. This qualitatively generalizes recent work of Terry and Wolf on vector spaces over Fp.
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