Small doubling in groups with moderate torsion

Abstract

We determine the structure of a finite subset A of an abelian group given that |2A|<3(1-ε)|A|, ε>0; namely, we show that A is contained either in a "small" one-dimensional coset progression, or in a union of fewer than ε-1 cosets of a finite subgroup. The bounds 3(1-ε)|A| and ε-1 are best possible in the sense that none of them can be relaxed without tightened another one, and the estimate obtained for the size of the coset progression containing A is sharp. In the case where the underlying group is infinite cyclic, our result reduces to the well-known Freiman's (3n-3)-theorem; the former thus can be considered as an extension of the latter onto arbitrary abelian groups, provided that there is "not too much torsion involved".