On the cardinality of sumsets in torsion-free groups
Abstract
Let A, B be finite subsets of a torsion-free group G. We prove that for every positive integer k there is a c(k) such that if |B| c(k) then the inequality |AB| |A|+|B|+k holds unless a left translate of A is contained in a cyclic subgroup. We obtain c(k)<c0k6 for arbitrary torsion-free groups, and c(k)<c0k3 for groups with the unique product property, where c0 is an absolute constant. We give examples to show that c(k) is at least quadratic in k.
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