Cauchy-Davenport type inequalities, I

Abstract

Let G = (G, +) be a group (either abelian or not). Given X, Y ⊂eq G, we denote by Y the subsemigroup of G generated by Y, and we set γ(Y) := y0 ∈ Y ∈fy0 y ∈ Y ord(y - y0) if |Y| 2 and γ(Y) := |Y| otherwise. We prove that if Y is commutative, Y is non-empty, and X+2Y ≠ X + Y + y for some y ∈ Y, then |X+Y| |X|+(γ(Y), |Y| - 1). Actually, this is obtained from a more general result, which improves on previous work of the author on sumsets in cancellative semigroups, and yields a comprehensive generalization, and in some cases a considerable strengthening, of various additive theorems, notably including the Chowla-Pillai theorem (on sumsets in finite cyclic groups) and the specialization to abelian groups of the Hamidoune-Shatrowsky theorem.