Midconvex sets in Abelian groups

Abstract

A subset X of an Abelian group G is called midconvex if for every x,y∈ X the set x+y2=\z∈ G:2z=x+y\ is a subset of X. We prove that a subset X of an Abelian group G is midconvex if and only if for every g∈ G and x∈ X, the set \n∈ Z:x+ng∈ X\ is equal to C H for some order-convex set C⊂eq Z and some subgroup H⊂eq Z such that the quotient group Z/H has no elements of even order. This characterization implies that a subset X of a periodic Abelian group G is midconvex if and only if for every x∈ X the set X-x is a subgroup of G such that every element of the quotient group G/(X-x) has odd order. Also we prove that a nonempty set X in a subgroup G⊂eq Q is midconvex if and only if X=C(H+x) for some order-convex set C⊂eq Q, some x∈ X and some subgroup H of G such that the quotient group G/H contains no elements of even order.