On schurity of finite abelian groups

Abstract

A finite group G is called a Schur group, if any Schur ring over G is associated in a natural way with a subgroup of Sym(G) that contains all right translations. Recently, the authors have completely identified the cyclic Schur groups. In this paper it is shown that any abelian Schur group belongs to one of several explicitly given families only. In particular, any non-cyclic abelian Schur group of odd order is isomorphic to Z3× Z3k or Z3× Z3× Zp where k 1 and p is a prime. In addition, we prove that Z2× Z2× Zp is a Schur group for every prime p.