Classification of abelian Schur groups I

Abstract

A finite group G is called a Schur group if every Schur ring over G is schurian, i.e. associated in a natural way with a subgroup of the symmetric group Sym(G) that contains all right translations of G. The list of all possible abelian Schur groups was obtained by Evdokimov, Kov\'acs, and Ponomarenko in 2016. In two papers, we complete a classification of abelian Schur groups. In the present paper, we study schurity of several groups from the list. First, we prove that a direct product of the elementary abelian group of order 4 and a cyclic group, whose order is an odd prime power or a product of two distinct odd primes, is a Schur group. Second, we establish nonschurity of some other groups from the list.