Schurity of S-rings over a cyclic group and generalized wreath product of permutation groups

Abstract

The generalized wreath product of permutation groups is introduced. By means of it we study the schurity problem for S-rings over a cyclic group G and the automorphism groups of them. Criteria for the schurity and non-schurity of the generalized wreath product of two such S-rings are obtained. As a byproduct of the developed theory we prove that G is a Schur group whenever the total number (n) of prime factors of the integer n=|G| is at most 3. Moreover, we describe the structure of a non-schurian S-ring over G when (n)=4. The latter result implies in particular that if n=p3q where p and q are primes, then G is a Schur group.