On separability of Schur rings over abelian p-groups

Abstract

An S-ring (Schur ring) is called separable with respect to a class of S-rings K if it is determined up to isomorphism in K only by the tensor of its structure constants. An abelian group is said to be separable if every S-ring over this group is separable with respect to the class of S-rings over abelian groups. Let Cn be a cyclic group of order n and G be a noncylic abelian p-group. From the previously obtained results it follows that if G is separable then G is isomorphic to Cp× Cpk or Cp× Cp× Cpk, where p∈ \2,3\ and k≥ 1. We prove that the groups D=Cp× Cpk are separable whenever p∈ \2,3\. From this statement we deduce that a given Cayley graph over D and a given Cayley graph over an arbitrary abelian group one can check whether these graphs are isomorphic in time |D|O(1).