The isomorphism problem for group algebras: a criterion

Abstract

Let R be a finite unital commutative ring. We introduce a new class of finite groups, which we call hereditary groups over R. Our main result states that if G is a hereditary group over R then a unital algebra isomorphism between group algebras RG RH implies a group isomorphism G H for every finite group H. As application, we study the modular isomorphism problem, which is the isomorphism problem for finite p-groups over R = Fp where Fp is the field of p elements. We prove that a finite p-group G is a hereditary group over Fp provided G is abelian, G is of class two and exponent p or G is of class two and exponent four. These yield new proofs for the theorems by Deskins and Passi-Sehgal.