The ring of perfect p-permutation bimodules for blocks with cyclic defect groups

Abstract

Let B be a block algebra of a group algebra FG of a finite group G over a field F of characteristic p>0. This paper studies ring theoretic properties of the representation ring T(B,B) of perfect p-permutation (B,B)-bimodules and properties of the k-algebra kZ T(B,B), for a field k. We show that if the Cartan matrix of B has 1 as an elementary divisor then [B] is not primitive in T(B,B). If B has cyclic defect groups we determine a primitive decomposition of [B] in T(B,B). Moreover, if k is a field of characteristic different from p and B has cyclic defect groups of order pn we describe kZ T(B,B) explicitly as a direct product of a matrix algebra and n group algebras.