K-theory, genotypes, and biset functors

Abstract

Let p be an odd prime number. In this paper, we show that the genome (P) of a finite p-group P, defined as the direct product of the genotypes of all rational irreducible representations of P, can be recovered from the first group of K-theory K1(QP). It follows that the assignment P (P) is a p-biset functor. We give an explicit formula for the action of bisets on , in terms of generalized transfers associated to left free bisets. Finally, we show that is a rational p-biset functor, i.e. that factors through the Roquette category of finite p-groups.