The A-fibered Burnside ring as A-fibered biset functor in characteristic zero

Abstract

Let A be an abelian group such that Hom(G,A) is finite for all finite groups G, and let K be a field of characteristic zero containing roots of unity of all orders equal to finite element orders in A. In this paper we prove foundational properties of the A-fibered Burnside ring functor BKA as an A-fibered biset functor over K. This includes the determination of the lattice of subfunctors of BKA and the determination of the composition factors of BKA. The results of the paper extend results of Coskun and Y lmaz for the A-fibered Burnside ring functor restricted to p-groups and results of Bouc in the case that A is trivial, i.e., the case of the Burnside ring functor over fields of characteristic zero.