The algebraic K-theory of Green functors

Abstract

In this paper we develop computational tools to study the higher algebraic K-theory of Green functors. We construct a spectral sequence converging to the algebraic G-theory of any G-Green functor, for G a cyclic p-group. From the spectral sequence we deduce a complete calculation of the algebraic K-theory of the constant C2-Green functor associated to the field with two elements, and a calculation of the p-completion of the algebraic K-theory of the constant G-Green functor associated to the integers when G is a cyclic p-group. Additionally, we introduce the notion of a Green meadow to abstract the Green functor structure underlying clarified Tambara fields, and show, under mild conditions, that every finitely generated projective module over a G-Green meadow is free when G is a cyclic p-group. This gives a computation of K0 for such Green functors.