K-theory of affine actions

Abstract

For a Lie group G and a vector bundle E we study those actions of the Lie group TG on E for which the action map TG× E E is a morphism of vector bundles, and call those affine actions. We prove that the category VectTGaff(X) of such actions over a fixed G-manifold X is equivalent to a certain slice category gX VectG(X). We show that there is a monadic adjunction relating VectTGaff(X) to VectG(X), and the right adjoint of this adjunction induces an isomorphism of Grothendieck groups KTGaff(X) KOG(X). Complexification produces analogous results involving T C G and KG(X).