Equivariant K-theory of regular compactifications: further developments

Abstract

In this article we describe the × -equivariant K-ring of X, where is a factorial cover of a connected complex reductive algebraic group G, and X is a regular compactification of G. Furthermore, using the description of K× (X), we describe the ordinary K-ring K(X) as a free module of rank the cardinality of the Weyl group, over the K-ring of a toric bundle over G/B, with fibre the toric variety T+, associated to a smooth subdivision of the positive Weyl chamber. This generalizes our previous work on the wonderful compactification (see u). Further, we give an explicit presentation of K× (X) as well as K(X) as an algebra over the K× (Gad) and K(Gad) respectively, where Gad is the wonderful compactification of the adjoint semisimple group Gad. Finally, we identify the equivariant and ordinary Grothendieck ring of X respectively with the corresponding rings of a canonical toric bundle over Gad with fiber the toric variety T+.