Equivariant K-theory of cellular toroidal embeddings
Abstract
In this article we describe the Gcomp× Gcomp-equivariant topological K-ring of a cellular toroidal embedding X of a complex connected reductive algebraic group G. In particular, our results extend the results in u1 and u2 on the regular embeddings of G, to the equivariant topological K-ring of a larger class of (possibly singular) cellular toroidal embeddings. They are also a topological analogue of the results in gon on the operational equivariant algebraic K-ring, for cellular toroidal embeddings.
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