Algebraic cycles and completions of equivariant K-theory
Abstract
Let G be a complex, linear algebraic group acting on an algebraic space X. The purpose of this paper is to prove a Riemann-Roch theorem (Theorem 5.3) which gives a description of the completion of the equivariant Grothendieck group G0(G,X) at any maximal ideal of the representation ring R(G) in terms of equivariant cycles. The main new technique for proving this theorem is our non-abelian completion theorem (Theorem 4.3) for equivariant K-theory. Theorem 4.3 generalizes the classical localization theorems for diagonalizable group actions to arbitrary groups.
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