The geometric K-theory of quotient stacks
Abstract
Given a quotient of a regular noetherian separated algebraic space X over a field by an affine algebraic group G having finite stabilizers (with some mild technical conditions), G. Vezzosi and A. Vistoli defined the geometric part of the rational equivariant K-theory K(X,G) and conjectured that it is isomorphic to the rational K-theory of the quotient X/G. In this paper we refine the construction of geometric K-theory to the rational K-theory of a quotient stack [X/G] over an arbitrary excellent base; we show that it is part of an intrinsic decomposition of the K-theory of the stack and prove many properties that make it amenable to computations.
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