On the Negative K-theory of Singular Varieties
Abstract
Let X be an n-dimensional variety over a field k of characteristic zero, regular in codimension 1 with singular locus Z. In this paper we study the negative K-theory of X, showing that when Z is sufficiently nice, K1-n(X) is an extension of KH1-n(X) by a finite dimensional vector space, which we compute explicitly. We also show that KH1-n(X) almost has a geometric structure. Specifically, we give an explicit 1-motive [L → G] and a map G(k) → KH1-n(X) whose kernel and cokernel are finitely generated abelian groups.
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