Negative K-theory and Chow group of monoid algebras

Abstract

We show, for a finitely generated partially cancellative torsion-free commutative monoid M, that Ki(R) Ki(R[M]) whenever i -d and R is a quasi-excellent -algebra of Krull dimension d 1. In particular, Ki(R[M]) = 0 for i < -d. This is a generalization of Weibel's K-dimension conjecture to monoid algebras. We show that this generalization fails for X[M] if X is not an affine scheme. We also show that the Levine-Weibel Chow group of 0-cycles LW0(k[M]) vanishes for any finitely generated commutative partially cancellative monoid M if k is an algebraically closed field.