English

Zero cycles with modulus and zero cycles on singular varieties

Algebraic Geometry 2019-02-20 v4

Abstract

Given a smooth variety XX and an effective Cartier divisor DXD \subset X, we show that the cohomological Chow group of 0-cycles on the double of XX along DD has a canonical decomposition in terms of the Chow group of 0-cycles CH0(X){\rm CH}_0(X) and the Chow group of 0-cycles with modulus CH0(XD){\rm CH}_0(X|D) on XX. When XX is projective, we construct an Albanese variety with modulus and show that this is the universal regular quotient of CH0(XD){\rm CH}_0(X|D). As a consequence of the above decomposition, we prove the Roitman torsion theorem for the 0-cycles with modulus. We show that CH0(XD){\rm CH}_0(X|D) is torsion-free and there is an injective cycle class map CH0(XD)K0(X,D){\rm CH}_0(X|D) \hookrightarrow K_0(X,D) if XX is affine. For a smooth affine surface XX, this is strengthened to show that K0(X,D)K_0(X,D) is an extension of CH1(XD){\rm CH}_1(X|D) by CH0(XD){\rm CH}_0(X|D).

Keywords

Cite

@article{arxiv.1512.04847,
  title  = {Zero cycles with modulus and zero cycles on singular varieties},
  author = {Federico Binda and Amalendu Krishna},
  journal= {arXiv preprint arXiv:1512.04847},
  year   = {2019}
}

Comments

62 pages. Final version to appear in Compositio Math

R2 v1 2026-06-22T12:10:25.686Z