English

Semi-purity for cycles with modulus

Algebraic Geometry 2021-01-01 v3

Abstract

In this paper, we prove a form of purity property for the (P1,)(\mathbb{P}^1, \infty)-invariant replacement h0(X)h_0^{\overline{\square}}(\mathfrak{X}) of the Yoneda object Ztr(X)\mathbb{Z}_{\rm tr} (\mathfrak{X}) for a modulus pair X=(X,X)\mathfrak{X}=(\overline{X}, X_\infty) over a field kk, consisting of a smooth projective kk-scheme and an effective Cartier divisor on it. As application, we prove the analogue in the modulus setting of Voevodsky's fundamental theorem on the homotopy invariance of the cohomology of homotopy invariant sheaves with transfers, based on a main result of "Purity of reciprocity sheaves" arXiv:1704.02442. This plays an essential role in the development of the theory of motives with modulus, and among other things implies the existence of a homotopy tt-structure on the category MDMeff(k)\mathbf{MDM}^{\rm eff}(k) of Kahn-Saito-Yamazaki.

Keywords

Cite

@article{arxiv.1812.01878,
  title  = {Semi-purity for cycles with modulus},
  author = {Federico Binda and Shuji Saito},
  journal= {arXiv preprint arXiv:1812.01878},
  year   = {2021}
}

Comments

This paper is withdrawn due to a gap in Prop. 5.4.4, from which the main theorem depends

R2 v1 2026-06-23T06:32:23.904Z