English

Connectivity and Purity for logarithmic motives

Algebraic Geometry 2022-01-25 v3 K-Theory and Homology

Abstract

The goal of this paper is to extend the work of Voevodsky and Morel on the homotopy tt-structure on the category of motivic complexes to the context of motives for logarithmic schemes. To do so, we prove an analogue of Morel's connectivity theorem and show a purity statement for (P1,)(\mathbf{P}^1, \infty)-local complexes of sheaves with log transfers. The homotopy tt-structure on logDMeff(k)\mathbf{logDM}^{\textrm{eff}}(k) is proved to be compatible with Voevodsky's tt-structure i.e. we show that the comparison functor Rω ⁣:DMeff(k)logDMeff(k)R^{\overline{\square}}\omega^*\colon \mathbf{DM}^{\textrm{eff}}(k)\to \mathbf{logDM}^{\textrm{eff}}(k) is tt-exact. The heart of the homotopy tt-structure on logDMeff(k)\mathbf{logDM}^{\textrm{eff}}(k) is the Grothendieck abelian category of strictly cube-invariant sheaves with log transfers: we use it to build a new version of the category of reciprocity sheaves in the style of Kahn--Saito--Yamazaki and R\"ulling.

Keywords

Cite

@article{arxiv.2012.08361,
  title  = {Connectivity and Purity for logarithmic motives},
  author = {Federico Binda and Alberto Merici},
  journal= {arXiv preprint arXiv:2012.08361},
  year   = {2022}
}

Comments

A gap was found in a proof on the last section. We modified the statement to a weaker form

R2 v1 2026-06-23T20:59:20.013Z