Mathematics > Algebraic Geometry
This paper has been withdrawn by Federico Binda
[Submitted on 5 Dec 2018 (v1), last revised 30 Dec 2020 (this version, v3)]
Title:Semi-purity for cycles with modulus
No PDF available, click to view other formatsAbstract:In this paper, we prove a form of purity property for the $(\mathbb{P}^1, \infty)$-invariant replacement $h_0^{\overline{\square}}(\mathfrak{X})$ of the Yoneda object $\mathbb{Z}_{\rm tr} (\mathfrak{X})$ for a modulus pair $\mathfrak{X}=(\overline{X}, X_\infty)$ over a field $k$, consisting of a smooth projective $k$-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 $t$-structure on the category $\mathbf{MDM}^{\rm eff}(k)$ of Kahn-Saito-Yamazaki.
Submission history
From: Federico Binda [view email][v1] Wed, 5 Dec 2018 09:45:03 UTC (61 KB)
[v2] Thu, 3 Jan 2019 10:13:10 UTC (61 KB)
[v3] Wed, 30 Dec 2020 07:43:20 UTC (1 KB) (withdrawn)
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