On Bloch's map for torsion cycles over non-closed fields

Theodosis Alexandrou; Stefan Schreieder

doi:10.48550/arXiv.2210.03201

On Bloch's map for torsion cycles over non-closed fields

Theodosis Alexandrou, Stefan Schreieder

Research output: Contribution to journal › Article › Research › peer review

Abstract

We generalize Bloch's map on torsion cycles from algebraically closed fields to arbitrary fields. While Bloch's map over algebraically closed fields is injective for zero-cycles and for cycles of codimension at most two, we show that the generalization to arbitrary fields is only injective for cycles of codimension at most two but, in general, not for zero-cycles. Our result implies that Jannsen's cycle class map in integral -adic continuous étale cohomology is, in general, not injective on torsion zero-cycles over finitely generated fields. This answers a question of Scavia and Suzuki.

Original language	English
Article number	e53
Journal	Forum of Mathematics, Sigma
Volume	11
DOIs	https://doi.org/10.48550/arXiv.2210.03201 https://doi.org/10.1017/fms.2023.51
Publication status	Published - 22 Jun 2023

Keywords

math.NT
math.AG
14C15, 14C25
14C15 14C25 14D06

ASJC Scopus subject areas

Computational Mathematics
Analysis
Theoretical Computer Science
Discrete Mathematics and Combinatorics
Geometry and Topology
Algebra and Number Theory
Statistics and Probability
Mathematical Physics

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10.48550/arXiv.2210.03201Licence: CC BY 4.0
10.1017/fms.2023.51Licence: CC BY 4.0

Cite this

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title = "On Bloch's map for torsion cycles over non-closed fields",

abstract = "We generalize Bloch's map on torsion cycles from algebraically closed fields to arbitrary fields. While Bloch's map over algebraically closed fields is injective for zero-cycles and for cycles of codimension at most two, we show that the generalization to arbitrary fields is only injective for cycles of codimension at most two but, in general, not for zero-cycles. Our result implies that Jannsen's cycle class map in integral -adic continuous {\'e}tale cohomology is, in general, not injective on torsion zero-cycles over finitely generated fields. This answers a question of Scavia and Suzuki.",

keywords = "math.NT, math.AG, 14C15, 14C25, 14C15 14C25 14D06",

author = "Theodosis Alexandrou and Stefan Schreieder",

note = "Funding Information: We thank the referee for his or her useful comments. This project has received funding from the European Research Council (ERC) under the European Union{\textquoteright}s Horizon 2020 research and innovation programme under grant agreement No 948066 (ERC-StG RationAlgic).",

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month = jun,

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doi = "10.48550/arXiv.2210.03201",

language = "English",

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T1 - On Bloch's map for torsion cycles over non-closed fields

AU - Alexandrou, Theodosis

AU - Schreieder, Stefan

N1 - Funding Information: We thank the referee for his or her useful comments. This project has received funding from the European Research Council (ERC) under the European Union’s Horizon 2020 research and innovation programme under grant agreement No 948066 (ERC-StG RationAlgic).

PY - 2023/6/22

Y1 - 2023/6/22

N2 - We generalize Bloch's map on torsion cycles from algebraically closed fields to arbitrary fields. While Bloch's map over algebraically closed fields is injective for zero-cycles and for cycles of codimension at most two, we show that the generalization to arbitrary fields is only injective for cycles of codimension at most two but, in general, not for zero-cycles. Our result implies that Jannsen's cycle class map in integral -adic continuous étale cohomology is, in general, not injective on torsion zero-cycles over finitely generated fields. This answers a question of Scavia and Suzuki.

AB - We generalize Bloch's map on torsion cycles from algebraically closed fields to arbitrary fields. While Bloch's map over algebraically closed fields is injective for zero-cycles and for cycles of codimension at most two, we show that the generalization to arbitrary fields is only injective for cycles of codimension at most two but, in general, not for zero-cycles. Our result implies that Jannsen's cycle class map in integral -adic continuous étale cohomology is, in general, not injective on torsion zero-cycles over finitely generated fields. This answers a question of Scavia and Suzuki.

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KW - math.AG

KW - 14C15, 14C25

KW - 14C15 14C25 14D06

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U2 - 10.48550/arXiv.2210.03201

DO - 10.48550/arXiv.2210.03201

M3 - Article

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VL - 11

JO - Forum of Mathematics, Sigma

JF - Forum of Mathematics, Sigma

M1 - e53

ER -

On Bloch's map for torsion cycles over non-closed fields

Abstract

Keywords

ASJC Scopus subject areas

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RationAlgic: Rationality of varieties and algebraic cycles

Cite this

On Bloch's map for torsion cycles over non-closed fields

Abstract

Keywords

ASJC Scopus subject areas

Access to Document

Other files and links

Projects

RationAlgic: Rationality of varieties and algebraic cycles

Cite this