Extending tamely ramified strict 1-motives into két log 1-motives

Heer Zhao

doi:10.1017/fms.2021.5

Extending tamely ramified strict 1-motives into két log 1-motives

Heer Zhao^*

^*Corresponding author for this work

University of Duisburg-Essen

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

2 Scopus citations

Abstract

We define két abelian schemes, két 1-motives and két log 1-motives and formulate duality theory for these objects. Then we show that tamely ramified strict 1-motives over a discrete valuation field can be extended uniquely to két log 1-motives over the corresponding discrete valuation ring. As an application, we present a proof to a result of Kato stated in [12, §4.3] without proof. To a tamely ramified strict 1-motive over a discrete valuation field, we associate a monodromy pairing and compare it with Raynaud’s geometric monodromy.

Original language	English
Article number	e20
Journal	Forum of Mathematics, Sigma
Volume	9
DOIs	https://doi.org/10.1017/fms.2021.5
State	Published - 9 Mar 2021
Externally published	Yes

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10.1017/fms.2021.5

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title = "Extending tamely ramified strict 1-motives into k{\'e}t log 1-motives",

abstract = "We define k{\'e}t abelian schemes, k{\'e}t 1-motives and k{\'e}t log 1-motives and formulate duality theory for these objects. Then we show that tamely ramified strict 1-motives over a discrete valuation field can be extended uniquely to k{\'e}t log 1-motives over the corresponding discrete valuation ring. As an application, we present a proof to a result of Kato stated in [12, §4.3] without proof. To a tamely ramified strict 1-motive over a discrete valuation field, we associate a monodromy pairing and compare it with Raynaud{\textquoteright}s geometric monodromy.",

author = "Heer Zhao",

note = "Publisher Copyright: {\textcopyright} The Author(s), 2021. Published by Cambridge University Press.",

year = "2021",

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AU - Zhao, Heer

PY - 2021/3/9

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N2 - We define két abelian schemes, két 1-motives and két log 1-motives and formulate duality theory for these objects. Then we show that tamely ramified strict 1-motives over a discrete valuation field can be extended uniquely to két log 1-motives over the corresponding discrete valuation ring. As an application, we present a proof to a result of Kato stated in [12, §4.3] without proof. To a tamely ramified strict 1-motive over a discrete valuation field, we associate a monodromy pairing and compare it with Raynaud’s geometric monodromy.

AB - We define két abelian schemes, két 1-motives and két log 1-motives and formulate duality theory for these objects. Then we show that tamely ramified strict 1-motives over a discrete valuation field can be extended uniquely to két log 1-motives over the corresponding discrete valuation ring. As an application, we present a proof to a result of Kato stated in [12, §4.3] without proof. To a tamely ramified strict 1-motive over a discrete valuation field, we associate a monodromy pairing and compare it with Raynaud’s geometric monodromy.

UR - https://www.scopus.com/pages/publications/85102299850

U2 - 10.1017/fms.2021.5

DO - 10.1017/fms.2021.5

M3 - 文章

AN - SCOPUS:85102299850

SN - 2050-5094

VL - 9

JO - Forum of Mathematics, Sigma

JF - Forum of Mathematics, Sigma

M1 - e20

ER -

Extending tamely ramified strict 1-motives into két log 1-motives

Abstract

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