An Arakelov inequality in characteristic p and upper bound of p-rank zero locus

Jun Lu; Mao Sheng; Kang Zuo

doi:10.1016/j.jnt.2009.05.015

An Arakelov inequality in characteristic p and upper bound of p-rank zero locus

Jun Lu
, Mao Sheng^*
, Kang Zuo

^*Corresponding author for this work

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

7 Scopus citations

Abstract

In this paper we show an Arakelov inequality for semi-stable families of algebraic curves of genus g ≥ 1 over characteristic p with nontrivial Kodaira-Spencer maps. We apply this inequality to obtain an upper bound of the number of algebraic curves of p-rank zero in a semi-stable family over characteristic p with nontrivial Kodaira-Spencer map in terms of the genus of a general closed fiber, the genus of the base curve and the number of singular fibres. The parallel results for smooth families of Abelian varieties over k with W₂-lifting assumption are also obtained.

Original language	English
Pages (from-to)	3029-3045
Number of pages	17
Journal	Journal of Number Theory
Volume	129
Issue number	12
DOIs	https://doi.org/10.1016/j.jnt.2009.05.015
State	Published - Dec 2009
Externally published	Yes

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title = "An Arakelov inequality in characteristic p and upper bound of p-rank zero locus",

abstract = "In this paper we show an Arakelov inequality for semi-stable families of algebraic curves of genus g ≥ 1 over characteristic p with nontrivial Kodaira-Spencer maps. We apply this inequality to obtain an upper bound of the number of algebraic curves of p-rank zero in a semi-stable family over characteristic p with nontrivial Kodaira-Spencer map in terms of the genus of a general closed fiber, the genus of the base curve and the number of singular fibres. The parallel results for smooth families of Abelian varieties over k with W2-lifting assumption are also obtained.",

author = "Jun Lu and Mao Sheng and Kang Zuo",

year = "2009",

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AU - Zuo, Kang

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N2 - In this paper we show an Arakelov inequality for semi-stable families of algebraic curves of genus g ≥ 1 over characteristic p with nontrivial Kodaira-Spencer maps. We apply this inequality to obtain an upper bound of the number of algebraic curves of p-rank zero in a semi-stable family over characteristic p with nontrivial Kodaira-Spencer map in terms of the genus of a general closed fiber, the genus of the base curve and the number of singular fibres. The parallel results for smooth families of Abelian varieties over k with W2-lifting assumption are also obtained.

AB - In this paper we show an Arakelov inequality for semi-stable families of algebraic curves of genus g ≥ 1 over characteristic p with nontrivial Kodaira-Spencer maps. We apply this inequality to obtain an upper bound of the number of algebraic curves of p-rank zero in a semi-stable family over characteristic p with nontrivial Kodaira-Spencer map in terms of the genus of a general closed fiber, the genus of the base curve and the number of singular fibres. The parallel results for smooth families of Abelian varieties over k with W2-lifting assumption are also obtained.

UR - https://www.scopus.com/pages/publications/82455181946

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DO - 10.1016/j.jnt.2009.05.015

M3 - 文章

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VL - 129

SP - 3029

EP - 3045

JO - Journal of Number Theory

JF - Journal of Number Theory

IS - 12

ER -

An Arakelov inequality in characteristic p and upper bound of p-rank zero locus

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