Effective bound of linear series on arithmetic surfaces

Xinyi Yuan; Tong Zhang

doi:10.1215/00127094-2322779

Effective bound of linear series on arithmetic surfaces

Xinyi Yuan, Tong Zhang

School of Mathematical Sciences

University of California at Berkeley

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

7 Scopus citations

Abstract

We prove effective upper bounds on the number of effective sections of a Hermitian line bundle over an arithmetic surface. It is an effective version of the arithmetic Hilbert-Samuel formula in the nef case. As a consequence, we obtain effective lower bounds on the Faltings height and on the self-intersection of the canonical bundle in terms of the number of singular points on fibers of the arithmetic surface.

Original language	English
Pages (from-to)	1723-1770
Number of pages	48
Journal	Duke Mathematical Journal
Volume	162
Issue number	10
DOIs	https://doi.org/10.1215/00127094-2322779
State	Published - 2013

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abstract = "We prove effective upper bounds on the number of effective sections of a Hermitian line bundle over an arithmetic surface. It is an effective version of the arithmetic Hilbert-Samuel formula in the nef case. As a consequence, we obtain effective lower bounds on the Faltings height and on the self-intersection of the canonical bundle in terms of the number of singular points on fibers of the arithmetic surface.",

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N2 - We prove effective upper bounds on the number of effective sections of a Hermitian line bundle over an arithmetic surface. It is an effective version of the arithmetic Hilbert-Samuel formula in the nef case. As a consequence, we obtain effective lower bounds on the Faltings height and on the self-intersection of the canonical bundle in terms of the number of singular points on fibers of the arithmetic surface.

AB - We prove effective upper bounds on the number of effective sections of a Hermitian line bundle over an arithmetic surface. It is an effective version of the arithmetic Hilbert-Samuel formula in the nef case. As a consequence, we obtain effective lower bounds on the Faltings height and on the self-intersection of the canonical bundle in terms of the number of singular points on fibers of the arithmetic surface.

UR - https://www.scopus.com/pages/publications/84880676007

U2 - 10.1215/00127094-2322779

DO - 10.1215/00127094-2322779

M3 - 文章

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VL - 162

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JO - Duke Mathematical Journal

JF - Duke Mathematical Journal

IS - 10

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Effective bound of linear series on arithmetic surfaces

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