Adelic Line Bundles on Quasi-Projective Varieties

Name: Adelic Line Bundles on Quasi-Projective Varieties
Brand: Princeton University Press
SKU: 9780691271736
Price: 74.99 EUR
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Product variants

A01=Shou-Wu Zhang

A01=Xinyi Yuan

Adelic

adelic curves

adelic line bundles

adelic metrics

algebraic geometry

algebraic points

ample line bundles

analytic spaces

Arakelov theory

Arithmetic

arithmetic compactifications

arithmetic geometry

arithmetic intersection numbers

arithmetic setting

asymptotic behavior

Author_Shou-Wu Zhang

Author_Xinyi Yuan

birational invariants

Boundary

boundary topology

Canonical

canonical heights

Category=PB

Category=PBF

Category=PBH

characteristic zero

compactified varieties

Deligne pairing

Diophantine properties

Divisor

dynamical properties

effective sections

eq_isMigrated=1

eq_isMigrated=2

eq_nobargain

equidistribution theorem

Finitely

finitely generated fields

forthcoming

function fields

Galois orbits

geometric setting

graded linear series

height functions

Hermitian

Hermitian line bundles

Hilbert-Samuel formula

integrable adelic line bundles

Integral scheme

intersection theory

Isomorphism

limit processes

Line bundle

Metric

metrized line bundles

minimal slopes

model adelic line bundles

moduli spaces

Morphism

Nakai-Moishezon theorem

nef adelic line bundles

Neron-Tate heights

number fields

number theory

numerical properties

positivity

positivity conditions

Projective

projective compactifications

proper models

Quasi

quasi-projective varieties

Rational

semipositive line bundles

slope boundedness

small points

Theorem

Variety

volumes

Product details

ISBN 9780691271736
Dimensions: 156 x 235mm
Publication Date: 13 Jan 2026
Publisher: Princeton University Press
Publication City/Country: US
Product Form: Paperback

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A comprehensive new theory of adelic line bundles on quasi-projective varieties over finitely generated fields

This book introduces a comprehensive theory of adelic line bundles on quasi-projective varieties over finitely generated fields, developed in both geometric and arithmetic contexts. In the geometric setting, adelic line bundles are defined as limits of line bundles on projective compactifications under the boundary topology. In the arithmetic setting, they are defined as limits of Hermitian line bundles on projective arithmetic compactifications, also under the boundary topology. After establishing these foundational definitions, the book uses the theory to explore key concepts such as intersection theory, effective sections, volumes, and positivity of adelic line bundles. It also applies these results to study height functions of algebraic points and prove an equidistribution theorem on quasi-projective varieties. This theory has broad applications in the study of numerical, dynamical, and Diophantine properties of moduli spaces, quasi-projective varieties, and varieties over finitely generated fields.

Xinyi Yuan is a professor at the Beijing International Center for Mathematical Research of Peking University. Shou-Wu Zhang is the Eugene Higgins Professor of Mathematics at Princeton University. Yuan and Zhang are the authors, with Wei Zhang, of The Gross-Zagier Formula on Shimura Curves (Princeton).