Adelic Line Bundles on Quasi-Projective Varieties

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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.

About the author

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).