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OverviewFull Product DetailsAuthor: Serge LangPublisher: Springer-Verlag New York Inc. Imprint: Springer-Verlag New York Inc. Edition: 1988 ed. Dimensions: Width: 15.50cm , Height: 1.20cm , Length: 23.50cm Weight: 1.030kg ISBN: 9780387967936ISBN 10: 0387967931 Pages: 187 Publication Date: 09 November 1988 Audience: College/higher education , General/trade , Postgraduate, Research & Scholarly , General Format: Hardback Publisher's Status: Active Availability: In Print This item will be ordered in for you from one of our suppliers. Upon receipt, we will promptly dispatch it out to you. For in store availability, please contact us. Table of ContentsI Metrics and Chern Forms.- §1. Néron Functions and Divisors.- §2. Metrics on Line Sheaves.- §3. The Chern Form of a Metric.- §4. Chern Forms in the Case of Riemann Surfaces.- II Green’s Functions on Rlemann Surface.- §1. Green’s Functions.- §2. The Canonical Green’s Function.- §3. Some Formulas About the Green’s Function.- §4. Coleman’s Proof for the Existence of Green’s Function.- §5. The Green’s Function on Elliptic Curves.- III Intersection on an Arithmetic Surface.- §1. The Chow Groups.- §2. Intersections.- §3. Fibral Intersections.- §4. Morphisms and Base Change.- §5. Néron Symbols.- IV Hodge Index Theorem and the Adjunction Formula.- §1. Arakelov Divisors and Intersections.- §2. The Hodge Index Theorem.- §3. Metrized Line Sheaves and Intersections.- §4. The Canonical Sheaf and the Residue Theorem.- §5. Metrizations and Arakelov’s Adjunction Formula.- V The Faltings Reimann-Roch Theorem.- §1. Riemann-Roch on an Arithmetic Curve.- §2. Volume Exact Sequences.- §3. Faltings Riemann-Roch.- §4. An Application of Riemann-Roch.- §5. Semistability.- §6. Positivity of the Canonical Sheaf.- VI Faltings Volumes on Cohomology.- §1. Determinants.- §2. Determinant of Cohomology.- §3. Existence of the Faltings Volumes.- §4. Estimates for the Faltings Volumes.- §5. A Lower Bound for Green’s Functions.- Appendix by Paul Vojta Diophantine Inequalities and Arakelov Theory.- §1. General Introductory Notions.- §2. Theorems over Function Fields.- §3. Conjectures over Number Fields.- §4. Another Height Inequality.- §5. Applications.- References.- Frequently Used Symbols.ReviewsAuthor InformationTab Content 6Author Website:Countries AvailableAll regions |