Lectures on algebraic geometry I : sheaves, cohomology of sheaves, and applications to riemann surfaces
Material type:
TextLanguage: English Series: Aspects of mathematics. E ; v. 35. Publication details: Wiesbaden : Vieweg+Teubner Verlag, 2011. Edition: 2nd rev edDescription: xiii, 299pISBN: 9783834818447Subject(s): Geometry, Algebraic | Algebraic topology | Sheaf theory | Riemann surfaces | Surfaces, Riemann | Sheaf cohomology | Sheaves (Algebraic topology) | Algebraische Geometrie | Garbe (Math.) | Homologische Algebra | Kohomologie | Kommutative Algebra | Komplexe AnalysisDDC classification: 512.7 Online resources: Table of contents | Reviews | Electronic Version Summary: This book and the following second volume is an introduction into modern algebraic geometry. In the first volume the methods of homological algebra, theory of sheaves, and sheaf cohomology are developed. These methods are indispensable for modern algebraic geometry, but they are also fundamental for other branches of mathematics and of great interest in their own.
In the last chapter of volume I these concepts are applied to the theory of compact Riemann surfaces. In this chapter the author makes clear how influential the ideas of Abel, Riemann and Jacobi were and that many of the modern methods have been anticipated by them.
For this second edition the text was completely revised and corrected. The author also added a short section on moduli of elliptic curves with N-level structures. This new paragraph anticipates some of the techniques of volume II.
| Item type | Current library | Call number | Status | Date due | Barcode |
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Book
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SMS Library | 512.7 HAR-L (Browse shelf(Opens below)) | Available | 25156 |
Includes bibliographical references and index.
This book and the following second volume is an introduction into modern algebraic geometry. In the first volume the methods of homological algebra, theory of sheaves, and sheaf cohomology are developed. These methods are indispensable for modern algebraic geometry, but they are also fundamental for other branches of mathematics and of great interest in their own.
In the last chapter of volume I these concepts are applied to the theory of compact Riemann surfaces. In this chapter the author makes clear how influential the ideas of Abel, Riemann and Jacobi were and that many of the modern methods have been anticipated by them.
For this second edition the text was completely revised and corrected. The author also added a short section on moduli of elliptic curves with N-level structures. This new paragraph anticipates some of the techniques of volume II.
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