《国外数学名著系列(续1)(影印版)43:代数几何1(代数曲线代数流形与概型)》consists of two parts. The first is devoted to the theory of curves, which are treated from both the analytic and algebraic points of view. Starting with the basic notions of the theory of Riemann surfaces the reader is lead into an exposition covering the Riemann-Roch theorem, Riemann's fundamental existence theorem. uniformization and automorphic functions. The algebraic material also treats algebraic curves over an arbitrary field and the connection between algebraic curves and Abelian varieties. The second part is an introduction to higher-dimensional algebraic geometry. The author deals with algebraic varieties, the corresponding morphisms, the theory of coherent sheaves and, finally, The theory of schemes. This book is a very readable introduction to algebraic geometry and will be immensely useful to mathematicians working in algebraic geometry and complex analysis and especially to graduate students in these fields.

中译名： 复代数曲面 世图书号： 978-7-5062-9203-0 原版书号： 978-0-521-42353-3 原出版社： Cambridge University Press 原版出版年代： 1992年 世图影印年代： 2008年 目录及部分内容页要览： 19世纪发展起来的复代数曲面理论，其良好的性质已经在数学的各个领域以及理论物理学中得到很好的应用，成为许多科目研究中心话题。本书源自Kirwan 在牛津大学的讲义，作者以本科生掌握的数学知识为基础引入了该理论，详细介绍了复代数曲面的代数和拓扑性质以及它们和复分析的联系。本书适于数学专业本科高年级研究生以及相关专业的研究人员。 目次：背景；基础知识；代数性质；拓扑性质；黎曼面；黎曼面上的微分；奇异曲面。

In spirit, this book is closer to Elements de Geometrie Algebrique (EGA) than the existing textbooks on algebraic geometry. It prvides an introduction to schemes, formal schemesc coherent sheaves, and their cohomologies. The prerequisites for reading this book is the knowledge of commutative algebra up to the level of Ateyah-Macdonald's book. The material on algebraic geometry covered in this book provides adequate preparation for reading more advanced books such as Seminaire de Geometrie Algebrique （SGA）.

This textbook, for an undergraduate course in modern algebraic geometry, recognizes that the typical undergraduate curriculum contains a great deal of analysis and, by contrast, little algebra. Because of this imbalance, it seems most natural to present algebraic geometry by highlighting the way it connects algebra and analysis; the average student will probably be more familiar and more comfortable with the analytic component. The book therefore focuses on Serre's GAGA theorem, which perhaps best encapsulates the link between algebra and analysis. GAGA provides the unifying theme of the book: we develop enough of the modern machinery of algebraic geometry to be able to give an essentially complete proof, at a level accessible to undergraduates throughout. The book is based on a course which the author has taught, twice, at the Australian National University.