
Preface  Introduction  Table of Contents 
IAS/Park City Mathematics Series 2010; 583 pp; hardcover Volume: 17 ISBN10: 0821849085 ISBN13: 9780821849088 List Price: US$104 Member Price: US$83.20 Order Code: PCMS/17 See also: Complex Algebraic Geometry  Janos Kollar Quantum Field Theory, Supersymmetry, and Enumerative Geometry  Daniel S Freed, David R Morrison and Isadore Singer Low Dimensional Topology  Tomasz S Mrowka and Peter S Ozsvath  Analytic and algebraic geometers often study the same geometric structures but bring different methods to bear on them. While this dual approach has been spectacularly successful at solving problems, the language differences between algebra and analysis also represent a difficulty for students and researchers in geometry, particularly complex geometry. The PCMI program was designed to partially address this language gulf, by presenting some of the active developments in algebraic and analytic geometry in a form suitable for students on the "other side" of the analysisalgebra language divide. One focal point of the summer school was multiplier ideals, a subject of wide current interest in both subjects. The present volume is based on a series of lectures at the PCMI summer school on analytic and algebraic geometry. The series is designed to give a highlevel introduction to the advanced techniques behind some recent developments in algebraic and analytic geometry. The lectures contain many illustrative examples, detailed computations, and new perspectives on the topics presented, in order to enhance access of this material to nonspecialists. Titles in this series are copublished with the Institute for Advanced Study/Park City Mathematics Institute. Members of the Mathematical Association of America (MAA) and the National Council of Teachers of Mathematics (NCTM) receive a 20% discount from list price. Readership Graduate students and research mathematicians interested in modern algebraic geometry and modern complex analytic geometry. Reviews "This book succeeds [in] making explicit the bridges between the algebraic and analytic approaches, closing the language differences and at the same time introducing graduate students and researchers to a major development in complex algebraic geometry."  MAA Reviews 


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