Complex Ball Quotients and Line Arrangements in the Projective Plane - Paula Tretkoff

Complex Ball Quotients and Line Arrangements in the Projective Plane

(Autor)

Buch | Softcover
232 Seiten
2016
Princeton University Press (Verlag)
978-0-691-14477-1 (ISBN)
93,50 inkl. MwSt
This book introduces the theory of complex surfaces through a comprehensive look at finite covers of the projective plane branched along line arrangements. Paula Tretkoff emphasizes those finite covers that are free quotients of the complex two-dimensional ball. Tretkoff also includes background on the classical Gauss hypergeometric function of one variable, and a chapter on the Appell two-variable F1 hypergeometric function. The material in this book began as a set of lecture notes, taken by Tretkoff, of a course given by Friedrich Hirzebruch at ETH Zurich in 1996. The lecture notes were then considerably expanded by Hirzebruch and Tretkoff over a number of years. In this book, Tretkoff has expanded those notes even further, still stressing examples offered by finite covers of line arrangements. The book is largely self-contained and foundational material is introduced and explained as needed, but not treated in full detail. References to omitted material are provided for interested readers. Aimed at graduate students and researchers, this is an accessible account of a highly informative area of complex geometry.

Paula Tretkoff is professor of mathematics at Texas A&M University and director of research in the National Center for Scientific Research (CNRS) at the Universite de Lille 1, France.

*Frontmatter, pg. i*Contents, pg. vii*Preface, pg. ix*Introduction, pg. 1*Chapter One. Topological Invariants and Differential Geometry, pg. 6*Chapter Two. Riemann Surfaces, Coverings, and Hypergeometric Functions, pg. 23*Chapter Three. Complex Surfaces and Coverings, pg. 47*Chapter Four. Algebraic Surfaces and the Miyaoka-Yau Inequality, pg. 65*Chapter Five. Line Arrangements in P2(C) and Their Finite Covers, pg. 85*Chapter Six. Existence of Ball Quotients Covering Line Arrangements, pg. 126*Chapter Seven. Appell Hypergeometric Functions, pg. 167*Appendix A. Torsion-Free Subgroups of Finite Index by Hans-Christoph Im Hof, pg. 189*Appendix B. Kummer Coverings, pg. 197*Bibliography, pg. 205*Index, pg. 213

Reihe/Serie Mathematical Notes
Mitarbeit Anhang von: Hans-Christoph Im Hof
Zusatzinfo 2 line illus. 18 tables.
Verlagsort New Jersey
Sprache englisch
Maße 152 x 235 mm
Gewicht 340 g
Themenwelt Mathematik / Informatik Mathematik Geometrie / Topologie
ISBN-10 0-691-14477-X / 069114477X
ISBN-13 978-0-691-14477-1 / 9780691144771
Zustand Neuware
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