This book is novel in its broad perspective on Riemann surfaces: the text systematically explores the connection with other fields of mathematics. The book can serve as an introduction to contemporary mathematics as a whole, as it develops background material from algebraic topology, differential geometry, the calculus of variations, elliptic PDE, and algebraic geometry. The book is unique among textbooks on Riemann surfaces in its inclusion of an introduction to Teichmüller theory. For this new edition, the author has expanded and rewritten several sections to include additional material and to improve the presentation.
Rezensionen / Stimmen
From the reviews:
"Compact Riemann Surfaces: An Introduction to Contemporary Mathematics starts off with a wonderful Preface containing a good deal of history, as well as Jost's explicit dictum that there are three foci around which the whole subject revolves . . Jost's presentation is quite accessible, modulo a lot of diligence on the part of the reader. It's a very good and useful book, very well-written and thorough." (Michael Berg, MathDL, April, 2007)
Reihe
Auflage
Sprache
Verlagsort
Verlagsgruppe
Zielgruppe
Für Beruf und Forschung
Für höhere Schule und Studium
Editions-Typ
Illustrationen
24 figures, bibliography, index
Maße
Höhe: 23.5 cm
Breite: 15.5 cm
Gewicht
ISBN-13
978-3-540-43299-9 (9783540432999)
DOI
10.1007/978-3-662-04745-3
Schweitzer Klassifikation
Preface
1. Topological Foundations
1.1 Manifolds and differential manifolds
1.2 Homotopy of maps. The fundamental group
1.3 Coverings
1.4 Global continuation of functions on simply-connected manifolds
2. Differential Geometry of Riemann Surfaces
2.1 The concept of a Riemann surface
2.2 Some simple properties of Riemann surfaces
2.3 A Triangulations of compact Riemann surfaces
2.4 Discrete groups of hyperbolic isometries. Fundamental polygons. Some basic concepts of surface topology and geometry
2.5 The theorems of Gauss-Bonnet and Riemann-Hurwitz
2.6 A general Schwarz lemma
2.7 Conformal structures on tori
3 Harmonic Maps
3.1 Review: Banach and Hilbert spaces. The Hilbert space L2
3.2 The sobolev space W1,2=H1,2
3.3 The Dirichlet principle. Weak solutions of the Poisson equation
3.4 Harmonic and subharmonic functions
3.5 The Ca-regularity theory
3.6 Maps between surfaces. The energy integral. Definition and simple properties of harmonic maps
3.7 Existence of harmonic maps
3.8 Regularity of harmonic maps
3.9 Uniqueness of harmonic maps
3.10 Harmonic diffeomorphisms
3.11 Metrics and conformal structures
4 Teichmüller Spaces
4.1 The basic definitions
4.2 Harmonic maps, conformal structures and holomorphic quadratic differentials. Teichmüller's theorem
4.3 Fenchel-Nielsen coordinates. An alternative approach to the topology of Teichmüller space
4.4 Uniformization of compact Riemann surfaces
5. Geometric structures on Riemann surfaces
5.1 Preliminaries: cohomology and homology groups
5.2 Harmonic and holomorphic differential forms on Riemann surfaces
5.3 The periods of holomorphic and meromorphic diferential forms
5.4 Divisors. The Riemann-Roch theorem
5.5 Holomorphic 1-forms and metrics on compact Riemann surfaces
5.6 Divisors and line bundles
5.7 Projective embeddings
5.8 Algebraic curves
5.9 Abel's theorem and the Jacobi inversiontheorem
5.10 Elliptic curves
Sources and references
Bibliography
Index of notation
Index
