The moduli problem is to describe the structure of the space of isomorphism classes of Riemann surfaces of a given topological type. This space is known as the moduli space and has been at the center of pure mathematics for more than a hundred years. In spite of its age, this field still attracts a lot of attention, the smooth compact Riemann surfaces being simply complex projective algebraic curves. Therefore the moduli space of compact Riemann surfaces is also the moduli space of complex algebraic curves. This space lies on the intersection of many fields of mathematics and may be studied from many different points of view.
The aim of this monograph is to present information about the structure of the moduli space using as concrete and elementary methods as possible. This simple approach leads to a rich theory and opens a new way of treating the moduli problem, putting new life into classical methods that were used in the study of moduli problems in the 1920s.
Author(s): Mika Seppälä and Tuomas Sorvali (Eds.)
Series: North-Holland Mathematics Studies 169
Publisher: North Holland
Year: 1992
Language: English
Pages: ii-iv, 1-263
Content:
Edited by
Pages ii-iii
Copyright page
Page iv
Preface
Page 1
Mika Seppälä, Tuomas Sorvali
Introduction
Pages 3-6
Chapter 1 Geometry of Möbius transformations
Pages 11-57
Chapter 2 Quasiconformal mappings
Pages 59-67
Chapter 3 Geometry of Riemann surfaces
Pages 69-136
Chapter 4 Moduli problems and Teichmüller spaces
Pages 137-175
Chapter 5 Moduli spaces
Pages 177-208
Appendix A Hyperbolic metric and Möbius groups
Pages 209-243
Appendix B Traces of matrices
Pages 245-247
Bibliography
Pages 249-257
Subject Index
Pages 258-263