Mathematics 602

Introduction to the Theory of Riemann Surfaces

Department of Mathematics, Math grad courses, University of British Columbia

Instructors

Joel Feldman

E-mail	feldman@math.ubc.ca
Office	Math 221
Phone	822-5660

Feldman's home page

Richard Froese

E-mail	rfroese@math.ubc.ca
Office	Math Annex 1106
Phone	822-3042

Froese's home page

Prerequisites

Permission of the instructors. You will need a basic knowledge of complex function theory at the level of Complex Analysis by Lars Ahlfors or Functions of One Complex Variable, Volume I, by John Conway.

Outline

Riemann's analysis of finite genus one dimensional complex manifolds is a mathematical gem. This course will be an introduction to these manifolds. The topics are

Definitions and Examples
Topology of Riemann Surfaces
Differential Forms
Integration Formulae
Hodge Decomposition
Harmonic Differentials
Meromorphic Functions and Differentials
Compact Riemann Surfaces
- Bilinear Relations
- The Riemann--Roch Theorem
- Hyperelliptic Riemann Surfaces
- Torelli's Theorem
Additional topics as time permits
- Automorphisms of Compact Riemann Surfaces
- Theta Functions

Text

H. M. Farkas and I. Kra, Riemann Surfaces, Springer-Verlag, 2nd Edition, 1992.

Other possible references include

A. Beardon, Riemann Surfaces - A Primer.
C. H. Clemens, A Scrapbook of Complex Curve Theory.
R. Miranda, Algebraic Curves and Riemann Surfaces.
G. Springer, Introduction to Riemann Surfaces.

All handouts, problem sets, etc. will be posted on the web here.