📐Complex Analysis Unit 11 – Riemann Surfaces

Riemann surfaces are complex manifolds that bridge algebra, geometry, and analysis. They provide a framework for studying holomorphic functions on curved spaces, extending complex analysis beyond the flat plane. These surfaces are classified by their genus and complex structure. Riemann surfaces have far-reaching applications in mathematics and physics. They're crucial in algebraic geometry, string theory, and integrable systems. The study of Riemann surfaces involves topology, complex analysis, and differential geometry, making it a rich and interdisciplinary field.

Study Guides for Unit 11

11.1

Multivalued functions and branch points

4 min read

11.2

Riemann surfaces

5 min read

11.3

Analytic continuation

4 min read

11.4

Riemann mapping theorem

6 min read

Key Concepts and Definitions

Riemann surfaces are one-dimensional complex manifolds that allow for a consistent definition of holomorphic functions
Every Riemann surface is a two-dimensional real manifold equipped with a complex structure
The complex structure on a Riemann surface is an atlas of charts where transition functions are holomorphic
Holomorphic functions on a Riemann surface are complex-valued functions that are differentiable in the complex sense
Meromorphic functions on a Riemann surface are holomorphic functions except for isolated poles
The genus of a Riemann surface is a topological invariant that measures the number of holes or handles
- Riemann surfaces of genus 0 are topologically equivalent to the Riemann sphere (complex plane plus a point at infinity)
- Riemann surfaces of genus 1 are topologically equivalent to a torus

Topology of Riemann Surfaces

The topology of a Riemann surface determines its global structure and connectivity
Riemann surfaces are classified topologically by their genus, which counts the number of holes or handles
The Euler characteristic $\chi$ of a Riemann surface is related to its genus $g$ by the formula $\chi = 2 - 2g$
Compact Riemann surfaces without boundary are characterized by their genus (sphere, torus, double torus, etc.)
Non-compact Riemann surfaces include the complex plane, the punctured plane, and the universal cover of a compact Riemann surface
The fundamental group of a Riemann surface encodes information about its loops and paths
- The fundamental group of a genus $g$ surface is generated by $2g$ loops with a single relation

Complex Structure and Holomorphic Functions

A complex structure on a Riemann surface is an atlas of charts where transition functions are holomorphic
Holomorphic functions on a Riemann surface are locally expressible as power series in the complex coordinate
The maximum modulus principle states that a non-constant holomorphic function on a compact Riemann surface attains its maximum on the boundary
Holomorphic functions on a compact Riemann surface are constant by the maximum modulus principle
The Riemann-Roch theorem relates the dimension of the space of meromorphic functions with prescribed poles to the genus and the degree of the divisor
Holomorphic 1-forms on a Riemann surface form a vector space of dimension equal to the genus
- Holomorphic 1-forms are locally of the form $f(z)dz$ where $f$ is holomorphic

Examples and Classifications

The Riemann sphere $\hat{\mathbb{C}}$ is the simplest example of a Riemann surface, obtained by adding a point at infinity to the complex plane
Elliptic curves are Riemann surfaces of genus 1, described by an equation of the form $y^2 = x^3 + ax + b$ $y^{2} = x^{3} + a x + b$
- Elliptic curves have a group structure given by the chord-tangent construction
Hyperelliptic curves are Riemann surfaces described by an equation of the form $y^2 = P(x)$ where $P$ is a polynomial of degree greater than 4
Compact Riemann surfaces are classified up to biholomorphism by their genus (topological type) and a finite number of moduli parameters
The moduli space of genus $g$ Riemann surfaces has dimension $3g-3$ for $g \geq 2$
Riemann surfaces can also be constructed from polygons by identifying edges (pair of pants decomposition)

Covering Spaces and Monodromy

A covering space of a Riemann surface is another Riemann surface that locally looks like the original surface
The universal cover of a Riemann surface is a simply connected covering space (usually the complex plane or the disk)
The deck transformation group of a covering space consists of the biholomorphic self-maps that preserve the covering map
- The deck transformation group is isomorphic to the fundamental group of the base surface
Monodromy describes how solutions of differential equations on a Riemann surface behave under analytic continuation along loops
The monodromy group is a representation of the fundamental group that encodes the branching behavior of a covering space
Riemann surfaces can be constructed as branched covers of the Riemann sphere, with branch points corresponding to singularities

Meromorphic Functions and Divisors

Meromorphic functions on a Riemann surface are holomorphic functions except for isolated poles
The zeros and poles of a meromorphic function define a divisor, which is a formal sum of points with integer coefficients
The degree of a divisor is the sum of its coefficients, counting zeros positively and poles negatively
The divisor of a meromorphic function has degree zero by the argument principle
Two divisors are linearly equivalent if their difference is the divisor of a meromorphic function
The Riemann-Roch theorem relates the dimension of the space of meromorphic functions with prescribed poles to the genus and the degree of the divisor
- The Riemann-Roch theorem states that $\dim L(D) - \dim L(K-D) = \deg(D) - g + 1$ , where $L(D)$ is the space of meromorphic functions with poles bounded by $D$ , $K$ is the canonical divisor, and $g$ is the genus

Differential Forms and Integration

Holomorphic differential forms on a Riemann surface are locally of the form $f(z)dz$ where $f$ is holomorphic
The space of holomorphic 1-forms on a genus $g$ surface has dimension $g$
Meromorphic differential forms are allowed to have poles, and they form a larger space than holomorphic forms
Integration of differential forms on Riemann surfaces is defined using charts and partitions of unity
The residue theorem relates the integral of a meromorphic form around a closed curve to the sum of its residues at the enclosed poles
The period matrix of a Riemann surface is the matrix of integrals of a basis of holomorphic 1-forms over a basis of homology cycles
- The period matrix is symmetric and has positive definite imaginary part (Riemann bilinear relations)

Applications in Physics and Geometry

Riemann surfaces arise naturally in the study of algebraic curves and their function fields
The moduli space of Riemann surfaces is a fundamental object in algebraic geometry and has deep connections with the theory of modular forms
Riemann surfaces are used to describe the worldsheets of strings in string theory, where the genus corresponds to the number of loops
The Riemann-Hilbert correspondence relates monodromy representations of the fundamental group to systems of differential equations on Riemann surfaces
Conformal field theories on Riemann surfaces are important in statistical physics and quantum field theory
Spectral curves of integrable systems are often Riemann surfaces, and their geometry encodes the dynamics of the system
The uniformization theorem states that every Riemann surface is the quotient of the Riemann sphere, the complex plane, or the hyperbolic plane by a discrete group of automorphisms