Mirzakhani’s Curve Counting and Geodesic Currents

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This monograph presents an approachable proof of Mirzakhani’s curve counting theorem, both for simple and non-simple curves. Designed to welcome readers to the area, the presentation builds intuition with elementary examples before progressing to rigorous proofs. This approach illuminates new and established results alike, and produces versatile tools for studying the geometry of hyperbolic surfaces, Teichmüller theory, and mapping class groups.

Beginning with the preliminaries of curves and arcs on surfaces, the authors go on to present the theory of geodesic currents in detail. Highlights include a treatment of cusped surfaces and surfaces with boundary, along with a comprehensive discussion of the action of the mapping class group on the space of geodesic currents. A user-friendly account of train tracks follows, providing the foundation for radallas, an immersed variation. From here, the authors apply these tools to great effect, offering simplified proofs of existing results and a new, more general proof of Mirzakhani’s curve counting theorem. Further applications include counting square-tiled surfaces and mapping class group orbits, and investigating random geometric structures.

Mirzakhani’s Curve Counting and Geodesic Currents introduces readers to powerful counting techniques for the study of surfaces. Ideal for graduate students and researchers new to the area, the pedagogical approach, conversational style, and illuminating illustrations bring this exciting field to life. Exercises offer opportunities to engage with the material throughout. Basic familiarity with 2-dimensional topology and hyperbolic geometry, measured laminations, and the mapping class group is assumed.

Author(s): Viveka Erlandsson, Juan Souto
Series: Progress in Mathematics, 345
Publisher: Birkhäuser
Year: 2022

Language: English
Pages: 232
City: Cham

Preface
Acknowledgments
Contents
Notation
1 Introduction
Some Things that the Reader Will Not Find in This Book
What the Reader Will Find Here
A Comment on the Way This Book Is Written
2 Read Me
Curves, Multicurves, and Arcs
Intersection Number
Geodesic Representatives
Random Geodesics. Or Length Versus Intersections
Space of Geodesics
Geodesics Projecting into a Fixed Compact Set
Laminations
Hausdorff Limits
Mapping Class Group
Shortening Curves
3 Geodesic Currents
Definition and Examples
Curves as Currents
Weighted Multicurves
Measured Laminations
The Space of Geodesic Currents
Interesting Subsets of C(Σ)
Intersection Form
Characterization of Measured Laminations
Filling Currents
The Mapping Class Group Action
Mapping Class Group Action on the Set of Filling Currents
Comments (The Liouville Current)
4 Train Tracks
Train Tracks as Smoothly Embedded Complexes
Almost Geodesic Train Tracks
Band Complexes and Train Tracks
Curves and Laminations Carried by Train Tracks
Weights and Recurrence
Switch Equations
Thurston Measure
First Counting Result
Masur's Ergodicity Theorem
An Example: The Case of the Once Punctured Torus
Comments
Piecewise Linear Structure
Symplectic Structure
Weil–Petersson Volume Form
Other Interesting Measures on ML(S)
5 Radallas
Terminology
The Game of Cars
Almost Geodesic Radallas
Finding Almost Geodesic Radallas
Generic Curves
Comments: Expected Angle of Self-Intersection
6 Subconvergence of Measures
Idea of the Proof of Theorem 6.1
Local Map
Global Map
New Measures
Comments
7 Approximating the Thurston Measure
Dribbling
Radallas Carrying the Curves in Θσ0
Reducing to a Linear Algebra Problem
Proof of Proposition 7.2
Comments
8 The Main Theorem
Notation and the Constants
The Theorem
The Fundamental Domain
The Meat
The Not Ker-Invariant Case
Comments
9 Counting Curves
Main Curve Counting Theorem
Frequencies and Relative Frequencies
Functions on the Space of Currents
10 Counting Square-Tiled Surfaces
Square-Tiled Surfaces
Recovering Square-Tiled Surface Structures from Multicurves
Square-Tiled Surfaces of Given Type
Counting
Comments
11 Statistics of Simple Curves
Credit to Kasra
Hard Data
A Formula for c(α0) for Simple Curves
Punctured Spheres
Separating Curves in Closed Surfaces
Non-Separating Curves in Closed Surfaces
Combinatorial Computation
Changing Weights
Comments
12 Smörgåsbord
Random Pants Decompositions
Lattice Point Counting in Teichmüller Space
Genericty of pseudo-Anosov Elements
A Radon Measures
Point-Set Topology
Weak-*-Topology
Sequential Compactness
B Computing Thurston Volumes
Punctured Spheres
Separating Curves in Closed Surfaces
Non-separating Curves in Closed Surfaces
References
Index