Book contents
- Frontmatter
- Contents
- Preface
- Foreword
- Semisimple actions of mapping class groups on CAT(0) spaces
- A survey of research inspired by Harvey's theorem on cyclic groups of automorphisms
- Algorithms for simple closed geodesics
- Matings in holomorphic dynamics
- Equisymmetric strata of the singular locus of the moduli space of Riemann surfaces of genus 4
- Diffeomorphisms and automorphisms of compact hyperbolic 2-orbifolds
- Holomorphic motions and related topics
- Cutting sequences and palindromes
- On a Schottky problem for the singular locus of A5
- Non-special divisors supported on the branch set of a p-gonal Riemann surface
- A note on the lifting of automorphisms
- Simple closed geodesics of equal length on a torus
- On extensions of holomorphic motions—a survey
- Complex hyperbolic quasi-Fuchsian groups
- Geometry of optimal trajectories
- Actions of fractional Dehn twists on moduli spaces
Non-special divisors supported on the branch set of a p-gonal Riemann surface
Published online by Cambridge University Press: 05 May 2013
- Frontmatter
- Contents
- Preface
- Foreword
- Semisimple actions of mapping class groups on CAT(0) spaces
- A survey of research inspired by Harvey's theorem on cyclic groups of automorphisms
- Algorithms for simple closed geodesics
- Matings in holomorphic dynamics
- Equisymmetric strata of the singular locus of the moduli space of Riemann surfaces of genus 4
- Diffeomorphisms and automorphisms of compact hyperbolic 2-orbifolds
- Holomorphic motions and related topics
- Cutting sequences and palindromes
- On a Schottky problem for the singular locus of A5
- Non-special divisors supported on the branch set of a p-gonal Riemann surface
- A note on the lifting of automorphisms
- Simple closed geodesics of equal length on a torus
- On extensions of holomorphic motions—a survey
- Complex hyperbolic quasi-Fuchsian groups
- Geometry of optimal trajectories
- Actions of fractional Dehn twists on moduli spaces
Summary
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- Chapter
- Information
- Geometry of Riemann Surfaces , pp. 238 - 259Publisher: Cambridge University PressPrint publication year: 2010
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