AMS eBook CollectionsOne of the world's most respected mathematical collections, available in digital format for your library or institution
Automorphisms of Riemann Surfaces, Subgroups of Mapping Class Groups and Related Topics
About this Title
Aaron Wootton, University of Portland, Portland, OR, S. Allen Broughton, Rose-Hulman Institute of Technology, Terre Haute, IN and Jennifer Paulhus, Grinnell College, Grinnell, IA, Editors
Publication: Contemporary Mathematics
Publication Year:
2022; Volume 776
ISBNs: 978-1-4704-6025-9 (print); 978-1-4704-6776-0 (online)
DOI: https://doi.org/10.1090/conm/776
Table of Contents
Download chapters as PDF
Front/Back Matter
Articles
- S. Allen Broughton, Gareth A. Jones and David Singerman – The engaging symmetry of Riemann surfaces: A historical perspective
- S. Allen Broughton, Jennifer Paulhus and Aaron Wootton – Future directions in automorphisms of surfaces, graphs, and other related topics
- Jane Gilman – Extending Harvey’s surface kernel maps
- Gareth A. Jones – A short proof of Greenberg’s Theorem
- S. Allen Broughton – Equivalence of finite group actions on Riemann surfaces and algebraic curves
- Sebastian Bozlee, Samuel Lippert and Aaron Wootton – Planar representations of group actions on surfaces
- Rubén A. Hidalgo, Sebastián Reyes-Carocca and Angélica Vega – Fiber product of Riemann surfaces
- S. Allen Broughton, Antonio F. Costa and Milagros Izquierdo – One dimensional equisymmetric strata in moduli space
- Rachel Davis and Edray Herber Goins – Arithmetic of dihedral origami
- Tanush Shaska – Reduction of superelliptic Riemann surfaces
- Ruben A. Hidalgo – Dessins d’enfants with a given bipartite graph
- Charles Camacho and Dami Lee – On infinite octavalent polyhedral surfaces
- Doha Kattan and David Singerman – Universal $q$-gonal tessellations and their Petrie paths
- Alexander Mednykh – On the Riemann-Hurwitz formula for regular graph coverings
- E. Bujalance, J. J. Etayo and E. Martínez – Cyclic and dihedral actions on Klein surfaces with 2 boundary components
- F. J. Cirre and A. J. Monerri – Finitely generated non-cocompact NEC groups