Geometric Galois actions
edited by Leila Schneps and Pierre Lochak.
Cambridge : Cambridge University Press, 1997.
2 vols. : ilustraciones ; 23 cm.
Serie: London Mathematical Society lecture note series ; 242-243
ISBN: 0521596424 (v. 1 : pbk.), 0521596416 (v. 2 : pbk.)
"This volume grew out of the conference which was held at Luminy in August 1995 on the theme 'Geometry and arithmetic of moduli spaces'"—Introduction to v. 2.
Texto en inglés; con contribuciones en francés y alemán.
Incluye referencias bibliográficas.
Reseña:
MathSciNet, 98e:14003 (v. 1)
MathSciNet, 99f:14002 (v. 2)
Contenido
- 1. Around Grothendieck's Esquisse d'un programme
- 2. The inverse Galois problem, moduli spaces and mapping class groups.
- v. 2: Nikolai Adrianov and George Shabat, Unicellular cartography and Galois orbits of plane trees
- Gareth A. Jones and Manfred Streit, Galois groups, monodromy groups and cartographic groups
- Tim Hsu, Permutation techniques for coset representations of modular subgroups
- Leonardo Zapponi, Dessins d'enfants en genre 1 [Dessins d'enfants in genus 1]
- Pierre Dèbes and Bruno Deschamps, The regular inverse Galois problem over large fields
- Karl Strambach and Helmut Völklein, The symplectic braid group and Galois realizations
- Michael D. Fried and Yaacov Kopeliovich, Applying modular towers to the inverse Galois problem
- Makoto Matsumoto, Galois group $G_Q$, singularity $E_7$, and moduli $\scr M_3$
- Zdzis\l aw Wojtkowiak, Monodromy of iterated integrals and non-abelian unipotent periods
- Robert C. Penner, The universal Ptolemy group and its completions
- Michel Imbert, Sur l'isomorphisme du groupe de Richard Thompson avec le groupe de Ptolémée
- Pierre Lochak and Leila Schneps, The universal Ptolemy-Teichmüller groupoid.