# Galois–Teichmüller Theory and Arithmetic Geometry

Share this page *Edited by *
*Hiroaki Nakamura; Florian Pop; Leila Schneps; Akio Tamagawa*

A publication of the Mathematical Society of Japan

Since the 1980s, Grothendieck's "Esquisse d'un Programme" has
triggered tremendous developments in number theory and arithmetic
geometry, extending from the studies of anabelian geometry and related
Galois representations to those of polylogarithms and multiple zeta
values, motives, rational points on arithmetic varieties, and
effectiveness questions in arithmetic geometry.

This volume contains twenty-four articles based on talks presented
at two international meetings that focused on the above themes. The
meetings were held in Kyoto in October 2010. The volume includes both survey
articles and research papers that provide useful information about
this area of investigation.

Published for the Mathematical Society of Japan by Kinokuniya, Tokyo, and distributed worldwide, except in Japan, by the AMS.

Volumes in this series are freely available electronically 5 years post-publication.

#### Readership

Graduate students and research mathematicians interested in Galois–Teichmüller theory and arithmetic geometry.