Séminaire de théorie des nombres, Paris 1984-85
Author :
Publisher :
Page : 272 pages
File Size : 31,38 MB
Release : 1986
Category : Number theory
ISBN :
Author :
Publisher :
Page : 272 pages
File Size : 31,38 MB
Release : 1986
Category : Number theory
ISBN :
Author : Goldstein
Publisher : Springer Science & Business Media
Page : 349 pages
File Size : 43,4 MB
Release : 2012-12-06
Category : Mathematics
ISBN : 1461234603
Author : Sinnou David
Publisher : Springer Science & Business Media
Page : 328 pages
File Size : 25,41 MB
Release : 1993-12-23
Category : Computers
ISBN : 9780817637415
This is the 13th annual volume of papers based on lectures given at the Seminaire des Nombres de Paris. The results presented here by an international group of mathematicians reflect recent work in many areas of number theory and should form a basis for further discussion on these topics.
Author : Catherine Goldstein
Publisher :
Page : 272 pages
File Size : 30,20 MB
Release : 1990
Category : Number theory
ISBN :
Author : Catherine Goldstein
Publisher : Birkhäuser
Page : 272 pages
File Size : 15,79 MB
Release : 1990
Category : Juvenile Nonfiction
ISBN :
Very Good,No Highlights or Markup,all pages are intact.
Author : Sinnou David
Publisher :
Page : 288 pages
File Size : 48,66 MB
Release : 1992
Category : Number theory
ISBN :
Author : Catherine Goldstein
Publisher :
Page : 368 pages
File Size : 15,32 MB
Release : 1990
Category : Number theory
ISBN :
Author : Etienne Ghys
Publisher : Springer Science & Business Media
Page : 289 pages
File Size : 33,44 MB
Release : 2013-12-11
Category : Mathematics
ISBN : 1468491679
The theory of hyperbolic groups has its starting point in a fundamental paper by M. Gromov, published in 1987. These are finitely generated groups that share important properties with negatively curved Riemannian manifolds. This monograph is intended to be an introduction to part of Gromov's theory, giving basic definitions, some of the most important examples, various properties of hyperbolic groups, and an application to the construction of infinite torsion groups. The main theme is the relevance of geometric ideas to the understanding of finitely generated groups. In addition to chapters written by the editors, contributions by W. Ballmann, A. Haefliger, E. Salem, R. Strebel, and M. Troyanov are also included. The book will be particularly useful to researchers in combinatorial group theory, Riemannian geometry, and theoretical physics, as well as post-graduate students interested in these fields.
Author : Montserrat Alsina
Publisher : American Mathematical Soc.
Page : 232 pages
File Size : 25,24 MB
Release : 2004
Category : Mathematics
ISBN : 9780821833599
Shimura curves are a far-reaching generalization of the classical modular curves. They lie at the crossroads of many areas, including complex analysis, hyperbolic geometry, algebraic geometry, algebra, and arithmetic. This monograph presents Shimura curves from a theoretical and algorithmic perspective. The main topics are Shimura curves defined over the rational number field, the construction of their fundamental domains, and the determination of their complex multiplicationpoints. The study of complex multiplication points in Shimura curves leads to the study of families of binary quadratic forms with algebraic coefficients and to their classification by arithmetic Fuchsian groups. In this regard, the authors develop a theory full of new possibilities that parallels Gauss'theory on the classification of binary quadratic forms with integral coefficients by the action of the modular group. This is one of the few available books explaining the theory of Shimura curves at the graduate student level. Each topic covered in the book begins with a theoretical discussion followed by carefully worked-out examples, preparing the way for further research.
Author : Montserrat Alsina and Pilar Bayer
Publisher : American Mathematical Soc.
Page : 216 pages
File Size : 40,10 MB
Release :
Category :
ISBN : 0821869833
Shimura curves are a far-reaching generalization of the classical modular curves. They lie at the crossroads of many areas, including complex analysis, hyperbolic geometry, algebraic geometry, algebra, and arithmetic. This monograph presents Shimura curves from a theoretical and algorithmic perspective. The main topics are Shimura curves defined over the rational number field, the construction of their fundamental domains, and the determination of their complex multiplication points. The study of complex multiplication points in Shimura curves leads to the study of families of binary quadratic forms with algebraic coefficients and to their classification by arithmetic Fuchsian groups. In this regard, the authors develop a theory full of new possibilities that parallels Gauss' theory on the classification of binary quadratic forms with integral coefficients by the action of the modular group. This is one of the few available books explaining the theory of Shimura curves at the graduate student level. Each topic covered in the book begins with a theoretical discussion followed by carefully worked-out examples, preparing the way for further research. Titles in this series are co-published with the Centre de Recherches Mathématiques.