Posted by **interes** at Jan. 18, 2016

English | 2016 | ISBN: 3037191457 | 514 pages | PDF | 15,2 MB

Posted by **step778** at June 5, 2015

1994 | pages: 117 | ISBN: 3540587217 | PDF | 3,2 mb

Posted by **nebulae** at Jan. 4, 2014

English | ISBN: 3642225330 | 2011 | PDF | 254 pages | 2,3 MB

Posted by **interes** at July 3, 2014

English | 2011 | ISBN: 0198526393 , 0199606749 | 256 pages | PDF | 1,3 MB

The theory of Riemann surfaces occupies a very special place in mathematics. It is a culmination of much of traditional calculus, making surprising connections with geometry and arithmetic. It is an extremely useful part of mathematics, knowledge of which is needed by specialists in many other fields.

Posted by **interes** at April 11, 2014

English | 2003-06-01 | ISBN: 082183357X | 387 pages | PDF | 1,7 mb

In this book, the authors geometrically construct Riemann surfaces of infinite genus by pasting together plane domains and handles. To achieve a meaningful generalization of the classical theory of Riemann surfaces to the case of infinite genus, one must impose restrictions on the asymptotic behavior of the Riemann surface.

Posted by **phidhahoogaya** at Aug. 6, 2011

Birkhäuser Boston | November 4, 2010 | ISBN-10: 0817649913 | 492 pages | PDF | 44.2 MB

This monograph is a self-contained introduction to the geometry of Riemann Surfaces of constant curvature –1 and their length and eigenvalue spectra. It focuses on two subjects: the geometric theory of compact Riemann surfaces

Posted by **step778** at May 22, 2015

2007 | pages: 228 | ISBN: 3540711740 | PDF | 2 mb

Posted by **fdts** at Oct. 30, 2014

by Martin Schlichenmaier

English | 2007 | ISBN: 3540711740 | 220 pages | PDF | 6 MB

Posted by **roxul** at Nov. 18, 2016

English | ISBN: 0486640256 | 2003 | 352 pages | PDF | 3 MB

Posted by **Underaglassmoon** at April 15, 2016

Springer | Algebra | May 14, 2016 | ISBN-10: 3319247093 | 259 pages | pdf | 3.81 mb

Authors: Jones, Gareth A., Wolfart, Jürgen

Emphasises the role of group theory in the classification of regular maps, regular dessins, and quasiplatonic surfaces

Explains the links between the theory of dessins and other areas of arithmetic and geometry