Posted by **tanas.olesya** at Feb. 23, 2015

English | Dec 13, 2005 | ISBN: 0821839888 | 392 Pages | DJVU | 2 MB

Our first knowledge of differential geometry usually comes from the study of the curves and surfaces in $I\!\!R^3$ that arise in calculus. Here we learn about line and surface integrals, divergence and curl, and the various forms of Stokes' Theorem.

Posted by **step778** at Oct. 7, 2014

2005 | pages: 391 | ISBN: 0821839888 | PDF | 14,1 mb

Posted by **Jeembo** at March 20, 2017

English | 2000 | ISBN: 3540414142 | 120 Pages | DJVU | 2.4 MB

Since the time of surfaces -+ in differential Gauss, parametrized (x, y) P(x, y) have been described a frame attached to the moving geometry through TI(x, y) surface.

Posted by **arundhati** at April 27, 2016

2006 | ISBN-10: 1584884487 | 1016 pages | PDF | 20 MB

Posted by **Jeembo** at March 18, 2017

English | 2003 | ISBN: 0521535697 | 428 Pages | DJVU | 8.5 MB

This introduction to the conformal differential geometry of surfaces and submanifolds covers those aspects of the geometry of surfaces that only refer to an angle measurement, but not to a length measurement.

Posted by **viserion** at Feb. 11, 2016

ISBN: 9814590444 | 2015 | PDF | 400 pages | 5 MB

Posted by **tarantoga** at Feb. 15, 2017

ISBN: 8847019400 | 2011 | EPUB | 210 pages | 5 MB

Posted by **interes** at Nov. 23, 2016

English | 2016 | ISBN: 3319397982 | 366 pages | PDF | 14 MB

Posted by **tarantoga** at Oct. 7, 2016

ISBN: 3662504464 | 2016 | EPUB | 439 pages | 11 MB

Posted by **Underaglassmoon** at Aug. 14, 2016

Springer | Mathematics | September 13, 2016 | ISBN-10: 3662504464 | 439 pages | pdf | 28.7 mb

Editors: Bobenko, Alexander I. (Ed.)

Excellent way to access this new exciting area

Topics survey fascinating connections of discrete models in differential geometry to complex analysis, integrable systems, and to applications in computer graphics