Posted by **AvaxGenius** at March 27, 2018

English | PDF(Repost) | 2012 | 336 Pages | ISBN : 1441978372 | 3.63 MB

This book offers a presentation of the special theory of relativity that is mathematically rigorous and yet spells out in considerable detail the physical significance of the mathematics. It treats, in addition to the usual menu of topics one is accustomed to finding in introductions to special relativity, a wide variety of results of more contemporary origin.

Posted by **ksveta6** at Feb. 22, 2017

2015 | ISBN: 149872292X | English | 317 pages | PDF | 2 MB

Posted by **Nice_smile)** at Jan. 13, 2017

English | 1995 | ISBN: 0534944221 | 288 Pages | PDF | 16.46 MB

Posted by **arundhati** at Dec. 8, 2016

2016 | ISBN-10: 1482246473 | 384 pages | EPUB | 3 MB

Posted by **interes** at Dec. 26, 2015

English | 2016 | ISBN: 9814730351, 9814723770 | 208 pages | PDF | 1,7 MB

Posted by **ChrisRedfield** at Dec. 2, 2015

Published: 1992-07-23 | ISBN: 0387978488, 3540978488 | PDF + DJVU | 350 pages | 6.88 MB

Posted by **tanas.olesya** at Oct. 14, 2015

English | 12 Dec. 1996 | ISBN: 3540533346 | 304 Pages | PDF | 7 MB

This text explores the connection of Reimann surfaces with other fields of mathematics. It is intended as an introduction to contemporary mathematics and it includes background material from algebraic topology, differential geometry, the calculus of variations, elliptic PDE, and algebraic geometry.

Posted by **AlenMiler** at June 7, 2015

English | July 31, 2015 | ISBN: 1107084520 | 352 Pages | AZW3/EPUB/PDF (conv) | 20.42 MB

Games and elections are fundamental activities in society with applications in economics, political science, and sociology. These topics offer familiar, current, and lively subjects for a course in mathematics.

Posted by **ChrisRedfield** at May 11, 2015

Published: 2006-08-18 | ISBN: 3540330658 | PDF | 282 pages | 1.4 MB

Posted by **MoneyRich** at March 23, 2015

English | Oct 24, 2006 | ISBN: 0387344322 | 300 Pages | PDF | 4 MB

This is an undergraduate textbook on the basic aspects of personal savings and investing with a balanced mix of mathematical rigor and economic intuition. It uses routine financial calculations as the motivation and basis for tools of elementary real analysis rather than taking the latter as given. Proofs using induction, recurrence relations and proofs by contradiction are covered.