Posted by **tanas.olesya** at Sept. 18, 2015

English | 28 Sept. 2010 | ISBN: 1420093649 | 921 Pages | PDF | 22 MB

Handbook of Mathematical Induction: Theory and Applications shows how to find and write proofs via mathematical induction. This comprehensive book covers the theory, the structure of the written proof, all standard exercises, and hundreds of application examples from nearly every area of mathematics.

Posted by **sasha82** at Oct. 28, 2014

1994 | ISBN: 0313281424 | English | 484 pages | PDF | 59 MB

Posted by **fdts** at July 3, 2013

by David S. Gunderson

English | 2011 | ISBN: 1420093649 | 921 pages | PDF | 22.93 MB

Posted by **step778** at Dec. 17, 2014

2011 | pages: 921 | ISBN: 1420093649 | DJVU | 10,9 mb

Posted by **happy4all** at Oct. 15, 2016

2016 | 640 Pages | ISBN: 1118650190 | PDF | 10 MB

Posted by **Underaglassmoon** at Oct. 15, 2016

Wiley | Accounting & Finance | Oct 17 2016 | ISBN-10: 1118650190 | 640 pages | pdf | 10.13 mb

by Francois Longin (Author)

Posted by **libr** at July 10, 2016

English | 2014 | ISBN: 1848729723, 113878785X | 492 pages | PDF | 5,3 MB

Posted by **interes** at Jan. 15, 2015

English | 2014 | ISBN: 1848729723, 113878785X | 492 pages | PDF | 5,3 MB

Posted by **srinivasgoud** at July 5, 2010

Publisher: Springer | Pages: 344 | ISBN: 1402075405 | PDF | 8.76 MB

This book considers a graph as a mathematical structure on a set of elements with a binary relation, and provides the most classical and important theory and application of graphs. It covers basic concepts, trees and graphic spaces, plane graphs and planar graphs, flows and connectivity, matchings and independent sets, coloring theory, graphs and groups. These topics, both theoretical and applied, are treated with some depth and with some suggestions for further reading.

Posted by **srinivasgoud** at July 5, 2010

Springer; 1 edition | ISBN:0387272356 | 512 pages | PDF | 17 Mb

This monograph provides a comprehensive and accessible introduction to the optimization of elliptic systems. This area of mathematical research, which has many important application in science and technology, has experienced an impressive development during the last two decades. This monograph aims to address some of the pressing unsolved questions in the field. The exposition concentrates along two main directions: the optimal control of linear and nonlinear elliptic equations, and problems involving unknown and/or variable domains. Throughout this monograph, the authors elucidate connections between seemingly different types of problems. One basic feature is to relax the needed regularity assumptions as much as possible in order to include larger classes of possible applications. The book is organized into six chapters that give a gradual and accessible presentation of the material, and a special effort is made to present numerous examples. This monograph is addressed to a large readership, primarily to graduate students and researchers working in this field of mathematics. Much of this material will prove useful also for scientists from other fields where the optimization of elliptic systems occurs, such as physics, mechanics, and engineering.