Posted by **libr** at April 16, 2015

English | 2014 | ISBN: 3319064460 | 208 pages | PDF | 2 MB

Posted by **interes** at Feb. 17, 2015

English | 2014 | ISBN: 3319064460 | 208 pages | PDF | 2 MB

Posted by **interes** at April 7, 2014

English | ISBN: 1420083090 | 2010 | 344 pages | PDF | 2 MB

Intended for researchers, numerical analysts, and graduate students in various fields of applied mathematics, physics, mechanics, and engineering sciences, Applications of Lie Groups to Difference Equations is the first book to provide a systematic construction of invariant difference schemes for nonlinear differential equations.

Posted by **Specialselection** at Jan. 31, 2014

English | 2000-06-30 | ISBN: 0792362896 | 346 pages | DJVU | 2.7 mb

Posted by **libr** at May 16, 2017

English | 1997 | ISBN: 052144618X , 0521440696 | ISBN-13: 9780521446181 , 9780521440691 | 416 pages | PDF | 4,6 MB

Posted by **naag** at April 14, 2017

English | 2013 | ISBN: 1461473322 | 515 pages | PDF | 6 MB

Posted by **thingska** at April 12, 2017

English | 2015 | ISBN: 3658092742, 9783658092740 | 443 Pages | PDF | 3.78 MB

Posted by **AvaxGenius** at March 25, 2017

English | EPUB | 2016 | 223 Pages | ISBN : 331942212X | 3.46 MB

This monograph is a first in the world to present three approaches for stability analysis of solutions of dynamic equations. The first approach is based on the application of dynamic integral inequalities and the fundamental matrix of solutions of linear approximation of dynamic equations.

Posted by **leonardo78** at March 22, 2017

2007 | ISBN: 977454000X | 375 pages | PDF | 15,9 MB

Delay partial difference equations occur frequently in the approximation of solutions of delay partial differential equations by finite difference methods, random walk problems, the study of molecular orbits and mathematical physics problems.

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

English | 2000 | ISBN: 3540413979 | 276 Pages | DJVU | 2.1 MB

Variational methods are applied to prove the existence of weak solutions for boundary value problems from the deformation theory of plasticity as well as for the slow, steady state flow of generalized Newtonian fluids including the Bingham and Prandtl-Eyring model.