Posted by **arundhati** at May 27, 2014

2011 | ISBN: 0521888859 | 404 pages | PDF | 2 MB

Posted by **ChrisRedfield** at Dec. 14, 2013

Published: 2011-06-20 | ISBN: 0521888859 | PDF | 404 pages | 3 MB

Posted by **hill0** at March 24, 2018

English | 7 Nov. 2016 | ISBN: 9462392277 | 414 Pages | EPUB | 7.19 MB

Posted by **Nice_smile)** at Feb. 5, 2017

English | 2010 | ISBN: 3642040837 | 280 Pages | PDF | 3.29 MB

Posted by **tot167** at April 7, 2010

Springer | 2010 | ISBN: 3642040837 | 280 pages | PDF | 3,1 MB

Posted by **AvaxGenius** at Aug. 29, 2017

English | PDF | 2017 | 167 Pages | ISBN : 3319621297 | 4.12 MB

The book addresses the problem of calculation of d-dimensional integrals (conditional expectations) in filter problems. It develops new methods of deterministic numerical integration, which can be used to speed up and stabilize filter algorithms. With the help of these methods, better estimates and predictions of latent variables are made possible in the fields of economics, engineering and physics. The resulting procedures are tested within four detailed simulation studies.

Posted by **hill0** at June 11, 2017

English | 5 Apr. 2016 | ISBN: 9462391238 | 280 Pages | EPUB | 6.45 MB

The aim of this monograph is to present a general method of proving continuity of Lyapunov exponents of linear cocycles. The method uses an inductive procedure based on a general, geometric version of the Avalanche Principle.

Posted by **nebulae** at Feb. 13, 2017

2012 | ISBN: 1461415233 | PDF | 504 pages | 8,8 MB

Posted by **AvaxGenius** at Feb. 13, 2017

English | PDF | 2016 | 449 Pages | ISBN : 1785611747 | 28.84 MB

This book presents a collection of exercises on dynamical systems, modelling and control.

Posted by **hill0** at Jan. 16, 2017

English | 18 Aug. 2013 | ISBN: 9462390428 | 204 Pages | PDF | 2.45 MB

This book covers normally hyperbolic invariant manifolds and their relation to hyperbolic fixed points and center manifolds, and offers a proof of persistence for noncompact normally hyperbolic invariant manifolds in Riemannian manifolds of bounded geometry.