# eBook Computational Methods in Bifurcation Theory and Dissipative Structures: Springer Series in Computational Physics download

## by M. Kubicek,M. Marek

**ISBN:**038712070X

**Author:**M. Kubicek,M. Marek

**Publisher:**Springer-Verlag; First Edition edition (December 1983)

**Language:**English

**Pages:**243

**ePub:**1614 kb

**Fb2:**1500 kb

**Rating:**4.7

**Other formats:**lrf docx azw mbr

**Category:**Math Sciences

**Subcategory:**Physics

Dissipative structures" is a concept which has recently been used in physics to discuss the formation of structures organized in space and/or time at the expense of the energy flowing into the system from the outside.

Dissipative structures" is a concept which has recently been used in physics to discuss the formation of structures organized in space and/or time at the expense of the energy flowing into the system from the outside. It seems that you're in Russian Federation. We have a dedicated site for Russian Federation.

Springer series in computational physics) Bibliography: p. 1. Bifurcation theory. 3. Mathematical physics. I. Marek, M. II. Title. Dissipative Structures in Physical, Chemical, and Biological Systems We shall illustrate the wide variety of dissipative systems with examples from various branches of science and engineering, and discuss some problems encountered in an analysis of the dependence on parameters. 1 The problems of elastic stability There is extensive literature on elastic stability problems.

Read instantly in your browser. Many computational details are provided, including a description of algorithms such at the Runge-Kutta method. by M. Kubicek (Author), M. Marek (Author). ISBN-13: 978-3642859595. The appendix includes FORTRAN programs for some of these algorithms.

Dissipative structures" is a concept which has recently been used in. .M. Kubicek, M. Marek. Numerical techniques to determine both bifurcation points and the depen dence of steady-state and oscillatory solutions on parameters are developed and discussed in detail in this text.

Автор: M. Kubicek; M. Marek Название: Computational Methods in Bifurcation Theory and Dissipative . Описание: This book provides a modern investigation into the bifurcation phenomena of physical and engineering problems.

2012 Серия: Scientific Computation Язык: ENG Размер: 2. 9 x 1. 0 x . 0 cm Основная тема: Physics Рейтинг: Поставляется из: Германии.

Kubicek, . Published by Springer-Verlag (1983). ISBN 10: 038712070X ISBN 13: 9780387120706.

Computational Method in Bifurcation Theory and Dissipative Structures.

The catalysts are used in series for the conversion of exhaust gases from automobiles with Diesel engines (or other lean-burn engines). Several tens of catalytic reactions are considered in the description by a model based on a system of non-linear partial differential equations (mass and enthalpy ballances). Computational Method in Bifurcation Theory and Dissipative Structures.

High performance computations of steady-state bifurcations in 3D.Applications of Bifurcation Theory, Rabinowitz, P. E. Academic Press, New York, .

High performance computations of steady-state bifurcations in 3D incompressible fluid flows by Asymptotic Numerical Method. Journal of Computational Physics, Vol. 299, Issue. Hof, . et a. 2004: Experimental observation of nonlinear traveling waves in turbulent pipe flow. Kerswell, . Tutty, . and Drazin, . 2004: Steady nonlinear waves in diverging channel flow.

Dieter W. Heermann, Computer Simulation Methods in Theoretical Physics, second .

P. Harrison, Computational Methods in Physics, Chemistry, and Mathematical Biology, Wiley-VCH (2002). Steven Koonin, Computational Physics, Addison-Wesley, (1986).

4 M. Kubicek and M. Marek, Computational Methods in Bifurcation Theory and Dissi pative Structures, Springer Series in Computational Physics, Springer-Verlag, New York et. 1983. 5 G. A. Chumakov and N. Chumakova, Chem. Eng. (2002) (to be published)

4 M. (2002) (to be published). 6 G. Chumakov, Technology of Periodic Solution Computation for Autonomous System of Ordin ary Differential Equations, Prep. No. 16, Sobolev Institute of Mathematics, Novosibirsk, 1990 (in Russian). 7 G. Chumakova, in J. Warnatz and.

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