Titlebook: Numerical Bifurcation Analysis for Reaction-Diffusion Equations; Zhen Mei Book 2000 Springer-Verlag Berlin Heidelberg 2000 Numerics.Numeri

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Numerical Bifurcation Analysis for Reaction-Diffusion Equations

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0179-3632 , an analytical bifurcation analysis is possible only for exceptional cases. This book is devoted to nu- merical analysis of bifurcation problems in reaction-diffusion equations. The aim is to pursue a systematic investigation of generic bifurcations a978-3-642-08669-4978-3-662-04177-2Series ISSN 0179-3632 Series E-ISSN 2198-3712

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Book 2000e. g. temperature, catalyst and diffusion rate, etc. Moreover, they form normally a nonlinear dissipative system, coupled by reaction among differ- ent substances. The number and stability of solutions of a reaction-diffusion system may change abruptly with variation of the control parameters. Cor-

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Center Manifold Theory,al system. The center manifold theorem was introduced in the sixties by Pliss [243] and Kelley [182]. Owing to the Lanford’s contribution [198] this theory has been applied extensively to the study of bifurcation problems and dynamical systems, in particular, in connection with the normal form theory.

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