Difference approximations of "reaction - diffusion" equation on a segment

Difference approximations of "reaction - diffusion" equation on a segment

The system of phase differences for a chain of diffuse weakly coupled oscillators on a stable integral manifold is constructed and analysed. It is shown by means of numerical methods that as the number of oscillators in the chain increases, the Lyapunov dimention growth is close to linear. The exten...

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Bibliographic Details
Main Author: S. D. Glyzin
Format: Article
Language:English
Published: Yaroslavl State University 2009-09-01
Series:Modelirovanie i Analiz Informacionnyh Sistem
Subjects:
chaotic attractor
autooscillations
autogenerator
lyapunov's dimension
bifurcations
invariant torus
Online Access:https://www.mais-journal.ru/jour/article/view/955
Description
Summary:The system of phase differences for a chain of diffuse weakly coupled oscillators on a stable integral manifold is constructed and analysed. It is shown by means of numerical methods that as the number of oscillators in the chain increases, the Lyapunov dimention growth is close to linear. The extensive computations performed for difference model of Ginsburg-Landau equation illustrate this result and determine the applicability limits for asymptotic methods.
ISSN:1818-1015
2313-5417

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