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Vestnik YuUrGU. Ser. Mat. Model. Progr., 2017, Volume 10, Issue 1, Pages 125–137
(Mi vyuru362)
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Programming & Computer Software
Stationary points of the “reaction-diffusion” equation and transitions to stable states
A. S. Korotkih Voronezh State University, Voronezh, Russian Federation
Abstract:
Of concern is a stationary “reaction-diffusion” equation with cubic non-linearity is Neumann boundary conditions and fixed average value of the desired bifurcating solutions. A method of approximate calculation of bifurca-ting solutions for small and finite values of supercritical parameter increment are presented. Computing is based on the Lyapunov–Schmidt reducing procedure and is leaning on key functions Ritz' approximation of the set of eigenfunctions (modes) of main linear part of gradient energy functional. A technique of evaluating of a functional space size, where Lyapunov–Schmidt reduction can be applied is performed. In case of local reduction the main part of the key function has been found and asymptotic presentation of bifurcating solutions for small supercritical increment of bifurcation parameter is calculated. The relation between solutions search procedures for “reaction-diffusion” equations and Cahn–Hilliard equation (with extended Neumann boundary conditions) is also performed. Graphs are presented.
Keywords:
continuously differentiable functional; extremal; bifurcation; Lyapunov–Shmidt method.
DOI:
https://doi.org/10.14529/mmp170108
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Document Type:
Article
UDC:
517.9
MSC: 90C30, 90C90 Received: 20.09.2016
Citation:
A. S. Korotkih, “Stationary points of the “reaction-diffusion” equation and transitions to stable states”, Vestnik YuUrGU. Ser. Mat. Model. Progr., 10:1 (2017), 125–137
Citation in format AMSBIB
\Bibitem{Kor17}
\by A.~S.~Korotkih
\paper Stationary points of the ``reaction-diffusion'' equation and transitions to stable states
\jour Vestnik YuUrGU. Ser. Mat. Model. Progr.
\yr 2017
\vol 10
\issue 1
\pages 125--137
\mathnet{http://mi.mathnet.ru/vyuru362}
\crossref{https://doi.org/10.14529/mmp170108}
\elib{http://elibrary.ru/item.asp?id=28922155}
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http://mi.mathnet.ru/eng/vyuru362 http://mi.mathnet.ru/eng/vyuru/v10/i1/p125
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