Radially Symmetric Patterns of Reaction-Diffusion Systems

Arnd Scheel

doi:10.1090/memo/0786

Radially Symmetric Patterns of Reaction-Diffusion Systems

Arnd Scheel

Mathematics

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38 Scopus citations

Abstract

In this paper, bifurcations of stationary and time-periodic solutions to reaction-diffusion systems are studied. We develop a center-manifold and normal form theory for radial dynamics which allows for a complete description of radially symmetric patterns. In particular, we show the existence of localized pulses near saddle-nodes, critical Gibbs kernels in the cusp, focus patterns in Turing instabilities, and active or passive target patterns in oscillatory instabilities.

Original language	English (US)
Journal	Memoirs of the American Mathematical Society
Issue number	786
DOIs	https://doi.org/10.1090/memo/0786
State	Published - Sep 2003

Keywords

Center manifolds
Defects
Normal forms
Reaction-diffusion systems
Target patterns

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title = "Radially Symmetric Patterns of Reaction-Diffusion Systems",

abstract = "In this paper, bifurcations of stationary and time-periodic solutions to reaction-diffusion systems are studied. We develop a center-manifold and normal form theory for radial dynamics which allows for a complete description of radially symmetric patterns. In particular, we show the existence of localized pulses near saddle-nodes, critical Gibbs kernels in the cusp, focus patterns in Turing instabilities, and active or passive target patterns in oscillatory instabilities.",

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PY - 2003/9

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AB - In this paper, bifurcations of stationary and time-periodic solutions to reaction-diffusion systems are studied. We develop a center-manifold and normal form theory for radial dynamics which allows for a complete description of radially symmetric patterns. In particular, we show the existence of localized pulses near saddle-nodes, critical Gibbs kernels in the cusp, focus patterns in Turing instabilities, and active or passive target patterns in oscillatory instabilities.

KW - Center manifolds

KW - Defects

KW - Normal forms

KW - Reaction-diffusion systems

KW - Target patterns

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JF - Memoirs of the American Mathematical Society

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ER -

Radially Symmetric Patterns of Reaction-Diffusion Systems

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