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Autori principali: Villar-Sepúlveda, Edgardo, Champneys, Alan R., Cusseddu, Davide, Madzvamuse, Anotida
Natura: Preprint
Pubblicazione: 2024
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Accesso online:https://arxiv.org/abs/2409.06826
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author Villar-Sepúlveda, Edgardo
Champneys, Alan R.
Cusseddu, Davide
Madzvamuse, Anotida
author_facet Villar-Sepúlveda, Edgardo
Champneys, Alan R.
Cusseddu, Davide
Madzvamuse, Anotida
contents Weakly nonlinear amplitude equations are derived for the onset of spatially extended patterns on a general class of n-component bulk-surface reaction-diffusion systems in a ball, under the assumption of linear kinetics in the bulk and coupling Robin-type boundary conditions. Linear analysis shows conditions under which various pattern modes can become unstable to either generalised pitchfork or transcritical bifurcations depending on the parity of the spatial wavenumber. Weakly nonlinear analysis is used to derive general expressions for the multi-component amplitude equations of different patterned states. These reduced-order systems are found to agree with prior normal forms for pattern formation bifurcations with O(3) symmetry and they provide information on the stability of bifurcating patterns of different symmetry types. The analysis is complemented with numerical results using a dedicated bulk-surface finite-element method. The theory is illustrated in two examples: a bulk-surface version of the Brusselator and a four-component bulk-surface cell-polarity model.
format Preprint
id arxiv_https___arxiv_org_abs_2409_06826
institution arXiv
publishDate 2024
record_format arxiv
spellingShingle Pattern formation of bulk-surface reaction-diffusion systems in a ball
Villar-Sepúlveda, Edgardo
Champneys, Alan R.
Cusseddu, Davide
Madzvamuse, Anotida
Pattern Formation and Solitons
Weakly nonlinear amplitude equations are derived for the onset of spatially extended patterns on a general class of n-component bulk-surface reaction-diffusion systems in a ball, under the assumption of linear kinetics in the bulk and coupling Robin-type boundary conditions. Linear analysis shows conditions under which various pattern modes can become unstable to either generalised pitchfork or transcritical bifurcations depending on the parity of the spatial wavenumber. Weakly nonlinear analysis is used to derive general expressions for the multi-component amplitude equations of different patterned states. These reduced-order systems are found to agree with prior normal forms for pattern formation bifurcations with O(3) symmetry and they provide information on the stability of bifurcating patterns of different symmetry types. The analysis is complemented with numerical results using a dedicated bulk-surface finite-element method. The theory is illustrated in two examples: a bulk-surface version of the Brusselator and a four-component bulk-surface cell-polarity model.
title Pattern formation of bulk-surface reaction-diffusion systems in a ball
topic Pattern Formation and Solitons
url https://arxiv.org/abs/2409.06826