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On the dynamics of a non-local parabolic equation arising from the Gierer–Meinhardt system
University of Chester, GBR.ORCID iD: 0000-0002-9743-8636
Graduate School of Engineering Science, Osaka University, JPN.
2017 (English)In: Nonlinearity, ISSN 0951-7715, E-ISSN 1361-6544, Vol. 30, no 5, p. 1734-1761Article in journal (Refereed) Published
Abstract [en]

The purpose of the current paper is to contribute to the comprehension of the dynamics of the shadow system of an activator-inhibitor system known as a Gierer-Meinhardt model. Shadow systems are intended to work as an intermediate step between single equations and reaction-diffusion systems. In the case where the inhibitor's response to the activator's growth is rather weak, then the shadow system of the Gierer-Meinhardt model is reduced to a single though non-local equation whose dynamics will be investigated. We mainly focus on the derivation of blow-up results for this non-local equation which can be seen as instability patterns of the shadow system. In particular, a diffusion driven instability (DDI), or Turing instability, in the neighbourhood of a constant stationary solution, which it is destabilised via diffusion-driven blow-up, is obtained. The latter actually indicates the formation of some unstable patterns, whilst some stability results of global-in-time solutions towards non-constant steady states guarantee the occurrence of some stable patterns.

Place, publisher, year, edition, pages
Institute of Physics (IOP), 2017. Vol. 30, no 5, p. 1734-1761
Keywords [en]
Pattern formationturing instabilityshadow-systeminvariant regionsdiffusion-driven blow-up
National Category
Mathematical Analysis
Research subject
Mathematics
Identifiers
URN: urn:nbn:se:kau:diva-88704DOI: 10.1088/1361-6544/aa64b2ISI: 000398755600001Scopus ID: 2-s2.0-85018488986OAI: oai:DiVA.org:kau-88704DiVA, id: diva2:1639917
Available from: 2022-02-22 Created: 2022-02-22 Last updated: 2022-11-21Bibliographically approved

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Kavallaris, Nikos I.

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CiteExportLink to record
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Citation style
  • apa
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  • vancouver
  • apa.csl
  • Other style
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Language
  • de-DE
  • en-GB
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  • fi-FI
  • nn-NO
  • nn-NB
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  • Other locale
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Output format
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  • asciidoc
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