Literature DB >> 21293858

Global existence for semilinear reaction-diffusion systems on evolving domains.

Chandrasekhar Venkataraman1, Omar Lakkis, Anotida Madzvamuse.   

Abstract

We present global existence results for solutions of reaction-diffusion systems on evolving domains. Global existence results for a class of reaction-diffusion systems on fixed domains are extended to the same systems posed on spatially linear isotropically evolving domains. The results hold without any assumptions on the sign of the growth rate. The analysis is valid for many systems that commonly arise in the theory of pattern formation. We present numerical results illustrating our theoretical findings. © Springer-Verlag 2011

Mesh:

Year:  2011        PMID: 21293858     DOI: 10.1007/s00285-011-0404-x

Source DB:  PubMed          Journal:  J Math Biol        ISSN: 0303-6812            Impact factor:   2.259


  9 in total

1.  Mode-doubling and tripling in reaction-diffusion patterns on growing domains: a piecewise linear model.

Authors:  E J Crampin; E A Gaffney; P K Maini
Journal:  J Math Biol       Date:  2002-02       Impact factor: 2.259

2.  Mode transitions in a model reaction-diffusion system driven by domain growth and noise.

Authors:  Iain Barrass; Edmund J Crampin; Philip K Maini
Journal:  Bull Math Biol       Date:  2006-06-06       Impact factor: 1.758

3.  Stationary multiple spots for reaction-diffusion systems.

Authors:  Juncheng Wei; Matthias Winter
Journal:  J Math Biol       Date:  2007-12-05       Impact factor: 2.259

4.  Reaction and diffusion on growing domains: scenarios for robust pattern formation.

Authors:  E J Crampin; E A Gaffney; P K Maini
Journal:  Bull Math Biol       Date:  1999-11       Impact factor: 1.758

5.  Stability analysis of non-autonomous reaction-diffusion systems: the effects of growing domains.

Authors:  Anotida Madzvamuse; Eamonn A Gaffney; Philip K Maini
Journal:  J Math Biol       Date:  2009-08-29       Impact factor: 2.259

6.  Spatiotemporal dynamics of two generic predator-prey models.

Authors:  Marcus R Garvie; C Trenchea
Journal:  J Biol Dyn       Date:  2010-11       Impact factor: 2.179

7.  A theory of biological pattern formation.

Authors:  A Gierer; H Meinhardt
Journal:  Kybernetik       Date:  1972-12

8.  Simple chemical reaction systems with limit cycle behaviour.

Authors:  J Schnakenberg
Journal:  J Theor Biol       Date:  1979-12-07       Impact factor: 2.691

9.  A reaction-diffusion wave on the skin of the marine angelfish Pomacanthus.

Authors:  S Kondo; R Asal
Journal:  Nature       Date:  1995-08-31       Impact factor: 49.962
  9 in total
  4 in total

1.  Modelling cell motility and chemotaxis with evolving surface finite elements.

Authors:  Charles M Elliott; Björn Stinner; Chandrasekhar Venkataraman
Journal:  J R Soc Interface       Date:  2012-06-06       Impact factor: 4.118

2.  Parameter identification problems in the modelling of cell motility.

Authors:  Wayne Croft; Charles M Elliott; Graham Ladds; Björn Stinner; Chandrasekhar Venkataraman; Cathryn Weston
Journal:  J Math Biol       Date:  2014-09-02       Impact factor: 2.259

3.  Stability analysis and simulations of coupled bulk-surface reaction-diffusion systems.

Authors:  Anotida Madzvamuse; Andy H W Chung; Chandrasekhar Venkataraman
Journal:  Proc Math Phys Eng Sci       Date:  2015-03-08       Impact factor: 2.704

4.  Exact Solutions of Coupled Multispecies Linear Reaction-Diffusion Equations on a Uniformly Growing Domain.

Authors:  Matthew J Simpson; Jesse A Sharp; Liam C Morrow; Ruth E Baker
Journal:  PLoS One       Date:  2015-09-25       Impact factor: 3.240
  4 in total

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