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Spatial patterns for an interaction-diffusion equation in morphogenesis

โœ Scribed by Masayasu Mimura; Yasumasa Nishiura

Publisher
Springer
Year
1979
Tongue
English
Weight
863 KB
Volume
7
Category
Article
ISSN
0303-6812

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โœฆ Synopsis

A certain interaction-diffusion equation occurring in morphogenesis is considered. This equation is proposed by Gierer and Meinhardt, which is introduced by Child's gradient theory and Turing's idea about diffusion driven instability. It is shown that slightly asymmetric gradients in the tissue produce stable striking patterns depending on its asymmetry, starting from uniform distribution of morphogens. The tool is the perturbed bifurcation theory. Moreover, from a mathematical point of view, the global existence of steady state solutions with respect to some parameters is discussed.

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