The Scientific Way to Simulate Pattern Formation in Reaction-Diffusion Equations

The Scientific Way to Simulate Pattern Formation in Reaction-Diffusion Equations

For a uniquely defined subset of phase space, solutions of non-linear, coupled reaction-diffusion equations may converge to heterogeneous steady states, organic in appearance. Hence, many theoretical models for pattern formation, as in the theory of morphogenesis, include the mechanics of reaction-d...

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Bibliographic Details
Main Author:	Cleary, Erin
Other Authors:	Garvie, Marcus
Language:	en
Published:	2013
Subjects:	Turing pattern Finite difference method Numerical methods Turing space Initial data Schnakenberg model Gierer-Meinhardt model
Online Access:	http://hdl.handle.net/10214/6659

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