In this work we investigate the possibility of the pattern formation for a reaction-di®usion system with nonlinear di®usion terms. Through a linear sta- bility analysis we ¯nd the conditions which allow a homogeneous steady state (stable for the kinetics) to become unstable through a Turing mechanism. In particular, we show how cross-di®usion e®ects are responsible for the initiation of spatial patterns. Finally, we ¯nd a Fisher amplitude equation which describes the weakly nonlinear dynamics of the system near the marginal stability.
GAMBINO G, LOMBARDO M C, SAMMARTINO M (2008). Cross-diffusion driven instability for a Lotka-Volterra competitive reaction-diffusion system. ??????? it.cilea.surplus.oa.citation.tipologie.CitationProceedings.prensentedAt ??????? XIV International Conference on Waves and Stability in Continuous Media, Baia Samuele (RG).
Cross-diffusion driven instability for a Lotka-Volterra competitive reaction-diffusion system
GAMBINO, Gaetana;LOMBARDO, Maria Carmela;SAMMARTINO, Marco Maria Luigi
2008-01-01
Abstract
In this work we investigate the possibility of the pattern formation for a reaction-di®usion system with nonlinear di®usion terms. Through a linear sta- bility analysis we ¯nd the conditions which allow a homogeneous steady state (stable for the kinetics) to become unstable through a Turing mechanism. In particular, we show how cross-di®usion e®ects are responsible for the initiation of spatial patterns. Finally, we ¯nd a Fisher amplitude equation which describes the weakly nonlinear dynamics of the system near the marginal stability.
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