Stationary spots and stationary arcs induced by advection in a one-activator, two-inhibitor reactive system.

Berenstein, Igal; Bullara, Domenico; De Decker, Yannick

Berenstein, Igal; Bullara, Domenico; De Decker, Yannick.

Affiliation

Berenstein I; Center for Nonlinear Phenomena and Complex Systems (CENOLI), NonLinear Physical Chemistry Unit, Université libre de Bruxelles (ULB), Campus Plaine, C.P. 231, Brussels B-1050, Belgium.
Bullara D; Center for Nonlinear Phenomena and Complex Systems (CENOLI), NonLinear Physical Chemistry Unit, Université libre de Bruxelles (ULB), Campus Plaine, C.P. 231, Brussels B-1050, Belgium.
De Decker Y; Center for Nonlinear Phenomena and Complex Systems (CENOLI), NonLinear Physical Chemistry Unit, Université libre de Bruxelles (ULB), Campus Plaine, C.P. 231, Brussels B-1050, Belgium.

Chaos ; 24(3): 033129, 2014 Sep.

Article in En | MEDLINE | ID: mdl-25273209

ABSTRACT

ABSTRACT

This paper studies the spatiotemporal dynamics of a reaction-diffusion-advection system corresponding to an extension of the Oregonator model, which includes two inhibitors instead of one. We show that when the reaction-diffusion, two-dimensional problem displays stationary patterns the addition of a plug flow can induce the emergence of new types of stationary structures. These patterns take the form of spots or arcs, the size and the spacing of which can be controlled by the flow.

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Full text: 1 Database: MEDLINE Language: En Year: 2014 Type: Article

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Full text: 1 Database: MEDLINE Language: En Year: 2014 Type: Article