AbstractA reaction-diffusion system of activator–inhibitor type is studied on an N-dimensional ball with the homogeneous Neumann boundary conditions. We analyze the stability property of the spherically symmetric solutions and their symmetry-breaking bifurcations into layer solutions which are not spherically symmetric
We analyse a reaction-diffusion system and show that complex spatial patterns can be generated by im...
Stationary, spatially inhomogenous solutions of reaction-diffusion systems are studied in this thesi...
In this paper, we consider a reaction–diffusion system known as the Brusselator model with homogenou...
AbstractReaction–diffusion systems of activator–inhibitor type are studied on an N-dimensional ball ...
AbstractWe consider a reaction–diffusion system of activator–inhibitor or substrate-depletion type w...
summary:We consider a reaction-diffusion system of the activator-inhibitor type with boundary condit...
Given a reaction-diffusion system which exhibits Turing's diffusion-driven instability, the influenc...
Bifurcation from equilibrium solutions to reaction diffusion systems is considered in a two-dimensio...
summary:We consider a simple reaction-diffusion system exhibiting Turing's diffusion driven instabil...
In the limit of small activator diffusivity ε, and in a bounded domain in R N with N = 1 or N = 2 un...
Diploma thesis is about stationary solutions to reaction-diffusion system of the activator-inhibitor...
The aim of this paper is to discuss the behaviour of the numerical solution of systems of nonlinear ...
AbstractFor a singularly perturbed system of reaction-diffusion equations, we study the bifurcation ...
We present necessary conditions for the formation of internal transition layers in stationary soluti...
Fujii, Mimura, and Nishiura [1985] and Armbruster and Dangelmayr [1986, 1987] have observed that rea...
We analyse a reaction-diffusion system and show that complex spatial patterns can be generated by im...
Stationary, spatially inhomogenous solutions of reaction-diffusion systems are studied in this thesi...
In this paper, we consider a reaction–diffusion system known as the Brusselator model with homogenou...
AbstractReaction–diffusion systems of activator–inhibitor type are studied on an N-dimensional ball ...
AbstractWe consider a reaction–diffusion system of activator–inhibitor or substrate-depletion type w...
summary:We consider a reaction-diffusion system of the activator-inhibitor type with boundary condit...
Given a reaction-diffusion system which exhibits Turing's diffusion-driven instability, the influenc...
Bifurcation from equilibrium solutions to reaction diffusion systems is considered in a two-dimensio...
summary:We consider a simple reaction-diffusion system exhibiting Turing's diffusion driven instabil...
In the limit of small activator diffusivity ε, and in a bounded domain in R N with N = 1 or N = 2 un...
Diploma thesis is about stationary solutions to reaction-diffusion system of the activator-inhibitor...
The aim of this paper is to discuss the behaviour of the numerical solution of systems of nonlinear ...
AbstractFor a singularly perturbed system of reaction-diffusion equations, we study the bifurcation ...
We present necessary conditions for the formation of internal transition layers in stationary soluti...
Fujii, Mimura, and Nishiura [1985] and Armbruster and Dangelmayr [1986, 1987] have observed that rea...
We analyse a reaction-diffusion system and show that complex spatial patterns can be generated by im...
Stationary, spatially inhomogenous solutions of reaction-diffusion systems are studied in this thesi...
In this paper, we consider a reaction–diffusion system known as the Brusselator model with homogenou...
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