A model scheme incorporating reactant inhibition in the rate process has been analyzed with a view to study the instability of homogeneous solution due to diffusion. Conditions for the occurrence of Turing as well as phase instability are derived and show the existence of multiplicity in the parameter space. The Ginzburg-Landau equation for the system is developed and solved numerically in various regions of the parameter space. The simple model system shows the existence of very rich behavior including normal and inverted bifurcations in the super and subcritical regimes. The various results are analyzed and discussed
Patterns are ubiquitous in nature and can arise in reaction-diffusion systems with differential diff...
The Turing instability paradigm is revisited in the context of a multispecies diffusion scheme deriv...
In this thesis we investigate the formation of patterns in a simple activator-inhibitor model supple...
Abstract. Theoretical framework for linear stability of an anomalous sub-diffusive activator-inhibit...
summary:We consider a reaction-diffusion system of activator-inhibitor type which is subject to Turi...
We analyze the condition for instability and pattern formation in reaction-diffusion systems beyond ...
The reaction diffusion system is one of the important models to describe the objective world. It is ...
Theoretical framework for linear stability of an anomalous sub-diffusive activator-inhibitor system...
Reaction-diffusion equation with a logistic production term and a delayed inhibition term is studied...
Abstract. We introduce a two-species fractional reaction-diffusion system to model activator-inhibit...
We examine the selection and competition of patterns in the Brusselator model, one of the simplest ...
We present necessary and sufficient conditions on the stability matrix of a general n(S2)-dimensiona...
In an attempt to explain the mechanism of pattern formation in early stages of develop-mental proces...
In this thesis we analyse three different reaction-diffusion models These are: the Gray-Scott model...
We consider a general reaction-diffusion system exhibiting Turing's diffusion-driven instability. In...
Patterns are ubiquitous in nature and can arise in reaction-diffusion systems with differential diff...
The Turing instability paradigm is revisited in the context of a multispecies diffusion scheme deriv...
In this thesis we investigate the formation of patterns in a simple activator-inhibitor model supple...
Abstract. Theoretical framework for linear stability of an anomalous sub-diffusive activator-inhibit...
summary:We consider a reaction-diffusion system of activator-inhibitor type which is subject to Turi...
We analyze the condition for instability and pattern formation in reaction-diffusion systems beyond ...
The reaction diffusion system is one of the important models to describe the objective world. It is ...
Theoretical framework for linear stability of an anomalous sub-diffusive activator-inhibitor system...
Reaction-diffusion equation with a logistic production term and a delayed inhibition term is studied...
Abstract. We introduce a two-species fractional reaction-diffusion system to model activator-inhibit...
We examine the selection and competition of patterns in the Brusselator model, one of the simplest ...
We present necessary and sufficient conditions on the stability matrix of a general n(S2)-dimensiona...
In an attempt to explain the mechanism of pattern formation in early stages of develop-mental proces...
In this thesis we analyse three different reaction-diffusion models These are: the Gray-Scott model...
We consider a general reaction-diffusion system exhibiting Turing's diffusion-driven instability. In...
Patterns are ubiquitous in nature and can arise in reaction-diffusion systems with differential diff...
The Turing instability paradigm is revisited in the context of a multispecies diffusion scheme deriv...
In this thesis we investigate the formation of patterns in a simple activator-inhibitor model supple...