Add to ORKGThis thesis deals with a detailed linear analysis for a two-component reaction-diffusion system with constant diffusion coefficients. A comprehensive linear stability analysis results in three types of instabilities: (1) stationary periodic instability, (2) oscillatory uniform and (3) stationary uniform. The first instability involves pattern formation and the other two do not. Precise parameter regimes are identified for each. Travelling wave analysis is performed for the system and a detailed and comprehensive analysis is undertaken of a linear mechanism governing the development and propagation of nonlinear patterns. This analysis focuses on a linear selection mechanism that gives some insights into the selected speed of invasion of ...
Patterns are ubiquitous in nature and can arise in reaction-diffusion systems with differential diff...
We identify sufficient conditions for the stability of some well-known finite difference schemes for...
In this thesis, we study two types of reaction-diffusion systems which have direct applications in u...
“Pattern formation and selection is an important topic in many physical, chemical, and biological fi...
Sufficient conditions for wave instability in general three-component reaction–diffusion systems are...
This thesis deals with a two component reaction-diffusion system (RDS) for competing and cooperating...
This research focuses on the reaction diffusion systems where the matrix of diffusion co- efficient...
We analyze the condition for instability and pattern formation in reaction-diffusion systems beyond ...
13 pagesInternational audienceThe propagation of unstable interfaces is at the origin of remarkable ...
This work explores the influence of domain-size on the evolution of pattern formation modelled by an...
In this thesis, we study a two-component reaction diffusion system in one and two spatial dimensions...
Abstract. Theoretical framework for linear stability of an anomalous sub-diffusive activator-inhibit...
The present thesis deals with the nonlinear stability analysis of some reaction-diffusion models of ...
Theoretical framework for linear stability of an anomalous sub-diffusive activator-inhibitor system...
In this thesis, the existence and stability of pulse solutions in two-component, singularly perturbe...
Patterns are ubiquitous in nature and can arise in reaction-diffusion systems with differential diff...
We identify sufficient conditions for the stability of some well-known finite difference schemes for...
In this thesis, we study two types of reaction-diffusion systems which have direct applications in u...
“Pattern formation and selection is an important topic in many physical, chemical, and biological fi...
Sufficient conditions for wave instability in general three-component reaction–diffusion systems are...
This thesis deals with a two component reaction-diffusion system (RDS) for competing and cooperating...
This research focuses on the reaction diffusion systems where the matrix of diffusion co- efficient...
We analyze the condition for instability and pattern formation in reaction-diffusion systems beyond ...
13 pagesInternational audienceThe propagation of unstable interfaces is at the origin of remarkable ...
This work explores the influence of domain-size on the evolution of pattern formation modelled by an...
In this thesis, we study a two-component reaction diffusion system in one and two spatial dimensions...
Abstract. Theoretical framework for linear stability of an anomalous sub-diffusive activator-inhibit...
The present thesis deals with the nonlinear stability analysis of some reaction-diffusion models of ...
Theoretical framework for linear stability of an anomalous sub-diffusive activator-inhibitor system...
In this thesis, the existence and stability of pulse solutions in two-component, singularly perturbe...
Patterns are ubiquitous in nature and can arise in reaction-diffusion systems with differential diff...
We identify sufficient conditions for the stability of some well-known finite difference schemes for...
In this thesis, we study two types of reaction-diffusion systems which have direct applications in u...