What is the long-time effect of adding convention to a discretised reaction-diffusion equation? For linear problems, it is well known that convection may denormalise the process, and, in particular, eigenvalue-based stability predictions may be overoptimistic. This work deals with a related issue - with a nonlinear reaction term, the nonnormality can greatly influence the long-time dynamics. For a nonlinear model problem with Dirichlet boundary conditions, it is shown that the basin of attraction of the 'correct' steady state can be shrunk in a directionally biased manner. A normwise analysis provides lower bounds on the basin of attraction and a more revealing picture is provided by pseudo-eigenvalues. In extreme cases, the computed soluti...
Direct numerical simulations of the transition process from periodic to chaotic dynamics are present...
We study a reaction-diffusion-convection problem with non-linear drift posed in a domain with period...
It is known that diffusion together with Dirichlet boundary conditions can inhibit the occurrence of...
What is the long-time effect of adding convention to a discretised reaction-diffusion equation? For ...
We analyse discrete approximations of reaction-diffusion-convection equations and show that lineariz...
We consider a diffusion model with limit cycle reaction functions. In an unbounded domain, diffusion...
This thesis explores the interaction of non-normality and nonlinearity incontinuous dynamical system...
The chemical transformation of a rock by a pervading convecting fluid in disequilibrium with it is m...
[[abstract]]This paper is concerned with linear determinacy in monostable reaction- diffusion-convec...
AbstractSolutions of nonlinear (possibly degenerate) reaction-diffusion models are known to exist fo...
We consider a time-dependent and a steady linear convection-diffusion-reaction equation whose coeffi...
The long-time behaviour of a discretised evolution equation is studied. The equation, which involves...
Abstract. In this Note we study the asymptotic behavior of reaction diffusion equations with nonline...
Patterns are ubiquitous in nature and can arise in reaction-diffusion systems with differential diff...
We analyze the condition for instability and pattern formation in reaction-diffusion systems beyond ...
Direct numerical simulations of the transition process from periodic to chaotic dynamics are present...
We study a reaction-diffusion-convection problem with non-linear drift posed in a domain with period...
It is known that diffusion together with Dirichlet boundary conditions can inhibit the occurrence of...
What is the long-time effect of adding convention to a discretised reaction-diffusion equation? For ...
We analyse discrete approximations of reaction-diffusion-convection equations and show that lineariz...
We consider a diffusion model with limit cycle reaction functions. In an unbounded domain, diffusion...
This thesis explores the interaction of non-normality and nonlinearity incontinuous dynamical system...
The chemical transformation of a rock by a pervading convecting fluid in disequilibrium with it is m...
[[abstract]]This paper is concerned with linear determinacy in monostable reaction- diffusion-convec...
AbstractSolutions of nonlinear (possibly degenerate) reaction-diffusion models are known to exist fo...
We consider a time-dependent and a steady linear convection-diffusion-reaction equation whose coeffi...
The long-time behaviour of a discretised evolution equation is studied. The equation, which involves...
Abstract. In this Note we study the asymptotic behavior of reaction diffusion equations with nonline...
Patterns are ubiquitous in nature and can arise in reaction-diffusion systems with differential diff...
We analyze the condition for instability and pattern formation in reaction-diffusion systems beyond ...
Direct numerical simulations of the transition process from periodic to chaotic dynamics are present...
We study a reaction-diffusion-convection problem with non-linear drift posed in a domain with period...
It is known that diffusion together with Dirichlet boundary conditions can inhibit the occurrence of...