We derive drift-diffusion systems describing transport processes starting from free energy and equilibrium solutions by a unique method. We include several statistics, heterostructures and cross diffusion. The resulting systems of nonlinear partial differential equations conserve mass and positivity, and have a Lyapunov function (free energy). Using the inverse Hessian as mobility, non-degenerate diffusivity matrices turn out to be diagonal, or – in the case of cross diffusion – even constant
Predicting the properties of nonequilibrium systems from molecular simulations is a growing area of ...
Abstract. We consider dissipative systems on the real axis in situations when the evolution is domin...
summary:This paper deals with nonlinear diffusion problems involving degenerate parabolic problems, ...
We derive drift-diffusion systems describing transport processes starting from free energy and equil...
35 pagesWe study a nonlinear, degenerate cross-diffusion model which involves two densities with two...
Diffusion processes superimposed upon deterministic motion play a key role in understanding and cont...
In this article we study reaction-diffusion systems containing self and cross-diffusion using a free...
We derive gradient-flow formulations for systems describing drift-diffusion processes of a finite nu...
This book is an introduction to the dynamics of reaction-diffusion systems, with a focus on fronts a...
The theory of double diffusion describes a number of physical situations which are not adequately ex...
In recent years the theory of the Wasserstein metric has opened up new treatments of diffusion equat...
This thesis focuses on well-posedness and stability estimates (i.e. continuous dependence with respe...
A reaction-diffusion model is presented in which spatial structure is maintained by means of a diffu...
The authors investigate the dynamics of dissipative structures in a reaction-diffusion system. They ...
In this paper we deal with equations modelling the transport of electrically charged species in hete...
Predicting the properties of nonequilibrium systems from molecular simulations is a growing area of ...
Abstract. We consider dissipative systems on the real axis in situations when the evolution is domin...
summary:This paper deals with nonlinear diffusion problems involving degenerate parabolic problems, ...
We derive drift-diffusion systems describing transport processes starting from free energy and equil...
35 pagesWe study a nonlinear, degenerate cross-diffusion model which involves two densities with two...
Diffusion processes superimposed upon deterministic motion play a key role in understanding and cont...
In this article we study reaction-diffusion systems containing self and cross-diffusion using a free...
We derive gradient-flow formulations for systems describing drift-diffusion processes of a finite nu...
This book is an introduction to the dynamics of reaction-diffusion systems, with a focus on fronts a...
The theory of double diffusion describes a number of physical situations which are not adequately ex...
In recent years the theory of the Wasserstein metric has opened up new treatments of diffusion equat...
This thesis focuses on well-posedness and stability estimates (i.e. continuous dependence with respe...
A reaction-diffusion model is presented in which spatial structure is maintained by means of a diffu...
The authors investigate the dynamics of dissipative structures in a reaction-diffusion system. They ...
In this paper we deal with equations modelling the transport of electrically charged species in hete...
Predicting the properties of nonequilibrium systems from molecular simulations is a growing area of ...
Abstract. We consider dissipative systems on the real axis in situations when the evolution is domin...
summary:This paper deals with nonlinear diffusion problems involving degenerate parabolic problems, ...