Add to ORKGWe show that there are no stable stationary nonconstant solutions of the evolution problem (1) for fully autonomous reaction-diffusion-equations on the edges of a finite metric graph G under continuity and Kirchhoff flow transition conditions at the verticesPeer Reviewe
AbstractWe study an one-dimensional nonlinear reaction–diffusion system coupled on the boundary. Suc...
We analyse the dynamics of the non-autonomous nonlinear reaction-diffusion equation u(t) - Delta u =...
This thesis focuses on well-posedness and stability estimates (i.e. continuous dependence with respe...
We show that there are no stable stationary nonconstant solutions of the evolution problem (1) for f...
The nonexistence of stable stationary nonconstant solutions of reaction-diffusion-equations partial ...
A new notion of solutions is introduced to study degenerate nonlinear parabolic equations in one sp...
Global existence, uniqueness and continuous dependence on initial data are estab-lished for a quasil...
We study an one-dimensional nonlinear reaction-diffusion system coupled on the boundary. Such system...
AbstractWe give a condition which implies that the trivial solution, U ≡ 0, of a class of reaction-d...
We consider the geometric evolution problem of entire graphs moving by fractional mean curvature. Fo...
We consider ordinary differential equations (ODEs) that describe the time evolution of the concentra...
A reaction-diffusion equation with variable diffusivity and nonlinear flux boundary condition is co...
The volume preserving fourth order surface diffusion flow has constant mean curvature hypersurfaces ...
We deal with the bistable reaction-diffusion equation in an infinite star graph, which consists of s...
A reaction-diffusion equation with variable diffusivity and non-linear flux boundary condition is co...
AbstractWe study an one-dimensional nonlinear reaction–diffusion system coupled on the boundary. Suc...
We analyse the dynamics of the non-autonomous nonlinear reaction-diffusion equation u(t) - Delta u =...
This thesis focuses on well-posedness and stability estimates (i.e. continuous dependence with respe...
We show that there are no stable stationary nonconstant solutions of the evolution problem (1) for f...
The nonexistence of stable stationary nonconstant solutions of reaction-diffusion-equations partial ...
A new notion of solutions is introduced to study degenerate nonlinear parabolic equations in one sp...
Global existence, uniqueness and continuous dependence on initial data are estab-lished for a quasil...
We study an one-dimensional nonlinear reaction-diffusion system coupled on the boundary. Such system...
AbstractWe give a condition which implies that the trivial solution, U ≡ 0, of a class of reaction-d...
We consider the geometric evolution problem of entire graphs moving by fractional mean curvature. Fo...
We consider ordinary differential equations (ODEs) that describe the time evolution of the concentra...
A reaction-diffusion equation with variable diffusivity and nonlinear flux boundary condition is co...
The volume preserving fourth order surface diffusion flow has constant mean curvature hypersurfaces ...
We deal with the bistable reaction-diffusion equation in an infinite star graph, which consists of s...
A reaction-diffusion equation with variable diffusivity and non-linear flux boundary condition is co...
AbstractWe study an one-dimensional nonlinear reaction–diffusion system coupled on the boundary. Suc...
We analyse the dynamics of the non-autonomous nonlinear reaction-diffusion equation u(t) - Delta u =...
This thesis focuses on well-posedness and stability estimates (i.e. continuous dependence with respe...