Add to ORKGIn this note we address the question of existence of non-constant stable stationary solution to the heat equation on surfaces of revolution subject to nonlinear boundary flux involving a positive parameter. Our result is independent of the surface geometry and, in addition, we provide the asymptotic profile of the solutions and some examples where the result applies
In this work, we give some results on the existence and multiplicity of solutions concerned a class ...
AbstractFitzHugh–Nagumo equation has been studied extensively in the field of mathematical biology. ...
This paper deals with a free boundary problem for a reaction-diffusion equation with moving boundary...
In this note we address the question of existence of non-constant stable stationary solution to the ...
AbstractWe study existence and nonexistence of patterns on Riemannian manifolds, depending on the Ri...
A reaction-diffusion equation with variable diffusivity and non-linear flux boundary condition is co...
In this article we study the existence of non-constant stable stationary solutions to the the diffu...
We give a sufficient condition for the existence of patterns on surfaces of revolution of ...
In the present article we first study the existence of the stationary solution to an initial boundar...
In this paper we perform an extensive study of the existence, uniqueness (or multiplicity) and stabi...
AbstractWe first study the initial value problem for a general semilinear heat equation. We prove th...
AbstractReaction diffusion equations over surfaces of revolution are considered. It is shown that st...
We study singular patterns in a particular system of parabolic partial differential equations which ...
It is shown that any three-dimensional periodic configuration that is strictly stable for the area f...
The linearized stability of stationary solutions for surface diffusion is studied. We consider hyper...
In this work, we give some results on the existence and multiplicity of solutions concerned a class ...
AbstractFitzHugh–Nagumo equation has been studied extensively in the field of mathematical biology. ...
This paper deals with a free boundary problem for a reaction-diffusion equation with moving boundary...
In this note we address the question of existence of non-constant stable stationary solution to the ...
AbstractWe study existence and nonexistence of patterns on Riemannian manifolds, depending on the Ri...
A reaction-diffusion equation with variable diffusivity and non-linear flux boundary condition is co...
In this article we study the existence of non-constant stable stationary solutions to the the diffu...
We give a sufficient condition for the existence of patterns on surfaces of revolution of ...
In the present article we first study the existence of the stationary solution to an initial boundar...
In this paper we perform an extensive study of the existence, uniqueness (or multiplicity) and stabi...
AbstractWe first study the initial value problem for a general semilinear heat equation. We prove th...
AbstractReaction diffusion equations over surfaces of revolution are considered. It is shown that st...
We study singular patterns in a particular system of parabolic partial differential equations which ...
It is shown that any three-dimensional periodic configuration that is strictly stable for the area f...
The linearized stability of stationary solutions for surface diffusion is studied. We consider hyper...
In this work, we give some results on the existence and multiplicity of solutions concerned a class ...
AbstractFitzHugh–Nagumo equation has been studied extensively in the field of mathematical biology. ...
This paper deals with a free boundary problem for a reaction-diffusion equation with moving boundary...