Add to ORKGIn this article, we consider the reaction diffusion equation $$ \frac{\partial u}{\partial t} = \Delta A(u),\quad (x,t)\in \Omega \times (0,T), $$ with the homogeneous boundary condition. Inspired by the Fichera-Oleinik theory, if the equation is not only strongly degenerate in the interior of $\Omega$, but also degenerate on the boundary, we show that the solution of the equation is free from any limitation of the boundary condition
Abstract The degenerate parabolic equations from the reaction–diffusion problems are considered on a...
We show that the reaction-diffusion system ut = ∆ϕ(u) + f (v), vt = ∆ψ(v) + g(u), with homogeneous N...
It is known that diffusion together with Dirichlet boundary conditions can inhibit the occurrence of...
This thesis is aimed to study boundary conditions for heat potentials for degeneratetype diffusion e...
We are concerned with the identification of the diffusion coefficient $u(x)$ in a strongly degenerat...
We consider the initial-boundary value problem for a degenerate reaction diffusion equation consisti...
AbstractThis paper consists of three parts. In Section 2, the Cauchy problem for general reaction-co...
In this paper, we are interested in the study of a degenerate reaction-diffusion model, where we pro...
Consider the problem (P) {-div(A(x, u, del u)) = lambda u^s/|x|^p + f(x) in \Omega, u(x) >= 0 i...
Consider the problem (P) {-div(A(x, u, del u)) = lambda u^s/|x|^p + f(x) in \Omega, u(x) >= 0 i...
Consider the problem (P) {-div(A(x, u, del u)) = lambda u^s/|x|^p + f(x) in \Omega, u(x) >= 0 i...
Consider the problem (P) {-div(A(x, u, del u)) = lambda u^s/|x|^p + f(x) in \Omega, u(x) >= 0 i...
We are concerned with the identification of the diffusion coefficient $u(x)$ in a strongly degenerat...
We consider degenerate reaction diffusion equations of the form u(t) = Delta u(m) + f(x, u), where f...
Abstract. In this Note we study the asymptotic behavior of reaction diffusion equations with nonline...
Abstract The degenerate parabolic equations from the reaction–diffusion problems are considered on a...
We show that the reaction-diffusion system ut = ∆ϕ(u) + f (v), vt = ∆ψ(v) + g(u), with homogeneous N...
It is known that diffusion together with Dirichlet boundary conditions can inhibit the occurrence of...
This thesis is aimed to study boundary conditions for heat potentials for degeneratetype diffusion e...
We are concerned with the identification of the diffusion coefficient $u(x)$ in a strongly degenerat...
We consider the initial-boundary value problem for a degenerate reaction diffusion equation consisti...
AbstractThis paper consists of three parts. In Section 2, the Cauchy problem for general reaction-co...
In this paper, we are interested in the study of a degenerate reaction-diffusion model, where we pro...
Consider the problem (P) {-div(A(x, u, del u)) = lambda u^s/|x|^p + f(x) in \Omega, u(x) >= 0 i...
Consider the problem (P) {-div(A(x, u, del u)) = lambda u^s/|x|^p + f(x) in \Omega, u(x) >= 0 i...
Consider the problem (P) {-div(A(x, u, del u)) = lambda u^s/|x|^p + f(x) in \Omega, u(x) >= 0 i...
Consider the problem (P) {-div(A(x, u, del u)) = lambda u^s/|x|^p + f(x) in \Omega, u(x) >= 0 i...
We are concerned with the identification of the diffusion coefficient $u(x)$ in a strongly degenerat...
We consider degenerate reaction diffusion equations of the form u(t) = Delta u(m) + f(x, u), where f...
Abstract. In this Note we study the asymptotic behavior of reaction diffusion equations with nonline...
Abstract The degenerate parabolic equations from the reaction–diffusion problems are considered on a...
We show that the reaction-diffusion system ut = ∆ϕ(u) + f (v), vt = ∆ψ(v) + g(u), with homogeneous N...
It is known that diffusion together with Dirichlet boundary conditions can inhibit the occurrence of...