Global dynamics of a discontinuous Galerkin approximation to a class of reaction-diffusion equations

For any essentially nonlinear system of reaction diffusion equations of the generic form Oci/?t = DiV~c~ + Q~(e, x, t) supplemented with Robin type boundary conditions over the surface of a closed bounded three-dimensional region, it is demonstrated that all solutions for the concentration distribut

In this paper, an n-species strongly coupled cooperating diffusive system is considered in a bounded smooth domain, subject to homogeneous Neumann boundary conditions. Employing the method of energy estimates, we obtain some conditions on the diffusion matrix and inter-specific cooperatives to ensur

A class of nonlinear reaction-diffusion equations is studied. We prove that the semigroup of the solutions for the nonlinear reaction-diffusion equation has a global attractor in L 2 (R N ) under some weaker assumptions than those in other papers we could find.