A reaction–diffusion system with mixed-type coupling

This paper deals with the blowup rate and profile near the blowup time for the system of diffusion equations ui, -Aui = u~. l (xo, t), (i = 1,..., k, Uk+l := ut) in ~ x (0, T) with boundary conditions ui = 0 on 0fl x [0, T). We show that the solution has a global blowup. The exact rate of the blowup

We consider a reaction-diffusion system which models a fast reversible reaction between two mobile reactants and prove convergence of the solutions as the reaction rate tends to infinity, where the limiting problem is given by a diffusion equation with nonlinear diffusion. Since the rate function ha

We develop 2-grid schemes for solving nonlinear reaction-diffusion systems: where p = (p, q) is an unknown vector-valued function. The schemes use discretizations based on a mixed finite-element method. The 2-grid approach yields iterative procedures for solving the nonlinear discrete equations. Th