Analytic-numerical solutions of diffusion mathematical models with delays

In this paper two implicit numerical difference schemes for mixed problems for a delay diffusion model are proposed. Consistence, convergence and some properties of stability for these schemes are studied. Illustrative examples of numerical results are also included.

In this paper, we consider coupled semi-infinite diffusion problems of the form ut(x, t)-A2uxx (x,t) = 0, x > 0, t > 0, subject to u(0, t) = B and u(x,O) = O, where A is a matrix in C r×r, and u(x, t), and B axe vectors in C r. Using the Fourier sine transform, an explicit exact solution of the prob

In this article we use the monotone method for the computation of numerical solutions of a nonlinear reactiondiffusion-convection problem with time delay. Three monotone iteration processes for a suitably formulated finite-difference system of the problem are presented. It is shown that the sequence