Discrete numerical solution of strongly coupled mixed diffusion problems

In this paper, the method proposed in [11 tbr the construction of stable solutions of strongly coupled mixed diffusion problems is extended to more general initial value conditions.

This paper provides a discrete Fourier method for numerical solution of strongly coupled mixed parabolic systems which avoids solving large algebraic systems. After discretization using Crank-Nicholson difference scheme, the exact solution of the discretized problem is constructed and stability is a

In this paper, existence conditions and construction of an exsct series solution for coupled diffusion problems of the type ut -Ausr = G(z,t), u(O,t) = 0, Bzl(1, t) + C&(1, t) = o, u(qO) = f(z), 0 < x 5 1, t > 0 are treated. Here A is a positive stable matrix, matrix C-'B has real eigenvalues, and n

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

This paper deals with the construction of convergent discrete numerical solutions of coupled mixed partial differential systems with coupling boundary conditions. The proposed numerical solution is the exact solution of a discrete partial difference mixed problem obtained using a discrete separation