A method of solving evolutionary problems based on the Laguerre step-by-step transform

This note deals with the numerical solution of the matrix differential system where Y0 is a real constant symmetric matrix, B maps symmetric into skew-symmetric matrices, and [B(t, Y), Y] is the Lie bracket commutator of B(t, Y) and Y, i.e. [B(t, Y), Y] = B(t, Y)Y -YB(t, Y). The unique solution of

From ( 19) and ( 22) we have F(x,O)=A1(x)-tN(x), -L<x<L, ( Let us now study the behaviour of the functions f(z) and F(.) at the ends (-L, 0), (L, 0). From ( 15) and ( 16), using the expressions for the behaviour of a Cauchy integral close to the ends of the line of integration in class H' of functi

In this paper we consider numerical schemes for multidimensional evolutionary convection-diffusion problems, where the approximation properties are uniform in the diffusion parameter. In order to obtain an efficient method, to provide good approximations with independence of the size of the diffusio