On the solution op prandtl equations by the method of finite differences

We introduce a new method for the solution of linear differential equations with constant coefficients. The solutions are obtained by the application of a divided differences functional to a kernel function in two variables. For homogeneous equations the kernel is the product of a polynomial, which

A functional has been developed for the finite element solution of diffusion-convection problems. This functional is suitable for the application of the variational principle on discretization schemes in the spacetime domain. This algorithm has shown to be computationally efficient over the conventi

It is shown how the various norms of the coefficient matrix of a set of finite difference equations can, in many cases, be employed in an easy, straightforward fashion to find sufficient conditions for stability in situations involving non-periodic boundary conditions and variable coefficients. With

In this article, we combine finite difference approximations (for spatial derivatives) and collocation techniques (for the time component) to numerically solve the two-dimensional heat equation. We employ, respectively, second-order and fourth-order schemes for the spatial derivatives, and the discr