Stability of elliptic difference problems

We consider optimal control problems governed by elliptic equations depending on parameters and give sufficient conditions for the continuous dependence of the solutions on the parameters. The techniques are based on variational methods. (~) 2001 Elsevier Science Ltd. All rights reserved.

An algorithm is developed for discretizing boundary-value problems given by a general linear elliptic second-order partial-differential equation with general mixed or Robin boundary conditions in general logically rectangular grids. The continuum problem can be written as an operator equation where

A finite difference method for solving the multipoint elliptic-parabolic partial differential equation with a nonlocal boundary condition is considered. Stable difference schemes accurate to first and second orders for this problem are presented. Stability, almost coercive stability and coercive sta

This paper presents an invariant imbedding approach to the solution of coupled matrix-vector difference equations under two-point boundary conditions. It is shown that the finite difference approach to the solution of elliptic equations results in a special case of the coupled difference equations c