On semilinear elliptic boundary value problems in unbounded domains

In this paper we develop a Cli!ord operator calculus over unbounded domains whose complement contains a non-empty open set by using add-on terms to the Cauchy kernel. Using the knowledge about the Poisson equation allows us to prove a direct decomposition of the space L O ( ), which will be applied

## Abstract Recently Babus̆ka‐Oh introduced the method of auxiliary mapping (MAM) which efficiently handles elliptic boundary value problems containing singularities. In this paper, a special weighted residue method, the Weighted Ritz‐Galerkin Method (WRGM), is investigated by introducing special w

The finite element (FE) solutions of a general elliptic equation -div([a ij ] • ∇u) + u = f in an exterior domain , which is the complement of a bounded subset of R 3 , is considered. The most common approach to deal with exterior domain problems is truncating an unbounded subdomain ∞ , so that the

## Abstract The paper is devoted to the study of solutions to linear elliptic boundary value problems in domains depending smoothly on a small perturbation parameter. To this end we transform the boundary value problem onto a fixed reference domain and obtain a problem in a fixed domain but with di