Mecánica Computacional

In this paper we present new domain decomposition methods for solving linear exterior boundary value problems in elasticity. Our methods use a suitable Dirichlet to Neumann mapping which allows to transform the exterior problem into an equivalent boundary value problem in a bounded domain.
Then, the use of Steklov–Poincar´e operators and iterative solvers allows to obtain domain decomposition algorithms which can be naturally implemented on a parallel computing environment.