Variational Theory and Domain Decomposition for Nonlocal Problems
Abstract
In this article we present the first results on domain decomposition methods for nonlocal operators. We present a nonlocal variational formulation for these operators and establish the well-posedness of associated boundary value problems, proving a nonlocal Poincar\'{e} inequality. To determine the conditioning of the discretized operator, we prove a spectral equivalence which leads to a mesh size independent upper bound for the condition number of the stiffness matrix. We then introduce a nonlocal two-domain variational formulation utilizing nonlocal transmission conditions, and prove equivalence with the single-domain formulation. A nonlocal Schur complement is introduced. We establish condition number bounds for the nonlocal stiffness and Schur complement matrices. Supporting numerical experiments demonstrating the conditioning of the nonlocal one- and two-domain problems are presented.
Cite
@article{arxiv.0909.4504,
title = {Variational Theory and Domain Decomposition for Nonlocal Problems},
author = {Burak Aksoylu and Michael L. Parks},
journal= {arXiv preprint arXiv:0909.4504},
year = {2015}
}
Comments
Updated the technical part. In press in Applied Mathematics and Computation