Nonlocal $H$-convergence
Abstract
We introduce the concept of nonlocal -convergence. For this we employ the theory of abstract closed complexes of operators in Hilbert spaces. We show uniqueness of the nonlocal -limit as well as a corresponding compactness result. Moreover, we provide a characterisation of the introduced concept, which implies that local and nonlocal -convergence coincide for multiplication operators. We provide applications to both nonlocal and nonperiodic fully time-dependent 3D Maxwell's equations on rough domains. The material law for Maxwell's equations may also rapidly oscillate between eddy current type approximations and their hyperbolic non-approximated counter parts. Applications to models in nonlocal response theory used in quantum theory and the description of meta-materials, to fourth order elliptic problems as well as to homogenisation problems on Riemannian manifolds are provided.
Cite
@article{arxiv.1804.02026,
title = {Nonlocal $H$-convergence},
author = {Marcus Waurick},
journal= {arXiv preprint arXiv:1804.02026},
year = {2018}
}
Comments
typos removed; accepted for publication in Calculus of Variations and Partial Differential Equations