On low-dimensional approximation of function spaces of interior regularity

Abstract: Many elliptic boundary value problems exhibit an interior regularity property, which can be exploited to construct local approximation spaces that converge exponentially within function spaces satisfying this property. These spaces can be used to define local ansatz spaces within the framework of generalised finite element methods, leading to a better relation between dimensionality and convergence order. In this paper, we present a new technique for the construction of such spaces for Lipschitz domains. Instead of the commonly used approach based on eigenvalue problems it relies on extensions of approximations performed on the boundary. Hence, it improves the influence of the spatial dimension on the exponential convergence and allows to construct the local spaces by solving the original kind of variational problems on easily structured domains.