L2-Discretization Error Bounds for Maps into Riemannian Manifolds

Abstract

We study the approximation of functions that map a Euclidean domain Ω⊂ Rd into an n-dimensional Riemannian manifold (M,g) minimizing an elliptic, semilinear energy in a function set H⊂ W1,2(Ω,M). The approximation is given by a restriction of the energy minimization problem to a family of conforming finite-dimensional approximations Sh⊂ H. We provide a set of conditions on Sh such that we can prove a priori W1,2- and L2-approximation error estimates comparable to standard Euclidean finite elements. This is done in an intrinsic framework, independently of embeddings of the manifold or the choice of coordinates. A special construction of approximations ---geodesic finite elements--- is shown to fulfill the conditions, and in the process extended to maps into the tangential bundle.