Higher order weak differentiability and Sobolev spaces between manifolds

Abstract

We define the notion of higher-order colocally weakly differentiable maps from a manifold M to a manifold N. When M and N are endowed with Riemannian metrics, p 1 and k 2, this allows us to define the intrinsic higher-order homogeneous Sobolev space Wk,p(M,N). We show that this new intrinsic definition is not equivalent in general with the definition by an isometric embedding of N in a Euclidean space; if the manifolds M and N are compact, the intrinsic space is a larger space than the one obtained by embedding. We show that a necessary condition for the density of smooth maps in the intrinsic space Wk,p(M,N) is that π k p (N) \0\. We investigate the chain rule for higher-order differentiability in this setting.