Density of Neumann regular smooth functions in Sobolev spaces of subanalytic manifolds

Abstract

We give characterizations of the bounded subanalytic C∞ submanifolds M of Rn for which the space of Neumann regular functions is dense in Sobolev spaces. By ``Neumann regular function'', we mean a function which is smooth at almost every boundary point and whose gradient is tangent to the boundary. In the case p∈ [1,2], we prove that the Neumann regular elements of C∞(M) are dense in W1,p(M) if and only if M is connected at almost every boundary point. In the case p large, we show that the Neumann regular Lipschitz elements of C∞(M) are dense in W1,p(M) if and only if M is connected at every boundary point. The proof involves the construction of Lipschitz Neumann regular partitions of unity, which is of independent interest.