Sobolev functions without compactly supported approximations

Abstract

A basilar property and a useful tool in the theory of Sobolev spaces is the density of smooth compactly supported functions in the space Wk,p(n) (i.e. the functions with weak derivatives of orders 0 to k in Lp). On Riemannian manifolds, it is well known that the same property remains valid under suitable geometric assumptions. However, on a complete non-compact manifold it can fail to be true in general, as we prove in this paper. This settles an open problem raised for instance by E. Hebey [Nonlinear analysis on manifolds: Sobolev spaces and inequalities, Courant Lecture Notes in Mathematics, vol. 5, 1999, pp. 48-49].