Weak approximation by bounded Sobolev maps with values into complete manifolds

Abstract

We have recently introduced the trimming property for a complete Riemannian manifold Nn as a necessary and sufficient condition for bounded maps to be strongly dense in W1, p(Bm; Nn) when p ∈ \1, …c, m\. We prove in this note that even under a weaker notion of approximation, namely the weak sequential convergence, the trimming property remains necessary for the approximation in terms of bounded maps. The argument involves the construction of a Sobolev map having infinitely many analytical singularities going to infinity.