Trace theory for Sobolev mappings into a manifold

Abstract

We review the current state of the art concerning the characterization of traces of the spaces W1, p (Bm-1× (0,1), N) of Sobolev mappings with values into a compact manifold N. In particular, we exhibit a new analytical obstruction to the extension, which occurs when p < m is an integer and the homotopy group πp (N) is non trivial. On the positive side, we prove the surjectivity of the trace operator when the fundamental group π1 (N) is finite and π2 (N) …b π p - 1 (N) \0\. We present several open problems connected to the extension problem.