A new obstruction to the extension problem for Sobolev maps between manifolds

Abstract

The main result of the present paper, combined with earlier results of Hardt and Lin settles the extension problem for W1,p( M, N), where M and N are compact riemannian manfolds, M having non-empty smooth boundary and assuming moreover that N is simply connected. The main question which is studied is the following: Given a map in the trace space W1-1p, p (∂ M, N), does it possess an extension in W1,p( M, N)? We show that the answer is negative in the case pc +1≤ p<m= dim \, M, where the number pc is related to the topology of N. We also adress the case N is not simply connected, providing various results and rising some open questions. In particular, we stress in that case the relationship between the extension problem and the lifting problem to the universal covering manifold.