On the local character of the extension of traces for Sobolev mappings

Abstract

We prove that a mapping u M' N, where M' and N are compact Riemannian manifolds, is the trace of a Sobolev mapping U M' × [0, 1) N if and only if it is on some open covering of M'. In the global case where M is a compact Riemannian manifold with boundary, this implies that the analytical obstructions to the extension of a mapping u ∂ M N to some Sobolev mapping U M N are purely local.

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