Quantitative characterization of traces of Sobolev maps

Abstract

We give a quantitative characterization of traces on the boundary of Sobolev maps in W1,p( M, N), where M and N are compact Riemannian manifolds, ∂ M ≠ : the Borel-measurable maps u ∂ M N that are the trace of a map U∈ W1,p( M, N) are characterized as the maps for which there exists an extension energy density w ∂ M [0,∞] that controls the Sobolev energy of extensions from p - 1 -dimensional subsets of ∂ M to p-dimensional subsets of M.

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