Singular extension of critical Sobolev mappings under an exponential weak-type estimate
Abstract
Given m ∈ N \0\ and a compact Riemannian manifold N, we construct for every map u in the critical Sobolev space Wm/(m + 1), m + 1 (Sm, N), a map U : Bm + 1 N whose trace is u and which satisfies an exponential weak-type Sobolev estimate. The result and its proof carry on to the extension to a half-space of maps on its boundary hyperplane and to the extension to the hyperbolic space of maps on its boundary sphere at infinity.
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