Controlled singular extension of critical trace Sobolev maps from spheres to compact manifolds

Abstract

Given n ∈ N*, a compact Riemannian manifold M and a Sobolev map u ∈ Wn/(n + 1), n + 1 (Sn; M), we construct a map U in the Sobolev-Marcinkiewicz (or Lorentz-Sobolev) space W1, (n + 1, ∞) (Bn + 1; M) such that u = U in the sense of traces on Sn = ∂ Bn + 1 and whose derivative is controlled: for every λ > 0, λn + 1 \ x ∈ Bn + 1 : D U (x) > λ\ γ (∫Sn∫Sn u (y) - u (z)n + 1 y - z2 n \,d y \,d z )\ , where the function γ : [0, ∞) [0, ∞) only depends on the dimension n and on the manifold M. The construction of the map U relies on a smoothing process by hyperharmonic extension and radial extensions on a suitable covering by balls.