Analytical obstructions to the weak approximation of Sobolev mappings into manifolds
Abstract
For any integer p ≥ 2 , we construct a compact Riemannian manifold N such that if M > p , there is a map in the Sobolev space of mappings W1,p (M, N) which is not a weak limit of smooth maps into N due to a mechanism of analytical obstruction. For p = 4n - 1 , the target manifold can be taken to be the sphere S2n thanks to the construction by Whitehead product of maps with nontrivial Hopf invariant, generalizing the result by Bethuel for p = 4n -1 = 3. The results extend to higher order Sobolev spaces Ws,p , with s ∈ R , s ≥ 1 , sp ∈ N, and sp 2 .
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