Minimal Ws,ns-harmonic maps in homotopy classes

Abstract

Let a closed n-dimensional manifold, N ⊂ RM be a closed manifold, and u ∈ Ws, ns(,N) for s∈(0,1). We extend the monumental work of Sacks and Uhlenbeck by proving that if πn(N)=\0\ then there exists a minimizing Ws, ns-harmonic map homotopic to u. If πn(N)≠ \0\, then we prove that there exists a Ws,ns-harmonic map from Sn to N in a generating set of πn(N). Since several techniques, especially Pohozaev-type arguments, are unknown in the fractional framework (in particular when ns ≠ 2 one cannot argue via an extension method), we develop crucial new tools that are interesting on their own: such as a removability result for point-singularities and a balanced energy estimate for non-scaling invariant energies. Moreover, we prove the regularity theory for minimizing Ws,ns-maps into manifolds.