Existence of nontrival n-harmonic maps via min-max methods
Abstract
For any n ≥ 3 and any closed manifold N with πn+k(N) ≠ \0\ for some k ≥ 0, we establish the existence of nontrivial n-harmonic maps from Sn into N. When k≥ 1, these maps naturally appear as bubbling limits of p-harmonic maps with p > n, obtained by min-max constructions in the limit p n+.
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