A regularity theorem for harmonic mappings.

Atsushi Tachikawa

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On Interior regularity and Liouville's theorem for harmonic mappings.

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Harmonic morphisms between riemannian manifolds

Bent Fuglede (1978)

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A harmonic morphism $f : M \to N$ between Riemannian manifolds $M$ and $N$ is by definition a continuous mappings which pulls back harmonic functions. It is assumed that dim $M \geq$ dim $N$ , since otherwise every harmonic morphism is constant. It is shown that a harmonic morphism is the same as a harmonic mapping in the sense of Eells and Sampson with the further property of being semiconformal, that is, a conformal submersion of the points where $d f$ vanishes. Every non-constant harmonic morphism is shown to be...

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Journal für die reine und angewandte Mathematik

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