Harmonic maps of spheres and the Hopf construction

We study the class of maps from the open unit disk into the Riemann sphere or into [& , + ] that can be continuously extended to the maximal ideal space of H . Several characterizations are given for these classes and the subclasses of meromorphic and harmonic functions in terms of cluster sets, sph

We present an elementary argument of the regularity of weak harmonic maps of a surface into the spheres, as well as the partial regularity of stationary harmonic maps of a higher-dimensional domain into the spheres. The argument does not make use of the structure of Hardy spaces.

## Abstract In this paper, we introduce a new energy functional, $\bar \partial $‐energy functional, instead of the total energy functional to investigate the uniqueness of harmonic maps with respect to any given metric on the unit disk. Even in the setting that the Hopf differentials of harmonic m

A growth lemma for certain discrete symmetric Laplacians defined on a lattice Z d δ = δZ d ⊂ R d with spacing δ is proved. The lemma implies a De Giorgi theorem, that the harmonic functions for these Laplacians are equi-Hölder continuous, δ → 0. These results are then applied to establish regularity

We give an example of a 6-valent harmonic mapping of the open unit disc onto a bounded close-to-convex domain which extends continuously to the unit circle as a 2-valent local homeomorphism onto the boundary of the image domain. ᮊ 1998