Schwarz-Pick lemma for harmonic maps which are conformal at a point

Abstract

We obtain a sharp estimate on the norm of the differential of a harmonic map from the unit disc D in C into the unit ball Bn in Rn, n 2, at any point where the map is conformal. In dimension n=2, this generalizes the classical Schwarz-Pick lemma, and for n 3 it gives the optimal Schwarz-Pick lemma for conformal minimal discs D Bn. This implies that conformal harmonic immersions M Bn from any hyperbolic conformal surface are distance-decreasing in the Poincar\'e metric on M and the Cayley-Klein metric on the ball Bn, and the extremal maps are precisely the conformal embeddings of the disc D onto affine discs in Bn. By using these results, we lay the foundations of the hyperbolicity theory for domains in Rn based on minimal surfaces.