Schwarz lemma for real harmonic functions onto surfaces with non-negative Gaussian curvature
Abstract
Assume that f is a real -harmonic function of the unit disk D onto the interval (-1,1), where (u,v)=R(u) is a metric defined in the infinite strip (-1,1)× R. Then we prove that |∇ f(z)|(1-|z|2) 4π(1-f(z)2) for all z∈D, provided that has a non-negative Gaussian curvature. This extends several results in the field and answers to a conjecture proposed by the first author in 2014. Such an inequality is not true for negatively curved metrics.
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