Schwarz lemma for hyperbolic harmonic mappings in the unit ball

Abstract

Assume that p∈[1,∞] and u=Ph[φ], where φ∈ Lp(Sn-1,Rn) and u(0) = 0. Then we obtain the sharp inequality |u(x)| Gp(|x|)\|φ\|Lp for some smooth function Gp vanishing at 0. Moreover, we obtain an explicit form of the sharp constant Cp in the inequality \|Du(0)\| Cp\|φ\|Lp. These two results generalize and extend some known result from harmonic mapping theory ([Theorem 2.1]kalaj2018) and hyperbolic harmonic theory ([Theorem 1]bur).