Optimal estimates for hyperbolic harmonic mappings in Hardy space

Abstract

Assume that p∈(1,∞] and u=Ph[φ], where φ∈ Lp(Sn-1,Rn). Then for any x∈ Bn, we obtain the sharp inequalities |u(x)|≤ Cq1q(x)(1-|x|2)n-1 p \|φ\|Lp |u(x)|≤ Cq1q (1-|x|2)n-1 p \|φ\|Lp for some function Cq(x) and constant Cq in terms of Gauss hypergeometric and Gamma functions, where q is the conjugate of p. This result generalize and extend some known result from harmonic mapping theory ([5, Theorems 1.1 and 1.2] and [1, Proposition 6.16]).