Khavinson problem for hyperbolic harmonic mappings in Hardy space

Abstract

abstract In this paper, we partly solve the generalized Khavinson conjecture in the setting of hyperbolic harmonic mappings in Hardy space. Assume that u=P[φ] and φ∈ Lp(∂, R), where p∈[1,∞], P[φ] denotes the Poisson integral of φ with respect to the hyperbolic Laplacian operator h in , and denotes the unit ball Bn or the half-space Hn. For any x∈ and l∈ Sn-1, let C,q(x) and C,q(x;l) denote the optimal numbers for the gradient estimate |∇ u(x)|≤ C,q(x)\|φ\| Lp(∂, R) and gradient estimate in the direction l |∇ u(x),l|≤ C,q(x;l)\|φ\| Lp(∂, R), respectively. Here q is the conjugate of p. If q=∞ or q∈[2K0-1n-1+1,2K0n-1+1] [1,∞) with K0∈N=\0,1,2,…\, then CBn,q(x)=CBn,q(x;x|x|) for any x∈Bn\0\, and CHn,q(x)=CHn,q(x; en) for any x∈ Hn, where en=(0,…,0,1)∈Sn-1. However, if q∈(1,nn-1), then CBn,q(x)=CBn,q(x;tx) for any x∈Bn\0\, and CHn,q(x)=CHn,q(x;ten) for any x∈ Hn. Here tw denotes any unit vector in Rn such that tw,w=0 for w∈ Rn\0\. abstract