Khavinson problem for hyperbolic harmonic mappings in Hardy space
Analysis of PDEs
2023-05-24 v1 Classical Analysis and ODEs
Abstract
\begin{abstract} In this paper, we partly solve the generalized Khavinson conjecture in the setting of hyperbolic harmonic mappings in Hardy space. Assume that u=PΩ[ϕ] and ϕ∈Lp(∂Ω,R), where p∈[1,∞], PΩ[ϕ] denotes the Poisson integral of ϕ with respect to the hyperbolic Laplacian operator Δh in Ω, and Ω denotes the unit ball Bn or the half-space Hn. For any x∈Ω and l∈Sn−1, let CΩ,q(x) and CΩ,q(x;l) denote the optimal numbers for the gradient estimate ∣∇u(x)∣≤CΩ,q(x)∥ϕ∥Lp(∂Ω,R) and gradient estimate in the direction l ∣⟨∇u(x),l⟩∣≤CΩ,q(x;l)∥ϕ∥Lp(∂Ω,R), respectively. Here q is the conjugate of p. If q=∞ or q∈[n−12K0−1+1,n−12K0+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,n−1n), 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}. \end{abstract}
Cite
@article{arxiv.2009.09548,
title = {Khavinson problem for hyperbolic harmonic mappings in Hardy space},
author = {Jiaolong Chen and David Kalaj and Petar Melentijević},
journal= {arXiv preprint arXiv:2009.09548},
year = {2023}
}
Comments
30 pages