English

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]u=\mathcal{P}_{\Omega}[\phi] and ϕLp(Ω,R)\phi\in L^{p}(\partial\Omega, \mathbb{R}), where p[1,]p\in[1,\infty], PΩ[ϕ]\mathcal{P}_{\Omega}[\phi] denotes the Poisson integral of ϕ\phi with respect to the hyperbolic Laplacian operator Δh\Delta_{h} in Ω\Omega, and Ω\Omega denotes the unit ball Bn\mathbb{B}^{n} or the half-space Hn\mathbb{H}^{n}. For any xΩx\in \Omega and lSn1l\in \mathbb{S}^{n-1}, let CΩ,q(x)\mathbf{C}_{\Omega,q}(x) and CΩ,q(x;l)\mathbf{C}_{\Omega,q}(x;l) denote the optimal numbers for the gradient estimate u(x)CΩ,q(x)ϕLp(Ω,R) |\nabla u(x)|\leq \mathbf{C}_{\Omega,q}(x)\|\phi\|_{ L^{p}(\partial\Omega, \mathbb{R})} and gradient estimate in the direction ll u(x),lCΩ,q(x;l)ϕLp(Ω,R),|\langle\nabla u(x),l\rangle|\leq \mathbf{C}_{\Omega,q}(x;l)\|\phi\|_{ L^{p}(\partial\Omega, \mathbb{R})}, respectively. Here qq is the conjugate of pp. If q=q=\infty or q[2K01n1+1,2K0n1+1][1,)q\in[\frac{2K_{0}-1}{n-1}+1,\frac{2K_{0}}{n-1}+1]\cap [1,\infty) with K0N={0,1,2,}K_{0}\in\mathbb{N}=\{0,1,2,\ldots\}, then CBn,q(x)=CBn,q(x;±xx)\mathbf{C}_{\mathbb{B}^{n},q}(x)=\mathbf{C}_{\mathbb{B}^{n},q}(x;\pm\frac{x}{|x|}) for any xBn\{0}x\in\mathbb{B}^{n}\backslash\{0\}, and CHn,q(x)=CHn,q(x;±en)\mathbf{C}_{\mathbb{H}^{n},q}(x)=\mathbf{C}_{\mathbb{H}^{n},q}(x;\pm e_{n}) for any xHnx\in \mathbb{H}^{n}, where en=(0,,0,1)Sn1e_{n}=(0,\ldots,0,1)\in\mathbb{S}^{n-1}. However, if q(1,nn1)q\in(1,\frac{n}{n-1}), then CBn,q(x)=CBn,q(x;tx)\mathbf{C}_{\mathbb{B}^{n},q}(x)=\mathbf{C}_{\mathbb{B}^{n},q}(x;t_{x}) for any xBn\{0}x\in\mathbb{B}^{n}\backslash\{0\}, and CHn,q(x)=CHn,q(x;ten)\mathbf{C}_{\mathbb{H}^{n},q}(x)=\mathbf{C}_{\mathbb{H}^{n},q}(x;t_{e_{n}}) for any xHnx\in \mathbb{H}^{n}. Here twt_{w} denotes any unit vector in Rn\mathbb{R}^{n} such that tw,w=0\langle t_{w},w\rangle=0 for wRn{0}w\in \mathbb{R}^{n}\setminus\{0\}. \end{abstract}

Keywords

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

R2 v1 2026-06-23T18:40:33.335Z