Optimal estimates for hyperbolic harmonic mappings in Hardy space

Abstract: Assume that $p\in(1,\infty]$ and $u=P_{h}[\phi]$, where $\phi\in L^{p}(\mathbb{S}^{n-1},\mathbb{R}^{n})$. Then for any $x\in \mathbb{B}^{n}$, we obtain the sharp inequalities $$ |u(x)|\leq \frac{\mathbf{C}{q}^{\frac{1}{q}}(x)}{(1-|x|^2)^{\frac{n-1 }{p}}} |\phi|{L^{p}} \quad\text{and}\quad |u(x)|\leq \frac{\mathbf{C}{q}^{\frac{1}{q}} }{(1-|x|^2)^{\frac{n-1 }{p}}} |\phi|{L^{p} } $$ for some function $\mathbf{C}{q}(x)$ and constant $\mathbf{C}{q}$ 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]).