单位球中双曲调和映射的Schwarz引理

Pub Date : 2020-04-13 DOI:10.7146/math.scand.a-128528

Jiaolong Chen, D. Kalaj

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引用次数: 2

摘要

假设$p\in[1，\infty]$和$u=p_｛h｝[\phi]$，其中$\phi\inL^｛p｝（\mathbb｛S｝^｛n-1｝，\mathbb{R｝^n）$和$u（0）=0$。然后我们得到了某光滑函数$G_p$在$0$处消失的尖锐不等式$\lvert u（x）\rvert \le G_p（\lvert x\rvert）\lvert\phi\rvert_{L^{p}}$。此外，我们在不等式$\lVert-Du（0）\rVert\le C_p\lVert\phi\rVert\le C_p\lVert\phi\r Vert_{L^｛p｝}$中得到了尖锐常数$C_p$的显式形式。这两个结果推广和推广了调和映射理论（D.Kalaj，Complex Anal.Oper.theory 12（2018），545–554，定理2.1）和双曲调和理论（B.Burgeth，Manuscripta Math.77（1992），283–291，定理1）的一些已知结果。

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A Schwarz lemma for hyperbolic harmonic mappings in the unit ball

Assume that $p\in [1,\infty ]$ and $u=P_{h}[\phi ]$, where $\phi \in L^{p}(\mathbb{S}^{n-1},\mathbb{R}^n)$ and $u(0) = 0$. Then we obtain the sharp inequality $\lvert u(x) \rvert \le G_p(\lvert x \rvert )\lVert \phi \rVert_{L^{p}}$ for some smooth function $G_p$ vanishing at $0$. Moreover, we obtain an explicit form of the sharp constant $C_p$ in the inequality $\lVert Du(0)\rVert \le C_p\lVert \phi \rVert \le C_p\lVert \phi \rVert_{L^{p}}$. These two results generalize and extend some known results from the harmonic mapping theory (D. Kalaj, Complex Anal. Oper. Theory 12 (2018), 545–554, Theorem 2.1) and the hyperbolic harmonic theory (B. Burgeth, Manuscripta Math. 77 (1992), 283–291, Theorem 1).

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