Heisenberg群上双线性Riesz均值的极大估计

Pub Date : 2022-10-26 DOI:10.11650/tjm/230802

Min Wang, Hua Zhu

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引用次数: 0

摘要

在本文中，我们研究了与海森堡群上的次拉普拉斯算子相关的最大双线性Riesz均值$S^｛\alpha｝_｛*｝$。我们证明了当$%\alpha$大于合适的光滑度指数$\alpha（p_{1}，p_{2}）$时，算子$S^{\alpha}_{*}$从$L^{p_{1}}\timesL^{p_{2}$有界到$%L^{p}$（对于$2\leqp_{1｝，p_{2｝\leq\infty$和$1/p=1/p_{1{+1/p{2}$）。为了获得较低的索引$\alpha（p_{1}，p_{2}）$，我们定义了两个重要的辅助算子，并研究了它们的$L^{p}$估计，这在我们的证明中起着关键作用。

本文章由计算机程序翻译，如有差异，请以英文原文为准。

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Maximal Estimates for the Bilinear Riesz Means on Heisenberg Groups

In this article, we investigate the maximal bilinear Riesz means $S^{\alpha }_{*}$ associated to the sublaplacian on the Heisenberg group. We prove that the operator $S^{\alpha }_{*}$ is bounded from $L^{p_{1}}\times L^{p_{2}}$ into $% L^{p}$ for $2\leq p_{1}, p_{2}\leq \infty $ and $1/p=1/p_{1}+1/p_{2}$ when $% \alpha $ is large than a suitable smoothness index $\alpha (p_{1},p_{2})$. For obtaining a lower index $\alpha (p_{1},p_{2})$, we define two important auxiliary operators and investigate their $L^{p}$ estimates,which play a key role in our proof.

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