Weak Type (1,1) Bounds for Some Operators Related to the Laplacian with Drift on Real Hyperbolic Spaces

Li Hong-Quan; Sjogren Peter

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Weak Type (1,1) Bounds for Some Operators Related to the Laplacian with Drift on Real Hyperbolic Spaces

机译：一些与Laplacian有关的弱型（1,1）界限与真正的双曲线空间漂移

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The setting of this work is the n-dimensional hyperbolic space , where the Laplacian is given a drift in the direction. We consider the operators defined by the horizontal Littlewood-Paley-Stein functions for the heat semigroup and the Poisson semigroup, and also the Riesz transforms of order 1 and 2. These operators are known to be bounded on , for the relevant measure. We show that most of the Littlewood-Paley-Stein operators and all the Riesz transforms are also of weak type (1,1). But in some exceptional cases, we disprove the weak type (1,1).

机译：这项工作的背景是n维双曲空间，拉普拉斯函数在这个方向上有一个漂移。我们考虑了热半群和泊松半群的水平Littlewood Paley Stein函数定义的算子，以及1阶和2阶的RiESz变换。已知这些算子对于相关测度是有界的。我们证明了大多数Littlewood-Paley-Stein算子和所有Riesz变换也是弱类型（1,1）。但在一些例外情况下，我们反驳了弱类型（1,1）。

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来源
《Potential analysis: An international journal devoted to the interactions between potential theory, probability theory, geometry and functional analysis》 |2017年第3期|共22页
作者
Li Hong-Quan; Sjogren Peter;
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作者单位

Fudan Univ Sch Math Sci 220 Handan Rd Shanghai 200433 Peoples R China;

Univ Gothenburg Math Sci SE-41296 Gothenburg Sweden;

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原文格式 PDF
正文语种 eng
中图分类数学;
关键词
Littlewood-Paley-Stein function; Riesz transform; Laplacian with drift; Real hyperbolic space;

机译：Littlewood-Paley-Stein功能;Riesz变换;拉普拉斯漂移;真正的双曲线空间;

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1. WEAK TYPE(1,1)BOUNDS FOR A MARCINKIEWICZ INTEGRAL [J] . 分析论及其应用：英文版 . 1994,第002期
2. Weak type (1,1) of some operators for the Laplacian with drift [J] . Li Hong-Quan, Sjogren Peter, Wu Yurong Mathematische Zeitschrift . 2016,第3a4期

机译：带漂移的拉普拉斯算子的弱算子（1,1）
3. Estimates for the first eigenvalue of the drifting Laplace and the p-Laplace operators on submanifolds with bounded mean curvature in the hyperbolic space [J] . Feng Du, Jing Mao Journal of Mathematical Analysis and Applications . 2017,第2期

机译：估计漂移拉普拉斯的第一个特征值和P-LAPLACE操作者在双曲线空间中有界均线曲率的子类别
4. Weak type (1,1) bounds for a class of periodic pseudo-differential operators [J] . Duvan Cardona Journal of pseudo-differential operators and applications . 2014,第4期

机译：一类周期伪微分算子的弱类型（1,1）边界
5. Weyl type theorems for bounded linear operators on Banach spaces [C] . Pietro Aiena International Course of Mathematical Analysis in Andalucia . 2012

机译：Banach空间上有界线性运营商的Weyl型定理
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机译：具有广义拉普拉斯算子和稀疏势的Anderson型随机Schrödinger算子
7. Efficient embedding of complex networks to hyperbolic space via their Laplacian [O] . Gregorio Alanis-Lobato, Pablo Mier, Miguel A. Andrade-Navarro -1

机译：通过拉普拉斯算子将复杂网络有效地嵌入到双曲空间
8. Weak Type (1,1) Bounds for Some Operators Related to the Laplacian with Drift on Real Hyperbolic Spaces [O] . 2017

机译：实双曲空间上与拉普拉斯算子相关的某些算子的弱类型（1,1）界
9. Weak Schwarzians, Bounded Hyperbolic Distortion, and Smooth Quasisymmetric Functions [R] . Chuaqui, M., Osgood, B. 1993

机译：弱schwarzians，有界双曲线失真和平滑拟对称函数

Weak Type (1,1) Bounds for Some Operators Related to the Laplacian with Drift on Real Hyperbolic Spaces

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