Centered Hardy-Littlewood maximal function on product manifolds

IF 3.2 1区 数学 Q1 MATHEMATICS Advances in Nonlinear Analysis Pub Date : 2022-01-01 DOI:10.1515/anona-2021-0233
Shiliang Zhao
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Abstract

Abstract Let X be the direct product of Xi where Xi is smooth manifold for 1 ≤ i ≤ k. As is known, if every Xi satisfies the doubling volume condition, then the centered Hardy-Littlewood maximal function M on X is weak (1,1) bounded. In this paper, we consider the product manifold X where at least one Xi does not satisfy the doubling volume condition. To be precise, we first investigate the mapping properties of M when X1 has exponential volume growth and X2 satisfies the doubling condition. Next, we consider the product space of two weighted hyperbolic spaces X1 = (ℍn+1, d, yα−n−1dydx) and X2 = (ℍn+1, d, yβ−n−1dydx) which both have exponential volume growth. The mapping properties of M are discussed for every α,β≠n2 \alpha,\beta \ne {n \over 2} . Furthermore, let X = X1 × X2 × … Xk where Xi = (ℍni+1, yαi−ni−1dydx) for 1 ≤ i ≤ k. Under the condition αi>ni2 {\alpha_i} > {{{n_i}} \over 2} , we also obtained the mapping properties of M.
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乘积流形上的中心Hardy-Littlewood极大函数
摘要设X是Xi的直积,其中Xi是1≤i≤k的光滑流形。众所周知,如果每个Xi满足加倍体积条件,则X上的中心Hardy-Littlewood极大函数M是弱(1,1)有界的。在本文中,我们考虑乘积流形X,其中至少一个Xi不满足加倍体积条件。确切地说,我们首先研究了当X1具有指数体积增长并且X2满足加倍条件时M的映射性质。接下来,我们考虑两个加权双曲空间的乘积空间X1=(ℍn+1,d,yα−n−1dydx)和X2=(ℍn+1,d,yβ−n−1dydx),它们都具有指数体积增长。讨论了2}上每个α,β≠n2\alpha,β-ne的M的映射性质。此外,设X=X1×X2×…Xk,其中Xi=(ℍni+1,yαi−ni−1dydx)对于1≤i≤k。在αi>ni2{\alpha_i}>{{n_i}}\在2}上的条件下,我们还得到了M的映射性质。
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来源期刊
Advances in Nonlinear Analysis
Advances in Nonlinear Analysis MATHEMATICS, APPLIED-MATHEMATICS
CiteScore
6.00
自引率
9.50%
发文量
60
审稿时长
30 weeks
期刊介绍: Advances in Nonlinear Analysis (ANONA) aims to publish selected research contributions devoted to nonlinear problems coming from different areas, with particular reference to those introducing new techniques capable of solving a wide range of problems. The Journal focuses on papers that address significant problems in pure and applied nonlinear analysis. ANONA seeks to present the most significant advances in this field to a wide readership, including researchers and graduate students in mathematics, physics, and engineering.
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