加权耦合型空间上的多线性算子(英文)  被引量:1

Multilinear Operators on Weighted Amalgam-type Spaces

在线阅读下载全文

作  者:王松柏 李朋 WANG Songbai;LI Peng(College of Mathematics and Statistics,Hubei Normal University,Huangshi,Hubei,335002,P.R.China;Graduate School,China Academy of Engineering Physics,Beijing,100088,P.R.China)

机构地区:[1]湖北师范大学数学与统计学院,黄石湖北435002 [2]中国工程物理研究院研究生院,北京100088

出  处:《数学进展》2018年第6期881-905,共25页Advances in Mathematics(China)

基  金:supported by Young Foundation of Education Department of Hubei Province(No.Q20162504)

摘  要:本文证明了,如果满足特定点态估计的多线性算子T和它的多线性交换子、迭代交换子分别在乘积加权Lebesgue空间上有界,那么它们也在加权耦合型空间上有界.作为应用,我们说明了多线性Littlewood-Paley函数、具有卷积或非卷积核的多线性Marcinkiewicz积分和它们的线性交换子和迭代交换子均在乘积加权耦合型空间上有界.引入耦合型Campanato空间后,我们得到了多线性分数次积分算子是从耦合型空间到耦合型Campanato空间上有界的.我们的结果对于线性的分数次积分算子也是新的.In this paper, we prove that if a multilinear operator T with certain pointwise control condition and its multilinear commutator T∑b and iterated commutator T∏b for b ∈BMO^M are bounded on product weighted Lebesgue spaces, then T, T∑b and T∏b are also bounded on product weighted amalgam spaces. As its applications, we show that multilinear Littlewood-Paley functions and multilinear Marcinkiewicz integral functions with kernels of convolution type and non-convolution type, and their multilinear commutators and iterated commutators are bounded on product weighted amalgam spaces. We also consider multilinear fractional type integral operators and their commutators' behaviors on weighted amalgam spaces. In order to deal with the endpoint case, we introduce the amalgam-Campanato spaces and show that fractional integral integral operator are bounded operators from product amalgam spaces to amalgam-Campanato spaces. Our results for the fractional integral operator are also new in the linear cases.

关 键 词:耦合空间 AP权 多线性算子 耦合型Campanato空间 

分 类 号:O174.2[理学—数学]

 

参考文献:

正在载入数据...

 

二级参考文献:

正在载入数据...

 

耦合文献:

正在载入数据...

 

引证文献:

正在载入数据...

 

二级引证文献:

正在载入数据...

 

同被引文献:

正在载入数据...

 

相关期刊文献:

正在载入数据...

相关的主题
相关的作者对象
相关的机构对象