On the Sobolev Boundedness Results of the Product of Pseudo-differential Operators Involving a Couple of Fractional Hankel Transforms

被引:0
作者
Akhilesh PRASAD [1 ]
Kanailal MAHATO [2 ]
机构
[1] Department of Applied Mathematics, Indian Institute of Technology (Indian School of Mines)
[2] Department of Mathematics, Institute of Science, Banaras Hindu University
来源
ActaMathematicaSinica | 2018年 / 34卷 / 02期
关键词
D O I
暂无
中图分类号
O175.3 [微分算子理论];
学科分类号
070104 ;
摘要
This article is concerned with the study of pseudo-differential operators associated with fractional Hankel transform. The product of two fractional pseudo-differential operators is defined and investigated its basic properties on some function space. It is shown that the pseudo-differential operators and their products are bounded in Sobolev type spaces. Particular cases are discussed.
引用
收藏
页码:221 / 232
页数:12
相关论文
共 50 条
[41]   A counterexample for boundedness of pseudo-differential operators on modulation spaces [J].
Sugimoto, Mitsuru ;
Tomita, Naohito .
PROCEEDINGS OF THE AMERICAN MATHEMATICAL SOCIETY, 2008, 136 (05) :1681-1690
[42]   Lp α(Rn+1+)- boundedness of pseudo-differential operators involving the Weinstein transform [J].
Sartaj, Mohd ;
Upadhyay, S. K. .
FILOMAT, 2024, 38 (03) :957-978
[43]   Two variants of fractional powers of Hankel-Clifford transformations and pseudo-differential operators [J].
Prasad, Akhilesh ;
Kumar, Sumant .
JOURNAL OF PSEUDO-DIFFERENTIAL OPERATORS AND APPLICATIONS, 2014, 5 (03) :411-454
[44]   Boundedness of Pseudo-Differential Operators on Weighted Hardy Spaces [J].
Do, Tan Duc .
VIETNAM JOURNAL OF MATHEMATICS, 2025, 53 (02) :427-439
[45]   Boundedness and nuclearity of pseudo-differential operators on homogeneous trees [J].
Mondal, Shyam Swarup .
ANALYSIS AND MATHEMATICAL PHYSICS, 2022, 12 (03)
[46]   Boundedness of Multilinear Pseudo-differential Operators on Modulation Spaces [J].
Molahajloo, Shahla ;
Okoudjou, Kasso A. ;
Pfander, Goetz E. .
JOURNAL OF FOURIER ANALYSIS AND APPLICATIONS, 2016, 22 (06) :1381-1415
[47]   Lp-Boundedness of Multilinear Pseudo-Differential Operators [J].
Catana, Viorel ;
Molahajloo, Shahla ;
Wong, M. W. .
PSEUDO-DIFFERENTIAL OPERATORS: COMPLEX ANALYSIS AND PARTIAL DIFFERENTIAL EQUATIONS, 2010, 205 :167-+
[48]   On -Boundedness of Pseudo-Differential Operators of Sjostrand's Class [J].
Cunanan, Jayson .
JOURNAL OF FOURIER ANALYSIS AND APPLICATIONS, 2017, 23 (04) :810-816
[49]   Boundedness of Multilinear Pseudo-differential Operators on Modulation Spaces [J].
Shahla Molahajloo ;
Kasso A. Okoudjou ;
Götz E. Pfander .
Journal of Fourier Analysis and Applications, 2016, 22 :1381-1415
[50]   Boundedness and nuclearity of pseudo-differential operators on homogeneous trees [J].
Shyam Swarup Mondal .
Analysis and Mathematical Physics, 2022, 12
12345