Mathematical Methods in the Applied Sciences.
John Wiley and Sons Ltd.
Vol. 42.
2019.
P. 7411-7424
Characterizations of Hardy spaces associated with Laplace–Bessel operators
In this paper, we obtain a characterization of HΔνp(R+n) Hardy spaces by using atoms associated with the radial maximal function, the nontangential maximal function and the grand maximal function related to Δν Laplace–Bessel operator for ν> 0 and 1 < p< ∞. As an application, we further establish an atomic characterization of Hardy spaces HΔνp(R+n) in terms of the high order Riesz–Bessel transform for 0 < p≤ 1. © 2019, Springer Nature Switzerland AG.
Authors
Keskin C.1
,
Ekincioglu I.1
,
Guliyev V.S.
1,
2,
3
Publisher
Springer Basel
Number of issue
4
Language
English
Pages
2281-2310
Status
Published
Link
Volume
9
Year
2019
Organizations
- 1 Department of Mathematics, Kutahya Dumlupınar University, Kutahya, Turkey
- 2 S.M. Nikolskii Institute of Mathematics at RUDN University, Moscow, Russian Federation
- 3 Institute of Mathematics and Mechanics of NAS, Baku, Azerbaijan
Keywords
Atomic decomposition; Fourier–Bessel transform; Generalized shift operator; Hardy space; Riesz–Bessel transform
Date of creation
24.12.2019
Date of change
24.12.2019
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Other records
Journal of Inequalities and Applications.
Springer International Publishing.
Vol. 2019.
2019.