INTERPOLATION THEOREMS FOR NONLINEAR OPERATORS IN GENERAL MORREY-TYPE SPACES AND THEIR APPLICATIONS
Article
Proceedings of the Steklov Institute of Mathematics.
Vol. 312.
2021.
P. 124-149
CHARACTERIZATIONS FOR THE FRACTIONAL INTEGRAL OPERATOR AND ITS COMMUTATORS IN GENERALIZED WEIGHTED MORREY SPACES ON CARNOT GROUPS
In this paper, we shall give a characterization for the strong and weak type Spanne type boundedness of the fractional integral operator I-alpha, 0 < alpha < Q on Carrot group G on generalized weighted Morrey spaces M-p,M-phi (G,w), respectively, where Q is the homogeneous dimension of G. Also we give a characterization for the Spanne type boundedness of the commutator operator [b,I-alpha] on generalized weighted Morrey spaces. As applications of the properties of the fundamental solution of sub-Laplacian L on G, we prove two Sobolev-Stein embedding theorems on generalized weighted Morrey spaces in the Carrot group setting.
Authors
Guliyev V.S.
1,
2,
3
,
Ekincioglu I.2
Publisher
Element D.O.O.
Number of issue
1
Language
English
Pages
151-171
Status
Published
Volume
15
Year
2021
Organizations
- 1 Baku State Univ, Inst Appl Math, Baku, Azerbaijan
- 2 Dumlupinar Univ, Dept Math, Kutahya, Turkey
- 3 Peoples Friendship Univ Russia RUDN Univ, 6 Miklukho Maklaya St, Moscow 117198, Russia
Keywords
Cannot group; fractional integral operator; generalized weighted Morrey space; commutator; BMO
Date of creation
20.07.2021
Date of change
20.07.2021
Share
Other records
Doklady Biochemistry and Biophysics.
Vol. 497.
2021.
P. 99-103