Add to ORKGThe obtained results extend the well-known theorem of Hardy-Littlewood for one-dimensional fractional integrals to the case of mixed Hölderness
We establish the boundedness of the fractional integral operators on the Hardy-amalgam spaces
AbstractThis paper is devoted to the study of four integral operators that are basic generalizations...
The paper discusses the properties of the partial fractional integrals, the partial fractional deriv...
We study mixed Riemann-Liouville fractional integration operators and mixed fractional derivative in...
We study mixed fractional derivative of functions of two variables in weighted Hölder spaces of diff...
We consider operators of mixed fractional integration in weighted generalized Hölder spaces of a fun...
The fractional integrals Ia+α(x)φ of variable order α(x) are considered. A theorem on mapping proper...
summary:In this paper some embedding theorems related to fractional integration and differentiation ...
In this paper, we introduce new mixed operators related to the coupled orders Riemann-Liouville inte...
The boundedness of operators on Hardy spaces is usually given by atomic decomposition. In this paper...
The boundedness of fractional integral operator on was introduced for the first tim...
In this article a theory of fractional powers of a singular hyperbolic operator on arbitrary spaces ...
The properties of \u27\u27convolution-type\u27\u27 operators that are invariant with respect to dila...
The result of Golubov [5, Theorem 2] on the boundedness of the Hardy-Littlewood operator Bf(x) := 1/...
Higher dimensional mixed norm type inequalities involving certain integral operators are characteriz...
We establish the boundedness of the fractional integral operators on the Hardy-amalgam spaces
AbstractThis paper is devoted to the study of four integral operators that are basic generalizations...
The paper discusses the properties of the partial fractional integrals, the partial fractional deriv...
We study mixed Riemann-Liouville fractional integration operators and mixed fractional derivative in...
We study mixed fractional derivative of functions of two variables in weighted Hölder spaces of diff...
We consider operators of mixed fractional integration in weighted generalized Hölder spaces of a fun...
The fractional integrals Ia+α(x)φ of variable order α(x) are considered. A theorem on mapping proper...
summary:In this paper some embedding theorems related to fractional integration and differentiation ...
In this paper, we introduce new mixed operators related to the coupled orders Riemann-Liouville inte...
The boundedness of operators on Hardy spaces is usually given by atomic decomposition. In this paper...
The boundedness of fractional integral operator on was introduced for the first tim...
In this article a theory of fractional powers of a singular hyperbolic operator on arbitrary spaces ...
The properties of \u27\u27convolution-type\u27\u27 operators that are invariant with respect to dila...
The result of Golubov [5, Theorem 2] on the boundedness of the Hardy-Littlewood operator Bf(x) := 1/...
Higher dimensional mixed norm type inequalities involving certain integral operators are characteriz...
We establish the boundedness of the fractional integral operators on the Hardy-amalgam spaces
AbstractThis paper is devoted to the study of four integral operators that are basic generalizations...
The paper discusses the properties of the partial fractional integrals, the partial fractional deriv...