We study mixed fractional derivative of functions of two variables in weighted Hölder spaces of different orders in each variable. The obtained results extend the well-known theorem of Hardy-Littlewood for the one-dimensional fractional derivative to the case of mixed Höldernes
The aim of the paper is twofold. First, we present a new general approach to the definition of a cla...
The fractional integrals Ia+α(x)φ of variable order α(x) are considered. A theorem on mapping proper...
We prove trace theorems for weighted mixed norm Sobolev spaces in the upper-half space where the wei...
We study mixed Riemann-Liouville fractional integration operators and mixed fractional derivative in...
The obtained results extend the well-known theorem of Hardy-Littlewood for one-dimensional fractiona...
We consider operators of mixed fractional integration in weighted generalized Hölder spaces of a fun...
The properties of \u27\u27convolution-type\u27\u27 operators that are invariant with respect to dila...
Let be an open unit disc in the complex plane ℂ and let φ:→ as well as u:→ℂ be analytic maps. For a...
Weighted inequalities for fractional derivatives (= fractional order Hardy-type inequalities) have r...
This paper studies fractional differential equations (FDEs) with mixed fractional derivatives. Exist...
summary:In this paper some embedding theorems related to fractional integration and differentiation ...
In the work mixed fractional order integrals and derivatives and their some properties аre studied
Abstract This study aims to resolve weighted fractional operators of variable order in specific spac...
We study the question of the composition of the mixed fractional integral and the mixed fractional d...
We study the action of fractional differentiation and integration on weighted Bergman spaces and als...
The aim of the paper is twofold. First, we present a new general approach to the definition of a cla...
The fractional integrals Ia+α(x)φ of variable order α(x) are considered. A theorem on mapping proper...
We prove trace theorems for weighted mixed norm Sobolev spaces in the upper-half space where the wei...
We study mixed Riemann-Liouville fractional integration operators and mixed fractional derivative in...
The obtained results extend the well-known theorem of Hardy-Littlewood for one-dimensional fractiona...
We consider operators of mixed fractional integration in weighted generalized Hölder spaces of a fun...
The properties of \u27\u27convolution-type\u27\u27 operators that are invariant with respect to dila...
Let be an open unit disc in the complex plane ℂ and let φ:→ as well as u:→ℂ be analytic maps. For a...
Weighted inequalities for fractional derivatives (= fractional order Hardy-type inequalities) have r...
This paper studies fractional differential equations (FDEs) with mixed fractional derivatives. Exist...
summary:In this paper some embedding theorems related to fractional integration and differentiation ...
In the work mixed fractional order integrals and derivatives and their some properties аre studied
Abstract This study aims to resolve weighted fractional operators of variable order in specific spac...
We study the question of the composition of the mixed fractional integral and the mixed fractional d...
We study the action of fractional differentiation and integration on weighted Bergman spaces and als...
The aim of the paper is twofold. First, we present a new general approach to the definition of a cla...
The fractional integrals Ia+α(x)φ of variable order α(x) are considered. A theorem on mapping proper...
We prove trace theorems for weighted mixed norm Sobolev spaces in the upper-half space where the wei...
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