Weighted inequalities for fractional derivatives (= fractional order Hardy-type inequalities) have recently been proved in [4] and [1]. In this paper, new inequalities of this type are proved and applied. In particular, the general mixed norm case and a general twodimensional weight are considered. Moreover, an Orlicz norm version and a multidimensional fractional order Hardy inequality are proved. The connections to related results are pointed out.Godkänd; 1997; 20070111 (evan
In this paper we show different inequalities for fractional order differential operators. In particu...
Necessary and sufficient conditions for weight norm inequalities on Lebesgue spaces to hold are give...
Abstract In this manuscript, we developed the Hardy-type inequality within the Caputo–Fabrizio fract...
Weighted inequalities for fractional derivatives (= fractional order Hardy-type inequalities) have r...
AbstractWe establish necessary and sufficient conditions for the validity of Hardy inequalities of f...
Abstract. We prove optimality of power-type weights in the Hardy inequality of fractional order. 1. ...
The aim of this paper is to establish some new weighted Hardy-type inequalities involving convex and...
Let be the usual Hardy operator, i.e., . We prove that the operator is bounded and has a bounded inv...
In this article, we establish some new weighted Hardy-type inequalities involving some variants of e...
AbstractThe paper is devoted to integral inequalities for fractional derivatives within the weighted...
The well-known Grisvard-Jakovlev inequality (see Theorems 1 and 1_ ) can be interpretedas a fraction...
We study mixed fractional derivative of functions of two variables in weighted Hölder spaces of diff...
A characterization of weighted Hardy inequalities in mixed norms on a half-axis is obtained
© 2017, Pleiades Publishing, Ltd. We prove new Hardy type inequalities for Riemann–Liouville fractio...
We prove new Hardy type inequalities for Riemann-Liouville fractional integrals and derivatives in t...
In this paper we show different inequalities for fractional order differential operators. In particu...
Necessary and sufficient conditions for weight norm inequalities on Lebesgue spaces to hold are give...
Abstract In this manuscript, we developed the Hardy-type inequality within the Caputo–Fabrizio fract...
Weighted inequalities for fractional derivatives (= fractional order Hardy-type inequalities) have r...
AbstractWe establish necessary and sufficient conditions for the validity of Hardy inequalities of f...
Abstract. We prove optimality of power-type weights in the Hardy inequality of fractional order. 1. ...
The aim of this paper is to establish some new weighted Hardy-type inequalities involving convex and...
Let be the usual Hardy operator, i.e., . We prove that the operator is bounded and has a bounded inv...
In this article, we establish some new weighted Hardy-type inequalities involving some variants of e...
AbstractThe paper is devoted to integral inequalities for fractional derivatives within the weighted...
The well-known Grisvard-Jakovlev inequality (see Theorems 1 and 1_ ) can be interpretedas a fraction...
We study mixed fractional derivative of functions of two variables in weighted Hölder spaces of diff...
A characterization of weighted Hardy inequalities in mixed norms on a half-axis is obtained
© 2017, Pleiades Publishing, Ltd. We prove new Hardy type inequalities for Riemann–Liouville fractio...
We prove new Hardy type inequalities for Riemann-Liouville fractional integrals and derivatives in t...
In this paper we show different inequalities for fractional order differential operators. In particu...
Necessary and sufficient conditions for weight norm inequalities on Lebesgue spaces to hold are give...
Abstract In this manuscript, we developed the Hardy-type inequality within the Caputo–Fabrizio fract...