ON SOME WEIGHTED HARDY-TYPE INEQUALITIES INVOLVING EXTENDED RIEMANN-LIOUVILLE FRACTIONAL CALCULUS OPERATORS

In this article, we establish some new weighted Hardy-type inequalities involving some variants of extended Riemann-Liouville fractional derivative operators, using convex and increasing functions. As special cases of the main results, we obtain the results of [18,19]. We also prove the boundedness of the k-fractional integral operator on L-p[a, b].

Авторы

Iqbal S.¹ , Pecaric J. ² , Samraiz M.³ , Tehmeena H.⁴ , Tomovski Z.⁵

Журнал

COMMUNICATIONS OF THE KOREAN MATHEMATICAL SOCIETY

Издательство

KOREAN MATHEMATICAL SOC

Номер выпуска

Язык

Английский

Страницы

161-184

Статус

Опубликовано

DOI

10.4134/CKMS.c180458

Том

Год

2020

Организации

¹ Univ Sargodha, Dept Math, Subcampus Bhakkar, Bhakkar, Pakistan
² RUDN Univ, Moscow, Russia
³ Univ Sargodha, Dept Math, Sargodha, Pakistan
⁴ Univ Sargodha, Dept Math, Mandi Bahauddin Campus, Mandi Bahauddin, Pakistan
⁵ Univ St Cyril & Methodius, Fac Nat Sci & Math, Inst Math, Skopje, North Macedonia

Ключевые слова

Hardy-type inequalities; Riemann-Liouville; fractional integral operator; convex and increasing function

Дата создания

10.02.2020

Дата изменения

10.02.2020

Постоянная ссылка

https://repository.rudn.ru/ru/records/article/record/56708/

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