Weighted hardy-type inequalities on the cone of quasi-concave functions

The paper is devoted to the study of weighted Hardy-type inequalities on the cone of quasi-concave functions, which is equivalent to the study of the boundedness of the Hardy operator between the Lorentz G-spaces. For described inequalities we obtain necessary and sufficient conditions to hold for parameters q > 1, p > 0 and sufficient conditions for the rest of the range of parameters. © Element, Zagreb.

Авторы

Persson L.-E.¹ , Popova O.V. ² , Stepanov V.D. ³

Журнал

Mathematical Inequalities and Applications

Издательство

Element D.O.O.

Номер выпуска

Язык

Английский

Страницы

879-898

Статус

Опубликовано

Ссылка

Внешняя ссылка

DOI

10.7153/mia-17-64

Том

Год

2014

Организации

¹ Department of Engineering Sciences and Mathematics, LuleØa University of Technology, SE-97187 Luleøa, Sweden
² Narvik University College, PO Box 385, NO 8505, Narvik, Norway
³ Department of Mathematical Analysis, Function Theory Peoples, Friendship University of Russia, Miklukho-Maklay 6, 117198 Moscow, Russian Federation

Ключевые слова

Concave function; Hardy operator; Hardy-type inequality; Lorentz space; Measure; Quasi-concave function; Weight

Дата создания

19.10.2018

Дата изменения

19.10.2018

Постоянная ссылка

https://repository.rudn.ru/ru/records/article/record/4990/

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