On supremum operators

The set of all nonnegative measurable functions and its subset consisting of all nonincreasing functions are denoted to study the supremum operators. The inequality is characterized for the Hardy operator, in which the constant C is minimal among all possible constants. The results shows that for a continuous function, the inequality for certain conditions. For a jointly measurable nonnegative function, the supremum operator is defined. The necessary and sufficient for the inequality with nonnegative weight functions are also defined.

Авторы

Prokhorov D.V.¹ , Stepanov V.D. ²

Журнал

Doklady Mathematics

Номер выпуска

Язык

Английский

Страницы

457-458

Статус

Опубликовано

Ссылка

Внешняя ссылка

DOI

10.1134/S1064562411030422

Том

Год

2011

Организации

¹ Computing Center, Far East Branch, Russian Academy of Sciences, ul. Kim Yu Chena 65, Khabarovsk 680000, Russian Federation
² Peoples Friendship University, ul. Miklukho-Maklaya 6, Moscow 117198, Russian Federation

Дата создания

19.10.2018

Дата изменения

19.10.2018

Постоянная ссылка

https://repository.rudn.ru/ru/records/article/record/2523/

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