Параметри
Elements of fractional calculus. Fractional integrals
Тип публікації :
Стаття
Дата випуску :
26 квітня 2022 р.
Автор(и) :
Мова основного тексту :
English
eKNUTSHIR URL :
Випуск :
1
ISSN :
1812-5409
Початкова сторінка :
11
Кінцева сторінка :
19
Цитування :
Мішура, Ю. С., Гопкало, О. М., Железняк, Г. С. (2022). Elements of fractional calculus. Fractional integrals. Bulletin of Taras Shevchenko National University of Kyiv. Physics and Mathematics(1), 11–19. https://doi.org/10.17721/1812-5409.2022/1.1
The paper is devoted to the basic properties of fractional integrals. It is a survey of the well-known properties of fractional integrals, however, the authors tried to present the known information about fractional integrals as short and transparently as possible. We introduce fractional integrals on the compact interval and on the semi-axes, consider the famous Hardy-Littlewood theorem and other properties of integrability of fractional integrals. Among other basic properties, we consider Holder continuity and establish to what extent fractional integration increases the smoothness of the integrand. Also, we establish continuity of fractional integrals according to the index of fractional integration, both at strictly positive value and at zero. Then we consider properties of restrictions of fractional integrals from semi-axes on the compact interval. Generalized Minkowsky inequality is applied as one of the important tools. Some examples of calculating fractional integrals are provided.
Pages of the article in the issue: 11 - 19
Language of the article: Ukrainian
Pages of the article in the issue: 11 - 19
Language of the article: Ukrainian
Тип зібрання :
Publication
Файл(и) :
Ескіз недоступний
Формат
Adobe PDF
Розмір :
175.64 KB
Контрольна сума:
(MD5):54e520f9b78c721d316860f4bb394b72
Ця робота розповсюджується на умовах ліцензії Creative Commons CC BY
10.17721/1812-5409.2022/1.1