MAJORIZATION INEQUALITIES VIA PEANO'S REPRESENTATION OF HERMITE'S POLYNOMIAL

The Peano's representation of Hermite polynomial and new Green functions are used to construct the identities related to the generalization of majorization type inequalities in discrete as well as continuous case. Cebysev functional is used to find the bounds for new generalized identities and to develop the Gruss and Ostrowski type inequalities. Further more, we present exponential convexity together with Cauchy means for linear functionals associated with the obtained inequalities and give some applications.

Авторы
Latif N.1 , Siddique N.2 , Pecaric J. 3, 4
Журнал
INTERNATIONAL JOURNAL OF ANALYSIS AND APPLICATIONS
Издательство
ETAMATHS PUBL
Номер выпуска
3
Язык
Английский
Страницы
374-399
Статус
Опубликовано
Ссылка
Внешняя ссылка
DOI
10.28924/2291-8639-16-2018-374
Том
16
Год
2018
Организации
  • 1 Jubail Ind Coll, Dept Gen Studies, Jubail Ind City 31961, Saudi Arabia
  • 2 Govt Coll Univ, Dept Math, Faisalabad 38000, Pakistan
  • 3 Univ Zagreb, Fac Text Technol Zagreb, Prilaz Baruna Filipovica 28A, Zagreb 10000, Croatia
  • 4 RUDN Univ, 6 Miklukho Maklay St, Moscow 117198, Russia
Ключевые слова
classical majorization theorem; Fuchs's thorem; Peano's representation of Hermite's polynomial; Green function for 'two point right focal' problem; Cebysev functional; Gruss type upper bounds; Ostrowski-type bounds; n-exponentially convex function; mean value theorems; Stolarsky type means
Дата создания
19.10.2018
Дата изменения
18.02.2019
Постоянная ссылка
https://repository.rudn.ru/ru/records/article/record/9124/
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