k-FRACTIONAL OSTROWSKI TYPE INEQUALITIES VIA (s, r)-CONVEX

被引:0
|
作者
Hassan, Ali [1 ]
Khan, Asif r. [2 ]
机构
[1] Shah Abdul Latif Univ, Khairpur, Pakistan
[2] Univ Karachi, Univ Rd, Karachi 75270, Pakistan
来源
KRAGUJEVAC JOURNAL OF MATHEMATICS | 2025年 / 49卷 / 04期
关键词
Ostrowski inequality; convex function; power mean inequality; H & ouml; lder's inequality; INTEGRAL INEQUALITY; BOUNDED VARIATION; MAPPINGS;
D O I
10.46793/KgJMat2504.527H
中图分类号
O1 [数学];
学科分类号
0701 ; 070101 ;
摘要
We introduce the generalized class named it the class of (s, r)-convex in mixed kind, this class includes s-convex in 1(st) and 2(nd) kind, P-convex, quasi convex and the class of ordinary convex. Also, we state the generalization of the classical Ostrowski inequality via k-fractional integrals, which is obtained for functions whose first derivative in absolute values is (s, r)-convex in mixed kind. Moreover, we establish some Ostrowski type inequalities via k-fractional integrals and their particular cases for the class of functions whose absolute values at certain powers of derivatives are (s, r)-convex in mixed kind by using different techniques including H & ouml;lder's inequality and power mean inequality. Also, various established results would be captured as special cases. Moreover, some applications in terms of special means are given.
引用
收藏
页码:527 / 540
页数:14
相关论文
共 50 条
  • [1] k-fractional Ostrowski type inequalities via (s, r)-convex
    Hassan, Ali
    Khan, Asif R.
    ANNALS OF THE UNIVERSITY OF CRAIOVA-MATHEMATICS AND COMPUTER SCIENCE SERIES, 2023, 50 (01): : 16 - 28
  • [2] FRACTIONAL OSTROWSKI TYPE INEQUALITIES VIA (s, r)-CONVEX FUNCTION
    Hassan, Ali
    Khan, Asif Raza
    JORDAN JOURNAL OF MATHEMATICS AND STATISTICS, 2022, 15 (4B): : 1031 - 1047
  • [3] Ostrowski type inequalities for k-β-convex functions via Riemann-Liouville k-fractional integrals
    Lakhal, Fahim
    RENDICONTI DEL CIRCOLO MATEMATICO DI PALERMO, 2021, 70 (03) : 1561 - 1578
  • [4] Ostrowski type inequalities in the sense of generalized K-fractional integral operator for exponentially convex functions
    Rashid, Saima
    Noor, Muhammad Aslam
    Noor, Khalida Inayat
    Chu, Yu-Ming
    AIMS MATHEMATICS, 2020, 5 (03): : 2629 - 2645
  • [5] Fractional Ostrowski Type Inequalities via φ - λ-Convex Function
    Hassan, Ali
    Khan, Asif R.
    SAHAND COMMUNICATIONS IN MATHEMATICAL ANALYSIS, 2024, 21 (01): : 111 - 129
  • [6] k-FRACTIONAL INTEGRAL INEQUALITIES FOR HARMONICALLY CONVEX FUNCTIONS VIA CAPUTO k-FRACTIONAL DERIVATIVES
    Waheed, Asif
    Farid, Ghulam
    Rehman, Atiq Ur
    Ayub, Waqas
    BULLETIN OF MATHEMATICAL ANALYSIS AND APPLICATIONS, 2018, 10 (01): : 55 - 67
  • [7] Fractional version of Ostrowski-type inequalities for strongly p-convex stochastic processes via a k-fractional Hilfer–Katugampola derivative
    Hengxiao Qi
    Muhammad Shoaib Saleem
    Imran Ahmed
    Sana Sajid
    Waqas Nazeer
    Journal of Inequalities and Applications, 2023
  • [8] Hadamard k-fractional inequalities of Fejér type for GA-s-convex mappings and applications
    Hui Lei
    Gou Hu
    Zhi-Jie Cao
    Ting-Song Du
    Journal of Inequalities and Applications, 2019
  • [9] Fractional version of Ostrowski-type inequalities for strongly p-convex stochastic processes via a k-fractional Hilfer-Katugampola derivative
    Qi, Hengxiao
    Saleem, Muhammad Shoaib
    Ahmed, Imran
    Sajid, Sana
    Nazeer, Waqas
    JOURNAL OF INEQUALITIES AND APPLICATIONS, 2023, 2023 (01)
  • [10] Fractional Ostrowski-type Inequalities via (α, β , γ, δ)-convex Function
    Hassan, Ali
    Khan, Asif R.
    Irshad, Nazia
    Khatoon, Sumbul
    SAHAND COMMUNICATIONS IN MATHEMATICAL ANALYSIS, 2023, 20 (04): : 1 - 20
12345