New Forms of the Open Newton-Cotes-Type Inequalities for a Family of the Quantum Differentiable Convex Functions

被引：0

作者：

Soontharanon, Jarunee ^{[1
,2
]}

Ali, Muhammad Aamir ^{[3
]}

Rezapour, Shahram ^{[4
,5
]}

Toseef, Muhammad ^{[3
]}

Sitthiwirattham, Thanin ^{[2
,6
]}

机构：

[1] King Mongkuts Univ Technol North Bangkok, Fac Appl Sci, Dept Math, Bangkok 10800, Thailand

[2] King Mongkuts Univ Technol North Bangkok, Sci & Technol Res Inst, Res Grp Fract Calculus Theory & Applicat, Bangkok 10800, Thailand

[3] Nanjing Normal Univ, Sch Math Sci, Jiangsu Key Lab NSLSCS, Nanjing, Peoples R China

[4] Azarbaijan Shahid Madani Univ, Dept Math, Tabriz, Iran

[5] China Med Univ, China Med Univ Hosp, Dept Med Res, Taichung, Taiwan

[6] Suan Dusit Univ, Fac Sci & Technol, Math Dept, Bangkok 10300, Thailand

来源：

SAHAND COMMUNICATIONS IN MATHEMATICAL ANALYSIS | 2025年 / 22卷 / 01期

关键词：

Open Newton-Cotes Formulas; Convex Functions; q-; Calculus; Fractional inequalities; HERMITE-HADAMARD INEQUALITIES; REAL NUMBERS; MIDPOINT; MAPPINGS;

D O I：

10.22130/scma.2024.2036770.1826

中图分类号：

O1 [数学];

学科分类号：

0701 ; 070101 ;

摘要：

The main objective of this paper is to establish some new inequalities related to the open Newton-Cotes formulas in the setting of q-calculus. We establish a quantum integral identity first and then prove the desired inequalities for q-differentiable convex functions. These inequalities are useful for determining error bounds for the open Newton-Cotes formulas in both classical and q-calculus. This work distinguishes itself from existing studies by employing quantum operators, leading to sharper and more precise error estimates. These results extend the applicability of Newton- Cotes methods to quantum calculus, offering a novel contribution to the numerical analysis of convex functions. Finally, we provide mathematical examples and computational analysis to validate the newly established inequalities.

引用

页数：16

共 50 条

[1] A new extension of quantum Simpson's and quantum Newton's type inequalities for quantum differentiable convex functions
Ali, Muhammad Aamir
Budak, Huseyin
Zhang, Zhiyue
MATHEMATICAL METHODS IN THE APPLIED SCIENCES, 2022, 45 (04) : 1845 - 1863
[2] Conformable fractional Newton-type inequalities with respect to differentiable convex functions
Cihan Ünal
Fatih Hezenci
Hüseyin Budak
Journal of Inequalities and Applications, 2023
[3] Conformable fractional Newton-type inequalities with respect to differentiable convex functions
uenal, Cihan
Hezenci, Fatih
Budak, Hueseyin
JOURNAL OF INEQUALITIES AND APPLICATIONS, 2023, 2023 (01)
[4] FRACTIONAL TRAPEZOID AND NEWTON TYPE INEQUALITIES FOR DIFFERENTIABLE S-CONVEX FUNCTIONS
Hezenci, Fatih
Budak, Huseyin
Ali, Muhammad Aamir
HONAM MATHEMATICAL JOURNAL, 2023, 45 (01): : 160 - 183
[5] On some new quantum midpoint-type inequalities for twice quantum differentiable convex functions
Ali, Muhammad Aamir
Alp, Necmettin
Budak, Huseyin
Chu, Yu-Ming
Zhang, Zhiyue
OPEN MATHEMATICS, 2021, 19 (01): : 427 - 439
[6] Study of Quantum Ostrowski-Type Inequalities for Differentiable Convex Functions
M. A. Ali
M. Fečkan
A. Mateen
Ukrainian Mathematical Journal, 2023, 75 : 5 - 28
[7] Study of Quantum Ostrowski-Type Inequalities for Differentiable Convex Functions
Ali, M. A.
Feckan, M.
Mateen, A.
UKRAINIAN MATHEMATICAL JOURNAL, 2023, 75 (01) : 5 - 28
[8] Riemann-Liouville Fractional Newton's Type Inequalities for Differentiable Convex Functions
Sitthiwirattham, Thanin
Nonlaopon, Kamsing
Ali, Muhammad Aamir
Budak, Huseyin
FRACTAL AND FRACTIONAL, 2022, 6 (03)
[9] A new generalization of some quantum integral inequalities for quantum differentiable convex functions
Yi-Xia Li
Muhammad Aamir Ali
Hüseyin Budak
Mujahid Abbas
Yu-Ming Chu
Advances in Difference Equations, 2021
[10] A new generalization of some quantum integral inequalities for quantum differentiable convex functions
Li, Yi-Xia
Ali, Muhammad Aamir
Budak, Huseyin
Abbas, Mujahid
Chu, Yu-Ming
ADVANCES IN DIFFERENCE EQUATIONS, 2021, 2021 (01)

← 1 2 3 4 5 →