Refinement of the general form of the two-point quadrature formulas via convexity

D. C. Benchettah; A. Lakhdari; B. Meftah

doi:10.2478/jamsi-2023-0006

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Refinement of the general form of the two-point quadrature formulas via convexity

Journal of Applied Mathematics, Statistics and Informatics

Volume 19 (2023): Issue 1 (May 2023)

By: D. C. Benchettah, A. Lakhdari and B. Meftah

Open Access

|Jun 2023

Budak, H., Hezenci, F., And Kara, H. 2021. On parameterized inequalities of ostrowski and simpson type for convex functions via generalized fractional integrals. Mathematical Methods in the Applied Sciences 44, 17, 12522–12536.
Search in Google Scholar Back to article
Dragomir, S. And Agarwal, R. 1998. Two inequalities for differentiable mappings and applications to special means of real numbers and to trapezoidal formula. Applied mathematics letters 11, 5, 91–95.
Search in Google Scholar Back to article
Dragomir, S. And Wang, S. 1997. An inequality of ostrowski-grüss’ type and its applications to the estimation of error bounds for some special means and for some numerical quadrature rules. Computers & Mathematics with Applications 33, 11, 15–20.
Search in Google Scholar Back to article
Dragomir, S. And Wang, S. 1998. Applications of ostrowski’s inequality to the estimation of error bounds for some special means and for some numerical quadrature rules. Applied Mathematics Letters 11, 1, 105–109.
Search in Google Scholar Back to article
Guessab, A. And Schmeisser, G. 2002. Sharp integral inequalities of the hermite–hadamard type. Journal of approximation theory 115, 2, 260–288.
Search in Google Scholar Back to article
Hezenci, F., Budak, H., And Kara, H. 2021. New version of fractional simpson type inequalities for twice differentiable functions. Advances in Difference Equations 2021, 1–10.
Search in Google Scholar Back to article
Iqbal, M., Iqbal Bhatti, M., And Nazeer, K. 2015. Generalization of inequalities analogous to hermite-hadamard inequality via fractional integrals. Bulletin of the Korean Mathematical Society 52, 3, 707–716.
Search in Google Scholar Back to article
Kirmaci, U. S. 2004. Inequalities for differentiable mappings and applications to special means of real numbers and to midpoint formula. Applied mathematics and computation 147, 1, 137–146.
Search in Google Scholar Back to article
Lakhdari, A. And Meftah, B. 2022. Some fractional weighted trapezoid type inequalities for preinvex functions. International Journal of Nonlinear Analysis and Applications 13, 1, 3567–3587.
Search in Google Scholar Back to article
Latif, M. And Dragomir, S. S. 2012. On some new inequalities for differentiable co-ordinated convex functions. Journal of Inequalities and Applications 2012, 1, 1–13.
Search in Google Scholar Back to article

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DOI: https://doi.org/10.2478/jamsi-2023-0006 | Journal eISSN: 1339-0015 | Journal ISSN: 1336-9180

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Language: English

Page range: 93 - 101

Published on: Jun 9, 2023

Published by: University of Ss. Cyril and Methodius in Trnava

In partnership with: Paradigm Publishing Services

Publication frequency: 2 issues per year

Keywords:

Newton-Cotes formulas,

trapezoid inequality,

convex functions

Related subjects:

Computer sciences,

Information technology,

Mathematics,

Logic and set theory,

Probability and statistics,

Applied mathematics

© 2023 D. C. Benchettah, A. Lakhdari, B. Meftah, published by University of Ss. Cyril and Methodius in Trnava
This work is licensed under the Creative Commons Attribution 4.0 License.

Volume 19 (2023): Issue 1 (May 2023)