Your search keyword '"Ostrowski inequality"' showing total 15 results

1. Ostrowski-Type Fractional Integral Inequalities: A Survey.

Author

Tariq, Muhammad, Ntouyas, Sotiris K., and Ahmad, Bashir

Subjects

FRACTIONAL integrals, HADAMARD matrices, KERNEL functions, CONVEX functions, RIEMANNIAN metric

Abstract

This paper presents an extensive review of some recent results on fractional Ostrowski-type inequalities associated with a variety of convexities and different kinds of fractional integrals. We have taken into account the classical convex functions, quasi-convex functions, (ζ , m) -convex functions, s-convex functions, (s , r) -convex functions, strongly convex functions, harmonically convex functions, h-convex functions, Godunova-Levin-convex functions, M T -convex functions, P-convex functions, m-convex functions, (s , m) -convex functions, exponentially s-convex functions, (β , m) -convex functions, exponential-convex functions, ζ ¯ , β , γ , δ -convex functions, quasi-geometrically convex functions, s − e -convex functions and n-polynomial exponentially s-convex functions. Riemann–Liouville fractional integral, Katugampola fractional integral, k-Riemann–Liouville, Riemann–Liouville fractional integrals with respect to another function, Hadamard fractional integral, fractional integrals with exponential kernel and Atagana-Baleanu fractional integrals are included. Results for Ostrowski-Mercer-type inequalities, Ostrowski-type inequalities for preinvex functions, Ostrowski-type inequalities for Quantum-Calculus and Ostrowski-type inequalities of tensorial type are also presented. [ABSTRACT FROM AUTHOR]

Published

2023

2. On the Generalization of Ostrowski-Type Integral Inequalities via Fractional Integral Operators with Application to Error Bounds.

Author

Rahman, Gauhar, Vivas-Cortez, Miguel, Yildiz, Çetin, Samraiz, Muhammad, Mubeen, Shahid, and Yassen, Mansour F.

Subjects

*FRACTIONAL integrals, *GENERALIZED integrals, *INTEGRAL operators, *INTEGRAL inequalities, *GENERALIZATION, *INTEGRALS, *CONVEX functions

Abstract

The Ostrowski inequality expresses bounds on the deviation of a function from its integral mean. The Ostrowski's type inequality is frequently used to investigate errors in numerical quadrature rules and computations. In this work, Ostrowski-type inequality is demonstrated using the generalized fractional integral operators. From an application perspective, we present the bounds of the fractional Hadamard inequalities. The results that are being presented involve a number of fractional inequalities that are already known and have been published. [ABSTRACT FROM AUTHOR]

Published

2023

3. Some New Estimates of Hermite–Hadamard, Ostrowski and Jensen-Type Inclusions for h -Convex Stochastic Process via Interval-Valued Functions.

Author

Afzal, Waqar, Prosviryakov, Evgeniy Yu., El-Deeb, Sheza M., and Almalki, Yahya

Subjects

*STOCHASTIC processes, *MATHEMATICAL programming, *INTEGRAL operators, *FUZZY integrals, *INTEGRAL inequalities, *CONVEXITY spaces

Abstract

Mathematical programming and optimization problems related to fluid dynamics are heavily influenced by stochastic processes associated with integral and variational inequalities. Furthermore, symmetry and convexity are intrinsically related. Over the last few years, both have become increasingly interconnected so that we can learn from one and apply it to the other. The objective of this note is to convert ordinary stochastic processes into interval stochastic processes due to the wide range of applications in various disciplines. We have developed Hermite–Hadamard ( H. H ), Ostrowski-, and Jensen-type inequalities using interval h-convex stochastic processes. Our main results can be applied to a variety of new and well-known outcomes as specific situations. The results of this study are expected to stimulate future research on inequalities using fractional and fuzzy integral operators. Furthermore, we validate our main findings by providing some non-trivial examples. To demonstrate their general properties, we illustrate the connections between the examined results and those that have already been published. The results discussed in this article can be seen as improvements and refinements to results that have already been published. This is a fascinating subject that can be investigated in the future to identify equivalent inequalities for various convexity types. [ABSTRACT FROM AUTHOR]

Published

2023

4. Inequalities of the Ostrowski Type Associated with Fractional Integral Operators Containing the Mittag–Leffler Function.

Author

Chen, Dong, Mehmood, Sajid, Farid, Ghulam, and Nonlaopon, Kamsing

Subjects

*FRACTIONAL integrals, *INTEGRAL operators, *INTEGRAL inequalities, *GENERALIZED integrals, *KERNEL functions, *OPERATOR functions

Abstract

Integral operators with the Mittag–Leffler function in kernels play a very vital role in generalizing classical integral inequalities. This paper aims to derive Ostrowski-type inequalities for k-fractional integrals containing Mittag–Leffler functions. Several new inequalities can be deduced for various fractional integrals in particular cases. Applications of these inequalities are also given. [ABSTRACT FROM AUTHOR]

Published

2022

5. Parameterized Quantum Fractional Integral Inequalities Defined by Using n -Polynomial Convex Functions.

Author

Liko, Rozana, Srivastava, Hari Mohan, Mohammed, Pshtiwan Othman, Kashuri, Artion, Al-Sarairah, Eman, Sahoo, Soubhagya Kumar, and Soliman, Mohamed S.

Subjects

*FRACTIONAL integrals, *CONVEX functions, *INTEGRAL inequalities, *REAL numbers

Abstract

Convexity performs the appropriate role in the theoretical study of inequalities according to the nature and behaviour. There is a strong relation between symmetry and convexity. In this article, we consider a new parameterized quantum fractional integral identity. Following that, our main results are established, which consist of some integral inequalities of Ostrowski and midpoint type pertaining to n-polynomial convex functions. From our main results, we discuss in detail several special cases. Finally, an example and an application to special means of positive real numbers are presented to support our theoretical results. [ABSTRACT FROM AUTHOR]

Published

2022

6. Improvement of Some Hayashi–Ostrowski Type Inequalities with Applications in a Probability Setting.

Author

Alomari, Mohammad W., Chesneau, Christophe, Leiva, Víctor, and Martin-Barreiro, Carlos

Subjects

*MATHEMATICAL inequalities, *PROBABILITY theory

Abstract

Different types of mathematical inequalities have been largely analyzed and employed. In this paper, we introduce improvements to some Ostrowski type inequalities and present their corresponding proofs. The presented proofs are based on applying the celebrated Hayashi inequality to certain functions. We provide examples that show these improvements. Illustrations of the obtained results are stated in a probability framework. [ABSTRACT FROM AUTHOR]

Published

2022

7. New Generalized Class of Convex Functions and Some Related Integral Inequalities.

Author

Kashuri, Artion, Agarwal, Ravi P., Mohammed, Pshtiwan Othman, Nonlaopon, Kamsing, Abualnaja, Khadijah M., and Hamed, Yasser S.

Subjects

*CONVEX functions, *INTEGRAL inequalities

Abstract

There is a strong correlation between convexity and symmetry concepts. In this study, we investigated the new generic class of functions called the (n , m) –generalized convex and studied its basic algebraic properties. The Hermite–Hadamard inequality for the (n , m) –generalized convex function, for the products of two functions and of this type, were proven. Moreover, this class of functions was applied to several known identities; midpoint-type inequalities of Ostrowski and Simpson were derived. Our results are extensions of many previous contributions related to integral inequalities via different convexities. [ABSTRACT FROM AUTHOR]

Published

2022

8. Some New Beesack–Wirtinger-Type Inequalities Pertaining to Different Kinds of Convex Functions.

Author

Kashuri, Artion, Samraiz, Muhammad, Rahman, Gauhar, and Khan, Zareen A.

Subjects

*INTEGRAL inequalities, *DIFFERENTIABLE functions, *CONVEX functions

Abstract

In this paper, the authors established several new inequalities of the Beesack–Wirtinger type for different kinds of differentiable convex functions. Furthermore, we generalized our results for functions that are n-times differentiable convex. Finally, many interesting Ostrowski- and Chebyshev-type inequalities are given as well. [ABSTRACT FROM AUTHOR]

Published

2022

9. Companion to the Ostrowski–Grüss-Type Inequality of the Chebyshev Functional with an Application.

Author

Kovač, Sanja and Vukelić, Ana

Subjects

*DERIVATIVES (Mathematics), *INTEGRALS

Abstract

Recently, there have been many proven results of the Ostrowski–Grüss-type inequality regarding the error bounds for the Chebyshev functional when the functions or their derivatives belong to L p spaces. In the existing literature, the main assumption in the weight-type results is that the derivative of the function is bounded by two constant functions. The aim of our paper is to extend those results in a way that the derivative of the function is bounded by two functions in L p spaces. Furthermore, we give some new error estimations of the Chebyshev functional and applications to the one-point weight integral formulas. [ABSTRACT FROM AUTHOR]

Published

2022

10. Refinements of Ostrowski Type Integral Inequalities Involving Atangana–Baleanu Fractional Integral Operator.

Author

Ahmad, Hijaz, Tariq, Muhammad, Sahoo, Soubhagya Kumar, Askar, Sameh, Abouelregal, Ahmed E., and Khedher, Khaled Mohamed

Subjects

*INTEGRAL operators, *INTEGRAL inequalities, *FRACTIONAL integrals, *JENSEN'S inequality, *FRACTIONAL calculus

Abstract

In this article, first, we deduce an equality involving the Atangana–Baleanu (AB)-fractional integral operator. Next, employing this equality, we present some novel generalization of Ostrowski type inequality using the Hölder inequality, the power-mean inequality, Young's inequality, and the Jensen integral inequality for the convexity of | Υ | . We also deduced some new special cases from the main results. There exists a solid connection between fractional operators and convexity because of their fascinating properties in the mathematical sciences. Scientific inequalities of this nature and, particularly, the methods included have applications in different fields in which symmetry plays a notable role. It is assumed that the results presented in this article will show new directions in the field of fractional calculus. [ABSTRACT FROM AUTHOR]

Published

2021

11. New Ostrowski-Type Fractional Integral Inequalities via Generalized Exponential-Type Convex Functions and Applications.

Author

Sahoo, Soubhagya Kumar, Tariq, Muhammad, Ahmad, Hijaz, Nasir, Jamshed, Aydi, Hassen, and Mukheimer, Aiman

Subjects

*FRACTIONAL integrals, *INTEGRAL inequalities, *CONVEX functions, *FRACTIONAL calculus, *REAL numbers, *MATHEMATICS

Abstract

Recently, fractional calculus has been the center of attraction for researchers in mathematical sciences because of its basic definitions, properties and applications in tackling real-life problems. The main purpose of this article is to present some fractional integral inequalities of Ostrowski type for a new class of convex mapping. Specifically, n–polynomial exponentially s–convex via fractional operator are established. Additionally, we present a new Hermite–Hadamard fractional integral inequality. Some special cases of the results are discussed as well. Due to the nature of convexity theory, there exists a strong relationship between convexity and symmetry. When working on either of the concepts, it can be applied to the other one as well. Integral inequalities concerned with convexity have a lot of applications in various fields of mathematics in which symmetry has a great part to play. Finally, in applications, some new limits for special means of positive real numbers and midpoint formula are given. These new outcomes yield a few generalizations of the earlier outcomes already published in the literature. [ABSTRACT FROM AUTHOR]

Published

2021

12. Fractional Weighted Ostrowski-Type Inequalities and Their Applications.

Author

Kashuri, Artion, Meftah, Badreddine, Mohammed, Pshtiwan Othman, Lupaş, Alina Alb, Abdalla, Bahaaeldin, Hamed, Y. S., and Abdeljawad, Thabet

Subjects

*DIFFERENTIABLE functions, *APPLIED mathematics, *CONVEX functions, *INTEGRAL inequalities

Abstract

An important area in the field of applied and pure mathematics is the integral inequality. As it is known, inequalities aim to develop different mathematical methods. Nowadays, we need to seek accurate inequalities for proving the existence and uniqueness of the mathematical methods. The concept of convexity plays a strong role in the field of inequalities due to the behavior of its definition and its properties. Furthermore, there is a strong correlation between convexity and symmetry concepts. Whichever one we work on, we can apply it to the other one due the strong correlation produced between them, especially in the last few years. In this study, by using a new identity, we establish some new fractional weighted Ostrowski-type inequalities for differentiable quasi-convex functions. Further, further results for functions with a bounded first derivative are given. Finally, in order to illustrate the efficiency of our main results, some applications to special means are obtain. The obtained results generalize and refine certain known results. [ABSTRACT FROM AUTHOR]

Published

2021

13. Generalization of Quantum Ostrowski-Type Integral Inequalities.

Author

Ali, Muhammad Aamir, Ntouyas, Sotiris K., Tariboon, Jessada, and Sánchez, Juan Ramón Torregrosa

Subjects

*INTEGRAL inequalities, *GENERALIZATION

Abstract

In this paper, we prove some new Ostrowski-type integral inequalities for q-differentiable bounded functions. It is also shown that the results presented in this paper are a generalization of know results in the literarure. Applications to special means are also discussed. [ABSTRACT FROM AUTHOR]

Published

2021

14. Quantum Estimates of Ostrowski Inequalities for Generalized ϕ-Convex Functions.

Author

Vivas-Cortez, Miguel J., Kashuri, Artion, Liko, Rozana, and Hernández, Jorge E. Hernández

Subjects

*THEORY of distributions (Functional analysis), *CONVEX functions, *SPECIAL functions, *HYPERGEOMETRIC functions, *SET functions, *ESTIMATES, *CALCULUS

Abstract

In this paper, the study is focused on the quantum estimates of Ostrowski type inequalities for q-differentiable functions involving the special function introduced by R.K. Raina which depends on certain parameters. Our methodology involves Jackson's q-integral, the basic concepts of quantum calculus, and a generalization of a class of special functions used in the frame of convex sets and convex functions. As a main result, some quantum estimates for the aforementioned inequality are established and some cases involving the special hypergeometric and Mittag–Leffler functions have been studied and some known results are deduced. [ABSTRACT FROM AUTHOR]

Published

2019

15. Some Refinements of Ostrowski's Inequality and an Extension to a 2-Inner Product Space.

Author

Minculete, Nicuşor

Subjects

*INNER product spaces, *MATHEMATICAL equivalence, *SCHWARZ inequality

Abstract

The purpose of this paper is to prove certain refinements of Ostrowski's inequality in an inner product space. We study extensions of Ostrowski type inequalities in a 2-inner product space. Finally, some applications which are related to the Chebyshev function and the Grüss inequality are presented. [ABSTRACT FROM AUTHOR]

Published

2019