Your search keyword '"KHAN, ZAREEN A."' showing total 9 results

1. SOME NEW INEQUALITIES FOR n-POLYNOMIAL s-TYPE CONVEXITY PERTAINING TO INTER-VALUED FUNCTIONS GOVERNED BY FRACTIONAL CALCULUS.

Author

KHAN, ZAREEN A. and KALSOOM, HUMAIRA

Subjects

*INTEGRAL operators, *CONVEX functions, *ALGEBRAIC functions, *FRACTIONAL calculus, *POLYNOMIAL approximation, *PROBLEM solving, *INTEGRAL inequalities, *GENERALIZATION, *SET-valued maps

Abstract

The main goals of this paper are to provide an introduction to the idea of interval-valued n -polynomial s -type convex functions and to investigate the algebraic properties of this type of function. This new generalization aims to show the existence of new Hermite–Hadamard inequalities for the recently presented class of interval-valued n -polynomials of s -type convex describing the φ -fractional integral operator. In the classical sense, some special cases are figured out, and the two examples are also given. There are some recently discovered inequalities for interval-valued functions that are regulated by fractional calculus applicable to interval-valued n -polynomial s -type convexity. The results obtained show that future research will be simple to implement, highly efficient, feasible, and extremely precise in its investigation. It could also help solve modeling problems, optimization problems, and fuzzy interval-valued functions that involve both discrete and continuous variables. [ABSTRACT FROM AUTHOR]

Published

2023

2. NEW INEQUALITIES OF HERMITE–HADAMARD TYPE FOR n-POLYNOMIAL s-TYPE CONVEX STOCHASTIC PROCESSES.

Author

KALSOOM, HUMAIRA and KHAN, ZAREEN A.

Subjects

*STOCHASTIC processes, *INTEGRAL inequalities, *STOCHASTIC analysis, *REAL numbers, *CONVEX functions, *INTEGRAL functions, *STOCHASTIC integrals

Abstract

The purpose of this paper is to introduce a more generalized class of convex stochastic processes and explore some of their algebraic properties. This new class of stochastic processes is called the n -polynomial s -type convex stochastic process. We demonstrate that this new class of stochastic processes leads to the discovery of novel Hermite–Hadamard type inequalities. These inequalities provide upper bounds on the integral of a convex function over an interval in terms of the moments of the stochastic process and the convexity parameter s. To compare the effectiveness of the newly discovered Hermite–Hadamard type inequalities, we also consider other commonly used integral inequalities, such as Hölder, Hölder–Ïşcan, and power-mean, as well as improved power-mean integral inequalities. We show that the Hölder–Ïşcan and improved power-mean integral inequalities provide a better approach for the n -polynomial s -type convex stochastic process than the other integral inequalities. Finally, we provide some applications of the Hermite–Hadamard type inequalities to special means of real numbers. Our findings provide a useful tool for the analysis of stochastic processes in various fields, including finance, economics, and engineering. [ABSTRACT FROM AUTHOR]

Published

2023

3. New Hermite–Hadamard Integral Inequalities for Geometrically Convex Functions via Generalized Weighted Fractional Operator.

Author

Kalsoom, Humaira, Latif, Muhammad Amer, Khan, Zareen A., and Al-Moneef, Areej A.

Subjects

*CONVEX functions, *FRACTIONAL integrals, *INTEGRAL inequalities, *INTEGRAL functions, *SYMMETRIC functions

Abstract

The main purpose of this research is to concentrate on the development of new definitions for the weighted geometric fractional integrals of the left-hand side and right-hand side of the function ℵ with regard to an increasing function used as an integral kernel. Moreover, the newly developed class of left-hand side and right-hand side weighted geometric fractional integrals of a function ℵ, by applying an additional increasing function, identifies a variety of novel classes as special cases. This is a development of the previously established fractional integrals by making use of the class of geometrically convex functions. Geometrically convex functions in weighted fractional integrals of a function ℵ in the form of another rising function yield the Hermite–Hadamard inequality type. We also establish a novel midpoint identity and the associated inequalities for a class of weighted fractional integral functions known as geometrically convex with respect to an increasing function and symmetric with respect to the geometric mean of the endpoints of the interval. In order to demonstrate the validity of our research, we present examples. Moreover, fractional inequalities and their solutions are applied in many symmetrical domains. [ABSTRACT FROM AUTHOR]

Published

2022

4. Generalized trapezium-type inequalities in the settings of fractal sets for functions having generalized convexity property.

Author

Khan, Zareen A., Rashid, Saima, Ashraf, Rehana, Baleanu, Dumitru, and Chu, Yu-Ming

Subjects

*FRACTALS, *SET functions, *CONVEX functions, *ABSOLUTE value, *FRACTAL analysis, *CONVEXITY spaces

Abstract

In the paper, we extend some previous results dealing with the Hermite–Hadamard inequalities with fractal sets and several auxiliary results that vary with local fractional derivatives introduced in the recent literature. We provide new generalizations for the third-order differentiability by employing the local fractional technique for functions whose local fractional derivatives in the absolute values are generalized convex and obtain several bounds and new results applicable to convex functions by using the generalized Hölder and power-mean inequalities. As an application, numerous novel cases can be obtained from our outcomes. To ensure the feasibility of the proposed method, we present two examples to verify the method. It should be pointed out that the investigation of our findings in fractal analysis and inequality theory is vital to our perception of the real world since they are more realistic models of natural and man-made phenomena. [ABSTRACT FROM AUTHOR]

Published

2020

5. Integral Majorization Type Inequalities for the Functions in the Sense of Strong Convexity.

Author

Zaheer Ullah, Syed, Khan, Muhammad Adil, Khan, Zareen Abdulhameed, and Chu, Yu-Ming

Subjects

*CONVEX functions, *CONVEXITY spaces, *FUNCTION spaces, *MATHEMATICAL inequalities

Abstract

In this article, we establish several integral majorization type and generalized Favard's inequalities for the class of strongly convex functions. Our results generalize and improve the previous known results. [ABSTRACT FROM AUTHOR]

Published

2019

6. New Fractional Integral Inequalities Pertaining to Center-Radius (cr)-Ordered Convex Functions.

Author

Sahoo, Soubhagya Kumar, Alrweili, Hleil, Treanţă, Savin, and Khan, Zareen A.

Subjects

*FRACTIONAL integrals, *CONVEX functions, *INTEGRAL inequalities

Abstract

In this work, we use the idea of interval-valued convex functions of Center-Radius (cr)-order to give fractional versions of Hermite–Hadamard inequality. The results are supported by some numerical estimations and graphical representations considering some suitable examples. The results are novel in the context of cr -convex interval-valued functions and deal with differintegrals of the p + s 2 type. We believe this will be an important contribution to spurring additional research. [ABSTRACT FROM AUTHOR]

Published

2023

7. Some New Hermite-Hadamard-Fejér Fractional Type Inequalities for h -Convex and Harmonically h -Convex Interval-Valued Functions.

Author

Kalsoom, Humaira, Latif, Muhammad Amer, Khan, Zareen A., and Vivas-Cortez, Miguel

Subjects

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

Abstract

In this article, firstly, we establish a novel definition of weighted interval-valued fractional integrals of a function Υ ˘ using an another function ϑ (ζ ˙) . As an additional observation, it is noted that the new class of weighted interval-valued fractional integrals of a function Υ ˘ by employing an additional function ϑ (ζ ˙) characterizes a variety of new classes as special cases, which is a generalization of the previous class. Secondly, we prove a new version of the Hermite-Hadamard-Fejér type inequality for h-convex interval-valued functions using weighted interval-valued fractional integrals of a function Υ ˘ according to another function ϑ (ζ ˙). Finally, by using weighted interval-valued fractional integrals of a function Υ ˘ according to another function ϑ (ζ ˙) , we are establishing a new Hermite-Hadamard-Fejér type inequality for harmonically h-convex interval-valued functions that is not previously known. Moreover, some examples are provided to demonstrate our results. [ABSTRACT FROM AUTHOR]

Published

2022

8. Association of Jensen's inequality for s-convex function with Csiszár divergence.

Author

Adil Khan, Muhammad, Hanif, Muhammad, Abdul Hameed Khan, Zareen, Ahmad, Khurshid, and Chu, Yu-Ming

Subjects

*JENSEN'S inequality, *CONVEX functions, *INTEGRAL inequalities

Abstract

In the article, we establish an inequality for Csiszár divergence associated with s-convex functions, present several inequalities for Kullback–Leibler, Renyi, Hellinger, Chi-square, Jeffery's, and variational distance divergences by using particular s-convex functions in the Csiszár divergence. We also provide new bounds for Bhattacharyya divergence. [ABSTRACT FROM AUTHOR]

Published

2019

9. 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