Hermite–Hadamard Type Inclusions for Interval-Valued Coordinated Preinvex Functions

Lai, Kin Keung; Mishra, Shashi Kant; Bisht, Jaya; Hassan, M. Y.

doi:10.3390/sym14040771

Cited by 9 publications

(4 citation statements)

References 37 publications

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“…Taking inspiration from this approach, Zhao et al [35,36] recently employed the conventional integral operator to establish inequality (1.2) within the framework of interval inclusion relations. The authors of [37] introduced pre-invex functions on the plane with interval values and derived multiple double inequalities. Wannalookkhee et al [38] utilized quantum integrals to derive a double inequality on the plane and for other applications.…”

Section: 𝒢(𝜅𝜃 + (1 − 𝜅)𝜆) ≤ 𝜅𝒢(𝜃) + (1 − 𝜅)𝒢(𝜆)mentioning

confidence: 99%

Some New Estimations of Left and Right Interval Fractional Pachpatte’s Type Integral Inequalities via Rectangle Plane

Alshehry,

Ciurdariu,

Saber

et al. 2024

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Inequalities involving fractional operators have been an active area of research, which is crucial in establishing bounds, estimates, and stability conditions for solutions to fractional integrals. In this paper, we initially presented a new class that is known as coordinated left and right ℏ-pre-invex interval-valued mappings (C·L·R-ℏ-pre-invex Ι·V-M), as well classical convex and nonconvex are also obtained. This newly defined class enabled us to derive novel inequalities, such as Hermite–Hadamard and Pachpatte’s type inequalities. Furthermore, the obtained results allowed us to recapture several special cases of known results for different parameter choices, which can be applications of the main results. Finally, we discussed the validity of the main outcomes.

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Section: 𝒢(𝜅𝜃 + (1 − 𝜅)𝜆) ≤ 𝜅𝒢(𝜃) + (1 − 𝜅)𝒢(𝜆)mentioning

confidence: 99%

Some New Estimations of Left and Right Interval Fractional Pachpatte’s Type Integral Inequalities via Rectangle Plane

Alshehry,

Ciurdariu,

Saber

et al. 2024

Axioms

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show abstract

“…Alomari and Darus [18] employed log-convex functions on coordinates to build Hermite-Hadamard inequality and its several new forms. Lai et al [19] defined I.V preinvex mappings on the coordinates and developed the Hermite-Hadamard inequality and its different forms by using interval partial-order relations. Wannalookkhee et al [20] employed quantum integrals and discovered the Hermite-Hadamard inequality on coordinates, with applications spanning numerous disciplines.…”

Section: Introductionmentioning

confidence: 99%

Hyers–Ulam Stability of 2D-Convex Mappings and Some Related New Hermite–Hadamard, Pachpatte, and Fejér Type Integral Inequalities Using Novel Fractional Integral Operators via Totally Interval-Order Relations with Open Problem

Afzal,

Breaz,

Abbas

et al. 2024

Mathematics

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The aim of this paper is to introduce a new type of two-dimensional convexity by using total-order relations. In the first part of this paper, we examine the Hyers–Ulam stability of two-dimensional convex mappings by using the sandwich theorem. Our next step involves the development of Hermite–Hadamard inequality, including its weighted and product forms, by using a novel type of fractional operator having non-singular kernels. Moreover, we develop several nontrivial examples and remarks to demonstrate the validity of our main results. Finally, we examine approximate convex mappings and have left an open problem regarding the best optimal constants for two-dimensional approximate convexity.

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“…Nasir et al [29] developed some Ostrowskitype results using a fractional approach by using preinvex functions via second derivatives. In [30], the authors developed new variants of double inequalities based on preinvex functions on a real plane. As a result of using preinvex mappings in fractal space, Yu et al [31] found error bounds on parameterized integral inequalities.…”

Section: Introductionmentioning

confidence: 99%

Weighted Fejér, Hermite–Hadamard, and Trapezium-Type Inequalities for (h1,h2)–Godunova–Levin Preinvex Function with Applications and Two Open Problems

Ahmadini,

Afzal,

Abbas

et al. 2024

Mathematics

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This note introduces a new class of preinvexity called (h1,h2)-Godunova-Levin preinvex functions that generalize earlier findings. Based on these notions, we developed Hermite-Hadamard, weighted Fejér, and trapezium type inequalities. Furthermore, we constructed some non-trivial examples in order to verify all the developed results. In addition, we discussed some applications related to the trapezoidal formula, probability density functions, special functions and special means. Lastly, we discussed the importance of order relations and left two open problems for future research. As an additional benefit, we believe that the present work can provide a strong catalyst for enhancing similar existing literature.

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Hermite–Hadamard Type Inclusions for Interval-Valued Coordinated Preinvex Functions

Cited by 9 publications

References 37 publications

Some New Estimations of Left and Right Interval Fractional Pachpatte’s Type Integral Inequalities via Rectangle Plane

Some New Estimations of Left and Right Interval Fractional Pachpatte’s Type Integral Inequalities via Rectangle Plane

Hyers–Ulam Stability of 2D-Convex Mappings and Some Related New Hermite–Hadamard, Pachpatte, and Fejér Type Integral Inequalities Using Novel Fractional Integral Operators via Totally Interval-Order Relations with Open Problem

Weighted Fejér, Hermite–Hadamard, and Trapezium-Type Inequalities for (h1,h2)–Godunova–Levin Preinvex Function with Applications and Two Open Problems

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