New extensions of Hermite-Hadamard and Fejér type inequalities using fuzzy fractional integral operators through different fuzzy convexities

Rana Safdar Ali; Miguel Vivas-Cortez; Artion Kashuri; Naila Talib

doi:10.22436/jmcs.040.04.02

New extensions of Hermite-Hadamard and Fejér type inequalities using fuzzy fractional integral operators through different fuzzy convexities

Rana Safdar Ali, Miguel Vivas-Cortez, Artion Kashuri, Naila Talib

Research output: Contribution to journal › Article › peer-review

Abstract

It is a familiar fact to develop inequalities using the popular method by adopting fractional operators, and such study of methods is the main core of modern research in recent year. Fuzzy interval valued (FIV) mappings not only used to generalize of different convex mappings but also developed fractional operators. In this paper, we investigate fuzzy fractional inequalities for different fuzzy convexities by successfully implementing generalized fuzzy fractional operators (G-FFO). We discuss the extension of Hermite–Hadamard, trapezoid-type inequalities on the basis of fuzzy convexities and fuzzy fractional operators. Moreover, we establish the Fejér and midpoint type fuzzy inequalities for (η₁, η₂)-convex fuzzy function.

Original language	English
Pages (from-to)	456-480
Number of pages	25
Journal	Journal of Mathematics and Computer Science
Volume	40
Issue number	4
DOIs	https://doi.org/10.22436/jmcs.040.04.02
State	Published - 2026

Keywords

(η, η)-convex fuzzy interval valued function
Fejér type fuzzy inequality
Hermite-Hadamard type fuzzy inequality
convex fuzzy interval valued function
generalized fuzzy fractional operators

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10.22436/jmcs.040.04.02

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title = "New extensions of Hermite-Hadamard and Fej{\'e}r type inequalities using fuzzy fractional integral operators through different fuzzy convexities",

abstract = "It is a familiar fact to develop inequalities using the popular method by adopting fractional operators, and such study of methods is the main core of modern research in recent year. Fuzzy interval valued (FIV) mappings not only used to generalize of different convex mappings but also developed fractional operators. In this paper, we investigate fuzzy fractional inequalities for different fuzzy convexities by successfully implementing generalized fuzzy fractional operators (G-FFO). We discuss the extension of Hermite–Hadamard, trapezoid-type inequalities on the basis of fuzzy convexities and fuzzy fractional operators. Moreover, we establish the Fej{\'e}r and midpoint type fuzzy inequalities for (η1, η2)-convex fuzzy function.",

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AU - Ali, Rana Safdar

AU - Vivas-Cortez, Miguel

AU - Kashuri, Artion

AU - Talib, Naila

PY - 2026

Y1 - 2026

N2 - It is a familiar fact to develop inequalities using the popular method by adopting fractional operators, and such study of methods is the main core of modern research in recent year. Fuzzy interval valued (FIV) mappings not only used to generalize of different convex mappings but also developed fractional operators. In this paper, we investigate fuzzy fractional inequalities for different fuzzy convexities by successfully implementing generalized fuzzy fractional operators (G-FFO). We discuss the extension of Hermite–Hadamard, trapezoid-type inequalities on the basis of fuzzy convexities and fuzzy fractional operators. Moreover, we establish the Fejér and midpoint type fuzzy inequalities for (η1, η2)-convex fuzzy function.

AB - It is a familiar fact to develop inequalities using the popular method by adopting fractional operators, and such study of methods is the main core of modern research in recent year. Fuzzy interval valued (FIV) mappings not only used to generalize of different convex mappings but also developed fractional operators. In this paper, we investigate fuzzy fractional inequalities for different fuzzy convexities by successfully implementing generalized fuzzy fractional operators (G-FFO). We discuss the extension of Hermite–Hadamard, trapezoid-type inequalities on the basis of fuzzy convexities and fuzzy fractional operators. Moreover, we establish the Fejér and midpoint type fuzzy inequalities for (η1, η2)-convex fuzzy function.

KW - (η, η)-convex fuzzy interval valued function

KW - Fejér type fuzzy inequality

KW - Hermite-Hadamard type fuzzy inequality

KW - convex fuzzy interval valued function

KW - generalized fuzzy fractional operators

UR - https://www.scopus.com/pages/publications/105014213846

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DO - 10.22436/jmcs.040.04.02

M3 - Artículo

AN - SCOPUS:105014213846

SN - 2008-949X

VL - 40

SP - 456

EP - 480

JO - Journal of Mathematics and Computer Science

JF - Journal of Mathematics and Computer Science

IS - 4

ER -

New extensions of Hermite-Hadamard and Fejér type inequalities using fuzzy fractional integral operators through different fuzzy convexities

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