Some New Improvements of Hermite-Hadamard Type Inequalities Using Strongly (s,m)-Convex Function with Applications

Arslan Munir; Hüseyin Budak; Artion Kashuri; Irza Faiz; Hasan Kara; Ather Qayyum

doi:10.22130/scma.2024.2023382.1633

Some New Improvements of Hermite-Hadamard Type Inequalities Using Strongly (s,m)-Convex Function with Applications

Arslan Munir, Hüseyin Budak, Artion Kashuri, Irza Faiz, Hasan Kara, Ather Qayyum^*

^*Corresponding author for this work

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

1 Citation (Scopus)

Abstract

The trapezoidal-type inequalities are discovered in this study using the fractional operator, which produces powerful results. We established a general identity for Caputo-Fabrizio integral operators and the second derivative function. Using this identity new error bounds and estimates for strongly (s, m)-convex functions are obtained. Moreover, some novel trapezoidal-type inequalities are offered taking this identity into account using the known inequalities like Young, Jensen, Hölder and power-mean inequalities. Finally, we present some applications for matrix inequality, estimation error regarding trapezoidal formulas and special means for real numbers.

Original language	English
Pages (from-to)	307-332
Number of pages	26
Journal	Sahand Communications in Mathematical Analysis
Volume	22
Issue number	2
DOIs	https://doi.org/10.22130/scma.2024.2023382.1633
Publication status	Published - 1 Apr 2025
Externally published	Yes

Keywords

Strongly (s.m)-convex function
Trapezoidal-type inequality
Young’s inequality, Jensen inequality

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10.22130/scma.2024.2023382.1633Licence: CC BY

scma.2024.2023382.1633Final published version, 422 KBLicence: CC BY

Cite this

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title = "Some New Improvements of Hermite-Hadamard Type Inequalities Using Strongly (s,m)-Convex Function with Applications",

abstract = "The trapezoidal-type inequalities are discovered in this study using the fractional operator, which produces powerful results. We established a general identity for Caputo-Fabrizio integral operators and the second derivative function. Using this identity new error bounds and estimates for strongly (s, m)-convex functions are obtained. Moreover, some novel trapezoidal-type inequalities are offered taking this identity into account using the known inequalities like Young, Jensen, H{\"o}lder and power-mean inequalities. Finally, we present some applications for matrix inequality, estimation error regarding trapezoidal formulas and special means for real numbers.",

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AU - Munir, Arslan

AU - Budak, Hüseyin

AU - Kashuri, Artion

AU - Faiz, Irza

AU - Kara, Hasan

AU - Qayyum, Ather

PY - 2025/4/1

Y1 - 2025/4/1

N2 - The trapezoidal-type inequalities are discovered in this study using the fractional operator, which produces powerful results. We established a general identity for Caputo-Fabrizio integral operators and the second derivative function. Using this identity new error bounds and estimates for strongly (s, m)-convex functions are obtained. Moreover, some novel trapezoidal-type inequalities are offered taking this identity into account using the known inequalities like Young, Jensen, Hölder and power-mean inequalities. Finally, we present some applications for matrix inequality, estimation error regarding trapezoidal formulas and special means for real numbers.

AB - The trapezoidal-type inequalities are discovered in this study using the fractional operator, which produces powerful results. We established a general identity for Caputo-Fabrizio integral operators and the second derivative function. Using this identity new error bounds and estimates for strongly (s, m)-convex functions are obtained. Moreover, some novel trapezoidal-type inequalities are offered taking this identity into account using the known inequalities like Young, Jensen, Hölder and power-mean inequalities. Finally, we present some applications for matrix inequality, estimation error regarding trapezoidal formulas and special means for real numbers.

KW - Strongly (s.m)-convex function

KW - Trapezoidal-type inequality

KW - Young’s inequality, Jensen inequality

UR - https://www.scopus.com/pages/publications/105003773141

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M3 - Article

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SN - 2322-5807

VL - 22

SP - 307

EP - 332

JO - Sahand Communications in Mathematical Analysis

JF - Sahand Communications in Mathematical Analysis

IS - 2

ER -

Some New Improvements of Hermite-Hadamard Type Inequalities Using Strongly (s,m)-Convex Function with Applications

Abstract

Keywords

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