New conticrete inequalities of the Hermite-Hadamard-Jensen-Mercer type in terms of generalized conformable fractional operators via majorization

IF 2 3区数学 Q1 MATHEMATICS Demonstratio Mathematica Pub Date : 2023-01-01 DOI:10.1515/dema-2022-0225

T. Saeed, M. Khan, Shah Faisal, H. Alsulami, M. Alhodaly

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Abstract

Abstract The Hermite-Hadamard inequality is regarded as one of the most favorable inequalities from the research point of view. Currently, mathematicians are working on extending, improving, and generalizing this inequality. This article presents conticrete inequalities of the Hermite-Hadamard-Jensen-Mercer type in weighted and unweighted forms by using the idea of majorization and convexity together with generalized conformable fractional integral operators. They not only represent continuous and discrete inequalities in compact form but also produce generalized inequalities connecting various fractional operators such as Hadamard, Katugampola, Riemann-Liouville, conformable, and Rieman integrals into one single form. Also, two new integral identities have been investigated pertaining a differentiable function and three tuples. By using these identities and assuming ∣ f ′ ∣ | f^{\prime} | and ∣ f ′ ∣ q ( q > 1 ) | f^{\prime} {| }^{q}\hspace{0.33em}\left(q\gt 1) as convex, we deduce bounds concerning the discrepancy of the terms of the main inequalities.

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广义适形分数算子的Hermite-Hadamard-Jensen-Mercer型新连续不等式

摘要从研究的角度来看，Hermite-Hadamard不等式被认为是最有利的不等式之一。目前，数学家们正在致力于扩展、改进和推广这个不等式。本文利用多数化和凸性的思想，结合广义适形分数积分算子，给出了加权和非加权形式的Hermite-Hadamard-Jensen-Mercer型连续不等式。它们不仅表示紧致形式的连续和离散不等式，而且产生了将Hadamard、Katugampola、Riemann-Liouville、保形和Riemann积分等各种分数算子连接成一个单一形式的广义不等式。此外，还研究了关于一个可微函数和三个元组的两个新的积分恒等式。通过使用这些恒等式，并假设｜f′Ş|f^｛\prime｝|和｜f’Şq（q>1）|f^{\prime}｛|｝^｛q｝\hspace｛0.33em｝\left（q\gt 1）是凸的，我们推导了关于主要不等式项的差异的界。

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来源期刊

Demonstratio Mathematica MATHEMATICS-

CiteScore

2.40

自引率

5.00%

发文量

审稿时长

35 weeks

期刊介绍： Demonstratio Mathematica publishes original and significant research on topics related to functional analysis and approximation theory. Please note that submissions related to other areas of mathematical research will no longer be accepted by the journal. The potential topics include (but are not limited to): -Approximation theory and iteration methods- Fixed point theory and methods of computing fixed points- Functional, ordinary and partial differential equations- Nonsmooth analysis, variational analysis and convex analysis- Optimization theory, variational inequalities and complementarity problems- For more detailed list of the potential topics please refer to Instruction for Authors. The journal considers submissions of different types of articles. "Research Articles" are focused on fundamental theoretical aspects, as well as on significant applications in science, engineering etc. “Rapid Communications” are intended to present information of exceptional novelty and exciting results of significant interest to the readers. “Review articles” and “Commentaries”, which present the existing literature on the specific topic from new perspectives, are welcome as well.