Some Ostrowski type inequalities for mappings whose second derivatives are preinvex function via fractional integral operator

Nasir, Jamshed; Qaisar, Shahid; Butt, Saad Ihsan; Qayyum, Ather

doi:10.3934/math.2022184

Cited by 13 publications

(6 citation statements)

References 28 publications

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“…The fractional counterparts of these findings are also comprehensively discussed in [9,10]. Moreover, a series of mathematical luminaries have established results applicable to twice differentiable convex functions, exemplified by works such as [11][12][13].…”

Section: Introductionmentioning

confidence: 91%

New Perspectives on Fractional Milne-Type Inequalities: Insights from Twice-Differentiable Functions

Desta,

Budak,

Kara

2024

Universal Journal of Mathematics and Applications

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This paper delves into an inquiry that centers on the exploration of fractional adaptations of Milne-type inequalities by employing the framework of twice-differentiable convex mappings. Leveraging the fundamental tenets of convexity, H\"{o}lder's inequality, and the power-mean inequality, a series of novel inequalities are deduced. These newly acquired inequalities are fortified through insightful illustrative examples, bolstered by rigorous proofs. Furthermore, to lend visual validation, graphical representations are meticulously crafted for the showcased examples.

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Section: Introductionmentioning

confidence: 91%

New Perspectives on Fractional Milne-Type Inequalities: Insights from Twice-Differentiable Functions

Desta,

Budak,

Kara

2024

Universal Journal of Mathematics and Applications

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“…Lately, many mathematicians have incorporated the concepts of new notions of fractional integrals and well-known inequalities. To know more about the recent developments about the theory of fractional integral inequalities, we suggest interested readers follow the articles [34][35][36][37][38].…”

Section: Definition 11 ([1]) a Functionmentioning

confidence: 99%

Ostrowski-type inequalities pertaining to Atangana–Baleanu fractional operators and applications containing special functions

et al. 2022

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The objective of this article is to incorporate the concept of the Ostrowski inequality with the Atangana–Baleanu fractional integral operator. A novel integral identity for twice-differentiable functions is established after a rigorous investigation of several basic definitions and existing ideas related to inequalities and fractional calculus. Following that, numerous Ostrowski-type inequalities are provided based on this identity, which uses Mittag–Leffler as its kernel structure. Some specific applications, such as q-digamma functions and modified Bessel functions, are also investigated. Choosing $s=1$ s = 1 , we also analyze new results for convex functions as special cases. Our findings corroborate some well-documented inequalities.

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“…A. Qayyum et.al [23] and [24] offered Ostrowski' s type inequalities which were the generalization of the inequalities given in [5]. Different researchers [11]- [21] worked on refinement of Ostrowski's type inequalities and its applications. From the above work, we develop new gernalized inequalities for different norms e.g || g || ∞ , || g || 1 and || g || p .…”

Section: Introductionmentioning

confidence: 99%

Some new generalized Ostrowski type inequalities with new error bounds

Amjad¹,

Qayyum

Fahad³

et al. 2022

IJM

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In this paper, we will ameliorate and generalize Ostrowski type inequality for twice differentiable mappings in various Lebesgue spaces. Some famous inequalities can be derived as a special cases of the inequalities obtained here. Furthermore, perturbed mid-point inequality and perturbed trapezoid inequality are also obtained. The obtained inequalities have very rapid applications in numerical integrations and some special means.

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Some Ostrowski type inequalities for mappings whose second derivatives are preinvex function via fractional integral operator

Cited by 13 publications

References 28 publications

New Perspectives on Fractional Milne-Type Inequalities: Insights from Twice-Differentiable Functions

New Perspectives on Fractional Milne-Type Inequalities: Insights from Twice-Differentiable Functions

Ostrowski-type inequalities pertaining to Atangana–Baleanu fractional operators and applications containing special functions

Some new generalized Ostrowski type inequalities with new error bounds

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