Generalized harmonically convex functions on fractal sets and related Hermite-Hadamard type inequalities

Abstract The present article addresses the concept of p-convex functions on fractal sets. We are able to prove a novel auxiliary result. In the application aspect, the fidelity of the local fractional is used to establish the generalization of Simpson-type inequalities for the class of functions whose local fractional derivatives in absolute values at certain powers are p-convex. The method we present is an alternative in showing the classical variants associated with generalized p-convex functions. Some parts of our results cover the classical convex functions and classical harmonically convex functions. Some novel applications in random variables, cumulative distribution functions and generalized bivariate means are obtained to ensure the correctness of the present results. The present approach is efficient, reliable, and it can be used as an alternative to establishing new solutions for different types of fractals in computer graphics.

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Some new Hermite-Hadamard type inequalities for generalized harmonically convex functions involving local fractional integrals

AIMS Mathematics ◽

10.3934/math.2021620 ◽

2021 ◽

Vol 6 (10) ◽

pp. 10679-10695

Author(s):

Wenbing Sun ◽

◽

Rui Xu

Keyword(s):

Convex Functions ◽

Integral Identity ◽

Fractional Integral ◽

Fractional Integrals ◽

Fractal Sets ◽

Special Means ◽

Local Fractional Integral ◽

Harmonically Convex Functions

<abstract><p>In this paper, we establish a new integral identity involving local fractional integral on Yang's fractal sets. Using this integral identity, some new generalized Hermite-Hadamard type inequalities whose function is monotonically increasing and generalized harmonically convex are obtained. Finally, we construct some generalized special means to explain the applications of these inequalities.</p></abstract>

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Fractional Hermite–Hadamard type inequalities for interval-valued functions

Journal of Inequalities and Applications ◽

10.1186/s13660-019-2217-1 ◽

2019 ◽

Vol 2019 (1) ◽

Cited By ~ 3

Author(s):

Xuelong Liu ◽

Gouju Ye ◽

Dafang Zhao ◽

Wei Liu

Keyword(s):

Convex Functions ◽

Harmonically Convex Functions ◽

Interval Valued

Abstract We introduce the concept of interval harmonically convex functions. By using two different classes of convexity, we get some further refinements for interval fractional Hermite–Hadamard type inequalities. Also, some examples are presented.

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New Modifications of Integral Inequalities via ℘-Convexity Pertaining to Fractional Calculus and Their Applications

Mathematics ◽

10.3390/math9151753 ◽

2021 ◽

Vol 9 (15) ◽

pp. 1753

Author(s):

Saima Rashid ◽

Aasma Khalid ◽

Omar Bazighifan ◽

Georgia Irina Oros

Keyword(s):

Integral Operator ◽

Convex Functions ◽

Hypergeometric Functions ◽

Fractional Integral ◽

Type Inequality ◽

Fractional Integral Operator ◽

Integral Inequalities ◽

Convex Mappings ◽

Special Cases ◽

Harmonically Convex Functions

Integral inequalities for ℘-convex functions are established by using a generalised fractional integral operator based on Raina’s function. Hermite–Hadamard type inequality is presented for ℘-convex functions via generalised fractional integral operator. A novel parameterized auxiliary identity involving generalised fractional integral is proposed for differentiable mappings. By using auxiliary identity, we derive several Ostrowski type inequalities for functions whose absolute values are ℘-convex mappings. It is presented that the obtained outcomes exhibit classical convex and harmonically convex functions which have been verified using Riemann–Liouville fractional integral. Several generalisations and special cases are carried out to verify the robustness and efficiency of the suggested scheme in matrices and Fox–Wright generalised hypergeometric functions.

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Extensions of the Hermite–Hadamard inequality for harmonically convex functions via fractional integrals

Applied Mathematics and Computation ◽

10.1016/j.amc.2015.06.051 ◽

2015 ◽

Vol 268 ◽

pp. 121-128 ◽

Cited By ~ 3

Author(s):

Feixiang Chen

Keyword(s):

Convex Functions ◽

Fractional Integrals ◽

Hadamard Inequality ◽

Harmonically Convex Functions

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New generalized fractional versions of Hadamard and Fejér inequalities for harmonically convex functions

Journal of Inequalities and Applications ◽

10.1186/s13660-020-02457-y ◽

2020 ◽

Vol 2020 (1) ◽

Cited By ~ 1

Author(s):

Xiaoli Qiang ◽

Ghulam Farid ◽

Muhammad Yussouf ◽

Khuram Ali Khan ◽

Atiq Ur Rahman

Keyword(s):

Convex Functions ◽

Harmonically Convex Functions

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Fractional Ostrowski type inequalities for differentiable harmonically convex functions

AIMS Mathematics ◽

10.3934/math.2022217 ◽

2021 ◽

Vol 7 (3) ◽

pp. 3939-3958

Author(s):

Thanin Sitthiwirattham ◽

◽

Muhammad Aamir Ali ◽

Hüseyin Budak ◽

Sotiris K. Ntouyas ◽

...

Keyword(s):

Convex Functions ◽

Fractional Integrals ◽

Real Numbers ◽

Special Means ◽

Special Cases ◽

Harmonically Convex Functions ◽

New Inequalities

<abstract><p>In this paper, we prove some new Ostrowski type inequalities for differentiable harmonically convex functions using generalized fractional integrals. Since we are using generalized fractional integrals to establish these inequalities, therefore we obtain some new inequalities of Ostrowski type for Riemann-Liouville fractional integrals and $ k $-Riemann-Liouville fractional integrals in special cases. Finally, we give some applications to special means of real numbers for newly established inequalities.</p></abstract>

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GENERALIZED h-CONVEXITY ON FRACTAL SETS AND SOME GENERALIZED HADAMARD-TYPE INEQUALITIES

Fractals ◽

10.1142/s0218348x20500218 ◽

2020 ◽

Vol 28 (02) ◽

pp. 2050021 ◽

Cited By ~ 1

Author(s):

WENBING SUN

Keyword(s):

Convex Function ◽

Convex Functions ◽

Generalized Convex Functions ◽

Text Type ◽

Fractal Sets ◽

Type Concept ◽

Real Linear

In this paper, we introduce the [Formula: see text]-type concept of generalized [Formula: see text]-convex function on real linear fractal sets [Formula: see text], from which the known definitions of generalized convex functions and generalized [Formula: see text]-convex functions are derived, and from this, we obtain generalized Godunova–Levin functions and generalized [Formula: see text]-functions. Some properties of generalized [Formula: see text]-convex functions are discussed. Lastly, some generalized Hadamard-type inequalities of these classes functions are given.

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Hermite-Hadamard type inequalities for generalized convex functions on fractal sets style

Boletim da Sociedade Paranaense de Matemática ◽

10.5269/bspm.v38i1.32820 ◽

2018 ◽

Vol 38 (1) ◽

pp. 101-116 ◽

Cited By ~ 9

Author(s):

Muharrem Tomar ◽

Praveen Agarwal ◽

Junesang Choi

Keyword(s):

Convex Functions ◽

Fractional Integral ◽

Generalized Convex Functions ◽

Fractal Sets ◽

Special Cases ◽

Logarithmic Means ◽

Local Fractional Integral ◽

Generalized Arithmetic

We aim to establish certain generalized Hermite-Hadamard's inequalities for generalized convex functions via local fractional integral. As special cases of some of the results presented here, certain interesting inequalities involving generalized arithmetic and logarithmic means are obtained.

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New Riemann–Liouville fractional Hermite–Hadamard type inequalities for harmonically convex functions

Arabian Journal of Mathematics ◽

10.1007/s40065-019-0255-7 ◽

2019 ◽

Vol 9 (2) ◽

pp. 431-441

Author(s):

Zeynep Şanlı ◽

Mehmet Kunt ◽

Tuncay Köroğlu

Keyword(s):

Convex Functions ◽

Fractional Integrals ◽

Differentiable Functions ◽

Left And Right ◽

Harmonically Convex Functions

Abstract In this paper, we proved two new Riemann–Liouville fractional Hermite–Hadamard type inequalities for harmonically convex functions using the left and right fractional integrals independently. Also, we have two new Riemann–Liouville fractional trapezoidal type identities for differentiable functions. Using these identities, we obtained some new trapezoidal type inequalities for harmonically convex functions. Our results generalize the results given by İşcan (Hacet J Math Stat 46(6):935–942, 2014).

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