On Pólya–Szegö and Čebyšev type inequalities via generalized k-fractional integrals

In this paper, we introduce the generalized k-fractional integral in terms of a new parameter \(k>0\), present some new important inequalities of Pólya–Szegö and Čebyšev types by use of the generalized k-fractional integral. Our consequences with this new integral operator have the abilities to implement the evaluation of many mathematical problems related to real world applications.

There are numerous problems wherein fractional derivatives (non-integer order derivatives and integrals) attain a valuable position [1–25]. It must be emphasized that fractional derivatives exist in many technologies, especially they can be described in three different approaches, and any of these approaches can be used to solve many important problems in the real world. Every classical fractional operator is typically described in terms of a particular significance. There are many well-recognized definitions of fractional operators, we can also point out the Riemann–Liouville, Caputo, Grunwald–Letnikov, and Hadamard operators [26], whose formulations include integrals with singular kernels and which may be used to check, for example, issues involving the reminiscence effect [27]. However, within the year 2010, specific formulations of fractional operators appeared in the literature [28]. The new formulations diverge from the classical ones in numerous components. As an example, classical fractional derivatives are described in such a manner that in the limit wherein the order of the derivative is an integer, one recovers the classical derivatives in the sense of Newton and Leibniz. In addition, new fractional operators [29–31] with a corresponding integral whose kernel may be a non-singular mapping have been currently proposed; for instance, a Mittag-Leffler function [32]. In such instances, integer-order derivatives are rediscovered by supposing suitable limits for the values of their parameters.

On the other hand, there are numerous approaches to acquire a generalization of classical fractional integrals. Many authors introduce parameters in classical definitions or in some unique specific function [4], as we shall do in what follows. Moreover, in the present paper, we introduce a parameter and enunciate a generalization for fractional integrals on a selected space, which we call generalized k-fractional integral, and further advocate a Pólya–Szegö and Čebyšev type inequalities modification of this generalization.

Inequalities and their potential applications are of great significance in pure mathematics and applied mathematics, many remarkable inequalities and their applications can be found in the literature [33–46]. In view of the broader applications, integral inequalities have received large interest [47–60]. Presently, many authors have provided the unique versions of such inequalities which may be beneficial within the study of diverse classes of differential and integral equations. Those inequalities act as far-reaching tools to look at the classes of differential and integral equations [61–70].

Čebyšev [71] introduced the well-known celebrated functional as follows:

where \(\mathcal{U}\) and \(\mathcal{V}\) are two integrable functions on \([\sigma _{1},\sigma _{2}]\). If \(\mathcal{U}\) and \(\mathcal{V}\) are synchronous, that is,

for any \(\lambda,\omega \in [\sigma _{1},\sigma _{2}]\), then \(\mathfrak{T}(\mathcal{U},\mathcal{V})\geq 0\).

Functional (1.1) has attracted the attention of many researchers due to its demonstrated applications in probability, numerical analysis, quantum theory, statistical and transform theory. Alongside facet with numerous applications, functional (1.1) has gained plenty of interest to yield a variety of fundamental inequalities [72–76].

Another interesting and fascinating aspect of the theory of inequalities is the Grüss type inequality [66] which states

where the integrable functions \(\mathcal{U}\) and \(\mathcal{V}\) satisfy

and

for all \(\lambda \in [\sigma _{1},\sigma _{2}]\) and for some \(q,Q,r,R\in \mathbb{R}\).

Many famous versions mentioned in the literature are direct effects of the numerous applications in optimizations and transform theory. In this regard Pólya–Szegö integral inequality is one of the most intensively studied inequalities. This inequality was introduced by Pólya and Szegö [76]:

The constant \(\frac{1}{4}\) is a best possible constant such that inequality (1.2) holds, that is, it can’t be replaced by a smaller constant.

By using the Pólya–Szegö inequality, Dragomir and Diamond [75] proved that the inequality

holds for all \(\lambda \in [\sigma _{1},\sigma _{2}]\) if the functions \(\mathcal{U}\) and \(\mathcal{V}\) defined on \([\sigma _{1},\sigma _{2}]\) satisfy

It has been extensively discussed that Pólya–Szegö and Čebyšev type inequalities in continuous and discrete cases play a considerable role in examining the qualitative conduct of differential and difference equations. As a result of these studies, many new branches of mathematics have been opened up. Inspired by Pólya, Szegö, and Čebyšev [71, 76], we intend to show more general versions of Pólya–Szegö and Čebyšev type inequalities.

Our present paper has been inspired by the resource of the above-defined work. The principal aim of the present paper is to set up new Pólya–Szegö and Čebyšev types integral inequalities associated with generalized k-fractional integrals. We introduce parameter \(k>0\) and generalize the results in such a way that the existing results can be explored too. Thus, the results provided in this research paper are more generalized as compared to the existing results.

In this section, we demonstrate some important concepts from fractional calculus that will play a major role in proving the results of the present paper. The essential points of interest are exhibited in the monograph by Kilbas et al. [27].

Definition 2.1

(see [27, 77])

Let \(p\geq 1\) and \(r\in \mathbb{R}\). Then the function \(\mathcal{U}(\zeta )\) is said to be in \(L_{p,r}[\upsilon _{1}, \upsilon _{2}]\) space if

In particular,

Definition 2.2

(see [78])

Let \(p\geq 1\), \(\mathcal{U}\in L_{1}[0,\infty )\) and Ψ be an increasing and positive monotone function defined on \([0,\infty )\) such that \(\varPsi ^{\prime }\) is continuous on \([0,\infty )\) and \(\varPsi (0)=0\). Then \(\mathcal{U}\) is said to be in \(\chi _{\varPsi }^{p}[0,\infty )\) space if \(\|\mathcal{U}\|_{\chi _{\varPsi }^{p}}<\infty \), where \(\|\mathcal{U}\|_{\chi _{\varPsi }^{p}}\) is defined by

for \(1\leq p<\infty \) and

In particular, if \(\varPsi (\lambda )=\lambda \), then \(\chi _{\varPsi }^{p}[0,\infty )\) coincides with \(L_{p}[0,\infty )\); if \(\varPsi (\lambda )=\log \lambda \), then \(\chi _{\varPsi }^{p}[0,\infty )\) becomes \(L_{p, -1}[0,\infty )\).

Definition 2.3

(see [27, 77])

Let \(\sigma _{1}<\sigma _{2}\) and \(\mathcal{U}\in L_{1}([\sigma _{1},\sigma _{2}])\). Then the left and right Riemann–Liouville fractional integrals of order \(\varrho >0\) are defined by

and

respectively, where \(\varGamma (\varrho )=\int _{0}^{\infty }t^{\varrho -1}e^{-t}\,dt\) is the gamma function [79–87].

Now, we recall the definition of k-fractional integral [88].

Definition 2.4

(see [88])

Let \(\sigma _{1}<\sigma _{2}\), \(k>0\), and \(\mathcal{U}\in L_{1}([\sigma _{1},\sigma _{2}])\). Then the left and right k-fractional integrals of order ϱ are defined by

and

respectively, where \(\varGamma _{k}(\varrho )=\int _{0}^{\infty }t^{\varrho -1}e^{- \frac{t^{k}}{k}}\,dt\) is the k-gamma function [89].

A generalization of the Riemann–Liouville fractional integrals with respect to another function is given in [27] as follows.

Definition 2.5

(see [27])

Let \(\sigma _{1}<\sigma _{2}\), \(\varrho >0\), and \(\varPsi (\zeta )\) be an increasing and positive monotone function defined on \((\sigma _{1},\sigma _{2}]\). Then the left and right generalized Riemann–Liouville fractional integrals of the function \(\mathcal{U}\) with respect the function Ψ of order ϱ are defined by

and

respectively.

Next, we present a new fractional integral operator which is known as the generalized k-fractional integral operator of a function with respect to another function.

Definition 2.6

Let \(\sigma _{1}<\sigma _{2}\), \(\varrho, k>0\), and \(\varPsi (\zeta )\) be an increasing and positive monotone function defined on \((\sigma _{1},\sigma _{2}]\). Then the left and right generalized k-fractional integrals of the function \(\mathcal{U}\) with respect to the function Ψ of order ϱ are defined by

and

respectively.

Remark 2.7

Several existing fractional operators are the special cases of Definition 2.6. For example:

1. (1)

   Let \(k=1\). Then Definition 2.6 reduces to Definition 2.5.

2. (2)

   Let \(\varPsi (\lambda )=\lambda \). Then Definition 2.6 reduces to Definition 2.4.

3. (3)

   Let \(\varPsi (\lambda )=\lambda \) and \(k=1\). Then Definition 2.6 reduces to 2.3.

4. (4)

   Let \(\varPsi (\lambda )=\log \lambda \) and \(k=1\). Then Definition 2.6 leads to the Hadamard fractional integral operators given in [27, 77].

5. (5)

   Let \(\beta >0\), \(\varPsi (\lambda )=\frac{\lambda ^{\beta }}{\beta }\), and \(k=1\). Then Definition 2.6 leads to the Katugampola fractional integral operators in the literature [90].

6. (6)

   Let \(\beta >0\), \(\varPsi (\lambda )=\frac{(\lambda -a)^{\beta }}{\beta }\), and \(k=1\). Then Definition 2.6 becomes the conformable fractional integral operators defined by Jarad et al. in [91].

7. (7)

   Let \(\varPsi (\lambda )=\frac{\lambda ^{u+v}}{u+v}\) and \(k=1\). Then Definition 2.6 becomes the generalized conformable fractional integrals defined by Khan et al. in [92].

Throughout this paper, we suppose that \(\varPsi (\zeta )\) is a strictly increasing function on \((0,\infty )\) and \(\varPsi ^{\prime }(\zeta )\) is continuous, \(0\leq \sigma _{1}<\sigma _{2}\) with the condition that at any point \(\sigma _{3}\in [\sigma _{1},\sigma _{2}]\), we have \(\varPsi (\sigma _{3})=0\).

In this section, we derive certain Pólya–Szegö type integral inequalities for real-valued integrable functions via generalized Riemann–Liouville k-fractional integral defined in (2.3) and (2.4). Throughout this paper, we assume that \(\varPsi (\zeta )\) is an increasing, positive, and monotone function defined on \([0,\infty )\) such that \(\varPsi (0)=0\), and \(\varPsi ^{\prime }(\zeta )\) is continuous on \([0,\infty )\).

Lemma 3.1

Let\(k, \lambda, \varrho >0\), \(\mathcal{U}\)and\(\mathcal{V}\), \(\rho _{1}\), \(\rho _{2}\), \(\chi _{1}\), and\(\chi _{2}\)be six positive integrable functions defined on\([0,\infty )\)such that

for all\(\zeta \in [0,\lambda ]\). Then one has

Proof

It follows from (3.1) that

and

for all \(\zeta \in [0,\lambda ]\).

Multiplying (3.3) and (3.4), we obtain

Multiplying both sides of inequality (3.5) by

and integrating the obtained result with respect to ζ to \((0,\lambda )\), we get

Applying the arithmetic-geometric inequality, we have

which leads to

Therefore, we obtain the desired inequality (3.1). □

Corollary 3.2

Let\(k, \lambda, q, r, \varrho, Q, R>0\)with\(q\leq Q\)and\(r\leq R\), and\(\mathcal{U}\)and\(\mathcal{V}\)be two positive integrable functions defined on\([0,\infty )\)such that

for all\(\zeta \in [0,\lambda ]\). Then one has

Corollary 3.3

Let\(k=1\). Then Lemma 3.1reduces to the inequality for generalized Riemann–Liouville fractional integrals as follows:

Corollary 3.4

Let\(\varPsi (\lambda )=\lambda \). Then Lemma 3.1leads to the inequality fork-fractional integral as follows:

Remark 3.5

Let \(\varPsi (\lambda )=\lambda \) and \(k=1\). Then Lemma 3.1 becomes Lemma 3.1 of [67].

Lemma 3.6

Let\(k, \lambda, \varrho, \delta >0\)and\(\mathcal{U}\), \(\mathcal{V}\), \(\rho _{1}\), \(\rho _{2}\), \(\chi _{1}\), and\(\chi _{2}\)be six positive integrable functions defined on\([0,\infty )\)such that (3.1) holds for all\(\zeta \in [0, \lambda ]\). Then we have

Proof

From (3.1) we clearly see that

and

which imply that

Multiplying both sides of inequality (3.9) by \(\chi _{1}(\eta )\chi _{2}(\eta )\mathcal{V}^{2}(\eta )\), we have

Multiplying both sides of inequality (3.10) by

and then integrating the obtained inequality with respect to ζ and η from 0 to λ, one has

Making use of the arithmetic-geometric mean inequality, we obtain

which leads to the desired inequality (3.8). □

Corollary 3.7

For\(k, \lambda, \varrho,\delta >0\), and\(\mathcal{U}\)and\(\mathcal{V}\)being two positive integrable functions defined on\([0,\infty )\)such that inequality (3.6) holds for\(\zeta \in [0, \lambda ]\), we have

Corollary 3.8

Let\(k=1\). Then Lemma 3.6leads to a new inequality for generalized Riemann–Liouville fractional integral as follows:

Corollary 3.9

Let\(\varPsi (\lambda )=\lambda \). Then Lemma 3.6leads to a new inequality fork-fractional integral as follows:

Remark 3.10

If \(\varPsi (\lambda )=\lambda \) and \(k=1\), then Lemma 3.6 reduces to Lemma 3.3 of [67].

Theorem 3.11

Let\(k, \lambda, \varrho,\delta >0\), and\(\mathcal{U}\), \(\mathcal{V}\), \(\rho _{1}\), \(\rho _{2}\), \(\chi _{1}\), and\(\chi _{2}\)be six positive integrable functions defined on\([0,\infty )\)such that (3.1) holds for all\(\zeta \in [0, \lambda ]\). Then we have

Proof

It follows from (3.1) that

which implies

Analogously, we obtain

from which one has

Multiplying (3.14) and (3.15), we get the desired inequality (3.13). □

Corollary 3.12

For\(k, \lambda, \varrho,\delta >0\), and\(\mathcal{U}\)and\(\mathcal{V}\)being two positive integrable functions defined on\([0,\infty )\)such that (3.6) holds for all\(\zeta \in [0, \lambda ]\), we have

Corollary 3.13

If\(k=1\), then Theorem 3.11gives the following new result for generalized Riemann–Liouville fractional integral:

Corollary 3.14

Let\(\varPsi (\lambda )=\lambda \). Then Theorem 3.11leads to the following new result for Riemann–Liouvillek-fractional integral:

Remark 3.15

If \(\varPsi (\lambda )=\lambda \) and \(\mathcal{K}=1\), then Theorem 3.11 reduces to Lemma 3.4 of [67].

In this section, we present several Čebyšev type inequalities for generalized k-fractional integrals defined in (2.3) and (2.4).

Theorem 4.1

Let\(k, \lambda, \varrho >0\), and\(\mathcal{U}\)and\(\mathcal{V}\)be two integrable and synchronous functions on\([0,\infty )\). Then one has

Proof

It follows from the synchronism of the functions \(\mathcal{U}\) and \(\mathcal{V}\) on the interval \([0,\infty )\) that

Multiplying both sides of inequality (4.1) by

for \(\lambda \in \mathbb{R}\) gives

Integrating the above inequality with respect to r over \((0,\lambda )\) leads to

Therefore, we get

and

where

Multiplying both sides of inequality (4.2) by

leads to the conclusion that

Integrating the above inequality over \((0,\lambda )\) reveals

Therefore,

This completes the proof of Theorem 4.1. □

Corollary 4.2

Let\(k=1\). Then Theorem 4.1leads to a new result for generalized Riemann–Liouville fractional integrals as follows:

Corollary 4.3

If\(\varPsi (\lambda )=\lambda \), then Theorem 4.1provides a new inequality fork-fractional integral as follows:

Corollary 4.4

Let\(\varPsi (\lambda )=\lambda \)and\(k=1\). Then Theorem 4.1leads to a new result for Riemann–Liouville fractional integral as follows:

Theorem 4.5

Let\(k, \lambda, \varrho, \delta >0\), and\(\mathcal{U}\)and\(\mathcal{V}\)be two integrable and synchronous functions on\([0,\infty )\). Then

Proof

Multiplying both sides of inequality (4.2) by

gives

Integrating both sides of the above inequality with respect to s over \((0,\lambda )\) leads to

Therefore,

which is the proof of Theorem 4.5. □

Remark 4.6

Let \(\varrho =\delta \). Then Theorem 4.5 becomes Theorem 4.1.

Corollary 4.7

Let\(k=1\). Then Theorem 4.5provides a new result for generalized Riemann–Liouville fractional integrals as follows:

Corollary 4.8

If\(\varPsi (\lambda )=\lambda \)and\(k=1\), then Theorem 4.5gives a new result for Riemann–Liouville fractional integral as follows:

Theorem 4.9

Let\(k, \lambda, \varrho >0\), \(\sigma _{1},\sigma _{2}\in \mathbb{R}\)with\(\sigma _{1}<\sigma _{2}\), and\(\mathcal{U}_{j}\)\((1\leq j\leq \gamma )\)be a real-valued increasing function on\([\sigma _{1},\sigma _{2}]\). Then

Proof

We use mathematical induction on \(\gamma \in \mathbb{N}\) to prove Theorem 4.9. We clearly see that inequality (4.3) holds for \(\gamma =1\).

For \(\gamma =2\), since \(\mathcal{U}_{1}\), \(\mathcal{U}_{2}\) are increasing, we have

Note that the left-hand side of inequality (4.3) for \(\gamma =2\) is the same as that of Theorem 4.1. Therefore, inequality (4.3) also holds for \(\gamma =2\).

Suppose that inequality (4.3) holds for some \(\gamma \geq 2\). We observe that \(\mathcal{U}=\prod_{j=1}^{\gamma }\mathcal{U}_{j}\) is increasing due to \(\mathcal{U}_{j}\) is increasing. Let \(\mathcal{V}=\mathcal{U}_{\gamma +1}\). Then applying the case \(\gamma =2\) to the functions \(\mathcal{U}\) and \(\mathcal{V}\) produces

in which the induction hypothesis for γ is used inside the deduction of second inequality. The proof of Theorem 4.9 is completed. □

Corollary 4.10

Let\(k=1\). Then Theorem 4.9leads to the following new result for generalized Riemann–Liouville fractional integral:

Corollary 4.11

If\(\varPsi (\lambda )=\lambda \), then Theorem 4.9leads to a new result fork-fractional integral as follows:

Corollary 4.12

Let\(\varPsi (\lambda )=\lambda \)and\(k=1\). Then Theorem 4.9provides a new result for Riemann–Liouville fractional integral as follows:

Theorem 4.13

Let\(k, \lambda, \varrho >0\), \(\mathcal{U} \)and\(\mathcal{V}\)be two positive functions defined on\([0, \infty )\)such that\(\mathcal{U}\)is increasing and\(\mathcal{V}\)is differentiable, and\(\vartheta =\inf_{\mu \in [0,\infty )}\mathcal{V}^{\prime }(\mu )\). Then one has

where\(\mathcal{I}(\lambda )\)is the identity mapping.

Proof

Let \(\mathfrak{h}(\lambda )=\mathcal{V}(\lambda )-\vartheta \lambda \) and \(\varUpsilon (\lambda )=\vartheta \lambda \). Then we clearly see that \(\mathfrak{h}\) is differentiable and increasing on \([0,\infty )\), and from the proof of Theorem 4.9 we know that

where

and

Substituting (4.7) and (4.8) into (4.6) leads to the desired result. □

Corollary 4.14

Let\(k=1\). Then Theorem 4.13leads to a new result for generalized Riemann–Liouville fractional integral as follows:

Corollary 4.15

If\(\varPsi (\lambda )=\lambda \), Theorem 4.13provides the following new result fork-fractional integral:

Corollary 4.16

Let\(\varPsi (\lambda )=\lambda \)and\(k=1\). Then Theorem 4.13leads to a new inequality for Riemann–Liouville fractional integral as follows:

In the article, we have established some new Pólya–Szegö and Čebyšev-type inequalities for two synchronous functions via generalized k-fractional integrals. Our obtained results are very general and can be specialized to discover numerous interesting fractional integral inequalities, and our approach may lead to a lot of follow-up research. Furthermore, they are expected to find some applications for establishing the uniqueness of solutions in fractional boundary value problems of the fractional partial differential equations.

Acknowledgements

The authors would like to express their sincere thanks to the anonymous reviewers for their helpful comments and suggestions.

Availability of data and materials

Not applicable.

The work was supported by the Natural Science Foundation of China (Grant Nos. 61673169, 11301127, 11701176, 11626101, 11601485).

Authors and Affiliations

1. Department of Mathematics, COMSATS University Islamabad, Islamabad, Pakistan

   Saima Rashid

2. Department of Mathematics, Çankaya University, Ankara, Turkey

   Fahd Jarad

3. School of Mathematical Sciences, Zhejiang University, Hangzhou, China

   Humaira Kalsoom

4. Department of Mathematics, Huzhou University, Huzhou, China

   Yu-Ming Chu

5. School of Mathematics and Statistic, Changsha University of Science & Technology, Changsha, China

   Yu-Ming Chu

Contributions

All authors contributed equally to the writing of this paper. All authors read and approved the final manuscript.

Corresponding author

Correspondence to Yu-Ming Chu.

Competing interests

The authors declare that they have no competing interests.

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