Abstract

The main objective of this paper is to establish some, presumably, new Saigo type fractional integral inequalities whose special cases are shown to yield corresponding inequalities associated with Riemann-Liouville and Erdélyi-Kober type fractional integral operators, respectively. We also investigate and present -extensions of the above results and some other presumably new ones. Relevant connections of the results presented here with those earlier ones are also indicated.

1. Introduction and Preliminaries

Throughout this paper, , , , and denote the sets of positive integers, real numbers, complex numbers, and nonpositive integers, respectively, and . Consider the following functional: where are two integrable functions on and and are positive integrable functions on . If and are synchronous on , that is, for any , then we have (see, e.g., [1, 2]) The inequality in (2) is reversed, if and are asynchronous on , that is, for any . If , for any , we get the Chebyshev inequality (see [3]). Ostrowski [4] established the following generalization of the Chebyshev inequality.

If and are two differentiable and synchronous functions on and is a positive integrable function on with and , for , then we have If and are asynchronous on , then we have

If and are two differentiable functions on with and , for , and is a positive integrable function on , then we have

The functional (1) has attracted many researchers’ attention due mainly to diverse applications in numerical quadrature, transform theory, and probability and statistical problems. Among those applications, the functional (1) has also been employed to yield a number of integral inequalities (see, e.g., [5–12]; for a very recent work, see also [13]).

Here, in this paper, we aim at establishing certain, presumably, new inequalities involving Saigo fractional integral operator (8) whose special cases are shown to yield corresponding inequalities associated with Riemann-Liouville fractional integral operator (11) and Erdélyi-Kober fractional integral operator (12). We also investigate and present -extensions of our results and some other presumably new ones. Relevant connections of some of the results presented here with those earlier ones are also pointed out.

For our purpose, we also need to recall the following definitions and some earlier works.

Definition 1. A real-valued function is said to be in the space , if there exists a real number such that , where .

Definition 2. A function is said to be in the space , if .

Definition 3. Let and . Then the Saigo fractional integral (in terms of the Gauss hypergeometric function) of order for a real-valued continuous function is defined by (see [14]; see also [15]) where the function is the Gaussian hypergeometric function defined by (see, e.g., [16, Section 1.5]) and is the familiar Gamma function. Here, is the Pochhammer symbol defined, for , by (see, e.g., [16, p. 2 and pp. 4–6])

It is noted that Saigo fractional integral operator includes both Riemann-Liouville and Erdélyi-Kober fractional integral operators, respectively, given by the following relationships (see, e.g., [17]), for :

For our purpose, we also recall the following definitions (see, e.g., [16, Section 6]) and some earlier works.

The -shifted factorial is defined by where and it is assumed that .

The -shifted factorial for negative subscript is defined by We also write It follows from (13), (14), and (15) that which can be extended to as follows: where the principal value of is taken.

We begin by noting that F. J. Jackson was the first to develop -calculus in a systematic way. The -derivative of a function is defined by It is noted that if is differentiable.

The function is a -antiderivative of , if . It is denoted by The Jackson integral of is thus defined, formally, by which can be easily generalized as follows:

Suppose that . The definite -integral is defined as follows: A more general version of (23) is given by

The classical Gamma function (see, e.g., [16, Section 1.1]) was found by Euler, while he was trying to extend the factorial to real numbers. The -factorial function of , defined by can be rewritten as follows: By replacing by in (27), Jackson [18] defined the -Gamma function by

The -analogue of is defined by the polynomial

Definition 4. Let ; let and be real or complex numbers. Then a -analogue of Saigo's fractional integral is given for by (see [19, p. 172, Equation ])

The integral operator includes both the -analogues of the Riemann-Liouville and Erdélyi-Kober fractional integral operators given by the following definitions.

Definition 5. A -analogue of Riemann-Liouville fractional integral operator of a function of an order is given by (see [20]) where is given by (17).

Definition 6. A -analogue of the Erdélyi-Kober fractional integral operator for , , and is given by (see [20])

2. Certain Inequalities Involving Saigo Fractional Integral Operator

Here, we start with presenting an inequality involving Saigo fractional integral (8) asserted by the following lemma.

Lemma 7. Let and be two continuous and synchronous functions on and let be continuous functions. Then the following inequality holds true: for all , , and , with and .

Proof. Let and be two continuous and synchronous functions on . Then, for all , with , we have or, equivalently, Consider the following function defined by We observe that each term of the above series is nonnegative under the conditions in Lemma 7, and, hence, the function remains nonnegative for all .
Now, by multiplying both sides of (35) by defined by (36), integrating the resulting inequality with respect to from to , and using (8), we get
Next, by multiplying both sides of (37) by , where is given when is replaced by in (36), integrating the resulting inequality with respect to from to , and using (8), we are led to the desired result (33).

Theorem 8. Let and be two continuous and synchronous functions on and let be continuous functions. Then the following inequality holds true: for all , , and , with and .

Proof. By setting and in Lemma 7, we get Since under the given conditions, by multiplying both sides of (39) by , we have Similarly, by replacing , by , and , by , , respectively, in (33) and then multiplying both sides of the resulting inequalities by and both of which are nonnegative under the given assumptions, respectively, we get the following inequalities: Finally, by adding (40) and (41), side by side, we arrive at the desired result (38).