Ostrowski–Trapezoid–Grüss-Type on (q, ω)-Hahn Difference Operator

El-Deeb, Ahmed A.; Awrejcewicz, Jan

doi:10.3390/sym14091776

Open AccessArticle

Ostrowski–Trapezoid–Grüss-Type on (q, ω)-Hahn Difference Operator

by

Ahmed A. El-Deeb

^1,*

and

Jan Awrejcewicz

^2,*

¹

Department of Mathematics, Faculty of Science, Al-Azhar University, Nasr City, Cairo 11884, Egypt

²

Department of Automation, Biomechanics and Mechatronics, Lodz University of Technology, 1/15 Stefanowski St., 90-924 Lodz, Poland

^*

Authors to whom correspondence should be addressed.

Symmetry 2022, 14(9), 1776; https://doi.org/10.3390/sym14091776

Submission received: 23 July 2022 / Revised: 14 August 2022 / Accepted: 18 August 2022 / Published: 26 August 2022

(This article belongs to the Section Mathematics)

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Abstract

:

We use two parameters for functions whose second (q, ω)-derivatives are bounded in order to prove several recent extensions of the Ostrowski inequality and its companion inequalities on (q, ω)-Hahn difference operator. Furthermore, we procure some q-integral and continuous inequalities as special cases of the main results as well these generalizations. Symmetry plays an essential role in determining the correct methods to solve dynamic inequalities.

Keywords:

(q, ω)-Hahn difference operator; montgomery identity; Ostrowski-type inequality; trapezoid-type inequality; Grüss-type inequality

1. Introduction

In 1938, the following integral inequality was proved by Ostrowski [1].

Theorem 1.

Let the function

Ξ : [τ, ν] \to R

be continuous on

[τ, ν]

and differentiable on

(τ, ν)

, then for all

ς \in [τ, ν]

, we obtain

| Ξ (ς) - \frac{1}{ν - τ} \int_{τ}^{ν} Ξ (ξ) d ξ | \leq sup_{τ < ξ < ν} | Ξ^{'} (ξ) | (ν - τ) [\frac{{(ς - \frac{τ + ν}{2})}^{2}}{{(ν - τ)}^{2}} + \frac{1}{4}] .

(1)

Clearly, an upper bound is estimated by inequality (1) on account of the absolute deviation between the value of

Ξ

at a point

ς

in

[τ, ν]

and its integral mean over

[τ, ν]

.

The following inequality was proved by Grüss [2] with a view to make the absolute deviation of the integral mean of the product of two functions be estimated from the product of the integral means.

Theorem 2.

Assume that Ξ and ϕ are continuous functions on

[τ, ν]

such that

m_{1} \leq Ξ (ξ) \leq M_{1} a n d m_{2} \leq ϕ (ξ) \leq M_{2}, f o r a l l ξ \in [τ, ν] .

Then the following inequality

| \frac{1}{ν - τ} \int_{τ}^{ν} Ξ (ξ) ϕ (ξ) d ξ - \frac{1}{{(ν - τ)}^{2}} \int_{τ}^{ν} Ξ (ξ) d ξ \int_{τ}^{ν} ϕ (ξ) d ξ | \leq \frac{1}{4} (M_{1} - m_{1}) (M_{2} - m_{2})

(2)

holds.

In the literature, inequality (2) is well known as the Grüss inequality.

The next inequality, which is known in the literature as the trapezoid inequality [3], is one of the companion inequalities of the Ostrowski inequality.

Theorem 3.

Assume that Ξ is a twice differentiable function on

[τ, ν]

, then

| \frac{Ξ (τ) + Ξ (ν)}{2} (ν - τ) - \int_{τ}^{ν} Ξ (ξ) d ξ | \leq sup_{τ < ξ < ν} | Ξ^{″} (ξ) | \frac{{(ν - τ)}^{3}}{12} .

In [4], Pachpatte procured the next trapezoid and Grüss-type inequality.

Theorem 4.

Suppose that

Ξ : [τ, ν] \to R

is continuous and differentiable on

(τ, ν)

, and its first derivative

Ξ^{'} : (τ, ν) \to R

is bounded on

(τ, ν)

, then

| \frac{Ξ^{2} (ν) - Ξ^{2} (τ)}{2} - \frac{Ξ (ν) - Ξ (τ)}{b - τ} \int_{τ}^{ν} Ξ (ξ) d ξ | \leq \frac{M^{2} {(ν - τ)}^{2}}{3},

where

M = sup_{τ < ξ < ν} Ξ^{'} (ξ)

.

Additionally, in the same paper [4], Pachpatte proved the following inequality.

Theorem 5.

Assume that

Ξ : [τ, ν] \to R

is continuous and differentiable on

(τ, ν)

, and its first derivative

Ξ^{'} : (τ, ν) \to R

is bounded on

(τ, ν)

, then

| \frac{Ξ^{2} (ν) - Ξ^{2} (τ)}{2} - \frac{Ξ (ν) - Ξ (τ)}{b - τ} \int_{τ}^{ν} Ξ (ξ) d ξ | \leq \frac{M^{2} {(ν - τ)}^{2}}{3},

where

M = sup_{τ < ξ < ν} Ξ^{'} (ξ)

.

In several fields, especially in numerical analysis, Ostrowski’s inequality has a very significant role, where we could use it in the estimation of the error in the approximation of integrals.

During the past few decades, many generalizations and amendments of the Ostrowski inequality and its associated inequalities have been done. The articles [2,3,5,6,7,8,9,10,11,12,13,14,15,16], the books [3,17] and the references cited therein are a few examples we refer to. Symmetry plays an essential role in determining the correct methods to solve dynamic inequalities.

The purpose of the present paper is as follows: first, we institute a new Ostrowski-type inequality on (q, ω)-Hahn difference operator for functions whose second (q, ω)-derivatives are bounded. Then, we confirm new generalized Trapezoid- and Grüss-type inequalities on (q, ω)-Hahn difference operator. A number of continuous and q-integral inequalities are obtained as special cases of our result.

This paper is ordered as follows: In Section 2, we set the essential definitions and concepts associated to the calculus on (q, ω)-Hahn difference operator substantially. In Section 3, our major results are stated and proved. In Section 4, the conclusion is stated.

2. Preliminaries

This section briefly introduces the calculus of Hahn-difference operators as established in [18]. Let

q \in (0, 1),

ω > 0

be fixed,

ω_{0} : = ω / (1 - q)

, and I be an interval of

R

containing

ω_{0}

. Let

h (ζ) : = q ζ + ω, ζ \in I .

Both

h (ζ)

and

h^{- 1} (ζ)

. The numbers

ω_{0}

play the role played by

ζ = 0

in the q-setting. In fact,

ω_{0} = lim_{k \to \infty} (\underset{k - times}{\underset{︸}{h \circ h \circ \dots \circ h}}) (ζ) .

The transformation

h (ζ)

has the inverse

h^{- 1} (ζ) = (ζ - ω) / q, ζ \in I .

The (q, ω)-Hahn difference operator introduced by Hahn in [19] can be defined as follows

Definition 1.

Let f be a function defined on I. The Hahn difference operator is defined by

D_{q, ω} f (ζ) : = \{\begin{matrix} \frac{f (q ζ + ω) - f (ζ)}{(q ζ + ω) - ζ}, & ζ \neq ω_{0}, \\ f^{'} (ω_{0}), & ζ = ω_{0}, \end{matrix}

(3)

provided that f is differentiable at

ω_{0} .

In this case, we call D_q,ωf, the (q, ω)-derivative of f. We say that f is (q, ω)-differentiable, i.e., throughout I, if

D_{q, ω} f (ω_{0})

exists.

Note that

lim_{ω ↑ 0} D_{q, ω} f (ζ) = D_{q} f (ζ),

lim_{q ↓ 1, ω ↑ 0} D_{q, ω} f (ζ) = f^{'} (ζ)

taking into account

↓, ↑

that mean limits from left and right at finite points, respectively. One can easily check that if

f, g

are (q, ω)-differentiable at

ζ \in I,

then

\begin{matrix} D_{q, ω} (α f + β g) (ζ) & = & α D_{q, ω} f (ζ) + β D_{q, ω} g (ζ), α, β \in C, \\ D_{q, ω} (f g) (ζ) & = & D_{q, ω} (f (ζ)) g (ζ) + f (q ζ + ω) D_{q, ω} g (ζ), \\ D_{q, ω} (\frac{f}{g}) (ζ) & = & \frac{D_{q, ω} (f (ζ)) g (ζ) - f (ζ) D_{q, ω} g (ζ)}{g (ζ) g (q ζ + ω)}, \end{matrix}

(4)

provided in the last identity

g (ζ) g (q t + ω) \neq 0,

cf. [18]. The right inverse for

D_{q, ω}

is defined in [18] in terms of Jackson–Nörlund sums as follows cf. [20]. Let

a, b \in I

the

(q, ω)

-integral of f from a to b is defined to be

\int_{a}^{b} f (ζ) d_{q, ω} ζ : = \int_{ω_{0}}^{b} f (ζ) d_{q, ω} ζ - \int_{ω_{0}}^{a} f (ζ) d_{q, ω} ζ,

(5)

\int_{ω_{0}}^{x} f (ζ) d_{q, ω} ζ : = (x (1 - q) - ω) \sum_{k = 0}^{\infty} q^{k} f (x q^{k} + ω {[k]}_{q}), x \in I,

(6)

provided that the series converges at

x = a

and

x = b .

Here

{[k]}_{q}

is the q-number

{[k]}_{q} : = \frac{1 - q^{k}}{1 - q}, k \in N_{0} .

In this case, f is called

(q, ω)

-integrable on

[a, b]

and the sum to the right hand side of (6) will be called the Jackson–Nörlund sum—see [20] for the relationship between Nörlund sums and the difference operators. The fundamental theorem of

(q, ω)

-calculus given in [18] states that if

f : I ⟶ R

is continuous at

ω_{0}

,

F (ζ) : = \int_{ω_{0}}^{ζ} f (x) d_{q, ω} x . ζ \in I,

then F is continuous at

ω_{0} .

Furthermore,

D_{q, ω} F (ζ)

exists for every

ζ \in I

and

D_{q, ω} F (ζ) = f (ζ) .

Conversely,

\int_{a}^{b} D_{q, ω} f (ζ) d_{q, ω} ζ = f (b) - f (a) for all a, b \in I .

Consequently, the

(q, ω)

- integration by parts for continuous function

f, g

is given in [18] by

\int_{a}^{b} f (ζ) D_{q, ω} g (ζ) d_{q, ω} ζ = f (ζ) g (ζ) |_{a}^{b} - \int_{a}^{b} D_{q, ω} (f (ζ)) g (q t + ω) d_{q, ω} ζ, a, b \in I .

(7)

Lemma 1

([18]). Let

s \in I

,

s > ω_{0},

f and g be

(q, ω)

-integrable on

I,

then for

a, b \in {s q^{k} + ω {[k]}_{q}}_{k = 0}^{\infty}

we have

| \int_{a}^{b} f (ζ) d_{q, ω} ζ | ⩽ \int_{a}^{b} | f (ζ) | d_{q, ω} ζ .

(8)

Consequently, if

g (ζ) ⩾ 0

for all

ζ \in {s q^{k} + ω {[k]}_{q}}_{k = 0}^{\infty},

then for all

a, b \in {s q^{k} + ω {[k]}_{q}}_{k = 0}^{\infty}

the inequalities

\int_{ω_{0}}^{b} g (ζ) d_{q, ω} ζ ⩾ 0 and \int_{a}^{b} g (ζ) d_{q, ω} ζ ⩾ 0

(9)

holds.

3. Main Results

3.1. An Ostrowski-Type Inequality on (q, ω)-Hahn Difference Operator

Theorem 6.

Let

ζ \in I,

ζ > ω_{0}

with τ, ν, ς,

ξ \in {t q^{k} + ω {[k]}_{q}}_{k = 0}^{\infty}

and

τ < ν

. Further, assume that

Ξ : [τ, ν] \to R

is a twice

(q, ω)

-differentiable function. Then, for all

ς \in [τ, ν]

and

η, γ \in R

, we get

\begin{matrix} | Ξ (ς) - \frac{1}{η + γ} [\frac{η}{ς - τ} \int_{τ}^{ς} Ξ (q ξ + ω) d_{q, ω} ξ + \frac{γ}{ν - ς} \int_{ς}^{ν} Ξ (q ξ + ω) d_{q, ω} ξ] \\ - \frac{1}{η + γ} [\int_{τ}^{ν} \int_{τ}^{ξ} \frac{η}{ξ - τ} Ω (ς, ξ) D_{q, ω} Ξ (q s + ω) d_{q, ω} s d_{q, ω} ξ \\ + \int_{τ}^{ν} \int_{ξ}^{ν} \frac{γ}{ν - ς} Ω (ς, ξ) D_{q, ω} Ξ (q s + ω) d_{q, ω} s d_{q, ω} ξ] | \\ ⩽ K \int_{τ}^{ν} \int_{τ}^{ν} | Ω (ς, ξ) Ω (ξ, s) | d_{q, ω} s d_{q, ω} ξ, \end{matrix}

(10)

where

Ω (ς, ξ) = \{\begin{matrix} \frac{η}{η + γ} (\frac{ξ - τ}{ς - τ}), & τ \leq ξ < ς, \\ \frac{- γ}{η + γ} (\frac{ν - ξ}{ν - ς}), & ς \leq ξ \leq ν \end{matrix}

and

K = sup_{τ < ξ < ν} | D_{q, ω}^{2} Ξ (ξ) | < \infty .

Proof.

If we use integration by parts Formula (7), we obtain

\int_{τ}^{ς} \frac{η}{η + γ} (\frac{ξ - τ}{ς - τ}) D_{q, ω} Ξ (ξ) d_{q, ω} ξ = \frac{η}{η + γ} Ξ (ς) - \frac{η}{(η + γ) (ς - τ)} \int_{τ}^{ς} Ξ (q ξ + ω) d_{q, ω} ξ,

(11)

and

\int_{ς}^{ν} \frac{- γ}{η + γ} (\frac{ν - ξ}{ν - ς}) D_{q, ω} Ξ (ξ) d_{q, ω} ξ = \frac{γ}{η + γ} Ξ (ς) - \frac{γ}{(η + γ) (ν - ς)} \int_{ς}^{ν} Ξ (q ξ + ω) d_{q, ω} ξ .

(12)

Adding (11) and (12), we obtain

\int_{τ}^{ν} Ω (ς, ξ) D_{q, ω} Ξ (ξ) d_{q, ω} ξ = Ξ (ς) - \frac{1}{η + γ} [\frac{η}{ς - τ} \int_{τ}^{ς} Ξ (q ξ + ω) d_{q, ω} ξ + \frac{γ}{ν - ς} \int_{ς}^{ν} Ξ (q ξ + ω) d_{q, ω} ξ] .

(13)

Similarly, we have

\begin{matrix} \int_{τ}^{ν} Ω (ξ, s) D_{q, ω}^{2} Ξ (s) d_{q, ω} s \\ = D_{q, ω} Ξ (ξ) - \frac{1}{η + γ} [\frac{η}{ξ - τ} \int_{τ}^{ξ} D_{q, ω} Ξ (q s + ω) d_{q, ω} s + \frac{γ}{ν - ξ} \int_{ξ}^{ν} D_{q, ω} Ξ (q s + ω) d_{q, ω} s] . \end{matrix}

(14)

Substituting (14) into (13) leads to

\begin{matrix} \int_{τ}^{ν} \int_{τ}^{ν} Ω (ς, ξ) Ω (ξ, s) D_{q, ω}^{2} Ξ (s) d_{q, ω} s d_{q, ω} ξ \\ + \frac{1}{η + γ} [\int_{τ}^{ν} \int_{τ}^{ξ} \frac{η}{ξ - τ} Ω (ς, ξ) D_{q, ω} Ξ (q s + ω) d_{q, ω} s d_{q, ω} ξ \\ + \int_{τ}^{ν} \int_{ξ}^{ν} \frac{γ}{ν - ξ} Ω (ς, ξ) D_{q, ω} Ξ (q s + ω) d_{q, ω} s d_{q, ω} ξ] \\ = Ξ (ς) - \frac{1}{η + γ} [\frac{η}{ς - τ} \int_{τ}^{ς} Ξ (q ξ + ω) d_{q, ω} ξ + \frac{γ}{ν - ς} \int_{ς}^{ν} Ξ (q ξ + ω) d_{q, ω} ξ] . \end{matrix}

(15)

Inequality (10) follows directly from (15) and the properties of modulus. So, the proof is completed by this. □

Corollary 1.

Tn Theorem 6, if one takes

ω ⟶ 0^{+}

, then, inequality (10) becomes

\begin{matrix} | Ξ (ς) - \frac{1}{η + γ} [\frac{η}{ς - τ} \int_{τ}^{ς} Ξ (q ξ) d_{q} ξ + \frac{γ}{ν - ς} \int_{ς}^{ν} Ξ (q ξ) d_{q} ξ] \\ - \frac{1}{η + γ} [\int_{τ}^{ν} \int_{τ}^{ξ} \frac{η}{ξ - τ} Ω (ς, ξ) D_{q} Ξ (q s) d_{q} s d_{q} ξ \\ + \int_{τ}^{ν} \int_{ξ}^{ν} \frac{γ}{ν - ς} Ω (ς, ξ) D_{q} Ξ (q s) d_{q} s d_{q} ξ] | \\ ⩽ K \int_{τ}^{ν} \int_{τ}^{ν} | Ω (ς, ξ) Ω (ξ, s) | d_{q} s d_{q} ξ, \end{matrix}

where

Ω (ς, ξ) = \{\begin{matrix} \frac{η}{η + γ} (\frac{ξ - τ}{ς - τ}), & τ \leq ξ < ς, \\ \frac{- γ}{η + γ} (\frac{ν - ξ}{ν - ς}), & ς \leq ξ \leq ν \end{matrix}

and

K = sup_{τ < ξ < ν} | D_{q}^{2} Ξ (ξ) | < \infty .

Corollary 2.

If we take

q ⟶ 1^{-}

and

ω ⟶ 0^{+}

in Theorem 6, then, inequality (10) becomes

\begin{matrix} | Ξ (ς) - \frac{1}{η + γ} [\frac{η}{ς - τ} \int_{τ}^{ς} Ξ (ξ) d ξ + \frac{γ}{ν - ς} \int_{ς}^{ν} Ξ (ξ) d ξ] \\ - \frac{1}{η + γ} [\int_{τ}^{ν} \int_{τ}^{ξ} \frac{η}{ξ - τ} Ω (ς, ξ) Ξ^{'} (s) d s d ξ \\ + \int_{τ}^{ν} \int_{ξ}^{ν} \frac{γ}{ν - ς} Ω (ς, ξ) Ξ^{'} (s) d s d ξ] | \\ ⩽ K \int_{τ}^{ν} \int_{τ}^{ν} | Ω (ς, ξ) Ω (ξ, s) | d s d ξ, \end{matrix}

where

Ω (ς, ξ) = \{\begin{matrix} \frac{η}{η + γ} (\frac{ξ - τ}{ς - τ}), & τ \leq ξ < ς, \\ \frac{- γ}{η + γ} (\frac{ν - ξ}{ν - ς}), & ς \leq ξ \leq ν \end{matrix}

and

K = sup_{τ < ξ < ν} | Ξ^{″} (ξ) | < \infty .

3.2. A Trapezoid-Type Inequality on (q, ω)-Hahn Difference Operator

Theorem 7.

Under the same assumptions as in Theorem 6, we have

\begin{matrix} | Ξ^{2} (ν) - Ξ^{2} (τ) - \frac{1}{η + γ} \int_{τ}^{ν} [\frac{η}{ς - τ} \int_{τ}^{ς} [Ξ (q ξ + ω) + Ξ (q^{2} ξ + ω {[2]}_{q})] d_{q, ω} ξ \\ + \frac{γ}{ν - ς} \int_{ς}^{ν} [Ξ (q ξ + ω) + Ξ (q^{2} ξ + ω {[2]}_{q})] d_{q, ω} ξ] d_{q, ω} ς | \\ \leq M (M + P) \int_{τ}^{ν} \int_{τ}^{ν} | Ω (ς, ξ) | d_{q, ω} ξ d_{q, ω} ς, \end{matrix}

(16)

where

Ω (ς, ξ) = \{\begin{matrix} \frac{η}{η + γ} (\frac{ξ - τ}{ς - τ}), & τ \leq ξ < ς, \\ \frac{- γ}{η + γ} (\frac{ν - ξ}{ν - ς}), & ς \leq ξ \leq ν \end{matrix}

and

M = sup_{τ < ξ < ν} | D_{q, ω} Ξ (ξ) | a n d P = sup_{τ < ξ < ν} | D_{q, ω} Ξ (q ξ + ω) | .

Proof.

From (13) we have

Ξ (ς) = \int_{τ}^{ν} Ω (ς, ξ) D_{q, ω} Ξ (ξ) d_{q, ω} ξ + \frac{1}{η + γ} [\frac{η}{ς - τ} \int_{τ}^{ς} Ξ (q ξ + ω) d_{q, ω} ξ + \frac{γ}{ν - ς} \int_{ς}^{ν} Ξ (q ξ + ω) d_{q, ω} ξ]

(17)

and similarly

\begin{matrix} Ξ (q ς + ω) & = \int_{τ}^{ν} Ω (ς, ξ) D_{q, ω} Ξ (q ξ + ω) d_{q, ω} ξ + \frac{1}{η + γ} [\frac{η}{ς - τ} \int_{τ}^{ς} Ξ (q^{2} ξ + ω {[2]}_{q}) d_{q, ω} ξ \\ + \frac{γ}{ν - ς} \int_{ς}^{ν} Ξ (q^{2} ξ + ω {[2]}_{q}) d_{q, ω} ξ] . \end{matrix}

(18)

Now, adding (17) and (18) produces

\begin{matrix} Ξ (ς) + Ξ (q ς + ω) & = & \int_{τ}^{ν} Ω (ς, ξ) [D_{q, ω} Ξ (ξ) + D_{q, ω} Ξ (q ξ + ω)] d_{q, ω} ξ \\ + \frac{1}{η + γ} [\frac{η}{ς - τ} \int_{τ}^{ς} [Ξ (q ξ + ω) + Ξ (q^{2} ξ + ω {[2]}_{q})] d_{q, ω} ξ \\ + \frac{γ}{ν - ς} \int_{ς}^{ν} [Ξ (q ξ + ω) + Ξ (q^{2} ξ + ω {[2]}_{q})] d_{q, ω} ξ] . \end{matrix}

If we multiply the latest identity by

D_{q, ω} Ξ (ς)

, and by employing (7) and integrating the resulting identity with respect to

ς

from

τ

to

ν

we obtain

\begin{matrix} Ξ^{2} (ν) - Ξ^{2} (τ) & = & \int_{τ}^{ν} \int_{τ}^{ν} D_{q, ω} Ξ (ς) Ω (ς, ξ) [D_{q, ω} Ξ (ξ) + D_{q, ω} Ξ (q ξ + ω)] d_{q, ω} ξ d_{q, ω} ς \\ + \frac{1}{η + γ} \int_{τ}^{ν} D_{q, ω} Ξ (ς) [\frac{η}{ς - τ} \int_{τ}^{ς} [Ξ (q ξ + ω) + Ξ (q^{2} ξ + ω {[2]}_{q})] d_{q, ω} ξ \\ + \frac{γ}{ν - ς} \int_{ς}^{ν} [Ξ (q ξ + ω) + Ξ (q^{2} ξ + ω {[2]}_{q})] d_{q, ω} ξ] d_{q, ω} ς . \end{matrix}

Equivalently

\begin{matrix} Ξ^{2} (ν) - Ξ^{2} (τ) - \frac{1}{η + γ} \int_{τ}^{ν} D_{q, ω} Ξ (ς) [\frac{η}{ς - τ} \int_{τ}^{ς} [Ξ (q ξ + ω) + Ξ (q^{2} ξ + ω {[2]}_{q})] d_{q, ω} ξ \\ + \frac{γ}{b - ς} \int_{ς}^{ν} [Ξ (q ξ + ω) + Ξ (q^{2} ξ + ω {[2]}_{q})] d_{q, ω} ξ] d_{q, ω} ς \\ = \int_{τ}^{ν} \int_{τ}^{ν} D_{q, ω} Ξ (ς) Ω (ς, ξ) [D_{q, ω} Ξ (ξ) + D_{q, ω} Ξ (q ξ + ω)] d_{q, ω} ξ d_{q, ω} ς . \end{matrix}

If we take the absolute value on both sides, we obtain

\begin{matrix} | Ξ^{2} (ν) - Ξ^{2} (τ) - \frac{1}{η + γ} \int_{τ}^{ν} D_{q, ω} Ξ (ς) [\frac{η}{ς - τ} \int_{τ}^{ς} [Ξ (q ξ + ω) + Ξ (q^{2} ξ + ω {[2]}_{q})] d_{q, ω} ξ \\ + \frac{γ}{ν - ς} \int_{ς}^{ν} [Ξ (q ξ + ω) + Ξ (q^{2} ξ + ω {[2]}_{q})] d_{q, ω} ξ] d_{q, ω} ς | \\ = | \int_{τ}^{ν} \int_{τ}^{ν} D_{q, ω} Ξ (ς) Ω (ς, ξ) [D_{q, ω} Ξ (ξ) + D_{q, ω} Ξ (q ξ + ω)] d_{q, ω} ξ d_{q, ω} ς | \\ \leq \int_{τ}^{ν} \int_{τ}^{ν} | D_{q, ω} Ξ (ς) | | Ω (ς, ξ) | [| D_{q, ω} Ξ (ξ) | + | D_{q, ω} Ξ (q ξ + ω) |] d_{q, ω} ξ d_{q, ω} ς \\ \leq M (M + P) \int_{τ}^{ν} \int_{τ}^{ν} | Ω (ς, ξ) | d_{q, ω} ξ d_{q, ω} ς . \end{matrix}

This shows the validity of (16). □

Corollary 3.

If we take

ω ⟶ 0^{+}

in Theorem 7, then, inequality (16) becomes

\begin{matrix} | Ξ^{2} (ν) - Ξ^{2} (τ) - \frac{1}{η + γ} \int_{τ}^{ν} [\frac{η}{ς - τ} \int_{τ}^{ς} [Ξ (q ξ) + Ξ (q^{2} ξ)] d_{q} ξ \\ + \frac{γ}{ν - ς} \int_{ς}^{ν} [Ξ (q ξ) + Ξ (q^{2} ξ)] d_{q} ξ] d_{q} ς | \\ \leq M (M + P) \int_{τ}^{ν} \int_{τ}^{ν} | Ω (ς, ξ) | d_{q} ξ d_{q} ς, \end{matrix}

where

Ω (ς, ξ) = \{\begin{matrix} \frac{η}{η + γ} (\frac{ξ - τ}{ς - τ}), & τ \leq ξ < ς, \\ \frac{- γ}{η + γ} (\frac{ν - ξ}{ν - ς}), & ς \leq ξ \leq ν \end{matrix}

and

M = sup_{τ < ξ < ν} | D_{q} Ξ (ξ) | a n d P = sup_{τ < ξ < ν} | D_{q} Ξ (q ξ) | .

Corollary 4.

If we take

q ⟶ 1^{-}

and

ω ⟶ 0^{+}

in Theorem 7, then, inequality (16) becomes

\begin{matrix} | \frac{Ξ^{2} (ν) - Ξ^{2} (τ)}{2} - \frac{1}{η + γ} \int_{τ}^{ν} Ξ^{'} (ς) [\frac{η}{ς - τ} \int_{τ}^{ς} Ξ (ξ) d ξ + \frac{γ}{ν - ς} \int_{ς}^{ν} Ξ (ξ) d ξ] d ς | \\ \leq M^{2} \int_{τ}^{ν} \int_{τ}^{ν} | Ω (ς, ξ) | d t d x, \end{matrix}

where

Ω (ς, ξ) = \{\begin{matrix} \frac{η}{η + γ} (\frac{ξ - τ}{ς - τ}), & τ \leq ξ < ς, \\ \frac{- γ}{η + γ} (\frac{ν - ξ}{ν - ς}), & ς \leq ξ \leq ν \end{matrix}

and

M = sup_{τ < ξ < ν} | Ξ^{'} (ξ) | .

3.3. A Grüss-Type Inequality on (q, ω)-Hahn Difference Operator

Theorem 8.

Let

ζ \in I,

ζ > ω_{0}

with τ, ν, ς,

ξ \in {t q^{k} + ω {[k]}_{q}}_{k = 0}^{\infty}

and

τ < ν

. Moreover, assume that Ξ,

ϕ : [τ, ν] \to R

are

(q, ω)

- differentiable functions. Then, for all

ς \in [τ, ν]

and

η, γ \in R

, we obtain

\begin{matrix} | 2 \int_{τ}^{ν} Ξ (ς) ϕ (ς) d_{q, ω} ς - \frac{1}{η + γ} [\frac{η}{ς - τ} \int_{τ}^{ν} \int_{τ}^{ς} (Ξ (q ξ + ω) ϕ (ς) + ϕ (q ξ + ω) Ξ (ς)) d_{q, ω} ξ d_{q, ω} ς \\ + \frac{γ}{ν - ς} \int_{τ}^{ν} \int_{ς}^{ν} (Ξ (q ξ + ω) ϕ (ς) + ϕ (q ξ + ω) Ξ (ς)) d_{q, ω} ξ d_{q, ω} ς] | \\ \leq \int_{τ}^{ν} \int_{τ}^{ν} | Ω (ς, ξ) | [M | ϕ (ς) | + N | Ξ (ς) |] d_{q, ω} ξ d_{q, ω} ς, \end{matrix}

(19)

where

Ω (ς, ξ) = \{\begin{matrix} \frac{η}{η + γ} (\frac{ξ - τ}{ς - τ}), & τ \leq ξ < ς, \\ \frac{- γ}{η + γ} (\frac{ν - ξ}{ν - ς}), & ς \leq ξ \leq ν \end{matrix}

and

M = sup_{τ < ξ < ν} | D_{q, ω} Ξ (ξ) | < \infty a n d N = sup_{τ < ξ < ν} | D_{q, ω} ϕ (ξ) | < \infty .

Proof.

From (13) we have

Ξ (ς) = \int_{τ}^{ν} Ω (ς, ξ) D_{q, ω} Ξ (ξ) d_{q, ω} ξ + \frac{1}{η + γ} [\frac{η}{ς - τ} \int_{τ}^{ς} Ξ (q ξ + ω) d_{q, ω} ξ + \frac{γ}{ν - ς} \int_{ς}^{ν} Ξ (q ξ + ω) d_{q, ω} ξ]

(20)

and similarly

ϕ (ς) = \int_{τ}^{ν} Ω (ς, ξ) D_{q, ω} ϕ (ξ) d_{q, ω} ξ + \frac{1}{η + γ} [\frac{η}{ς - τ} \int_{τ}^{ς} ϕ (q ξ + ω) d_{q, ω} ξ + \frac{γ}{ν - ς} \int_{ς}^{ν} ϕ (q ξ + ω) d_{q, ω} ξ] .

(21)

Multiplying (20) by

ϕ (ς)

and (21) by

Ξ (ς)

, adding them and integrating the resulting identity with respect to

ς

from

τ

to

ν

yield

\begin{matrix} 2 \int_{τ}^{ν} Ξ (ς) ϕ (ς) d_{q, ω} ς & = & \int_{τ}^{ν} \int_{τ}^{ν} Ω (ς, ξ) [D_{q, ω} Ξ (ξ) ϕ (ς) + D_{q, ω} ϕ (ξ) Ξ (ς)] d_{q, ω} ξ d_{q, ω} ς \\ + \frac{1}{η + γ} [\frac{η}{ς - τ} \int_{τ}^{ν} \int_{τ}^{ς} (Ξ (q ξ + ω) ϕ (ς) + ϕ (q ξ + ω) Ξ (ς)) d_{q, ω} ξ d_{q, ω} ς \\ + \frac{γ}{ν - ς} \int_{τ}^{ν} \int_{ς}^{ν} (Ξ (q ξ + ω) ϕ (ς) + ϕ (q ξ + ω) Ξ (ς)) d_{q, ω} ξ d_{q, ω} ς] . \end{matrix}

By using modulus properties, we obtain

\begin{matrix} | 2 \int_{τ}^{ν} Ξ (ς) ϕ (ς) d_{q, ω} ς - \frac{1}{η + γ} [\frac{η}{ς - τ} \int_{τ}^{ν} \int_{τ}^{ς} (Ξ (q ξ + ω) ϕ (ς) + ϕ (q ξ + ω) Ξ (ς)) d_{q, ω} ξ d_{q, ω} ς \\ + \frac{γ}{ν - ς} \int_{τ}^{ν} \int_{ς}^{ν} (Ξ (q ξ + ω) ϕ (ς) + ϕ (q ξ + ω) Ξ (ς)) d_{q, ω} ξ d_{q, ω} ς] | \\ = | \int_{τ}^{ν} \int_{τ}^{ν} Ω (ς, ξ) [D_{q, ω} Ξ (ξ) ϕ (ς) + D_{q, ω} ϕ (ξ) Ξ (ς)] d_{q, ω} ξ d_{q, ω} ς | \\ \leq \int_{τ}^{ν} \int_{τ}^{ν} | Ω (ς, ξ) | [| D_{q, ω} Ξ (ξ) | | ϕ (ς) | + | D_{q, ω} ϕ (ξ) | | Ξ (ς) |] d_{q, ω} ξ d_{q, ω} ς \\ \leq \int_{τ}^{ν} \int_{τ}^{ν} | Ω (ς, ξ) | [M | ϕ (ς) | + N | Ξ (ς) |] d_{q, ω} ξ d_{q, ω} ς . \end{matrix}

The proof is terminated by this. □

Corollary 5.

If we take

ω ⟶ 0^{+}

in Theorem 8, then, inequality (19) becomes

\begin{matrix} | 2 \int_{τ}^{ν} Ξ (ς) ϕ (ς) d_{q} ς - \frac{1}{η + γ} [\frac{η}{ς - τ} \int_{τ}^{ν} \int_{τ}^{ς} (Ξ (q ξ) ϕ (ς) + ϕ (q ξ) Ξ (ς)) d_{q} ξ d_{q} ς \\ + \frac{γ}{ν - ς} \int_{τ}^{ν} \int_{ς}^{ν} (Ξ (q ξ) ϕ (ς) + ϕ (q ξ) Ξ (ς)) d_{q} ξ d_{q} ς] | \\ \leq \int_{τ}^{ν} \int_{τ}^{ν} | Ω (ς, ξ) | [M | ϕ (ς) | + N | Ξ (ς) |] d_{q} ξ d_{q} ς \end{matrix}

where

Ω (ς, ξ) = \{\begin{matrix} \frac{η}{η + γ} (\frac{ξ - τ}{ς - τ}), & τ \leq ξ < ς, \\ \frac{- γ}{η + γ} (\frac{ν - ξ}{ν - ς}), & ς \leq ξ \leq ν \end{matrix}

and

M = sup_{τ < ξ < ν} | D_{q} Ξ (ξ) | < \infty a n d N = sup_{τ < ξ < ν} | D_{q} ϕ (ξ) | < \infty .

Corollary 6.

If we take

q ⟶ 1^{-}

and

ω ⟶ 0^{+}

in Theorem 8, then, inequality (19) becomes

\begin{matrix} | 2 \int_{τ}^{ν} Ξ (ς) ϕ (ς) d ς - \frac{1}{η + γ} [\frac{η}{ς - τ} \int_{τ}^{ν} \int_{τ}^{ς} (Ξ (ξ) ϕ (ς) + ϕ (ξ) Ξ (ς)) d ξ d ς \\ + \frac{γ}{ν - ς} \int_{τ}^{ν} \int_{ς}^{ν} (Ξ (ξ) ϕ (ς) + ϕ (ξ) Ξ (ς)) d ξ d ς] | \\ \leq \int_{τ}^{ν} \int_{τ}^{ν} | Ω (ς, ξ) | [M | ϕ (ς) | + N | Ξ (ς) |] d ξ d ς, \end{matrix}

where

Ω (ς, ξ) = \{\begin{matrix} \frac{η}{η + γ} (\frac{ξ - τ}{ς - τ}), & τ \leq ξ < ς, \\ \frac{- γ}{η + γ} (\frac{ν - ξ}{ν - ς}), & ς \leq ξ \leq ν \end{matrix}

and

M = sup_{τ < ξ < ν} | Ξ^{'} (ξ) | < \infty a n d N = sup_{τ < ξ < ν} | ϕ^{'} (ξ) | < \infty .

4. Conclusions

In this manuscript, a number of new investigations into the Ostrowski inequality and its attendant inequalities on

(q, ω)

-Hahn difference operator were discussed by using two parameters. Furthermore, definite conditions, which have not been studied before, existed in these inequalities. For instance, in Theorem 6, the second

(q, ω)

-derivative of the function

Ξ

is bounded, and we deal with it; however, all of the existing literature deals with functions whose first derivatives are bounded. Besides that, our inequalities were extended to be continuous and q calculus with a view to procure a number of new inequalities as special cases.

Author Contributions

Conceptualization, A.A.E.-D. and J.A.; formal analysis, A.A.E.-D. and J.A.; investigation, A.A.E.-D. and J.A.; writing–original draft preparation, A.A.E.-D. and J.A.; writing–review and editing, A.A.E.-D. and J.A. All authors have read and agreed to the published version of the manuscript.

Funding

This research received no external funding.

Conflicts of Interest

The authors declare no conflict of interest.

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El-Deeb, A.A.; Awrejcewicz, J. Ostrowski–Trapezoid–Grüss-Type on (q, ω)-Hahn Difference Operator. Symmetry 2022, 14, 1776. https://doi.org/10.3390/sym14091776

AMA Style

El-Deeb AA, Awrejcewicz J. Ostrowski–Trapezoid–Grüss-Type on (q, ω)-Hahn Difference Operator. Symmetry. 2022; 14(9):1776. https://doi.org/10.3390/sym14091776

Chicago/Turabian Style

El-Deeb, Ahmed A., and Jan Awrejcewicz. 2022. "Ostrowski–Trapezoid–Grüss-Type on (q, ω)-Hahn Difference Operator" Symmetry 14, no. 9: 1776. https://doi.org/10.3390/sym14091776

APA Style

El-Deeb, A. A., & Awrejcewicz, J. (2022). Ostrowski–Trapezoid–Grüss-Type on (q, ω)-Hahn Difference Operator. Symmetry, 14(9), 1776. https://doi.org/10.3390/sym14091776

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Ostrowski–Trapezoid–Grüss-Type on (q, ω)-Hahn Difference Operator

Abstract

1. Introduction

2. Preliminaries

3. Main Results

3.1. An Ostrowski-Type Inequality on (q, ω)-Hahn Difference Operator

3.2. A Trapezoid-Type Inequality on (q, ω)-Hahn Difference Operator

3.3. A Grüss-Type Inequality on (q, ω)-Hahn Difference Operator

4. Conclusions

Author Contributions

Funding

Conflicts of Interest

References

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