On Some Generalizations of Integral Inequalities in n Independent Variables and Their Applications

Abuelela, Waleed; El-Deeb, Ahmed A.; Baleanu, Dumitru

doi:10.3390/sym14112257

Open AccessArticle

On Some Generalizations of Integral Inequalities in n Independent Variables and Their Applications

by

Waleed Abuelela

^1,2

,

Ahmed A. El-Deeb

^1,*

and

Dumitru Baleanu

^3,4,*

¹

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

²

Department of Mathematics and Natural Sciences, Faculty of Engineering Technology and Science, Higher Colleges of Technology, Abu Dhabi P.O. Box 25035, United Arab Emirates

³

Institute of Space Science, 077125 Bucharest, Romania

⁴

Department of Mathematics, Cankaya University, Ankara 06530, Turkey

^*

Authors to whom correspondence should be addressed.

Symmetry 2022, 14(11), 2257; https://doi.org/10.3390/sym14112257

Submission received: 22 July 2022 / Revised: 19 September 2022 / Accepted: 6 October 2022 / Published: 27 October 2022

(This article belongs to the Section Mathematics)

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Abstract

:

Throughout this article, generalizations of some Grónwall–Bellman integral inequalities for two real-valued unknown functions in n independent variables are introduced. We are looking at some novel explicit bounds of a particular class of Young and Pachpatte integral inequalities. The results in this paper can be utilized as a useful way to investigate the uniqueness, boundedness, continuousness, dependence and stability of nonlinear hyperbolic partial integro-differential equations. To highlight our research advantages, several implementations of these findings will be presented. Young’s method, which depends on a Riemann method, will follow to prove the key results. Symmetry plays an essential role in determining the correct methods for solving dynamic inequalities.

Keywords:

integral inequalities; hyperbolic partial differential equation; Young’s technique

1. Introduction

Gronwall–Bellman’s inequality [1] in the integral form states the following: Let u and f be continuous and nonnegative functions defined on

[a, b]

, and let

u_{0}

be a nonnegative constant. Then, the inequality

u (t) \leq u_{0} + \int_{a}^{t} f (s) u (s) d s, for all t \in [a, b],

(1)

implies that

u (t) \leq u_{0} exp (\int_{a}^{t} f (s) d s), for all t \in [a, b] .

Baburao G. Pachpatte [2] proved the discrete version of Equation (1). In particular, he proved that if

u (n)

,

a (n)

, and

γ (n)

are nonnegative sequences defined for

n \in N_{0}

,

a (n)

is non-decreasing for

n \in N_{0}

, and if

u (n) \leq a (n) + \sum_{s = 0}^{n - 1} γ (n) u (n), n \in N_{0},

(2)

then

u (n) \leq a (n) \prod_{s = 0}^{n - 1} [1 + γ (n)], n \in N_{0} .

The authors of [3] studied the following result:

\begin{matrix} Ψ (u (ℓ, t)) & \leq & a (ℓ, t) + \int_{0}^{θ (ℓ)} \int_{0}^{ϑ (t)} ℑ_{1} (ς, η) [f (ς, η) ζ (u (ς, η)) ϖ (u (ς, η)) \\ + \int_{0}^{ς} ℑ_{2} (χ, η) ζ (u (χ, η)) ϖ (u (χ, η)) d χ] d η d ς, \end{matrix}

where u, f,

ℑ \in C (I_{1} \times I_{2}, R_{+})

, and

a \in C (ζ, R_{+})

are non-decreasing functions,

I_{1}, I_{2} \in R

,

θ \in C^{1} (I_{1}, I_{1})

, and

ϑ \in C^{1} (I_{2}, I_{2})

are non-decreasing with

θ (ℓ) \leq ℓ

on

I_{1},

ϑ (t) \leq t

on

I_{2},

ℑ_{1}

,

ℑ_{2} \in C (ζ, R_{+}),

and

Ψ

,

ζ

,

ϖ \in C (R_{+}, R_{+})

with

\{Ψ, ζ, ϖ\} (u) > 0

for

u > 0

, and

lim_{u \to + \infty} Ψ (u) = + \infty

.

Additionally, Anderson [4] studied the following result:

ω (u (t, s)) \leq a (t, s) + c (t, s) \int_{t_{0}}^{t} \int_{s}^{\infty} ω^{'} (u (τ, η)) [d (τ, η) w (u (τ, η)) + b (τ, η)] \nabla η Δ τ,

(3)

where u, a, c, and d are nonnegative continuous functions defined for

(t, s) \in T \times T

, b is a nonnegative continuous function for

(t, s) \in {[t_{0}, \infty)}_{T} \times {[t_{0}, \infty)}_{T}

and

ω \in C^{1} (R_{+}, R_{+})

, with

ω^{'} > 0

for

u > 0

.

Wendroff’s inequality, see [5], states the following: Let

ψ (ξ, ρ)

and

ϕ (ξ, ρ)

be nonnegative and continuous functions where

ξ

,

ρ \in R_{+}

. If

ψ (ξ, ρ) \leq A_{1} (ξ) + A_{2} (ρ) + \int_{0}^{ξ} \int_{0}^{ρ} ϕ (θ, t) ψ (θ, t) d θ d t,

(4)

holds for

ξ

,

ρ \in R_{+}

, where

A_{1} (ξ)

and

A_{2} (ρ)

are continuous and positive functions on

ξ

,

ρ \in R_{+}

, and the derivatives

A_{1}^{'} (ξ)

and

A_{2}^{'} (ρ)

on

ξ

,

ρ \in R_{+}

are nonnegative, then

ψ (ξ, ρ) \leq E (ξ, ρ) exp (\int_{0}^{ξ} \int_{0}^{ρ} ϕ (θ, t) d θ d t),

on

ξ

,

ρ \in R_{+}

, where

E (ξ, ρ) = \frac{[A_{2} (ρ) + A_{1} (0)] [A_{1} (ξ) + A_{2} (0)]}{A_{1} (0) + A_{2} (0)},

on

ξ

,

ρ \in R_{+}

.

Subsequently, some new Wendroff-type inequalities were developed (see, for example, [6,7]) to provide natural and effective means to further develop the theory of integral and partial integro-differential equations.

Wendroff’s inequality (Inequality (4)) has gained significant attention, and numerous articles have been published in the literature involved various extensions, generalizations, and applications [5,6,7,8,9,10,11,12,13,14,15,16,17,18,19,20,21,22].

For example, Bondge and Pachpatte [7] investigated some simple Wendroff-type inequalities with n independent variables as follows: Let

ψ (t)

,

P (t)

, and

Q (t)

be continuous and nonnegative functions defined on

Ω

and

Ψ i (ξ i) > 0

and

Ψ^{'} i (ξ i) \geq 0

for

1 \leq i \leq n

be continuous functions defined for

ξ i \geq ξ i^{0}

:

(i): If

$ψ (ξ) \leq \sum_{i = 1}^{n} Ψ_{i} (ξ_{i}) + \int_{ξ^{0}}^{ξ} P (ρ) ψ (ρ) d ρ,$

for $ξ \in Ω$ , then

$ψ (ξ) \leq E (ξ) exp (\int_{ξ^{0}}^{ξ} P (ρ) d ρ),$

for $ξ \in Ω$ , where

$E (ξ) = \frac{[\sum_{i = 1}^{n} Ψ_{i} (ς_{i}) + Ψ_{1} (ς_{1}^{0}) - Ψ_{1} (ξ_{1})] [\sum_{i = 1}^{n} Ψ_{i} (ξ_{i}) + Ψ_{2} (ξ_{2}^{0}) - Ψ_{2} (ξ_{2})]}{[\sum_{i = 1}^{n} Ψ_{i} (ξ_{i}) + Ψ_{1} (ξ_{1}^{0}) + Ψ_{2} (ξ_{2})]} .$

(5)
(ii): If

$ψ (ξ) \leq \sum_{i = 1}^{n} Ψ_{i} (ξ_{i}) + \int_{ξ^{0}}^{ξ} P (ρ) ψ (ρ) d ρ + \int_{ξ^{0}}^{ξ} P (ρ) ψ (ρ) (\int_{ξ^{0}}^{ρ} Q (θ) ψ (θ) d θ) d ρ,$

for $ξ \in Ω$ , then

$ψ (ξ) \leq \sum_{i = 1}^{n} Ψ_{i} (ξ_{i}) + \int_{ξ^{0}}^{ξ} P (ρ) E (ρ) (ρ) exp (\int_{ξ^{0}}^{ρ} [P (θ) Q (θ)] d θ) d ρ,$

for $ξ \in Ω$ , where $E (ξ)$ is defined by Equation (5).

An extension of Snow’s technique of n independent variables was performed by Young [15]. His inequality has several valuable applications in the theory of integro-differential and partial differential equations with n independent variables. He considered that

ϕ (ξ)

,

Ψ (ξ) \geq 0

, and

Φ (ξ)

are continuous functions on

Ω \subset R^{n}

. Let

ν (τ; ξ)

be a solution of the characteristic initial value problem

\begin{matrix} {(- 1)}^{n} ν_{τ_{1} \dots τ_{n}} (τ; ξ) & = & 0 in Ω, \\ ν (τ; ξ) & = & 1 on τ_{i} = ς_{i}, i = 1, \dots, n \end{matrix}

In addition, let

D^{+}

be a connected subdomain of

Ω

containing

ξ

such that

ν \geq 0

for all

τ \in D^{+}

. If

D \subset D^{+}

and

ϕ (ξ) \leq Ψ (ξ) + \int_{ξ^{0}}^{ξ} Φ (τ) ϕ (τ) d τ,

then

ϕ (ξ) \leq Ψ (ξ) + \int_{ξ^{0}}^{ξ} Ψ (τ) Φ (τ) ν (τ) d τ .

Motivated by the inequalities mentioned above, we prove more general integral inequalities with n independent variables by using Young’s technique. The proposed general integral inequalities can be employed in the analysis of many problems in the theory of integral and partial differential equations, which could easily be considered powerful tools. Symmetry plays an essential role in determining the correct methods for solving dynamic inequalities.

2. Auxiliary Results

First, we state and prove two important lemmas, and we will use them to prove the main results of this paper. To prove the following lemma, Bellman’s technique (see, for instance, [16]) will be applied.

Lemma 1.

Let

ϕ (ξ)

and

ν (ξ)

be real-valued, positive, and continuous functions. In addition, let all derivatives of

ϕ (ξ)

be positive on Ω with

ϕ (ξ) = 1

on

ξ_{i} = ξ_{i}^{o} .

If the inequality

D ϕ (ξ) \leq ν (ξ) ϕ (ξ),

(6)

holds, then

ϕ (ξ) \leq exp (\int_{ξ^{o}}^{ξ} ν (t) d t) .

(7)

Proof.

The inequality (6) leads to

\frac{ϕ (ξ) D ϕ (ξ)}{ϕ^{2} (ξ)} \leq ν (ξ) .

Thus, by the assumptions on

f (ς)

and its derivatives, we have

\frac{ϕ (ξ) D ϕ (ξ)}{ϕ^{2} (ξ)} \leq ν (ξ) + \frac{(D_{n} ϕ (ξ)) (D_{1} \dots D_{n - 1} ϕ (ξ))}{f^{2} (ξ)},

which implies that

D_{n} (\frac{D_{1} \dots D_{n - 1} ϕ (ξ)}{ϕ (ξ)}) \leq ν (ξ) .

(8)

Integrate both sides of the inequality (8) with respect to the component

ξ_{n}

from

ξ_{n}^{o}

to

ξ_{n}

to obtain

\frac{D_{1} \dots D_{n - 1} ϕ (ξ)}{ϕ (ξ)} \leq \int_{ξ_{n}^{o}}^{ξ_{n}} ν (ξ_{1}, \dots, ξ_{n - 1}, t_{n}) d t_{n} .

Therefore, and by the assumptions

ϕ (ξ)

and its derivatives, we can write the following inequality:

\frac{ϕ (ξ) D_{1} \dots D_{n - 1} ϕ (ξ)}{ϕ^{2} (ξ)} \leq \int_{ξ_{n}^{o}}^{ξ_{n}} ν (ξ_{1}, \dots, ξ_{n - 1}, t_{n}) d t_{n} + \frac{(D_{n - 1} ϕ (ξ)) (D_{1} \dots D_{n - 2} ϕ (ξ))}{ξ^{2} (ξ)},

which yields

D_{n - 1} (\frac{D_{1} \dots D_{n - 2} ϕ (ξ)}{ϕ (ξ)}) \leq \int_{ξ_{n}^{o}}^{ξ_{n}} ν (ξ_{1}, \dots, ξ_{n - 1}, t_{n}) d t_{n} .

(9)

Now, integrate both sides of inequality (9) with respect to the component

ξ_{n - 1}

from

ξ_{n - 1}^{o}

to

ξ_{n - 1}

to obtain

\frac{D_{1} \dots D_{n - 2} ϕ (ξ)}{ϕ (ξ)} \leq \int_{ξ_{n - 1}^{o}}^{ξ_{n - 1}} \int_{ξ_{n}^{o}}^{ξ_{n}} ν (ξ_{1}, \dots ξ_{n - 2}, t_{n - 1}, t_{n}) d t_{n} d t_{n - 1} .

We can continue this way until reaching

\frac{D_{1} ϕ (ξ)}{ϕ (ξ)} \leq \int_{ξ_{2}^{o}}^{ξ_{2}} \dots \int_{ξ_{n}^{o}}^{ξ_{n}} ν (ξ_{1}, t_{2}, \dots, t_{n}) d t_{n} \dots d t_{2} .

(10)

Integrating both sides of inequality (10) with respect to the component

ξ_{1}

from

ξ_{1}^{o}

to

ξ_{1}

gives

log (\frac{ϕ (ξ)}{ϕ (ξ_{1}^{o}, ξ_{2}, \dots, ξ_{n})}) \leq \int_{ξ^{o}}^{ξ} ν (t) d t,

which implies inequality (7). This proves the lemma. □

To prove the following lemma, Young’s technique (see, for instance, [17]) will be applied:

Lemma 2.

Let

K (ξ), ω (ξ),

and

Λ (ξ)

be real-valued nonnegative differentiable functions on Ω. Moreover, suppose that

K (ξ)

and all its derivatives with respect to

ξ_{1}, \dots, ξ_{n}

up to an order

n - 1

vanish at

ξ_{i} = ξ_{i}^{o}

for

i = 1, \dots, n .

Let

v (θ; ξ)

be the solution of the following characteristic initial value problem:

\begin{matrix} {(- 1)}^{n} \frac{\partial^{n} v (θ; ξ)}{\partial θ_{1} \dots \partial θ_{n}} - & Λ (θ) v (θ; ξ) = 0, in Ω, \\ v (θ; ξ) = 1 on θ_{i} = ξ_{i}, i = 1, \dots, n . \end{matrix}

(11)

If the inequality

\begin{matrix} D K (ξ) \leq ω (ξ) + Λ (ξ) K (ξ), \end{matrix}

(12)

holds, then

\begin{matrix} K (ξ) \leq \int_{ξ^{o}}^{ξ} ω (θ) v (θ; ς) d θ . \end{matrix}

(13)

Proof.

The inequality (12) implies that

\begin{matrix} L [K (ξ)] \leq ω (ξ), where L \equiv D - Λ (ξ) . \end{matrix}

(14)

If

z (ξ)

is a function that is continuously differentiable n times in the parallelepiped

ξ^{o} < t < ξ

(denoted by

D

), then

\begin{matrix} z L [K] - K L_{1} [z] = \sum_{j = 1}^{n} {(- 1)}^{j - 1} D_{j} [(D_{0} \dots D_{j - 1} z) (D_{j + 1} \dots D_{n} D_{n + 1} K)], \end{matrix}

(15)

where

L_{1} \equiv {(- 1)}^{n} D - Λ (ξ)

and

D_{0} = D_{n + 1} = I

is the identity operator. Integrating both sides of Equation (15) over

D

and taking into account that

K (ξ)

and all of its derivatives with respect to

ξ_{1}, \dots, ξ_{n}

up to the order

n - 1

vanish at

θ_{i} = ξ_{i}^{o}

for

i = 1, \dots, n

produces

\begin{matrix} \int_{D} (z L [K] - K L_{1} [z]) d θ = \sum_{j = 1}^{n} {(- 1)}^{j - 1} \int_{θ_{j} = ξ_{j}} (D_{1} \dots D_{j - 1} z) (D_{j + 1} \dots D_{n} K) d θ^{^{'}}, \end{matrix}

(16)

where

d θ^{^{'}} = d θ_{1} \dots d θ_{j - 1} d θ_{j + 1} \dots d θ_{n} .

Now, we choose

z (ξ)

to be the function

v (θ; ξ)

that satisfies the IVP (11). Since

v (θ; ξ) = 1

on

θ_{j} = ξ_{j}

for

j = 1, \dots, n

, it follows that

D_{1} \dots D_{j - 1} v (θ; ξ) = 0, on θ_{j} = ξ_{j}, j = 2, \dots, n .

Therefore, Equation (16) becomes

\begin{matrix} \int_{D} v L [K] d θ & = \int_{θ_{1} = ξ_{1}} D_{2} \dots D_{n} K d θ^{^{'}} \\ = K (ξ) . \end{matrix}

(17)

The continuity of v along with the fact that

v = 1

on

θ = ξ

leads to the existence of a domain

Ω^{+}

containing

ξ

for which

v \geq 0 .

We multiply both sides of inequality (14) by v and then use Equation (17) to obtain inequality (13). Tis proves the lemma. □

Now, we are ready to state and prove our main results.

3. Results and Discussion

In this section, the main results of this paper are stated and proven in Theorems 1–3. This is accomplished by using Lemmas 1 and 2:

Theorem 1.

Let

t_{i} (ς), b_{i} (ς), q_{i} (ς), e_{i} (ς), f_{i} (ς), g_{i} (ς),

and

h_{i} (ς)

be nonnegative, real-valued continuous functions on Ω and

a_{i} (ς)

be positive, nondecreasing, and continuous functions on Ω, where

i = 1, 2 .

Assume that the system

\begin{matrix} t_{i} (ς) \leq a_{i} (ς) & + \int_{ς^{o}}^{ς} b_{i} (υ) t_{1} (υ) d s + \int_{ς^{o}}^{ς} q_{i} (υ) t_{2} (υ) d s + \int_{ς^{o}}^{ς} e_{i} (υ) (\int_{ς^{o}}^{υ} f_{i} (c) t_{1} (c) d t) d s \\ + \int_{ς^{o}}^{ς} g_{i} (υ) (\int_{ς^{o}}^{υ} h_{i} (c) t_{2} (c) d t) d s, \end{matrix}

(18)

is satisfied for all

ς \in Ω

with

ς \geq ς^{o} .

Then, we have

\begin{matrix} \begin{matrix} t_{i} (ς) \leq a_{i} (ς) (1 + \int_{ς^{o}}^{ς} (ϕ_{i} (υ) η (υ) d s + ρ_{i} (υ) \int_{ς^{o}}^{υ} ψ_{i} (c) η (c) d t) d s), \end{matrix} \end{matrix}

(19)

where

ϕ_{1} (ς) = b_{1} (ς) + \frac{a_{2} (ς)}{a_{1} (ς)} q_{1} (ς),

ϕ_{2} (ς) = q_{2} (ς) + \frac{a_{1} (ς)}{a_{2} (ς)} b_{2} (ς),

ϕ (ς) = \sum_{i = 1}^{2} ϕ_{i} (ς),

ψ_{1} (ς) = f_{1} (ς) + \frac{a_{2} (ς)}{a_{1} (ς)} h_{1} (ς),

ψ_{2} (ς) = h_{2} (ς) + \frac{a_{1} (ς)}{a_{2} (ς)} f_{2} (ς),

ψ (ς) = \sum_{i = 1}^{2} ψ_{i} (ς),

ρ_{i} (ς) = e_{i} (ς) + g_{i} (ς),

and

η (ς) = 2 + 2 \int_{ς^{o}}^{ς} ϕ (υ) exp (\int_{ς^{o}}^{υ} (ϕ (c) + ψ (c)) d t) d s .

Proof.

Assuming that the functions

a_{i} (ς), i = 1, 2

are positive and nondecreasing functions, this allows us to rewrite the system in (18) in the following form:

\frac{t_{i} (ς)}{a_{i} (ς)} \leq T_{i} (ς),

(20)

where

\begin{matrix} T_{i} (ς) = 1 + & \int_{ς^{o}}^{ς} b_{i} (υ) \frac{t_{1} (υ)}{a_{i} (υ)} d s + \int_{ς^{o}}^{ς} q_{i} (υ) \frac{t_{2} (υ)}{a_{i} (υ)} d s + \int_{ς^{o}}^{ς} e_{i} (υ) (\int_{ς^{o}}^{υ} f_{i} (c) \frac{t_{1} (c)}{a_{i} (c)} d t) d s \\ + \int_{ς^{o}}^{ς} g_{i} (υ) (\int_{ς^{o}}^{υ} h_{i} (c) \frac{t_{2} (c)}{a_{i} (c)} d t) d s; \\ T_{i} (ς) = 1 on ς_{i} = ς_{i}^{o}, i = 1, \dots, n . \end{matrix}

(21)

For

i = 1

, we differentiate both sides of Equation (21) and then use inequality (20) to obtain

\begin{matrix} D T_{1} (ς) \leq b_{1} (ς) T_{1} (ς) & + q_{1} (ς) \frac{a_{2} (ς)}{a_{1} (ς)} T_{2} (ς) + e_{1} (ς) \int_{ς^{o}}^{ς} f_{1} (υ) T_{1} (υ) d s \\ + g_{1} (ς) \int_{ς^{o}}^{ς} h_{1} (ς) \frac{a_{2} (υ)}{a_{1} (υ)} T_{2} (υ) d s . \end{matrix}

(22)

Since all functions are nonnegative, the inequality (22) takes the following form:

D T_{1} (ς) \leq ϕ_{1} (ς) T (ς) + ρ_{1} (ς) \int_{ς^{o}}^{ς} ψ_{1} (υ) T (υ) d s,

(23)

where

T (ς) = \sum_{i = 1}^{2} T_{i} (ς) .

Similarly, for

T_{2} (ς)

, we have

D T_{2} (ς) \leq ϕ_{2} (ς) T (ς) + ρ_{2} (ς) \int_{ς^{o}}^{ς} ψ_{2} (υ) T (υ) d s .

(24)

Adding inequalities (23) and (24) gives

D T (ς) \leq ϕ (ς) T (ς) + ρ (ς) \int_{ς^{o}}^{ς} ψ (υ) T (υ) d s .

(25)

Adding and subtracting

ρ (ς) T (ς)

to the right-hand side of inequality (25) yields

D T (ς) \leq (ϕ (ς) - ρ (ς)) T (ς) + ρ (ς) Z (ς),

(26)

where

\begin{matrix} Z (ς) = T (ς) + \int_{ς^{o}}^{ς} ψ (υ) T (υ) d s, which implies that \\ Z (ς) \geq T (ς), Z (ς) \geq \int_{ς^{o}}^{ς} ψ (υ) T (υ) d s, a n d Z (ς_{o}) = T (ς_{o}) = 2 . \end{matrix}

(27)

Using inequality (27) permits writing inequality (26) in the following form:

D T (ς) \leq ϕ (ς) Z (ς) .

(28)

On the other hand, the relation (27) along with the inequality (28) allows us to write

D Z (ς) \leq (ϕ (ς) + ψ (ς)) Z (ς) .

(29)

We can apply Lemma 1 on the inequality (29) to obtain

Z (ς) \leq 2 exp (\int_{ς^{o}}^{ς} [ϕ (υ) + ψ (υ)] d s) .

(30)

By using the upper bound in inequality (30) on

Z (ς)

in the inequality (28) and then integrating both sides of the resulting inequality with respect to

ς

from

ς^{o}

to

ς

, we obtain

T (ς) \leq η (ς) .

(31)

Utilizing the inequality (31) in the inequality (23) gives

\begin{matrix} D T_{1} (ς) \leq ϕ_{1} (ς) η (ς) + ρ_{1} (ς) \int_{ς^{o}}^{ς} ψ_{1} (υ) η (υ) d s, \end{matrix}

which, by integration with respect to

ς

from

ς^{o}

to

ς

, yields

\begin{matrix} T_{1} (ς) \leq 1 + \int_{ς^{o}}^{ς} (ϕ_{1} (υ) η (υ) + ρ_{1} (υ) \int_{ς^{o}}^{υ} ψ_{1} (c) η (c) d t) d s . \end{matrix}

(32)

Similarly, we have the following upper bound for

T_{2} (ς)

:

\begin{matrix} T_{2} (ς) \leq 1 + \int_{ς^{o}}^{ς} (ϕ_{2} (υ) η (υ) + ρ_{2} (υ) \int_{ς^{o}}^{υ} ψ_{2} (c) η (c) d t) d s . \end{matrix}

(33)

Embedding these upper bounds from inequalities (32) and (33) on

T_{1} (ς)

and

T_{2} (ς)

, respectively, into the inequality (20) produces the system’s solution (inequality (19)). This proves the theorem. □

Remark 1.

If

n = 2

(i.e., we are dealing with functions in two variables), and

ς^{o} = 0

, then Theorem 1 yields that for

i = 1, 2

, if the system

\begin{matrix} t_{i} (ς, ℑ) \leq a_{i} (ς, ℑ) & + \int_{0}^{ς} \int_{0}^{ℑ} b_{i} (υ, c) t_{1} (υ, c) d t d s + \int_{0}^{ς} \int_{0}^{ℑ} q_{i} (υ, c) t_{2} (υ, c) d t d s \\ + \int_{0}^{ς} \int_{0}^{ℑ} e_{i} (υ, c) (\int_{0}^{υ} \int_{0}^{t} f_{i} (r, θ) t_{1} (r, θ) d θ d r) d t d s \\ + \int_{0}^{ς} \int_{0}^{ℑ} g_{i} (υ, c) (\int_{0}^{υ} \int_{0}^{t} h_{i} (r, θ) t_{2} (r, θ) d θ d r) d t d s, \end{matrix}

(34)

holds, then

\begin{matrix} \begin{matrix} t_{i} (ς, ℑ) \leq a_{i} (ς, ℑ) (1 + \int_{0}^{ς} \int_{0}^{ℑ} (ϕ_{i} (υ, c) η (υ, c) + ρ_{i} (υ, c) \int_{0}^{υ} \int_{0}^{t} ψ_{i} (r, θ) η (r, θ) d θ d r) d t d s), \end{matrix} \end{matrix}

(35)

where

ϕ_{1} (υ, c) = b_{1} (υ, c) + \frac{a_{2} (υ, c)}{a_{1} (υ, c)} q_{1} (υ, c),

ϕ_{2} (υ, c) = q_{2} (υ, c) + \frac{a_{1} (υ, c)}{a_{2} (υ, c)} b_{2} (υ, c),

ϕ (ς, ℑ) = \sum_{i = 1}^{2} ϕ_{i}

(ς, ℑ),

ψ_{1} (υ, c) = f_{1} (υ, c) + \frac{a_{2} (υ, c)}{a_{1} (υ, c)} h_{1} (υ, c),

ψ_{2} (υ, c) = h_{2} (υ, c) + \frac{a_{1} (υ, c)}{a_{2} (υ, c)} f_{2} (υ, c),

ψ (ς, ℑ) = \sum_{i = 1}^{2} ψ_{i} (ς, ℑ),

ρ_{i} (ς, ℑ) = e_{i} (ς, ℑ) + g_{i} (ς, ℑ),

and

η (ς, ℑ) = 2 + 2 \int_{0}^{ς} \int_{0}^{ℑ} ϕ (υ, c) exp (\int_{0}^{υ} \int_{0}^{t} (ϕ (r, θ) + ψ (r, θ)) d θ d r) d t d s .

Theorem 2.

Suppose that

t_{i} (ς), a_{i} (ς), e_{i} (ς), g_{i} (ς), f_{i} (ς), h_{i} (ς), D b_{i} (ς),

and

D c_{i} (ς)

, where

i = 1, 2

, are real-valued, nonnegative, continuous, and non-decreasing functions defined on Ω. Assume that the system

\begin{matrix} t_{i} (ς) \leq a_{i} (ς) & + \int_{ς^{o}}^{ς} b_{i} (ς, υ) t_{1} (υ) d s + \int_{ς^{o}}^{ς} c_{i} (ς, υ) t_{2} (υ) d s + \int_{ς^{o}}^{ς} e_{i} (υ) (\int_{ς^{o}}^{υ} f_{i} (ς, c) t_{1} (c) d t) d s \\ + \int_{ς^{o}}^{ς} g_{i} (υ) (\int_{ς^{o}}^{υ} h_{i} (ς, c) t_{2} (c) d t) d s; i = 1, 2, \end{matrix}

(36)

is satisfied. Then, we have

\begin{matrix} t_{i} (ς) \leq a_{i} (ς) & + \int_{ς^{o}}^{ς} [ϕ_{i} (υ) + \int_{ς^{o}}^{υ} D β_{i} (ς, c) τ (ς, c) d t + β_{i} (ς, υ) τ (ς, υ) + ρ_{i} (υ) \int_{ς^{o}}^{υ} σ_{i} (ς, c) τ (ς, c) d t \\ + \int_{ς^{o}}^{υ} [ρ_{i} (c) (\int_{ς^{o}}^{t} D σ_{i} (ς, r) τ (ς, r) d r) d t]] d s; i = 1, 2, \end{matrix}

(37)

where

\begin{matrix} ϕ_{i} (ς) = & a_{1} (ς) b_{i} (ς) + a_{2} (ς) c_{i} (ς) + \int_{ς^{o}}^{ς} a_{1} (υ) D b_{i} (ς, υ) d s + \int_{ς^{o}}^{ς} a_{2} (υ) D c_{i} (ς, υ) d s \\ + \int_{ς^{o}}^{ς} e_{i} (υ) (\int_{ς^{o}}^{υ} a_{1} (c) D f_{i} (ς, c) d t) d s + e_{i} (ς) \int_{ς^{o}}^{ς} a_{1} (υ) f_{i} (ς, υ) d s \\ + \int_{ς^{o}}^{ς} g_{i} (υ) (\int_{ς^{o}}^{υ} a_{2} (c) D h_{i} (ς, c) d t) d s + g_{i} (ς) \int_{ς^{o}}^{ς} a_{2} (υ) h_{i} (ς, υ) d s, \end{matrix}

β_{i} (ς) = b_{i} (ς) + c_{i} (ς), ρ_{i} (ς) = e_{i} (ς) + g_{i} (ς), σ_{i} (ς) = f_{i} (ς) + h_{i} (ς), β (ς) = \sum_{i = 1}^{2} β_{i} (ς), ρ (ς) = \sum_{i = 1}^{2} ρ_{i} (ς), σ (ς) = \sum_{i = 1}^{2} σ_{i} (ς), ϕ (ς) = \sum_{i = 1}^{2} ϕ_{i} (ς),

τ (ς, ϑ) = \int_{ς^{o}}^{ϑ} Y (ς, ϱ) ψ_{2} (ϱ) d ϱ

;

Y (ς; υ)

is the solution to the following characteristic initial value problem:

\begin{matrix} {(- 1)}^{n} \frac{\partial^{n} Y (ς; υ)}{\partial υ_{1} \dots \partial υ_{n}} - & [β (ς) - D β - ρ (ς) σ (ς)] Y (ς; υ) = 0, in Ω, \\ Y (ς; υ) = 1 on υ_{i} = ς_{i}, i = 1, \dots, n, \end{matrix}

(38)

ψ_{2} = ϕ (ς) + (D β (ς) + ρ (ς) σ (ς)) ψ_{1} (ς) + \int_{ς^{o}}^{ς} ρ (υ) D σ (ς, υ) ψ_{1} (υ) d s

,

ψ_{1} (ς) = \int_{ς^{o}}^{ς} (ϕ (υ) + ρ (υ) D σ (ς, υ) \int_{ς^{o}}^{υ} ϕ (c) v (ς; c) d t) w (ς; υ) d s

such that

v (ς; υ)

is the solution to the initial value problem

\begin{matrix} {(- 1)}^{n} \frac{\partial^{n} v (ς; υ)}{\partial υ_{1} \dots \partial υ_{n}} - & [β (ς) + D β (ς) + ρ (ς) σ (ς) + ρ (ς) D σ (ς) + 2] v (ς; υ) = 0, in Ω, \\ v (ς; υ) = 1 on υ_{i} = ς_{i}, i = 1, \dots, n . \end{matrix}

(39)

Additionally,

w (ς; υ)

is the solution to the initial value problem

\begin{matrix} {(- 1)}^{n} \frac{\partial^{n} w (ς; υ)}{\partial υ_{1} \dots \partial υ_{n}} - & [β (ς) + D β (ς) + ρ (ς) σ (ς) - ρ (ς) D σ (ς) + 1] w (ς; υ) = 0, in Ω, \\ w (ς; υ) = 1 on υ_{i} = ς_{i}, i = 1, \dots, n . \end{matrix}

(40)

Proof.

Start with

\begin{matrix} ζ_{i} (ς) = \int_{ς^{o}}^{ς} b_{i} (ς, υ) t_{1} (υ) d s + \int_{ς^{o}}^{ς} c_{i} (ς, υ) t_{2} (υ) d s + \int_{ς^{o}}^{ς} e_{i} (υ) (\int_{ς^{o}}^{υ} f_{i} (ς, c) t_{1} (c) d t) d s \\ + \int_{ς^{o}}^{ς} g_{i} (υ) (\int_{ς^{o}}^{υ} h_{i} (ς, c) t_{2} (c) d t) d s; \\ a n d ζ (ς) = \sum_{j = 1}^{2} ζ_{j} (ς); i = 1, 2 \end{matrix}

(41)

Thus, the system given in (36) takes the form

t_{i} (ς) \leq a_{i} (ς) + ζ_{i} (ς); i = 1, 2 .

(42)

Since all functions are nonnegative and non-decreasing, relation (41), along with Equation (42), gives the following inequalities:

\begin{matrix} D ζ_{i} (ς) & \leq ϕ_{i} (ς) + ζ_{1} (ς) b_{i} (ς) + \int_{ς^{o}}^{ς} ζ_{1} (υ) D b_{i} (ς, υ) d s + ζ_{2} (ς) c_{i} (ς) + \int_{ς^{o}}^{ς} ζ_{2} (υ) D c_{i} (ς, υ) d s \\ + e_{i} (ς) \int_{ς^{o}}^{ς} ζ_{1} (υ) f_{i} (ς, υ) d s + \int_{ς^{o}}^{ς} e_{i} (υ) (\int_{ς^{o}}^{υ} ζ_{1} (c) D f_{i} (c) d t) d s \\ + g_{i} (ς) \int_{ς^{o}}^{ς} ζ_{2} (υ) h_{i} (ς, υ) d s + \int_{ς^{o}}^{ς} g_{i} (υ) (\int_{ς^{o}}^{υ} ζ_{2} (c) D h_{i} (c) d t) d s \\ \leq ϕ_{i} (ς) + ζ (ς) β_{i} (ς) + \int_{ς^{o}}^{ς} ζ (υ) D β_{i} (ς, υ) d s + ρ_{i} (ς) \int_{ς^{o}}^{ς} ζ (υ) σ_{i} (ς, υ) d s \\ + \int_{ς^{o}}^{ς} ρ_{i} (υ) (\int_{ς^{o}}^{υ} ζ (c) D σ (c) d t) d s; i = 1, 2 \end{matrix}

(43)

Adding the inequalities in (43) (i.e., for the cases where

i = 1

and

i = 2

) gives

\begin{matrix} D ζ (ς) \leq ϕ (ς) & + ζ (ς) β (ς) + \int_{ς^{o}}^{ς} ζ (υ) D β (ς, υ) d s + ρ (ς) \int_{ς^{o}}^{ς} ζ (υ) σ (ς, υ) d s \\ + \int_{ς^{o}}^{ς} ρ (υ) (\int_{ς^{o}}^{υ} ζ (c) D σ (ς, c) d t) d s . \end{matrix}

(44)

Clearly, all functions in the inequality (44) are nonnegative and non-decreasing as well. Therefore, the inequality (44) can be written as

\begin{matrix} D ζ (ς) \leq ϕ (ς) + ζ (ς) β (ς) + (D β (ς) + ρ (ς) σ (ς)) \int_{ς^{o}}^{ς} ζ (υ) d s + \int_{ς^{o}}^{ς} ρ (υ) D σ (ς, υ) (\int_{ς^{o}}^{υ} ζ (c) d t) d s . \end{matrix}

(45)

Adding

(D β (ς) + ρ (ς) σ (ς)) ζ (ς)

to both sides of inequality (45) produces

\begin{matrix} D ζ (ς) & + (D β (ς) + ρ (ς) σ (ς)) ζ (ς) \\ \leq ϕ (ς) + ζ (ς) β (ς) + (D β (ς) + ρ (ς) σ (ς)) K_{1} (ς) + \int_{ς^{o}}^{ς} ρ (υ) D σ (ς, υ) (\int_{ς^{o}}^{υ} ζ (c) d t) d s, \end{matrix}

(46)

where

K_{1} (ς) = ζ (ς) + \int_{ς^{o}}^{ς} ζ (υ) d s .

This definition of

K_{1} (ς)

implies that

K_{1} (ς) \geq ζ (ς), K_{1} (ς) \geq \int_{ς^{o}}^{ς} ζ (υ) d s, and K_{1} (ς^{o}) = ζ (ς^{o}) = 0 .

(47)

From inequalities (47) and (46), we obtain

\begin{matrix} D ζ (ς) \leq ϕ (ς) & + K_{1} (ς) β (ς) + (D β (ς) + ρ (ς) σ (ς)) K_{1} (ς) + \int_{ς^{o}}^{ς} ρ (υ) D σ (ς, υ) K_{1} (υ) d s, \end{matrix}

which again, by the fact that

ζ (ς) \leq K_{1} (ς)

and that the functions

ρ (ς)

and

D σ (ς)

are nonnegative and non-decreasing, implies

\begin{matrix} D K_{1} (ς) & \leq ϕ (ς) + (β (ς) + D β (ς) + ρ (ς) σ (ς)) K_{1} (ς) + \int_{ς^{o}}^{ς} ρ (υ) D σ (ς, υ) K_{1} (υ) d s + K_{1} (ς) \\ \leq ϕ (ς) + (β (ς) + D β (ς) + ρ (ς) σ (ς) + 1) K_{1} (ς) + ρ (ς) D σ (ς) \int_{ς^{o}}^{ς} K_{1} (υ) d s . \end{matrix}

(48)

By adding

ρ (ς) D σ (ς) K_{1} (ς)

to both sides of the inequality (48), we have

\begin{matrix} D K_{1} (ς) + ρ (ς) D σ (ς) K_{1} (ς) \leq ϕ (ς) & + (β (ς) + D β (ς) + ρ (ς) σ (ς) + 1) K_{1} (ς) \\ + ρ (ς) D σ (ς) K_{2} (ς), \end{matrix}

(49)

where

K_{2} (ς) = K_{1} (ς) + \int_{ς^{o}}^{ς} K_{1} (υ) d s .

This definition of

K_{2} (ς)

together with the inequality (49) leads to

\begin{matrix} D K_{2} (ς) - (β (ς) + D β (ς) + ρ (ς) σ (ς) + ρ (ς) D σ (ς) + 2) K_{2} (ς) \leq ϕ (ς) . \end{matrix}

(50)

We can apply Lemma 2 to inequality (50) to find

\begin{matrix} K_{2} (ς) \leq \int_{ς^{o}}^{ς} ϕ (υ) v (ς; υ) d s, \end{matrix}

(51)

where

v (ς; υ)

is the solution to the initial value problem (39).

We can substitute this bound (inequality (51)) onto

K_{2} (ς)

in the inequality (49) to have

\begin{matrix} D K_{1} (ς) & - (β (ς) + D β (ς) + ρ (ς) σ (ς) - ρ (ς) D σ (ς) + 1) K_{1} (ς) \\ \leq ϕ (ς) + ρ (ς) D σ (ς) \int_{ς^{o}}^{ς} ϕ (υ) v (ς; υ) d s . \end{matrix}

(52)

By applying Lemma 2 to inequality (52), we obtain

\begin{matrix} K_{1} (ς) \leq ψ_{1} (ς), \end{matrix}

(53)

where

ψ_{1} (ς) = \int_{ς^{o}}^{ς} (ϕ (υ) + ρ (υ) D σ (ς, υ) \int_{ς^{o}}^{υ} ϕ (c) v (ς; c) d t) w (ς; υ) d s;

w (ς; υ)

is the solution to the initial value problem in (40). We can use the bound in inequality (53) on

K_{1} (ς)

along with inequality (47) in the inequality (46) to obtain

\begin{matrix} D ζ (ς) - & [β (ς) - D β (ς) - ρ (ς) σ (ς)] ζ (ς) \\ \leq ϕ (ς) + (D β (ς) + ρ (ς) σ (ς)) ψ_{1} (ς) + \int_{ς^{o}}^{ς} ρ (υ) D σ (ς, υ) ψ_{1} (υ) d s . \end{matrix}

(54)

An application of Lemma 2 on the inequality (54) gives

\begin{matrix} ζ (ς) \leq \int_{ς^{o}}^{ς} ψ_{2} (υ) Y (ς; υ) d s, \end{matrix}

(55)

where

ψ_{2} (ς) = ϕ (ς) + (D β (ς) + ρ (ς) σ (ς)) ψ_{1} (ς) + \int_{ς^{o}}^{ς} ρ (υ) D σ (ς, υ) ψ_{1} (υ) d s,

and

Y (ς; υ)

is the solution to the initial value problem in (38).

We can use the upper bound in (55) on

ζ (ς)

in the inequality (43) to obtain

\begin{matrix} ζ_{i} (ς) \leq \int_{ς^{o}}^{ς} & [ϕ_{i} (υ) + β_{i} (υ) τ (ς, υ) + \int_{ς^{o}}^{υ} D β_{i} (ς, c) τ (ς, c) d t \\ + ρ_{i} (υ) \int_{ς^{o}}^{υ} σ_{i} (ς, c) τ (ς, c) d t \\ + \int_{ς^{o}}^{υ} ρ_{i} (c) (\int_{ς^{o}}^{t} D σ_{i} (ς, r) τ (ς, r) d r) d t] d s; i = 1, 2 . \end{matrix}

(56)

Substituting from inequality (56) in the inequality (42) produces inequality (37). This completes the proof. □

Remark 2.

Let us consider the following system with

n = 2

(i.e., we are dealing with functions in

R^{2}

, and

ς^{o} = 0

). For

i = 1, 2

, if

\begin{matrix} t_{i} (ς, ℑ) \leq a_{i} (ς, ℑ) & + \int_{0}^{ς} \int_{0}^{ℑ} b_{i} (υ, c) t_{1} (υ, c) d t d s + \int_{0}^{ς} \int_{0}^{ℑ} c_{i} (υ, c) t_{2} (υ, c) d t d s \\ + \int_{0}^{ς} \int_{0}^{ℑ} e_{i} (υ, c) (\int_{0}^{υ} \int_{0}^{t} f_{i} (r, θ) t_{1} (r, θ) d θ d r) d t d s \\ + \int_{0}^{ς} \int_{0}^{ℑ} g_{i} (υ, c) (\int_{0}^{υ} \int_{0}^{t} h_{i} (r, θ) t_{2} (r, θ) d θ d r) d t d s, \end{matrix}

then

\begin{matrix} t_{i} (ς, ℑ) \leq a_{i} (ς, ℑ) & + \int_{0}^{ς} \int_{0}^{ℑ} [ϕ_{i} (υ, c) + β_{i} (υ, c) τ (υ, c) + ρ_{i} (υ, c) \int_{0}^{υ} \int_{0}^{t} σ_{i} (r, θ) τ (r, θ) d θ d r] d t d s, \end{matrix}

(57)

where

\begin{matrix} ϕ_{i} (ς, ℑ) = a_{1} (ς, ℑ) b_{i} (ς, ℑ) & + a_{2} (ς, ℑ) c_{i} (ς, ℑ) + e_{i} (ς, ℑ) \int_{0}^{ς} \int_{0}^{ℑ} a_{1} (υ, c) f_{i} (υ, c) d t d s \\ + g_{i} (ς, ℑ) \int_{0}^{ς} \int_{0}^{ℑ} a_{2} (υ, c) h_{i} (υ, c) d t d s, \end{matrix}

β_{i} (ς, ℑ) = b_{i} (ς, ℑ) + c_{i} (ς, ℑ),

ρ_{i} (ς, ℑ) = e_{i} (ς, ℑ) + g_{i} (ς, ℑ),

σ_{i} (ς, ℑ) = f_{i} (ς, ℑ) + h_{i} (ς, ℑ),

β (ς, ℑ) = \sum_{i = 1}^{2} β_{i} (ς, ℑ),

ρ (ς, ℑ) = \sum_{i = 1}^{2} ρ_{i} (ς, ℑ),

σ (ς, ℑ) = \sum_{i = 1}^{2}

σ_{i} (ς, ℑ),

ϕ (ς, ℑ) = \sum_{i = 1}^{2} ϕ_{i} (ς, ℑ),

τ (ς, ℑ; υ, c) = \int_{0}^{υ} \int_{0}^{t} Y (ς, ℑ; r, θ) ψ (r, θ) d θ d r

;

Y (ς, ℑ; υ, c)

is the solution to the following characteristic initial value problem:

\begin{matrix} \frac{\partial^{2} Y (ς, ℑ; υ, c)}{\partial υ \partial t} - & [β (ς) - ρ (ς) σ (ς)] Y (ς, ℑ; υ, c) = 0, in Ω, \\ Y (ς, ℑ; υ, c) = 1 on υ = ς, t = ℑ, \end{matrix}

ψ (ς, ℑ) = ϕ (ς, ℑ) + ρ (ς, ℑ) σ (ς, ℑ) \int_{0}^{ς} \int_{0}^{ℑ} ϕ (υ, c) w (ς, ℑ; υ, c) d t d s

, and

w (ς, ℑ; υ, c)

is the solution to the initial value problem

\begin{matrix} \frac{\partial^{2} w (ς, ℑ; υ, c)}{\partial υ \partial t} - & [β (ς) + ρ (ς) σ (ς) + 1] w (ς, ℑ; υ, c) = 0, in Ω, \\ w (ς, ℑ; υ, c) = 1 on υ = ς, t = ℑ . \end{matrix}

Theorem 3.

Let

t_{i} (ς), p_{i} (ς), q_{i} (ς), c_{i} (ς), f_{i} (ς), g_{i} (ς)

, and

h_{i} (ς)

be real-valued, positive, continuous functions on Ω, and let

a_{i} (ς)

be positive, continuous, non-decreasing functions on Ω;

i = 1, 2

. In addition, let

H (α)

be positive, continuous, non-decreasing function satisfying

t^{- 1} H (α) \leq H (t^{- 1} α)

, where

α \geq 0

. Assume that the system

\begin{matrix} t_{i} (ς) & \leq a_{i} (ς) + \int_{ς^{o}}^{ς} p_{i} (υ) H (t_{1} (υ)) d s + \int_{ς^{o}}^{ς} q_{i} (υ) H (t_{2} (υ)) d s \\ + \int_{ς^{o}}^{ς} e_{i} (υ) (\int_{ς^{o}}^{υ} f_{i} (c) H (t_{1} (c)) d t) d s + \int_{ς^{o}}^{ς} g_{i} (υ) (\int_{ς^{o}}^{υ} h_{i} (c) H (t_{2} (c)) d t) d s, \end{matrix}

(58)

is satisfied for all

ς \in Ω

with

ς \geq ς^{o}

. Then, for

ς^{o} \leq ς \leq ς^{*}

, we have

\begin{matrix} t_{i} (ς) \leq a_{i} (ς) [1 + 2 \int_{ς^{o}}^{ς} [ϕ_{i} (υ) H (γ (υ)) d s + ρ_{i} (υ) \int_{ς^{o}}^{υ} ψ_{i} (c) H (γ (c)) d t] d s], \end{matrix}

(59)

where

ϕ_{1} (ς) = p_{1} (ς) + q_{1} (ς) \frac{a_{2} (ς)}{a_{1} (ς)},

ϕ_{2} (ς) = p_{2} (ς) \frac{a_{1} (ς)}{a_{2} (ς)} + q_{2} (ς),

ϕ (ς) = \sum_{i = 1}^{2} ϕ_{i} (ς),

ψ_{1} (ς) = f_{1} (ς) + h_{1} (ς) \frac{a_{2} (ς)}{a_{1} (ς)},

ψ_{2} (ς) = f_{2} (ς) \frac{a_{1} (ς)}{a_{2} (ς)} + h_{2} (ς),

ψ (ς) = \sum_{i = 1}^{2} ψ_{i} (ς),

ρ_{i} (ς) = e_{i} (ς) + g_{i} (ς),

ρ (ς) = \sum_{i = 1}^{2} ρ_{i} (ς),

and

G (r) = \int_{r^{o}}^{r} \frac{d s}{H (υ)},

while

ς^{*}

is chosen so that

G (2) + 2 \int_{ς^{o}}^{ς} (ϕ (υ) + ρ (υ) \int_{ς^{o}}^{ς} ψ (c) (c) d t) d s \in D o m (G^{- 1})

and

γ (ς) = G^{- 1} (G (2) + 2 \int_{ς^{o}}^{ς} (ϕ (υ) + ρ (υ) \int_{ς^{o}}^{ς} ψ (c) d t) d s) .

Proof.

Utilizing the assumptions on

a_{i} (ς)

, where

i = 1, 2,

and

H (α)

allows us to write the system in (58) as follows:

\begin{matrix} \frac{t_{i} (ς)}{a_{i} (ς)} \leq T_{i} (ς); i = 1, 2, \end{matrix}

(60)

where

\begin{matrix} T_{1} (ς) = & 1 + \int_{ς^{o}}^{ς} p_{1} (υ) H (\frac{t_{1} (υ)}{a_{1} (υ)}) d s + \int_{ς^{o}}^{ς} q_{1} (υ) \frac{a_{2} (υ)}{a_{1} (υ)} H (\frac{t_{2} (υ)}{a_{2} (υ)}) d s \\ + \int_{ς^{o}}^{ς} e_{1} (υ) (\int_{ς^{o}}^{υ} f_{1} (c) H (\frac{t_{1} (c)}{a_{1} (c)}) d t) d s + \int_{ς^{o}}^{ς} g_{1} (υ) (\int_{ς^{o}}^{υ} h_{1} (c) \frac{a_{2} (c)}{a_{1} (c)} H (\frac{t_{2} (c)}{a_{2} (c)}) d t) d s; \\ where T_{1} = 1 on ς_{i} = ς_{i}^{o}, i = 1, \dots, n, \end{matrix}

(61)

and

\begin{matrix} T_{2} (ς) = & 1 + \int_{ς^{o}}^{ς} p_{2} (υ) \frac{a_{1} (υ)}{a_{2} (υ)} H (\frac{t_{1} (υ)}{a_{1} (υ)}) d s + \int_{ς^{o}}^{ς} q_{2} (υ) H (\frac{t_{2} (υ)}{a_{2} (υ)}) d s \\ + \int_{ς^{o}}^{ς} e_{2} (υ) (\int_{ς^{o}}^{υ} f_{2} (c) \frac{a_{1} (c)}{a_{2} (c)} H (\frac{t_{1} (c)}{a_{1} (c)}) d t) d s + \int_{ς^{o}}^{ς} g_{2} (υ) (\int_{ς^{o}}^{υ} h_{2} (c) H (\frac{t_{2} (c)}{a_{2} (c)}) d t) d s; \\ where T_{2} = 1 on ς_{i} = ς_{i}^{o}, i = 1, \dots, n . \end{matrix}

(62)

Now, from relations (60) and (61), we have

\begin{matrix} D T_{1} (ς) & \leq p_{1} (ς) H (T_{1} (ς)) + q_{1} (ς) \frac{a_{2} (ς)}{a_{1} (ς)} H (T_{2} (ς)) + e_{1} (ς) (\int_{ς^{o}}^{ς} f_{1} (υ) H (T_{1} (υ)) d s) \\ + g_{1} (ς) (\int_{ς^{o}}^{ς} h_{1} (υ) \frac{a_{2} (υ)}{a_{1} (υ)} H (T_{2} (υ)) d s) . \end{matrix}

(63)

Since all functions are positive and H is a non-decreasing function, the inequality (63) can be written as follows:

D T_{1} (ς) \leq 2 ϕ_{1} (ς) H (T (ς)) + 2 ρ_{1} (ς) (\int_{ς^{o}}^{ς} ψ_{1} (υ) H (T (υ)) d s),

(64)

where

ϕ_{1} (ς), ρ_{1} (ς)

, and

ψ_{1} (ς)

are as defined in the statement of this theorem and

T (ς) = \sum_{i = 1}^{2} T_{i} (ς)

. Similarly, by relations (60) and (62), we obtain

D T_{2} (ς) \leq 2 ϕ_{2} (ς) H (T (ς)) + 2 ρ_{2} (ς) (\int_{ς^{o}}^{ς} ψ_{2} (υ) H (T (υ)) d s),

(65)

where

ϕ_{2} (ς),

ρ_{2} (ς)

and

ψ_{2} (ς)

are as defined in the statement of this theorem.

Now, adding the inequalities in (64) and (65) yields

D T (ς) \leq 2 ϕ (ς) H (T (ς)) + 2 ρ (ς) (\int_{ς^{o}}^{ς} ψ (υ) H (T (υ)) d s),

(66)

where

ϕ (ς),

ρ (ς)

and

ψ (ς)

are as defined in the statement of this theorem. Since H is a non-decreasing function and

ς^{o} \leq υ \leq ς

, then

H (T (υ)) \leq H (T (ς))

, which causes inequality (66) to take the form

D T (ς) \leq 2 [ϕ (ς) + ρ (ς) \int_{ς^{o}}^{ς} ψ (υ) d s] H (T (ς)) .

(67)

By applying Lemma 1, we find from inequality (67) that

G (T (ς)) - G (2) \leq 2 \int_{ς^{o}}^{ς} (ϕ (υ) + ρ (υ) \int_{ς^{o}}^{υ} ψ (c) d t) d s,

which implies that

T (ς) \leq G^{- 1} (G (2) + 2 \int_{ς^{o}}^{ς} (ϕ (υ) + ρ (υ) \int_{ς^{o}}^{υ} ψ (c) d t) d s),

In other words, we have

T (ς) \leq γ (ς),

(68)

where

γ (ς)

is as given in the statement of the theorem. We can use the bound in (68) on

T (ς)

in inequality (64) to obtain

D T_{1} (ς) \leq 2 ϕ_{1} (ς) H (γ (ς)) + 2 ρ (ς) (\int_{ς^{o}}^{ς} ψ_{1} (υ) H (γ (υ)) d s) .

(69)

Integrating both sides of inequality (69) with respect to

ς

from

ς^{o}

to

ς

produces

T_{1} (ς) \leq 1 + 2 \int_{ς^{o}}^{ς} [ϕ_{1} (υ) H (γ (υ)) + ρ_{1} (υ) (\int_{ς^{o}}^{υ} ψ_{1} (c) H (γ (c))) d t] d s .

(70)

Similarly, we can obtain from inequalities (65) and (68) that

T_{2} (ς) \leq 1 + 2 \int_{ς^{o}}^{ς} [ϕ_{2} (υ) H (γ (υ)) + ρ_{2} (υ) (\int_{ς^{o}}^{υ} ψ_{2} (c) H (γ (c))) d t] d s .

(71)

Using inequalities (70) and (71) in inequality (60) leads to inequality (59). This completes the proof. □

4. Applications

This section presents some applications of the results proven in this paper. The theorems proven in this paper cover a wide range of previously proven results. This aim can be attained by limiting some of the functions in our results. For instance, if the functions

e_{i} (ς)

and

g_{i} (ς)

vanish, then consequently, the functions

ψ_{i} (ς), ψ (ς), ρ (i) (ς),

and

ρ (ς)

vanish as well, and then Theorem 3 states the following. If the system

\begin{matrix} t_{i} (ς) & \leq a_{i} (ς) + \int_{ς^{o}}^{ς} p_{i} (υ) H (t_{1} (υ)) d s + \int_{ς^{o}}^{ς} q_{i} (υ) H (t_{2} (υ)) d s, \end{matrix}

is satisfied for all

ς \in Ω

with

ς \geq ς^{o}

, then for

ς^{o} \leq ς \leq ς^{*}

, we have

\begin{matrix} t_{i} (ς) \leq a_{i} (ς) [1 + 2 \int_{ς^{o}}^{ς} ϕ_{i} (υ) H (γ (υ)) d s], \end{matrix}

where

ϕ_{1} (ς) = p_{1} (ς) + q_{1} (ς) \frac{a_{2} (ς)}{a_{1} (ς)},

ϕ_{2} (ς) = p_{2} (ς) \frac{a_{1} (ς)}{a_{2} (ς)} + q_{2} (ς),

ϕ (ς) = \sum_{i = 1}^{2} ϕ_{i} (ς),

and

G (r) = \int_{r^{o}}^{r} \frac{d s}{H (υ)},

while

ς^{*}

is chosen so that

G (2) + 2 \int_{ς^{o}}^{ς} ϕ (υ) d s \in D o m (G^{- 1})

and

γ (ς) = G^{- 1} (G (2) + 2 \int_{ς^{o}}^{ς} ϕ (υ) d s) .

On the other hand, we can apply Remarks 1 and 2 in order to obtain some upper bounds for the systems of integral inequalities. In what follows, we present two applications:

Consider the following system of integral inequalities in two unknown functions $t_{1} (ς, ℑ)$ and $t_{2} (ς, ℑ)$ :

$\begin{matrix} t_{1} (ς, ℑ) \leq x y + \int_{0}^{ς} \int_{0}^{ℑ} & s t_{1} (υ, c) d t d s - \int_{0}^{ς} \int_{0}^{ℑ} t u_{2} (υ, c) d t d s \\ + \int_{0}^{ς} \int_{0}^{ℑ} \frac{1}{s t} (\int_{0}^{υ} \int_{0}^{t} θ t_{2} (r, θ) d θ d r) d t d s, \end{matrix}$

and

$\begin{matrix} t_{2} (ς, ℑ) \leq x y + \int_{0}^{ς} \int_{0}^{ℑ} t t_{1} (υ, c) d t d s + \int_{0}^{ς} \int_{0}^{ℑ} \frac{1}{t^{2}} (\int_{0}^{υ} \int_{0}^{t} (- r - θ) t_{1} (r, θ) d θ d r) d t d s . \end{matrix}$

Comparing this system with the system given in Remark 1 indicates that

$\begin{matrix} ϕ_{1} (ς, ℑ) = ς - ℑ, ϕ_{2} (ς, ℑ) = ℑ, ϕ (ς, ℑ) = ς, ψ_{1} (ς, ℑ) = ℑ, ψ_{2} (ς, ℑ) = - (ς + ℑ), \\ ψ (ς, ℑ) = - ς, ρ_{1} (ς, ℑ) = \frac{1}{x y}, ρ_{2} (ς, ℑ) = \frac{1}{ℑ^{2}}, ρ (ς, ℑ) = \frac{ς + ℑ}{x y^{2}} . \end{matrix}$

Thus, we have

$\begin{matrix} η (ς, ℑ) & = 2 + 2 \int_{0}^{ς} \int_{0}^{ℑ} υ exp (\int_{0}^{υ} \int_{0}^{t} (r - r) d θ d r) d t d s \\ = 2 + ς^{2} ℑ, \end{matrix}$

which leads to

$\begin{matrix} t_{1} (ς, ℑ) & \leq x y [1 + \int_{0}^{ς} \int_{0}^{ℑ} ((υ - c) (2 + υ^{2} c) + \frac{1}{s t} \int_{0}^{υ} \int_{0}^{t} θ (2 + r^{2} θ) d θ d r) d t d s] \\ = x y [1 + \int_{0}^{ς} \int_{0}^{ℑ} (2 υ + υ^{3} t - t - \frac{8}{9} υ^{2} t^{2}) d t d s] \\ = x y [1 + x y (ς + (\frac{ς^{3} - 4}{8}) ℑ - \frac{8}{81} ς^{2} ℑ^{2})], \end{matrix}$

and

$\begin{matrix} t_{2} (ς, ℑ) & \leq x y [1 + \int_{0}^{ς} \int_{0}^{ℑ} (t (2 + υ^{2} c) - \frac{1}{t^{2}} \int_{0}^{υ} \int_{0}^{t} (r + θ) (2 + r^{2} θ) d θ d r) d t d s] \\ = x y [1 + \int_{0}^{ς} \int_{0}^{ℑ} (2 t + υ^{2} t^{2} - (\frac{υ^{2}}{t} + υ + \frac{υ^{4}}{8} + \frac{υ^{3} t}{9})) d t d s] \\ = x y [1 + x y (\frac{- ς}{2} (1 + \frac{ς^{3}}{20}) + (1 - \frac{ς^{3}}{72}) ℑ + \frac{1}{9} ς^{2} ℑ^{2}) - \frac{ς^{3}}{3} ln ℑ]; ℑ > 0 . \end{matrix}$
Consider the following system of integral inequalities in two unknown functions $t_{1} (ς, ℑ)$ and $t_{2} (ς, ℑ)$ :

$\begin{matrix} t_{1} (ς, ℑ) \leq \frac{- 1}{2} \int_{0}^{ς} \int_{0}^{ℑ} & t_{1} (υ, c) d t d s - \int_{0}^{ς} \int_{0}^{ℑ} (\frac{1}{2} + υ) t_{2} (υ, c) d t d s \\ - \int_{0}^{ς} \int_{0}^{ℑ} \frac{1}{2} (\int_{0}^{υ} \int_{0}^{t} \frac{1}{θ} t_{2} (r, θ) d θ d r) d t d s, \end{matrix}$

and

$\begin{matrix} t_{2} (ς, ℑ) \leq ℑ & + \int_{0}^{ς} \int_{0}^{ℑ} υ t_{1} (υ, c) d t d s + \frac{1}{2} \int_{0}^{ς} \int_{0}^{ℑ} t_{2} (υ, c) d t d s \\ + \int_{0}^{ς} \int_{0}^{ℑ} \frac{1}{2 t + 2} (\int_{0}^{υ} \int_{0}^{t} t_{1} (r, θ) d θ d r) d t d s . \end{matrix}$

Comparing this system with the system given in Remark 2 indicates that

$\begin{matrix} ϕ_{1} (ς, ℑ) = - ℑ (\frac{1}{2} + ς) - \frac{1}{2} x y, ϕ_{2} (ς, ℑ) = \frac{1}{2} ℑ, ϕ (ς, ℑ) = - \frac{3}{2} x y, \\ β_{1} (ς, ℑ) = - (1 + ς), β_{2} (ς, ℑ) = ς + \frac{1}{2}, β (ς, ℑ) = - \frac{1}{2}, \\ ρ_{1} (ς, ℑ) = - \frac{1}{2}, ρ_{2} (ς, ℑ) = \frac{1}{2 (ℑ + 1)}, ρ (ς, ℑ) = - \frac{ℑ}{2 (ℑ + 1)}, \\ σ_{1} (ς, ℑ) = \frac{1}{ℑ}, σ_{2} (ς, ℑ) = 1, σ (ς, ℑ) = \frac{ℑ + 1}{ℑ} . \end{matrix}$

Therefore, we have

$\begin{matrix} β - ρ σ = 0, β + ρ σ + 1 = 0, this leads to \frac{\partial^{2} Y}{\partial υ \partial t} = 0 so Y = 1, \\ in addition \frac{\partial^{2} w}{\partial υ \partial t} = 0, i . e ., w = 1, and τ (ς, ℑ) = \frac{3}{8} (\frac{ς^{3} ℑ^{3}}{18} - ς^{2} ℑ^{2}) . \end{matrix}$

Thus, the inequalities in (57) lead to

$\begin{matrix} t_{1} (ς, ℑ) & \leq \int_{0}^{ς} \int_{0}^{ℑ} [- \frac{t}{2} - \frac{3 s t}{2} + \frac{3}{8} (υ^{2} t^{2} - \frac{υ^{3} t^{3}}{18} + υ^{3} t^{2} - \frac{υ^{4} t^{3}}{18}) \\ - \frac{3}{16} \int_{0}^{υ} \int_{0}^{t} (\frac{r^{3} θ^{2}}{18} - r^{2} θ) d θ d r] d t d s \\ = \frac{x y^{2}}{8} [- 2 - 3 ς + (\frac{13 ς + 16}{48}) ς^{2} ℑ - (\frac{5 ς + 6}{576}) ς^{3} ℑ^{2}], \end{matrix}$

and

$\begin{matrix} t_{2} (ς, ℑ) & \leq ℑ + \int_{0}^{ς} \int_{0}^{ℑ} [\frac{t}{2} + \frac{3}{8} (υ + \frac{1}{2}) (\frac{υ^{3} t^{3}}{18} - υ^{2} t^{2}) \\ + \frac{3}{16 (t + 1)} \int_{0}^{υ} \int_{0}^{t} (\frac{r^{3} θ^{3}}{18} - r^{2} θ^{2}) d θ d r] d t d s \\ = \frac{ℑ}{16} [16 - \frac{ς^{4}}{2} (\frac{ς + 40}{16 (15)}) + (\frac{ς^{4}}{16 (15) 4} + \frac{ς^{3}}{24} + 4) x y - (\frac{ς^{3}}{40} + 19 ς^{2} + 12 ς) \frac{ς^{2} ℑ^{2}}{2 (18)} \\ + (\frac{33 ς^{2}}{20} + ς) \frac{ς^{3} ℑ^{3}}{48 (16)}] + \frac{ς^{4}}{2 (16)} (\frac{ς}{40} + 1) ln (1 + ℑ); ℑ > - 1 . \end{matrix}$

5. Discussion

By applying Young’s method, which depends on the Riemann method, we proved additional generalizations of the integral inequality in n independent variables. Some applications of the results proven in this paper are presented.

Author Contributions

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

Funding

This research received no external funding.

Institutional Review Board Statement

Not applicable.

Informed Consent Statement

Not applicable.

Data Availability Statement

Not applicable.

Conflicts of Interest

The authors declare no conflict of interest.

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Abuelela, W.; El-Deeb, A.A.; Baleanu, D. On Some Generalizations of Integral Inequalities in n Independent Variables and Their Applications. Symmetry 2022, 14, 2257. https://doi.org/10.3390/sym14112257

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Abuelela W, El-Deeb AA, Baleanu D. On Some Generalizations of Integral Inequalities in n Independent Variables and Their Applications. Symmetry. 2022; 14(11):2257. https://doi.org/10.3390/sym14112257

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Abuelela, Waleed, Ahmed A. El-Deeb, and Dumitru Baleanu. 2022. "On Some Generalizations of Integral Inequalities in n Independent Variables and Their Applications" Symmetry 14, no. 11: 2257. https://doi.org/10.3390/sym14112257

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Abuelela, W., El-Deeb, A. A., & Baleanu, D. (2022). On Some Generalizations of Integral Inequalities in n Independent Variables and Their Applications. Symmetry, 14(11), 2257. https://doi.org/10.3390/sym14112257

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On Some Generalizations of Integral Inequalities in n Independent Variables and Their Applications

Abstract

1. Introduction

2. Auxiliary Results

3. Results and Discussion

4. Applications

5. Discussion

Author Contributions

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