Some New Oscillation Results for Fourth-Order Neutral Differential Equations with Delay Argument

Bazighifan, Omar; Moaaz, Osama; El-Nabulsi, Rami Ahmad; Muhib, Ali

doi:10.3390/sym12081248

Open AccessFeature PaperEditor’s ChoiceArticle

Some New Oscillation Results for Fourth-Order Neutral Differential Equations with Delay Argument

¹

Department of Mathematics, Faculty of Science, Hadhramout University, Hadhramout 50512, Yemen

²

Department of Mathematics, Faculty of Education, Seiyun University, Hadhramout 50512, Yemen

³

Department of Mathematics, Faculty of Science, Mansoura University, Mansoura 35516, Egypt

⁴

Athens Institute for Education and Research, Mathematics and Physics Divisions, 10671 Athens, Greece

⁵

Department of Mathematics, Faculty of Education, Ibb University, Ibb 999101, Yemen

^*

Authors to whom correspondence should be addressed.

^†

These authors contributed equally to this work.

Symmetry 2020, 12(8), 1248; https://doi.org/10.3390/sym12081248

Submission received: 18 May 2020 / Revised: 30 May 2020 / Accepted: 8 June 2020 / Published: 29 July 2020

(This article belongs to the Special Issue Asymptotic Properties of Solutions of Difference and Differential Equations)

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Abstract

:

The aim of this paper is to study the oscillatory properties of 4th-order neutral differential equations. We obtain some oscillation criteria for the equation by the theory of comparison. The obtained results improve well-known oscillation results in the literate. Symmetry plays an important role in determining the right way to study these equation. An example to illustrate the results is given.

Keywords:

oscillation; fourth-order; neutral differential equations

1. Introduction

Differential equations with neutral delay are used in many applications such as biological, physical, engineering and chemical applications [1]. Symmetry plays an important role in determining the right way to study these equations, see [2].

In the last few decades, there has been a constant interest to investigate the asymptotic property for oscillations of differential equations [3,4,5,6,7,8,9,10,11,12,13,14,15,16,17,18,19] and nonlinear neutral differential equations, see [20,21,22,23,24,25,26,27,28,29,30,31,32]. Oscillation of nonlinear differential equations with delay arguments has been further developed in recent years. For some this results, see [33,34,35,36,37].

In this work, we investigate the oscillation of fourth-order nonlinear differential equation with neutral delay

{(r (y) {(ϖ^{‴} (y))}^{γ})}^{'} + q (y) u^{β} (ς (y)) = 0, y \geq y_{0},

(1)

where

ϖ (y) : = u (y) + p (y) u (ζ (y))

. We assume that

γ

and

β

are quotient of odd positive integers,

r, p, q \in C [y_{0}, \infty),

r (y) > 0,

r^{'} (y) \geq 0,

q (y) > 0,

0 \leq p (y) < p_{0} < \infty,

ζ, ς \in C [y_{0}, \infty),

ζ (y) \leq y,

{lim}_{y \to \infty} ζ (y) = {lim}_{y \to \infty} ς (y) = \infty

and

\int_{y_{0}}^{\infty} \frac{1}{r^{1 / γ} (s)} d s = \infty .

(2)

Definition 1.

If a solution u of (1) is neither eventually positive nor eventually negative, then it is said to be oscillatory. So, if all solutions are oscillate, then the equation is oscillatory.

Several authors in [3,4,5,6,38] considered the equation

{(r (y) {(u^{(m - 1)} (y))}^{γ})}^{'} + q (y) u^{β} (ζ (y)) = 0,

(3)

where

r^{'} (u) > 0, m

is an even and (2) holds. In [7,29], Zhang et al. studied the oscillation of (3) under the assumption that

\int_{y_{0}}^{\infty} r^{- 1 / γ} (s) d s < \infty .

(4)

Moaaz et al. [23] established the oscillation of even-order neutral differential equation

{(r (u) {(ϖ^{(m - 1)} (u))}^{γ})}^{'} + q (u) u^{γ} (ς (u)) = 0 .

(5)

where m is an even and

ϖ (u) : = u (u) + p (u) u (ζ (u))

.

Xing et al. [20] established the asymptotic properties of even-order neutral differential Equation (3) where

0 \leq p (u) < p_{0} < \infty

.

Bazighifan et al. [27] studied the oscillation of neutral differential equation

{(r (u) {(ϖ^{‴} (u))}^{γ})}^{'} + \sum_{i = 1}^{j} q_{i} (u) u^{γ} (ς_{i} (u)) = 0, j \geq 1,

where

j \geq 1, ς_{i} (u) \leq u

and under the assumption (2).

Our aim in this work is to improve results in [20] and to complement results in [9].

We shall employ the following lemmas:

Lemma 1.

[18] Assume that

u \in C^{m} ([y_{0}, \infty), (0, \infty)),

then

\frac{u (y)}{y^{m} / m!} \geq \frac{u^{'} (y)}{y^{m - 1} / (m - 1)!}

where u satisfies

u^{(i)} (y) > 0,

i = 0, 1, \dots, m,

and

u^{(m + 1)} (y) < 0 .

Lemma 2.

([22], Lemmas 1 and 2) Let

z_{1}, z_{2} \geq 0

, then

{(z_{1} + z_{2})}^{β} \leq 2^{β - 1} (z_{1}^{β} + z_{2}^{β}), for β \geq 1

and

{(z_{1} + z_{2})}^{β} \leq z_{1}^{β} + z_{2}^{β}, for β \leq 1 .

where β is a positive real number.

Lemma 3.

([3], Lemma 2.2.3) Let

u \in C^{m} ([y_{0}, \infty), (0, \infty)) .

If

u^{(m)} (y)

is of fixed sign and not identically zero on

[y_{0}, \infty)

and that there exists a

y_{1} \geq y_{0}

such that

u^{(m - 1)} (y) u^{(m)} (y) \leq 0

for all

y \geq y_{1}

. If

{lim}_{y \to \infty} u (y) \neq 0,

then for every

μ \in (0, 1)

there exists

y_{μ} \geq y_{1}

such that

u (y) \geq \frac{μ}{(m - 1)!} y^{m - 1} |u^{(m - 1)} (y)|, for y \geq y_{μ} .

2. Main Results

Firstly, we will define the following notations:

κ : = \{\begin{matrix} 1 & if β \leq 1; \\ 2^{β - 1} & if β > 1, \end{matrix}

and

\hat{q} (y) : = min \{q (ς^{- 1} (y)), q (ς^{- 1} (ζ (y)))\} .

Theorem 1.

Assume that

{(ς^{- 1} (y))}^{'} \geq ς_{0} > 0 and ζ^{'} (y) \geq ζ_{0} > 0 .

(6)

If the differential inequality

η^{'} (y) + \frac{1}{κ} {(\frac{μ y^{3}}{6 r^{1 / γ} (y)})}^{β} {(\frac{ς_{0} ζ_{0}}{ζ_{0} + p_{0}^{β}})}^{β / γ} \hat{q} (y) η^{β / γ} (ζ^{- 1} (ς (y))) \leq 0

(7)

is oscillatory for some

μ \in (0, 1)

, then (1) is oscillatory.

Proof.

Suppose that (1) has a nonoscillatory solution in

[y_{0}, \infty)

. Without loss of generality, we let u be an eventually positive solution of (1). Then, there exists a

y_{1} \geq y_{0}

such that

u (y) > 0,

u (ζ (y)) > 0

and

u (ς (y)) > 0

for

y \geq y_{1}

. Since

r^{'} (y) > 0

, we have

ϖ (y) > 0, ϖ^{'} (y) > 0, ϖ^{‴} (y) > 0, ϖ^{(4)} (y) < 0 and {(r (y) {(ϖ^{‴} (y))}^{γ})}^{'} \leq 0,

(8)

for

y \geq y_{1}

. From (1), we get

\frac{1}{{(ς^{- 1} (y))}^{'}} {(r (ς^{- 1} (y)) {(ϖ^{‴} (ς^{- 1} (y)))}^{γ})}^{'} + q (ς^{- 1} (y)) u^{β} (y) = 0 .

(9)

It follows from definition of

ϖ

and Lemma 2 that

\begin{matrix} ϖ^{β} (y) & = & {(u (y) + p (y) u (ζ (y)))}^{β} \\ \leq & κ (u^{β} (y) + p_{0}^{β} u^{β} (ζ (y))) . \end{matrix}

(10)

From (9) and (10), we obtain

\begin{matrix} 0 & = & \frac{1}{{(ς^{- 1} (y))}^{'}} {(r (ς^{- 1} (y)) {(ϖ^{‴} (ς^{- 1} (y)))}^{γ})}^{'} + q (ς^{- 1} (y)) u^{β} (y) \\ + p_{0}^{β} (\frac{1}{{(ς^{- 1} (ζ (y)))}^{'}} {(r (ς^{- 1} (ζ (y))) {(ϖ^{‴} (ς^{- 1} (ζ (y))))}^{γ})}^{'} + q (ς^{- 1} (ζ (y))) u^{β} (ζ (y))) \\ = & \frac{{(r (ς^{- 1} (y)) {(ϖ^{‴} (ς^{- 1} (y)))}^{γ})}^{'}}{{(ς^{- 1} (y))}^{'}} + p_{0}^{β} \frac{{(r (ς^{- 1} (ζ (y))) {(ϖ^{‴} (ς^{- 1} (ζ (y))))}^{γ})}^{'}}{{(ς^{- 1} (ζ (y)))}^{'}} \\ + q (ς^{- 1} (y)) u^{β} (y) + p_{0}^{β} q (ς^{- 1} (ζ (y))) u^{β} (ζ (y)) \\ \geq & \frac{{(r (ς^{- 1} (y)) {(ϖ^{‴} (ς^{- 1} (y)))}^{γ})}^{'}}{{(ς^{- 1} (y))}^{'}} + p_{0}^{β} \frac{{(r (ς^{- 1} (ζ (y))) {(ϖ^{‴} (ς^{- 1} (ζ (y))))}^{γ})}^{'}}{{(ς^{- 1} (ζ (y)))}^{'}} + \frac{1}{κ} \hat{q} (y) ϖ^{β} (y), \end{matrix}

which with (6) gives

\begin{matrix} \frac{1}{ς_{0}} {(r (ς^{- 1} (y)) {(ϖ^{‴} (ς^{- 1} (y)))}^{γ})}^{'} \\ + \frac{p_{0}^{β}}{ς_{0} ζ_{0}} {(r (ς^{- 1} (ζ (y))) {(ϖ^{‴} (ς^{- 1} (ζ (y))))}^{γ})}^{'} + \frac{1}{κ} \hat{q} (y) ϖ^{β} (y) \leq 0 . \end{matrix}

(11)

Since

ϖ^{'} (y) > 0

, we get that

{lim}_{y \to \infty} ϖ (y) \neq 0

. Thus, from Lemma 3, we get

ϖ (y) \geq \frac{μ}{6} y^{3} ϖ^{‴} (y) .

(12)

Combining (11) and (12), we see that

\begin{matrix} \frac{1}{ς_{0}} {(r (ς^{- 1} (y)) {(ϖ^{‴} (ς^{- 1} (y)))}^{γ})}^{'} + \frac{p_{0}^{β}}{ς_{0} ζ_{0}} {(r (ς^{- 1} (ζ (y))) {(ϖ^{‴} (ς^{- 1} (ζ (y))))}^{γ})}^{'} \\ + \frac{1}{κ} \hat{q} (y) {(\frac{μ}{6} y^{3})}^{β} {(ϖ^{‴} (y))}^{β} \leq 0 . \end{matrix}

(13)

If we set

η (y) : = \frac{1}{ς_{0}} r (ς^{- 1} (y)) {(ϖ^{‴} (ς^{- 1} (y)))}^{γ} + \frac{p_{0}^{β}}{ς_{0} ζ_{0}} r (ς^{- 1} (ζ (y))) {(ϖ^{‴} (ς^{- 1} (ζ (y))))}^{γ},

then it is easy to see that

η (ζ^{- 1} (ς (y))) \leq (\frac{ζ_{0} + p_{0}^{β}}{ς_{0} ζ_{0}}) r (y) {(ϖ^{‴} (y))}^{γ} .

Thus, from (13), we get that

η

is a positive solution of

η^{'} (y) + \frac{1}{κ} {(\frac{μ y^{3}}{6 r^{1 / γ} (y)})}^{β} {(\frac{ς_{0} ζ_{0}}{ζ_{0} + p_{0}^{β}})}^{β / γ} \hat{q} (y) η^{β / γ} (ζ^{- 1} (ς (y))) \leq 0 .

which is a contradiction. The proof is complete. □

Theorem 2.

Assume that (6) holds. If the differential inequality

ϑ^{'} (y) + \frac{1}{κ} {(\frac{μ y^{3}}{6 r^{1 / γ} (y)})}^{β} (\frac{ς_{0} ζ_{0}}{ζ_{0} + p_{0}^{β}}) \hat{q} (y) ϑ^{β / γ} (ς (y)) \leq 0

(14)

is oscillatory for some

μ \in (0, 1)

, then (1) is oscillatory.

Proof.

Proceeding as in the proof of Theorem 1, we get (13). If we set

ϑ (y) : = r (ς^{- 1} (y)) {(ϖ^{‴} (ς^{- 1} (y)))}^{γ}

, then

ϑ

is a positive solution of (14), which is a contradiction. The proof is complete. □

Corollary 1.

Let

γ = β

and (6) holds. If

ξ (y) \leq y

and

\underset{y \to \infty}{lim inf} \int_{ξ (y)}^{y} \frac{s^{3 γ}}{r (s)} \hat{q} (s) d s > (\frac{ζ_{0} + p_{0}^{γ}}{ς_{0} ζ_{0}}) \frac{κ 6^{γ}}{e},

(15)

where

ξ (y) = ζ^{- 1} (ς (y))

or

ς (y)

, then (1) is oscillatory.

Proof.

It is well-known (see, e.g., ([17], Theorem 2.1.1)) that condition (15) implies the oscillation of (7) and (14). □

Theorem 3.

Assume that

p_{0} < 1

and

ς (y) \leq y

. If the equation

ψ^{'} (y) + {(1 - p_{0})}^{β} {(\frac{μ ς^{3} (y)}{6 r^{1 / γ} (ς (y))})}^{β} q (y) ψ^{β / γ} (ς (y)) = 0

(16)

is oscillatory for some

μ \in (0, 1)

, then (1) is oscillatory.

Proof.

Proceeding as in the proof of Theorem 1, we get (8). From definition of

ϖ

, we get

\begin{matrix} u (y) & \geq & ϖ (y) - p_{0} u (ζ (y)) \geq ϖ (y) - p_{0} ϖ (ζ (y)) \\ \geq & (1 - p_{0}) ϖ (y), \end{matrix}

which with (1) gives

{(r (y) {(ϖ^{‴} (y))}^{γ})}^{'} + q (y) {(1 - p_{0})}^{β} ϖ^{β} (ς (y)) \leq 0 .

(17)

From Lemma 3, we obtain

ϖ (y) \geq \frac{μ}{6} y^{3} ϖ^{‴} (y) .

(18)

Combining (17) and (18), we get

{(r (y) {(ϖ^{‴} (y))}^{γ})}^{'} + q (y) {(1 - p_{0})}^{β} {(\frac{μ}{6} ς^{3} (y))}^{β} {(ϖ^{‴} (ς (y)))}^{β} \leq 0 .

Hence, if we set

ψ : = r {(ϖ^{‴})}^{γ}

, then we get that

ψ

is a positive solution of the inequality

ψ^{'} (y) + {(1 - p_{0})}^{β} {(\frac{μ ς^{3} (y)}{6 r^{1 / γ} (ς (y))})}^{β} q (y) ψ^{β / γ} (ς (y)) \leq 0 .

In view of ([19], Corollary 1), the associated delay differential Equation (16) also has a positive solution, which is a contradiction. The proof is complete. □

Corollary 2.

Let

γ = β,

p_{0} < 1

and

ς (y) \leq y

. If

\underset{y \to \infty}{lim inf} \int_{ς (y)}^{y} \frac{ς^{3 γ} (s)}{r (ς (s))} q (s) d s > \frac{6^{γ}}{{(1 - p_{0})}^{γ} e},

(19)

then (1) is oscillatory.

Proof.

It is well-known (see, e.g., ([17], Theorem 2.1.1)) that condition (19) implies the oscillation of (16). □

Theorem 4.

Assume that

p_{0} < 1

and

ς (y) \leq y

. If there exists a positive functions

ρ, δ \in C^{1} ([y_{0}, \infty))

such that

\int_{y_{0}}^{\infty} (Ψ (s) - \frac{2^{γ}}{{(γ + 1)}^{γ + 1}} \frac{r (s) {(ρ^{'} (s))}^{γ + 1}}{μ_{1}^{γ} s^{2 γ} ρ^{γ} (s)}) d s = \infty

(20)

and

\int_{y_{0}}^{\infty} (τ (s) - \frac{{(δ^{'} (s))}^{2}}{4 δ (s)}) d s = \infty,

(21)

for some

μ_{1}, μ_{2} \in (0, 1)

and every

M_{1}, M_{2} > 0

, where

Ψ (y) : = M_{1}^{β - γ} ρ (y) q (y) {(1 - p_{0})}^{β} {(\frac{ς (y)}{y})}^{3 β}

and

τ (y) : = {(1 - p_{0})}^{β / γ} δ (y) M_{2}^{(β - γ) / γ} \int_{y}^{\infty} {(\frac{1}{r (z_{1})} \int_{z_{1}}^{\infty} q (s) \frac{ς^{β} (s)}{s^{β}} d s)}^{1 / γ} d z_{1},

then (1) is oscillatory.

Proof.

Proceeding as in the proof of Theorem 3, we find (8) and (17). From (8), we have

ϖ^{″}

is of one sign.

In the case where

ϖ^{″} (y) > 0

, we define

η (y) : = ρ (y) \frac{r (y) {(ϖ^{‴} (y))}^{γ}}{ϖ^{γ} (y)} > 0 .

By differentiating and using (17), we get

η^{'} (y) \leq \frac{ρ^{'} (y)}{ρ (y)} η (y) - ρ (y) q (y) {(1 - p_{0})}^{β} \frac{ϖ^{β} (ς (y))}{ϖ^{γ} (y)} - γ ρ (y) \frac{r (y) {(ϖ^{‴} (y))}^{γ}}{ϖ^{γ + 1} (y)} ϖ^{'} (y) .

(22)

By Lemma 1, we find

ϖ (y) \geq \frac{y}{3} ϖ^{'} (y)

, and hence,

\frac{ϖ (ς (y))}{ϖ (y)} \geq \frac{ς^{3} (y)}{y^{3}} .

(23)

Using Lemma 3, we get

ϖ^{'} (y) \geq \frac{μ_{1}}{2} y^{2} ϖ^{‴} (y),

(24)

for all

μ_{1} \in (0, 1)

. Thus, by (22)–(24), we obtain

\begin{matrix} η^{'} (y) & \leq & \frac{ρ^{'} (y)}{ρ (y)} η (y) - ρ (y) q (y) {(1 - p_{0})}^{β} ϖ^{β - γ} (y) {(\frac{ς (y)}{y})}^{3 β} \\ - γ μ_{1} \frac{y^{2}}{2 r^{1 / γ} (y) ρ^{1 / γ} (y)} η^{\frac{γ + 1}{γ}} (y) . \end{matrix}

Since

ϖ^{'} (y) > 0

, there exist a

y_{2} \geq y_{1}

such that

ϖ (y) > M,

(25)

for all

y \geq y_{2}

and a constant

M > 0

. Using the inequality

E x - F x^{(γ + 1) / γ} \leq \frac{γ^{γ}}{{(γ + 1)}^{γ + 1}} E^{γ + 1} F^{- γ}, F > 0,

with

E = ρ^{'} (y) / ρ (y), F = γ μ y^{2} / 2 r^{1 / γ} (y) ρ_{1}^{1 / γ} (y)

and

u = η

, we find

η^{'} (y) \leq - Ψ (y) + \frac{2^{γ}}{{(γ + 1)}^{γ + 1}} \frac{r (y) {(ρ^{'} (y))}^{γ + 1}}{μ_{1}^{γ} y^{2 γ} ρ^{γ} (y)} .

This implies that

\int_{y_{1}}^{y} (Ψ (s) - \frac{2^{γ}}{{(γ + 1)}^{γ + 1}} \frac{r (s) {(ρ^{'} (s))}^{γ + 1}}{μ_{1}^{γ} s^{2 γ} ρ^{γ} (s)}) d s \leq η (y_{1}),

which contradicts (20).

For

ϖ^{″} (y) < 0

, integrating (17) from y to z, we obtain

r (z) {(ϖ^{‴} (z))}^{γ} - r (y) {(ϖ^{‴} (y))}^{γ} \leq - \int_{y}^{z_{1}} q (s) {(1 - p_{0})}^{β} ϖ^{β} (ς (s)) d s .

(26)

From Lemma 1, we see that

ϖ (y) \geq y ϖ^{'} (y)

, and hence,

ϖ (ς (y)) \geq \frac{ς (y)}{y} ϖ (y) .

(27)

For (26), letting

z \to \infty

and using (27), we get

r (y) {(ϖ^{‴} (y))}^{γ} \geq {(1 - p_{0})}^{β} ϖ^{β} (y) \int_{y}^{\infty} q (s) \frac{ς^{β} (s)}{s^{β}} d s .

(28)

Integrating (28) from y to ∞, we get

ϖ^{″} (y) \leq - {(1 - p_{0})}^{β / γ} ϖ^{β / γ} (y) \int_{y}^{\infty} {(\frac{1}{r (z_{1})} \int_{z_{1}}^{\infty} q (s) \frac{ς^{β} (s)}{s^{β}} d s)}^{1 / γ} d z_{1},

(29)

for all

μ_{2} \in (0, 1)

. Now, we define

ϑ (y) = δ (y) \frac{ϖ^{'} (y)}{ϖ (y)} .

Then

ϑ (y) > 0

for

y \geq y_{1}

. By using (25) and (29), we obtain

\begin{matrix} ϑ^{'} (y) & = & \frac{δ^{'} (y)}{δ (y)} ϑ (y) + δ (y) \frac{ϖ^{″} (y)}{ϖ (y)} - δ (y) {(\frac{ϖ^{'} (y)}{ϖ (y)})}^{2} \\ \leq & \frac{δ^{'} (y)}{δ (y)} ϑ (y) - \frac{1}{δ (y)} ϑ^{2} (y) \\ - {(1 - p_{0})}^{β / γ} δ (y) ϖ^{β / γ - 1} (y) \int_{y}^{\infty} {(\frac{1}{r (z_{1})} \int_{z_{1}}^{\infty} q (s) \frac{ς^{β} (s)}{s^{β}} d s)}^{1 / γ} d z_{1} . \end{matrix}

Thus, we find

ϑ^{'} (y) \leq - τ (y) + \frac{δ^{'} (y)}{δ (y)} ϑ (y) - \frac{1}{δ (y)} ϑ^{2} (y),

and so

ϑ^{'} (y) \leq - τ (y) + \frac{{(δ^{'} (y))}^{2}}{4 δ (y)} .

Then, we obtain

\int_{y_{1}}^{y} (τ (s) - \frac{{(δ^{'} (y))}^{2}}{4 δ (y)}) d s \leq ϑ (y_{1}),

which contradicts (21). This completes the proof. □

Example 1.

Consider the differential equation

{({({(u + p_{0} u (δ y))}^{‴})}^{γ})}^{'} + \frac{q_{0}}{y^{3 γ + 1}} u (λ y) = 0, y \geq 1,

(30)

where

δ, λ \in (0, 1]

and

p_{0}, q_{0} > 0

. Let

γ = β,

r (y) = 1,

p (y) = p_{0},

ζ (y) = δ y,

ς (y) = λ y

and

q (y) = q_{0} / y^{3 γ + 1}

. Hence, it is easy to see that

\hat{q} (y) = q_{0} λ^{3 γ + 1} \frac{1}{y^{3 γ + 1}} .

Using Corollary 1, the Equation (30) is oscillatory if

q_{0} ln \frac{1}{λ} > κ (\frac{δ + p_{0}^{γ}}{δ}) \frac{6^{γ}}{λ^{3 γ} e} .

(31)

From Corollary 2, if

q_{0} ln \frac{1}{λ} > \frac{1}{{(1 - p_{0})}^{γ}} \frac{6^{γ}}{λ^{3 γ} e},

(32)

then (30) is oscillatory.

Finally, if we set

ρ (s) : = y^{3 γ}

and

δ (y) : = y^{2}

, then we have

Ψ (y) = q_{0} {(1 - p_{0})}^{γ} λ^{3 γ} \frac{1}{s}

and

τ (y) : = \frac{1}{2} {(\frac{q_{0}}{3 γ})}^{1 / γ} (1 - p_{0}) λ .

Thus, from Theorem 4, Equation (30) is oscillatory if

q_{0} {(1 - p_{0})}^{γ} λ^{3 γ} > 2^{γ} 3^{γ + 1} {(\frac{γ}{γ + 1})}^{γ + 1}

(33)

and

q_{0} > {(\frac{2}{(1 - p_{0}) λ})}^{γ} 3 γ .

(34)

3. Conclusions

In this article, we studied the oscillatory properties of 4th-order differential equations. New oscillation criteria are established. We used Riccati technique and the theory of comparison to prove that every solution of (1) is oscillatory.

Further, we shall study Equation (1) under the condition

\int_{y_{0}}^{\infty} \frac{1}{r^{1 / γ} (s)} d s < \infty,

in the future work.

Author Contributions

The authors have contributed equally and significantly in this paper. All authors have read and agreed to the published version of the manuscript.

Funding

This research received no external funding.

Acknowledgments

The authors thank the reviewers for for their useful comments, which led to the improvement of the content of the paper.

Conflicts of Interest

The authors declare that they have no conflict of interest.

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Bazighifan, O.; Moaaz, O.; El-Nabulsi, R.A.; Muhib, A. Some New Oscillation Results for Fourth-Order Neutral Differential Equations with Delay Argument. Symmetry 2020, 12, 1248. https://doi.org/10.3390/sym12081248

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Bazighifan O, Moaaz O, El-Nabulsi RA, Muhib A. Some New Oscillation Results for Fourth-Order Neutral Differential Equations with Delay Argument. Symmetry. 2020; 12(8):1248. https://doi.org/10.3390/sym12081248

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Bazighifan, Omar, Osama Moaaz, Rami Ahmad El-Nabulsi, and Ali Muhib. 2020. "Some New Oscillation Results for Fourth-Order Neutral Differential Equations with Delay Argument" Symmetry 12, no. 8: 1248. https://doi.org/10.3390/sym12081248

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Some New Oscillation Results for Fourth-Order Neutral Differential Equations with Delay Argument

Abstract

1. Introduction

2. Main Results

3. Conclusions

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