Existence of periodic solutions for p-Laplacian neutral Rayleigh equation

In this paper, we use topological degree theory to establish new results on the existence of periodic solutions for a p-Laplacian neutral Rayleigh equation.

In this paper, we consider the following second-order p-Laplacian neutral functional differential equation:

where ${\varphi }_p(x)={|x|}^{p-2}x$ for $x\ne 0$ and $p>1$; σ and c are given constants with $|c|\ne 1$; ${\varphi }_p(0)=0$, $f(0)=0$. The conjugate exponent of p is denoted by q, i.e. $\frac{1}{p}+\frac{1}{q}=1$. f, g, β, e, and τ are real continuous functions on ℝ; τ, β, and e are periodic with periodic T, $T>0$ is a constant; ${\int }_0^{T}e(t)dt=0$, ${\int }_0^T\beta (t)\ne 0$.

As we know, the p-Laplace Rayleigh equation with a deviating argument $\tau (t)$ is applied in many fields such as physics, mechanics, engineering technique fields, and so on. The existence of a periodic solution for the second-order p-Laplacian Rayleigh equations with a deviating argument as follows:

and

has been extensively studied in [1–4]. In recent years, Lu et al. [5–7] used Mawhin’s continuation theory to do research to the existence of a periodic solution for p-Laplacian neutral Rayleigh equation. They obtained some existence results of periodic solutions to p-Laplacian neutral Rayleigh equations.

In the research mentioned above, the corresponding nonlinear terms of the second-order p-Laplacian Rayleigh equation did not include a variable coefficient. Only little literature discussed this kind of p-Laplacian Rayleigh equation. For more details refer to [8–11]. Here, we focus on [11] by Liang Feng et al. They discussed the existence of the solution to the following equation:

They established sufficient conditions for the existence of a T-periodic solution of (1.4). But their conclusions are founded on the prerequisite ${\int }_0^T(g(x(t-\tau (t)))+e(t))dt=0$, which does not satisfy (1.1). Another significance of the paper is that the result is related to the deviating argument $\tau (t)$, while the conclusions in those existing papers mentioned above have no relation with $\tau (t)$.

For convenience, throughout this paper, we will adopt the following assumptions:

(H₁) ${\parallel x\parallel }_p={({\int }_0^T|x(t){|}^{p}dt)}^{\frac{1}{p}}$, ${\parallel x\parallel }_{\mathrm{\infty }}={max}_{t\in [0,T]}|x(t)|$, $\parallel x\parallel =max\{{\parallel x\parallel }_{\mathrm{\infty }},{\parallel x^{\prime }(t)\parallel }_{\mathrm{\infty }}\}$;

(H₂) $m_0={min}_{t\in [0,T]}|\beta (t)|$, $m_1={max}_{t\in [0,T]}|\beta (t)|$;

(H₃) $C_T=\{x|x\in C(\mathbb{R},\mathbb{R}),x(t+T)=x(t),\mathrm{\forall }t\in \mathbb{R}\}$;

(H₄) $C_T^1=\{x|x\in C^1(R,R),x(t+T)=x(t),x^{\prime }(t+T)=x^{\prime }(t),\mathrm{\forall }t\in \mathbb{R}\}$.

It is obvious that $C_T$ with norm ${\parallel x\parallel }_{\mathrm{\infty }}$ and $C_T^1$ with norm $\parallel x\parallel$ are two Banach spaces.

Now we define a linear operator $A:C_T⟶C_T$, $(Ax)(t)=x(t)-cx(t-\sigma )$.

According to [12, 13], we know that the operator A has the following properties.

Lemma 2.1 [12, 13]

If $|c|\ne 1$, then A has continuous bounded inverse on $C_T$ and

1. (1)

   ${\parallel A^{-1}x\parallel }_{\mathrm{\infty }}=\frac{{\parallel x\parallel }_{\mathrm{\infty }}}{|1-|C||}$, $\mathrm{\forall }x\in C_T$,

2. (2)

   $(A^{-1}x)(t)=\{\begin{array}{ll}{\sum }_{j\ge 0}{c}^{j}x(t-j\sigma ),& |c|<1,\\ -{\sum }_{j\ge 0}{c}^{-j}x(t+j\sigma ),& |c|>1,\end{array}$

3. (3)

   ${\int }_0^T|(A^{-1}x)(t)|dt\le \frac{1}{|1-|c||}{\int }_0^T|x(t)|dt$, $\mathrm{\forall }x\in C_T$.

Lemma 2.2 If $|c|\ne 1$ and $p>1$, then

Proof We know that $x(t)$ is a periodic function. So ${\int }_0^T|x(t-j\sigma )|dt={\int }_0^T|x(t)|dt$ for $j\ge 0$. When $|c|<1$, from Lemma 2.1, we have

which implies ${({\int }_0^T|A^{-1}x(t){|}^{p}dt)}^{\frac{1}{p}}\le \frac{1}{1-|c|}{({\int }_0^T|x(t-j\sigma ){|}^{p}dt)}^{\frac{1}{p}}$. That is to say (2.1) holds. If $|c|>1$, we can also prove that (2.1) is true in the same way. Thus Lemma 2.2 is proved.

Now we consider the following equation in $C_T^1$:

$F:C_T^1⟶C_T$ is continuous and takes a bounded set into bounded set.

Let us define $P:C_T^1⟶C_T$, $u|⟶u(0)$, $Q:C_T⟶C_T$, $h|⟶\frac{1}{T}{\int }_0^{T}h(s)ds$ and

It is clear that if $u\in C_T^1$ is the solution to (2.2), then u satisfies the abstract equation

where the operator $K:C_T⟶C_T^1$ is given by

α is a continuous function which sends bounded sets of $C_T$ into bounded sets of ℝ, and it is a completely continuous mapping. For more details as regards the meaning of α, please refer to [14]. □

Lemma 2.3 [14]

Let Ω be an open bounded set in $C_T^1$. Suppose that the following conditions hold:

1. (i)

   For each $\lambda \in (0,1)$, the equation ${({\varphi }_p(u^{\prime }))}^{\prime }=\lambda F(u)$ has no solution on ∂ Ω.

2. (ii)

   The equation $Ϝ(u)=\frac{1}{T}{\int }_0^{T}F(u(t))dt=0$ has no solution on $\partial \mathrm{\Omega }\cap \mathbb{R}$.

3. (iii)

   The Brouwer degree of Ϝ, $deg\{Ϝ,\mathrm{\Omega }\cap \mathbb{R},0\}\ne 0$.

Then (2.2) has at least one T-periodic solution in $\overline{\mathrm{\Omega }}$.

Lemma 2.4 [15]

$\mathrm{\Omega }\subset {\mathbb{R}}^n$ is open bounded and symmetric with respect to $0\in \mathrm{\Omega }$. If $f\in C(\overline{\mathrm{\Omega }},{\mathbb{R}}^n)$ and $f(x)\ne \mu f(-x)$, $\mathrm{\forall }x\in \partial \mathrm{\Omega }$, $\mu \in [0,1]$, then $deg\{f,\mathrm{\Omega },0\}$ is an odd number.

Theorem 3.1 Suppose that the following conditions hold:

(A₁) $\tau (t)\in C^1(\mathbb{R},\mathbb{R})$, ${\tau }^{\prime }(t)>1$ or ${\tau }^{\prime }(t)<1$, $m_2={min}_{t\in [0,T]}\frac{1}{1-{\tau }^{\prime }(t)}$.

(A₂) The sign of $\frac{\beta (t)}{1-{\tau }^{\prime }(t)}$ is unchanged in the interval $[0,T]$.

(A₃) There exist constants $r_1\ge 0$, $r_2>0$ and $k>0$ such that

1. (1)

   $|f(x)|\le k+r_1{|x|}^{p-1}$, $\mathrm{\forall }x\in \mathbb{R}$,

2. (2)

   ${lim}_{|x|⟶\mathrm{\infty }}\frac{|g(x)|}{{|x|}^{p-1}}\le r_2$.

(A₄) There exists a constant $d>0$ such that $xg(x)>0$, $\mathrm{\forall }|x|>d$.

Then (1.1) has at least one solution with periodic T if there exists a constant $\epsilon >0$ such that the following condition holds:

where a is defined in (3.8).

Proof Consider the homotopic equation of (1.1) as follows:

Let $x(t)$ be a possible T-periodic solution to (3.2). By integrating both sides of (3.2) over [0, T], we have

Let $u(t)=t-\tau (t)$, by the condition (A₁), we know that $u(t)$ has a unique inverse denoted by $t=\gamma (u)$; noting that $\tau (0)=\tau (T)$, we get

Based on the condition of (A₂) and the integral mean value theorem, there exists $\xi \in [0,T]$ such that

By the condition (A₃)(2) for a given $\epsilon >0$, $\mathrm{\exists }\rho >d>0$ when $|x(t)|>\rho$ such that

Now we can claim that there are two constants a and b such that

where

In the following, we prove the above claim in two cases.

Case 1. If $|x(\xi )|\le \rho$, $\xi \in [0,T]$, then (3.7) holds.

Case 2. If $|x(\xi )|>\rho$, $\xi \in [0,T]$, by (3.5), (3.6), and the condition (A₃)(1), we have

When $0<p-1\le 1$, according to the Minkowski inequality, we have

When $p-1>1$, from ${(a+b)}^{\frac{1}{m}}\le {(a)}^{\frac{1}{m}}+{(b)}^{\frac{1}{m}}$, $a,b\in [0,+\mathrm{\infty })$, $m>1$, we have

Therefore, (3.7) is also satisfied for case 2.

For any $t\in \mathbb{R}$, there exists $t_0\in [0,T]$, such that $t=kT+t_0$, where k is an integer. Then

By (3.7), we have

At first, we prove that there is a constant $R_1$ such that

By (3.10), we only need to prove that ${\parallel x^{\prime }\parallel }_p$ is bounded in order to prove (3.11).

If ${\parallel x^{\prime }\parallel }_p=0$, then ${\parallel x^{\prime }\parallel }_p$ is obviously bounded.

If $\frac{b}{a+T^{\frac{1}{q}}{\parallel x^{\prime }\parallel }_p}\ge h$, then ${\parallel x^{\prime }\parallel }_p\le \frac{b-ah}{h{T}^{\frac{1}{q}}}$, that is, ${\parallel x^{\prime }\parallel }_p$ is bounded as well.

If $\frac{b}{a+T^{\frac{1}{q}}{\parallel x^{\prime }\parallel }_p}<h$, we prove that ${\parallel x^{\prime }\parallel }_p$ is bounded in the following.

By multiplying both sides of (3.2) by $A(x(t))=x(t)-cx(t-\sigma )$ and integrating them over $[0,T]$, we have

Let $E_1=\{t\in [0,T]:|x(t-\tau (t))|\le \rho \}$, $E_2=\{t\in [0,T]:|x(t-\tau (t))|>\rho \}$, then

where

By (3.12) and (3.13), we get

where $a_1=(1+|c|)(m_1{m}_{3}T+kT+{\int }_0^T|e(t)|dt)$, $a_2=(1+|c|)m_{1}T(r_2+\epsilon )$, $a_3=(1+|c|)r_1{T}^{\frac{1}{p}}$.

By elementary analysis, we know that there is a constant $h>0$ which satisfies $b-ah>0$ such that

By (3.16), one has

By Lemma 2.2, together with (3.15) and (3.17), we can derive

From (3.1) and (3.18), we know that ${\parallel x^{\prime }\parallel }_p$ also is bounded in this case. Based on the above, we can derive the result that ${\parallel x^{\prime }\parallel }_p$ has a bound; therefore, (3.11) holds.

Secondly, we prove that there is a constant $R_2$ such that

Based on (1.1), together with (3.13) and the condition (A₂)(1), we get

Because $A(x(0))=A(x(T))$, there exists $t_0\in [0,T]$ such that ${(Ax(t_0))}^{\prime }=A(x^{\prime }(t_0))=0$. Noting that ${\varphi }_p(0)=0$, we have

then

From Lemma 2.1, we derive

therefore, (3.19) is satisfied.

Let $y(t)=(Ax(t))$, then (3.2) is equivalent to the following equation:

Then $x=A^{-1}y$ is a T-periodic solution of (3.2) if y is a T-periodic solution of (3.20). Let

since f, g are continuous and A has a continuous inverse, the mapping $F:C_T^1⟶C_T$ in (3.21) is continuous and takes bounded sets into bounded sets.

In addition, (3.20) can be represented as

Let $R=Mmax\{R_1,R_2,\rho \}$; $M>1+|c|$ is a constant, $\mathrm{\Omega }=\{y(t)\in C_T^1,{\parallel y\parallel }_{\mathrm{\infty }}<R,{\parallel y^{\prime }\parallel }_{\mathrm{\infty }}<R\}$, then (3.22) has no solution on ∂ Ω for $\lambda \in (0,1)$. In fact, if $y=Ax$ is a solution to (3.22) on ∂ Ω, then ${\parallel y\parallel }_{\mathrm{\infty }}=R$ or ${\parallel y^{\prime }\parallel }_{\mathrm{\infty }}=R$. If ${\parallel y\parallel }_{\mathrm{\infty }}=R$, then ${\parallel y\parallel }_{\mathrm{\infty }}={\parallel Ax\parallel }_{\mathrm{\infty }}={\parallel x(t)-cx(t-\sigma )\parallel }_{\mathrm{\infty }}\le (1+|c|){\parallel x\parallel }_{\mathrm{\infty }}$. That is to say, ${\parallel x\parallel }_{\mathrm{\infty }}\ge \frac{{\parallel y\parallel }_{\mathrm{\infty }}}{1+|c|}>R_1$. This is a contradiction with (3.11). Similarly, ${\parallel y^{\prime }\parallel }_{\mathrm{\infty }}\ne R$. Then (3.22) satisfies the condition (i) of Lemma 2.3.

If $y\in \partial \mathrm{\Omega }\cap \mathbb{R}$, y is a constant and $|y|={\parallel y\parallel }_{\mathrm{\infty }}=R$, then $f({(A^{-1}y)}^{\prime })=0$ and $|y|\le (1+|c|)|x|$, $|x|\ge \frac{|y|}{1+|c|}>\rho >d$. By (A₄), we obtain $g(A^{-1}(y(t-\tau (t))))=g(A^{-1}y)=g(x)\ne 0$. Therefore

on $\partial \mathrm{\Omega }\cap \mathbb{R}$. This indicates that (3.22) satisfies the condition (ii) of Lemma 2.3.

We know $\partial (\mathrm{\Omega }\cap \mathbb{R})=\{-R,R\}$, then for $\mathrm{\forall }y\in \partial (\mathrm{\Omega }\cap \mathbb{R})$, we have $y=R>d$ or $y=-R<-d$. By (3.23) and the condition (A₄), we conclude that $Ϝ(y)\ne \mu Ϝ(-y)$, $\mu \in [0,1]$, $y\in \partial (\mathrm{\Omega }\cap \mathbb{R})$. Based on Lemma 2.4, we get $deg\{Ϝ,\mathrm{\Omega }\cap \mathbb{R},0\}\ne 0$.

Based on the above, (3.22) satisfies all the conditions of Lemma 2.3. So does (3.20). By Lemma 2.3, (3.20) has at least one T-periodic solution, then (1.1) has also at least a periodic solution. □

Consider the following equation:

where $p=4$, $c=\frac{1}{10}$, $\sigma =\frac{1}{2}$, $\tau (t)=\frac{1}{2}sint$, $e(t)=\frac{1}{400}cost$, $T=2\pi$. Obviously we get ${\tau }^{\prime }(t)<1$, $m_2=\frac{2}{3}$.

If we take $f(x)=\{\begin{array}{ll}\frac{1}{100}x,& |x|\le 1,\\ \frac{1}{100}{x}^3,& |x|>1,\end{array}$ $g(x)=\frac{x}{100}+\frac{x^3}{10}$, $\beta (t)=\frac{1}{10(1+{sin}^{2}t)}$, then the condition (A₄) of Theorem 3.1 is satisfied and

By (4.2), we obtain $k=\frac{1}{100}$, $r_1=\frac{1}{100}$, $r_2=\frac{1}{10}$.

If we choose $\epsilon =0.01$, $\rho >1$, then when $|x|>\rho$, we have

We calculate easily that

Based on the above, we know that (4.1) satisfies all conditions included in Theorem 3.1; therefore, (4.1) has at least one T-periodic solution.

The authors wish to thank the anonymous referee for his/her valuable suggestions to this paper. This work is supported by the NSFC of China (11171085).

Authors and Affiliations

1. Department of Mathematics, Tianmu College, Zhejiang A and F University, Hangzhou, China

   Zhi Min He

2. Hangzhou Normal University, Hangzhou, China

   Jian Hua Shen

Corresponding author

Correspondence to Zhi Min He.

Competing interests

The authors declare that they have no competing interests.

Authors’ contributions

ZMH performed all the steps of proof in this research and also wrote the paper. JHS suggested many good ideas that made this paper possible and helped to improve the manuscript. All authors read and approved the final manuscript.

Open Access This article is distributed under the terms of the Creative Commons Attribution 2.0 International License (https://creativecommons.org/licenses/by/2.0), which permits unrestricted use, distribution, and reproduction in any medium, provided the original work is properly cited.

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