Nontrivial homoclinic solutions for prescribed mean curvature Rayleigh equations

In this paper, some sufficient conditions on the existence of \(2k\pi\)-periodic solutions for a kind of prescribed mean curvature Rayleigh equations are given. Then the existence of nontrivial homoclinic solutions for prescribed mean curvature Rayleigh equations is obtained.

In this paper, we are concerned with the existence of homoclinic solutions for the following prescribed mean curvature Rayleigh equation:

where \(f,g,e\in C(\mathbb{R}, \mathbb{R})\) with \(f(0)=0\) and \(g(0)=0\).

A solution \(x(t)\) of (1.1) is named homoclinic (to 0) if \(x(t)\to0\) and \(x'(t)\to0\) as \(|t|\to0\). Furthermore, \(x(t)\) is called a nontrivial homoclinic solution (1.1) if \(x(t)\) is a homoclinic solution of (1.1) and \(x\neq0\).

Various types of prescribed mean equations have been studied widely by some authors in many papers (see [1–8]) because of their having appeared in some scientific fields, such as differential geometry and physics. Recently, some results on the existence of solutions for prescribed mean equations were obtained (see [9–12] and references cited therein). Feng in [10] discussed a delay prescribed mean curvature Liénard equation of the form

estimated a priori bounds by eliminating the nonlinear term \((\frac{x'(t)}{\sqrt{1+x^{\prime2}(t)}} )'\) and established sufficient conditions on the existence of periodic solutions for (1.2) by using Mawhin’s continuation theorem. The main difficulty overcome by Feng in [10] lies in the nonlinear term \((\frac {x'(t)}{\sqrt{1+x^{\prime2}(t)}} )'\), the existence of which obstructs the usual method of finding a priori bounds. He transformed (1.2) into the following equivalent system:

and used Mawhin’s continuation theorem to prove the existence result. From then on, similar approaches were used by Li and Wang [13] and Li et al. [14]. Clearly, \(|x_{2}|< c<1\) (c is a constant) is necessarily satisfied when Mawhin’s continuation theorem is applied to the system (1.3). But, as pointed out by Liang and Lu in [15], the proof of \(|x_{2}|< c<1\) was not done in [10, 13, 14]. To do it, Li and Wang in [16] gave a complementary proof.

In [15], Liang and Lu investigated the following prescribed mean curvature Duffing equation:

where \(f\in C^{1}(\mathbb{R},\mathbb{R})\), \(c>0\). Assume

(A₁):

there exist constants \(m_{0}>0\), \(\alpha>1\) such that \(xf(x)\leqslant-m_{0}|x|^{\alpha}\) and \(f'(x)<0\), \(\forall x\in\mathbb{R}\),

and

(A₂):

\(p\in C(\mathbb{R},\mathbb{R})\) is a bounded function with \(p(t)\neq0\) and

$$ B:=\max \biggl\{ \biggl(\int_{\mathbb{R}}\bigl|p(t)\bigr|^{2}\,dt \biggr)^{\frac{1}{2}}, \biggl(\int_{\mathbb{R}}\bigl|p(t)\bigr|^{\beta}\,dt \biggr)^{\frac{1}{\beta}} \biggr\} +\sup_{t\in \mathbb{R}}|p(t)|< +\infty, $$

where \(\frac{1}{\alpha}+\frac{1}{\beta}=1\).

If (A₁), (A₂), and condition

hold, they obtained the existence of homoclinic solutions for (1.4). For the method of obtaining homoclinic solution, we also see the papers [17–20]. It is not difficult to see that the condition (1.5) is complex and strong. In this paper, we will consider more general equation (1.1) and obtain the existence of homoclinic solutions under the more simple and reasonable conditions. To find a homoclinic solution for (1.1), we seek a limit of a certain sequence of \(2kT\)-periodic solutions \(x_{k}(t)\) for the following equations:

where \(k\in\mathbb{N}\), \(e_{k}:\mathbb{R}\to\mathbb{R}\) is a \(2kT\)-periodic function (\(T>0\) is a constant) defined by

\(\varepsilon_{0}\in(0,T)\) is a constant independent of k.

Let X and Y be real Banach spaces and \(L:X\supset \operatorname{Dom} L\rightarrow Y\) be a linear operator. L is said to be a Fredholm operator with index zero provided that

1. (i)

   ImL is closed subset of Y,

2. (ii)

   \(\operatorname{dim}\ker L=\operatorname{codim} \operatorname{Im} L <+\infty\).

Set \(X=\ker L\oplus X_{1}\), \(Y=\operatorname{Im} L\oplus Y_{1}\). Let \(P:X\rightarrow \ker L\) and \(Q:Y\rightarrow Y_{1}\) be the nature projections. It is easy to see that \(\ker L\cap(\operatorname{Dom} L\cap X_{1})={0}\). Thus the restriction \(L_{P}:=L|_{\operatorname{Dom} L\cap X_{1}}\) is invertible. We denote by K the inverse of \(L_{P}\).

Let Ω be an open bounded subset of X with \(\operatorname{Dom} L\cap\Omega\neq \phi\). A map \(N:\overline{\Omega}\rightarrow Y\) is said to be L-compact in \(\overline{\Omega}\) if \(QN:\overline{\Omega}\rightarrow Y\) and \(K(I-Q)N:\overline{\Omega}\rightarrow X\) are compact.

The following lemma due to Mawhin (see [21]) is a fundamental tool to prove the existence of \(2kT\)-periodic solutions for (1.6).

Lemma 2.1

Let L be a Fredholm operator of index zero and Let N be L-compact on \(\overline{\Omega}\). If the following conditions hold.

(h₁):

\(Lx\neq\lambda Nx\), \(\forall (x,\lambda)\in [(D(L)\setminus\ker L)\cap\partial\Omega]\times(0,1)\);

(h₂):

\(Nx \notin \operatorname{Im}L\), \(\forall x\in\ker L\cap\partial\Omega\);

(h₃):

\(\deg(JQN|_{\ker L},\Omega\cap\ker L,0)\neq0\), where \(J : \operatorname{Im}Q\rightarrow\ker L\) is an isomorphism.

Then \(Lx=Nx\) has at least one solution in \(D(L)\cap\overline{\Omega}\).

The following lemma is a special case of Lemma 2.1 in [22].

Lemma 2.2

If \(x:\mathbb{R}\to\mathbb{R}\) is continuously differentiable on ℝ, \(a>0\), then the following inequality holds:

Lemma 2.3

[22]

Let \(x_{k}\in C_{2kT}^{2}\) be \(2kT\)-periodic function for each \(k\in \mathbb{N}\) with

where \(A_{0}\), \(A_{1}\), and \(A_{2}\) are constants independent of \(k\in\mathbb {N}\). Then there exists a function \(x_{0}\in C^{1}(\mathbb{R},\mathbb{R})\) such that for each interval \([c,d]\subset\mathbb{R}\), there is a subsequence \(\{x_{k_{j}}\}\) of \(\{x_{k}\}_{k\in\mathbb{N}}\) with \(x'_{k_{j}}(t)\to x'_{0}(t)\) uniformly on \([c,d]\).

In order to apply Mawhin’s continuation theorem to study the existence of \(2kT\)-periodic solution of (1.6), we rewrite (1.6) as

Obviously, if \(z(t)=(x(t),y(t))^{\top}\) is a \(2kT\)-periodic solution of (2.2), then \(x(t)\) must be a \(2kT\)-periodic solution of (1.6). Hence, the problem of finding a \(2kT\)-periodic solution of (1.6) reduces to finding one of (2.2).

Now, we set

with the norm \(\|z\|=\max \{\|x\|_{\infty},\|y\|_{\infty} \}\), where

Clearly, \(X_{k}\) and \(Y_{k}\) are Banach spaces. Meanwhile, let

where

Define a nonlinear operator \(N:X_{k}\rightarrow Y_{k}\) by

Then the system (2.2) can be written to \(Lz=Nz\).

It is easy to see that \(\ker L=\mathbb{R}^{2}\) and \(\operatorname{Im} L= \{u\in Y_{k}:\int_{-kT}^{kT} u(s)\,ds=0 \}\). So L is a Fredholm operator with index zero.

Let \(P:X_{k}\rightarrow\ker L\) and \(Q:Y_{k}\rightarrow \operatorname{Im} Q\) be defined by

and denote by K the inverse of \(L|_{\ker P\cap \operatorname{Dom} L}\). Then, \(\ker L=\operatorname{Im} Q=\mathbb{R}^{2}\) and

where

It follows from (2.3) that N is L-compact on \(\overline{\Omega }\), where Ω is an open, bounded subset of \(X_{k}\).

For the sake of convenience, we give the following fundamental assumptions.

(H₁):

There exist α and β with \(\beta>\alpha>0\) such that \(\forall x\in\mathbb{R}\),

$$ \alpha x^{2}\leqslant xf(x)\leqslant\beta x^{2}. $$

(H₂):

There exists \(\gamma>0\) such that

$$ xg(x)\leqslant-\gamma x^{2}. $$

(H₃):

\(e(t)\) is bounded on ℝ and

$$ 0< d:=\max \biggl\{ \biggl(\int_{-\infty}^{+\infty}e^{2}(t)\,dt \biggr)^{\frac {1}{2}},\sup_{t\in\mathbb{R}}\bigl|e(t)\bigr| \biggr\} <+\infty. $$

Obviously, the conditions (H₁), (H₂), and (H₃) are simplistic and reasonable.

Theorem 3.1

Let (H₁), (H₂), and (H₃) hold. Then for each \(k\in\mathbb {N}\), (1.6) has at least one \(2kT\)-periodic solution.

Proof

We consider the auxiliary system of the system (2.2),

where \(\lambda\in(0,1]\) is a parameter. Firstly, we will prove that the set of all possible \(2kT\)-periodic solutions of the system (3.1) is bounded.

Obviously, the system (3.1) is equivalent to the following equation:

Multiplying (3.2) by \(x'\) and integrating from \(-kT\) to kT, we have

By (H₁), we obtain

By (1.7), we get

Noticing that \(\int_{-kT}^{kT}g(x(t))x'(t)\,dt=0\), we have from (3.3), (3.4), and (3.5)

i.e.,

Hence, there exists a positive constant \(D_{1}\) independent of k and λ such that

Multiplying (3.2) by x and integrating from \(-kT\) to kT, we obtain

Since \(x'(t)=\lambda\frac{y(t)}{\sqrt{1-y^{2}(t)}}\), we get \(y(t)=\frac {\frac{1}{\lambda}x'(t)}{\sqrt{1+\frac{1}{\lambda^{2}}x^{\prime2}(t)}}\). Then

It follows from (3.8) and (3.9) that

By (H₂), we have

By (H₁) and (3.6), we obtain

By (3.5), we get

Then we get from (3.10), (3.11), (3.12), and (3.13)

i.e.,

Therefore, there exists a positive constant \(D_{2}\) independent of k and λ such that

Thus, by using Lemma 2.2, we have

Hence, there exists a positive constant \(M_{1}\) independent of k and λ such that

In what follows, we prove that there exists a constant \(\varepsilon_{1}\) with \(0<\varepsilon_{1}\ll1\) such that

Since \(\|x\|_{\infty}\leqslant M_{1}\) and g is continuous, there exists \(M_{2}>0\) such that

By (H₁), we get

Now we prove by contradiction that

Assume that there exist \(t_{2}^{*}>t_{1}^{*}\) such that

and

Noticing that \(\lambda\in(0,1]\), we have \(\forall t\in(t_{1}^{*},t_{2}^{*})\),

which is a contradiction. By (H₁), we get

By using a similar argument, we can prove that

Thus

Therefore, (3.15) holds.

Putting

we can give a standard argument on Ω by using Lemma 2.1 (also see [13] or [14]) and find that the system (2.2) has at least one \(2kT\)-periodic solution. Equivalently, (1.6) has at least one \(2kT\)-periodic solution. □

Theorem 3.2

Let (H₁), (H₂), and (H₃) hold. Then (1.1) has at least one nontrivial homoclinic solution.

Proof

If \((x_{k}(t), y_{k}(t))\) is a solution of (1.6), then

From Theorem 3.1, we have

where \(y_{k}(t)=\frac{x'_{k}(t)}{\sqrt{1+(x'_{k}(t))^{2}}}\). Equation (3.16) is equivalent to

Since f, g, \(e_{k}\) are continuous, we have \(y_{k}(t)\) is continuous differentiable on ℝ. Moreover, it follows that \(x'_{k}(t)\) is also continuous differentiable on ℝ. Hence,

Since f, g, \(e_{k}\) are continuous, we find from (3.17) that there exists a positive constant \(M_{3}\) independent of k such that

Hence, by (3.18), there exists a positive constant \(M_{4}\) independent of k such that

By using Lemma 2.3, we find that there is a function \(x_{0}\in C^{1}(\mathbb {R}, \mathbb{R})\) such that, for each interval \([a,b]\subset\mathbb {R}\), there is a subsequence \(\{x_{k_{j}}(t)\}\) of \(x_{k}(t)\) with \(x'_{k_{j}}(t)\to x'_{0}(t)\) uniformly on \([a,b]\). In what follows, we will show that \(x_{0}(t)\) is just a homoclinic solution of (1.1).

For all \(a,b\in\mathbb{R}\) with \(a< b\), there exist a positive integer \(j_{0}\) and a positive real number \(\varepsilon_{2}\) such that, for \(j>j_{0}\), \([a-\varepsilon_{2},b+\varepsilon_{2}]\subset[-k_{j}T, k_{j}T-\varepsilon_{0}]\). Then for \(j>j_{0}\),

Since \(x'_{k_{j}}(t)\to x'_{0}(t)\) uniformly on \([a,b]\), we have

Since \(\frac{x'_{k_{j}}(t)}{\sqrt{1+(x'_{k_{j}}(t))^{2}}}\to\frac {x'_{0}(t)}{\sqrt{1+(x'_{0}(t))^{2}}}\) uniformly on \([a,b]\) and \(\frac {x'_{k_{j}}(t)}{\sqrt{1+(x'_{k_{j}}(t))^{2}}}=y_{k_{j}}(t)\) is continuous differentiable for \(t\in[a,b]\), we get

Hence, we obtain

Noticing that a, b are two arbitrary constants with \(a< b\), we find that \(x_{0}:\mathbb{R}\to\mathbb{R}\) is a solution of (1.1).

In the following, we prove that \(x_{0}(t)\to0\) and \(x'_{0}(t)\to0\) as \(|t|\to+\infty\). Firstly, we prove \(x_{0}(t)\to0\) as \(|t|\to+\infty\). Let i be a positive integer with \(i< k_{j}\), then

Let \(i\to+\infty\), then

which implies

Using Lemma 2.2, we have

Finally, we prove that

From (3.17), we get

Then we have

where \(M_{5}\) is a positive constant.

If (3.21) does not hold, then there exists a sequence \(t_{k}\) satisfying

and \(\varepsilon_{2}\in(0,\frac{1}{4})\) such that

Hence we have, for \(t\in[t_{k},t_{k}+\frac{\varepsilon_{2}}{1+M_{5}}]\),

Therefore,

which is a contradiction. Then (3.21) holds.

By (H₃), we have \(e\neq0\). Thus it follows from \(f(0)=0\) and \(g(0)=0\) that \(x_{0}\) is nontrivial. □

In this section, we shall construct an example to show the applications of Theorem 3.2.

Example 4.1

Let \(f(x)=\frac{x^{3}+x}{\sqrt{1+x^{4}}}\), \(g(x)=-\frac{x^{5}+x}{\sqrt {1+x^{8}}}\). The prescribed mean curvature Rayleigh equation

has at least one nontrivial homoclinic solution.

Proof

Obviously, one has

and

Then (H₁) and (H₂) hold. Since

(H₃) holds. Therefore, (4.1) has at least one nontrivial homoclinic solution. □

Authors and Affiliations

1. Department of Scientific Research Management, Jiujiang University, Jiujiang, 332005, China

   Meilin Zheng

2. School of Science, Jiujiang University, Jiujiang, 332005, China

   Jin Li

Corresponding author

Correspondence to Jin Li.

Competing interests

The authors declare that they have no competing interests.

Authors’ contributions

All authors have equally contributed in obtaining new results in this article and also read and approved the final manuscript.

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