At least three solutions for the Hamiltonian system and reduction method

We investigate the multiplicity of solutions for the Hamiltonian system with some asymptotically linear conditions. We get a theorem which shows the existence of at least three 2π-periodic solutions for the asymptotically linear Hamiltonian system. We obtain this result by the variational reduction method which reduces the infinite dimensional problem to the finite dimensional one. We also use the critical point theory and the variational method.

MSC:35A15, 37K05.

Let $G(t,z(t))$ be a $C^2$ function defined on $R^1\times R^{2n}$ which is 2π-periodic with respect to the first variable t. In this paper we investigate the number of 2π-periodic solutions of the following Hamiltonian system:

where $p,q\in R^n$, $z=(p,q)$. Let J be the standard symplectic structure on $R^{2n}$, i.e.,

where $I_n$ is the $n\times n$ identity matrix. Then (1.1) can be rewritten as

where $\dot{z}=\frac{dz}{dt}$ and $G_z$ is the gradient of G. We assume that $G\in C^2(R^1\times R^{2n},R^1)$ satisfies the following asymptotically linear conditions:

(G1) $G(t,z(t))=o({|z|}^2)$ as $|z|\to 0$, $G(t,\theta )=0$, $G_z(t,\theta )=\theta$, where $\theta =(0,\dots ,0)$.

(G2) There exist constants α, β (without loss of generality, we may assume $\alpha ,\beta \notin Z$) such that

(G3) Let $j_1$ be an integer within $[\alpha ,\beta ]$ such that

(G4) ${lim}_{|z|\to \mathrm{\infty }}\frac{G_z(t,z)\cdot z}{{|z|}^2}$ exists and there exists $j_2=j_1+1$ which satisfies

(G5) G is 2π-periodic with respect to t.

We are looking for the weak solutions of (1.1) with conditions (G1)-(G5). The 2π-periodic weak solution $z=(p,q)\in E$ of (1.1) satisfies

i.e.,

where E is introduced in Section 2. By Lemma 2.1 in Section 2, the weak solutions of (1.1) coincide with the critical points of the functional

Several authors [1–4] considered the multiplicity of solutions for the Hamiltonian system. Chang proved in [1] that if $G\in C^2(R^1\times R^{2n},R^1)$ satisfies conditions (G2), (G5) and the following additional conditions:

(G3)′ Let $j_0$, $j_0+1$, … , and $j_1$ be all integers within $[\alpha ,\beta ]$ (without loss of generality, we may assume $\alpha ,\beta \notin Z$) such that $j_0-1<\alpha <j_0<j_1<\beta <j_1+1=j_2$. Suppose that there exist $\gamma >0$ and $\tau >0$ such that $j_1<\gamma <\beta$ and

(G4)′ $G_z(t,\theta )=\theta$ and $j\in [j_0,j_1)\cap Z$ such that

then (1.1) has at least two nontrivial 2π-periodic weak solutions. Jung and Choi proved in [2] that if G satisfies the following conditions:

(G1) $G:R^{2n}\to R$ is $C^1$ with $G(\theta )=0$.

(G2) There exists $h\in N$ such that

(G3) There exists $m\in N$ such that

or

(G4) There exists an integer Γ such that $\mathrm{\Gamma }\le \frac{G^{\mathrm{\prime }}(z)\cdot z}{{|z|}^2}\le \mathrm{\Gamma }+1$,

then (1.1) has at least m weak solutions, which are geometrically distinct and nonconstant.

Our main result is the following:

Theorem 1.1 Assume that G satisfies conditions (G1)-(G5). Then system (1.1) has at least three 2π-periodic solutions.

Theorem 1.1 will be proved by the finite dimensional reduction method, the critical point theory and the variational method for the perturbed operator $A_{ϵ}$. The finite dimensional reduction method combined with the critical point theory and the variational method reduces the critical point results of the functional $I(z)$ on the infinite dimensional space to those of the corresponding functional $\tilde{I}(v)$ on the finite dimensional subspace.

The outline of this paper is organized as follows. In Section 2, we introduce the Hilbert normed space E, show that the corresponding functional $I(z)$ of (1.1) is in $C^1(E,R)$, Fréchet differentiable and prove the reduction lemma for the perturbed operator $A_{ϵ}$. In Section 3, we show that the reduced functional $-\tilde{I}(v)$ satisfies ${(P.S.)}_c$ condition and $v=0$ is the strict local point of minimum of $\tilde{I}(v)$ and prove Theorem 1.1 by the shape of graph of the reduced functional.

Let $L^2([0,2\pi ],R^{2n})$ denote the set of 2n-tuples of the square integrable 2π-periodic functions and choose $z\in L^2([0,2\pi ],R^{2n})$. Then it has a Fourier expansion $z(t)={\sum }_{k=-\mathrm{\infty }}^{k=+\mathrm{\infty }}{a}_k{e}^{ikt}$, with $a_k=\frac{1}{2\pi }{\int }_0^{2\pi }z(t)e^{-ikt}dt\in C^{2n}$, $a_{-k}=\overline{a_k}$ and ${\sum }_{k\in Z}{|a_k|}^2<\mathrm{\infty }$. Let

with the domain

where ϵ is a positive small number. Then A is a self-adjoint operator. Let $\{M_{\lambda }\}$ be the spectral resolution of A, and let

Let

For each $u\in L^2([0,2\pi ],R^{2n})$, we have the composition

where $u_0\in L_0$, $u_{+}\in L_{+}$, $u_{-}\in L_{-}$. According to A, there exists a small number $ϵ>0$ such that $-ϵ\notin \sigma (A)$. Let us define the space E as follows:

with the scalar product

and the norm

The space E endowed with this norm is a real Hilbert space continuously embedded in $L^2([0,2\pi ],R^{2n})$. The scalar product in $L^2$ naturally extends as the duality pairing between E and $E^{\mathrm{\prime }}=W^{-\frac{1}{2},2}([0,2\pi ],R^{2n})$. We note that the operator ${(ϵ+|A|)}^{-1}$ is a compact linear operator from $L^2([0,2\pi ],R^{2n})$ to E such that

Let

Let

Then $E=E_0\oplus E_{+}\oplus E_{-}$ and for $z\in E$, z has the decomposition $z=z_0+z_{+}+z_{-}\in E$, where

Thus we have

and that $E_0$, $E_{+}$, $E_{-}$ are isomorphic to $L_0$, $L_{+}$, $L_{-}$, respectively. Let us define the functional $f(u)$ on $L^2$ as follows:

where $M_{+}={\int }_0^{\mathrm{\infty }}d{M}_{\lambda }$, $M_{-}={\int }_{-\mathrm{\infty }}^{0}d{M}_{\lambda }$ and ${\psi }_{ϵ}(z)=\psi (z)+\frac{ϵ}{2}{\parallel z(t)\parallel }_{L^2}^2$, $\psi (z)={\int }_0^{2\pi }G(t,z(t))dt$. Let

By $G\in C^2$ and (G2), $\psi (z)={\int }_0^{2\pi }G(t,z(t))\in C^2(E,R^1)$. Let

The system (1.1) is equal to

The Euler equation of the functional $f(u)$ is the system

(2.3)

(2.4)

(2.5)

Thus $z=z_0+z_{+}+z_{-}$ is a solution of (2.2) if and only if $u=u_0+u_{+}+u_{-}$ is a critical point of f. System (2.3)-(2.5) is reduced to

(2.6)

(2.7)

(2.8)

By (G2),

By (G2), there exists a $\gamma >\beta +ϵ$ such that

We note that

Let us set

Now we will prove a reduction lemma which reduces the problem on the infinite dimensional space E to that of the finite dimensional subspace.

Let $z_0\in E_0$ be fixed and consider the function $h:E_{-}\times E_{+}\to R$ defined by

The function h has continuous partial Fréchet derivatives $D_{1}h$ and $D_{2}h$ with respect to its first and second variables given by

for $y_1\in E_{-}$ and $y_2\in E_{+}$, $i=1,2$. Let $v=z_0$.

Lemma 2.1 Assume that G satisfies the conditions (G1)-(G5).

1. (i)

   For given $v\in E_0$, there exists a unique $z_{-}+z_{+}\in C^1(E_0,E_{-}\oplus E_{+})$ satisfying the equation

   $$A_{ϵ}(z_{-}+z_{+})=(P_{-}+P_{+})F_{ϵ}(v+z_{-}+z_{+}).$$

   (2.11)
2. (ii)

   There exists $m_1<0$ such that if $z_{-}$ and $y_{-}$ are in $E_{-}$ and $z_{+}\in E_{+}$, then

   $$(D_{1}h(z_{-},z_{+})-D_{1}h(y_{-},z_{+}))(z_{-}-y_{-})\le m_1{\parallel z_{-}-y_{-}\parallel }^2.$$

   (2.12)
3. (iii)

   There exists $m_2>0$ such that if $z_{+}$ and $y_{+}$ are in $E_{+}$ and $z_{-}\in E_{-}$, then

   $$(D_{2}h(z_{-},z_{+})-D_{2}h(z_{-},y_{+}))(z_{+}-y_{+})\ge m_2{\parallel z_{+}-y_{+}\parallel }^2.$$

   (2.13)
4. (iv)

   For given $v\in E_0$, if we put the unique solution $z_{-}(v)+z_{+}(v)$ of (2.11) as $z_{-}(v)+z_{+}(v)=\theta (v)$, then $\theta (v)$ is continuous on $E_0$ and satisfies a uniform Lipschitz condition in $E_0$ with respect to $L^2$ norm (also norm ${\parallel \cdot \parallel }_E$) and ${|A_{ϵ}|}^{\frac{1}{2}}{z}_{-}(v)\in C^1(E_0,E_{-}\oplus E_{+})$, ${|A_{ϵ}|}^{\frac{1}{2}}{z}_{+}(v)\in C^1(E_0,E_{-}\oplus E_{+})$. Moreover,

   $$DI(v+\theta (v))(w)=0\mathit{\text{for all}}w\in E_{-}\oplus E_{+}.$$
5. (v)

   If $\tilde{I}:E_0\to R$ is defined by

   $$\tilde{I}(v)=I(v+\theta (v))=I(v+z_{-}(v)+z_{+}(v)),$$

then $\tilde{I}$ has a continuous Fréchet derivative $D\tilde{I}$ with respect to v, and

1. (vi)

   $v\in E_0$ is a critical point of $\tilde{I}$ if and only if $v+\theta (v)=v+z_{-}(v)+z_{+}(v)$ is a critical point of I.

Proof (i) Let $\delta =\frac{\alpha +\beta }{2}+ϵ$. If $F_{ϵ}^{\delta }(\psi )=F_{ϵ}(\psi )-\delta$, then equation (2.11) is equivalent to the equation

The operator ${(A_{ϵ}-\delta )}^{-1}(P_{-}+P_{+})$ is a self-adjoint, compact and linear map from $(P_{-}+P_{+})L_2$ into itself and its norm is ${(min\{|j_2-\delta |,|j_1-1-\delta |\})}^{-1}$. We note that

We claim that the right-hand side of (2.14) is a Lipschitz mapping of $(P_{-}+P_{+})L_2$ into itself with a Lipschitz constant $r<1$. In fact, let v be a fixed element in $E_0$ and $w=v+z_{-}+z_{+}$, $y=v+w_{-}+w_{+}$ be any elements in E. Then we have

Since the operator norm of ${|A_{ϵ}-\delta |}^{-\frac{1}{2}}(P_{-}+P_{+})$ is less than or equal to $\frac{1}{\sqrt{min\{|j_2-\delta |,|j_1-1-\delta |\}}+ϵ}$ and

we have

since $min\{|j_2-\delta |,|j_1-1-\delta |\}+ϵ>max\{|\alpha -\delta |,|\beta -\delta |\}+ϵ$. Therefore, by the implicit function theorem, for given $v\in E_0$, there exists a unique solution $z_{-}(v)+z_{+}(v)\in E_{-}\oplus E_{+}$ which satisfies (2.15).

1. (ii)

   For all $z_{-}\in E_{-}$,

   $${\parallel z_{-}\parallel }_E^2\le (j_1-1){\parallel w_1\parallel }_{L^2}^2.$$

   (2.16)

For all $z_{+}\in E_{+}$,

If $v\in E_0$, $z_{-}$ and $y_{-}$ are in $E_{-}$, $z_{+}\in E_{+}$ and $z=v+z_{-}+z_{+}$, then

Since $(G_z^{ϵ}({\xi }_2)-G_z^{ϵ}({\xi }_1))({\xi }_2-{\xi }_1)>(\alpha +ϵ){({\xi }_2-{\xi }_1)}^2$ and (2.15) holds, we see that if $z_{-}$ and $y_{-}$ are in $E_{-}$ and $z_{+}\in E_{+}$, then

where $m_1=1-\frac{\alpha }{j_1-1}<0$.

1. (iii)

   Similarly, using the fact that $(G_z^{ϵ}({\xi }_2)-G_z^{ϵ}({\xi }_1))({\xi }_2-{\xi }_1)<(\beta +ϵ){({\xi }_2-{\xi }_1)}^2$ and (2.17) holds, we see that if $z_{+}$ and $y_{+}$ are in $E_{+}$ and $z_{-}\in E_{-}$, then

   $$(D_{2}h(z_{-},z_{+})-D_{2}h(z_{-},y_{+}))(z_{+}-y_{+})\ge m_2{\parallel z_{+}-y_{+}\parallel }^2,$$

where $m_2=1-\frac{\beta }{j_1+1}>0$.

1. (iv)

   If $\theta (v)$ denotes the unique $(z_{-}+z_{+})(v)\in E_{-}\oplus E_{+}$ which solves (2.11), then $\theta \in C^1(E_0,E)$. In fact, if $v,v^{\mathrm{\prime }}\in E_0$, and $p_1=\theta (v)$, $p_2=\theta (v^{\mathrm{\prime }})$, then we have

   $$\begin{array}{rcl}{\parallel p_1-p_2\parallel }_E& =& {\parallel {(A_{ϵ})}^{-1}(P_{-}+P_{+})[F_{ϵ}(v+p_1)-F_{ϵ}(v^{\mathrm{\prime }}+p_2)]\parallel }_E\\ \le & C{\parallel (v+p_1)-(v^{\mathrm{\prime }}+p_2)\parallel }_E\\ \le & C{\parallel (v-v^{\mathrm{\prime }})-(p_1-p_2)\parallel }_E.\end{array}$$

Thus we have

Thus θ is continuous. Since $F_{ϵ}\in C^1(E,E)$, $\theta \in C^1(E_0,E)$. Since $dim{L}_0$ is finite and all topologies on $L_0$ are equivalent, we have

Let $v\in E_0$. If $q\in E_{-}\oplus E_{+}$, then from (2.11) we have

Since ${\int }_0^{2\pi }{A}_{ϵ}v\cdot q=0$, we have

for all $q\in E_{-}\oplus E_{+}$.

1. (v)

   Since the functional I has a continuous Fréchet derivative DI, $\tilde{I}$ has a continuous Fréchet derivative $D\tilde{I}$ with respect to v.

2. (vi)

   Suppose that there exists $v\in E_0$ such that $D\tilde{I}(v)=0$. From $D\tilde{I}(v)(h)=DI(v+\theta (v))(h)$ for all $v,h\in E_0$, $DI(v+\theta (v))(h)=0$ for all $h\in E_0$. Since $DI(v+\theta (v))(w)$ for all $w\in E_{-}\oplus E_{+}$, it follows that $DI(v+\theta (v))=0$. Thus $v+\theta (v)$ is a solution of (1.1). Conversely if u is a solution of (1.1) and $v=P_{0}u$, then $D\tilde{I}(v)=0$. □

Lemma 3.1 Assume that G satisfies the conditions (G1)-(G5). Then $-\tilde{I}(v)$ is bounded below and satisfies $(P.S.)$ condition.

Proof Let $v\in E_0$. By the finite dimensional reduction,

where $\theta (v)={\theta }_{-}(v)+{\theta }_{+}(v)$, $v\in E_0$, ${\theta }_{-}(v)\in E_{-}$, ${\theta }_{+}(v)\in E_{+}$, $G^{ϵ}(t,v(t)+\theta (v(t)))=G(t,v(t)+\theta (v(t)))+ϵ{(v(t)+\theta (v(t)))}^2$. Let $w=v+{\theta }_{-}(v)$. Then we have

Moreover, we have

By (G4), we have chosen a number γ such that $j_1<\gamma <d_z^{2}G(t,\mathrm{\infty })<\beta$. Thus we have

Thus $-\tilde{I}(v)$ is bounded from below and satisfies $(P.S.)$ condition. □

Lemma 3.2 Assume that G satisfies conditions (G1)-(G5). Then $v=0$ is a strict local point of minimum of $\tilde{I}(v)$ with $\tilde{I}(0)=0$.

Proof

where

Thus we have

Thus $v=0$ is a strict local point of minimum of $\tilde{I}(v)$. Since $\theta (0)=0$, $\tilde{I}(0)=0$. □

Proof of Theorem 1.1 By Lemma 2.1(v), $\tilde{I}(v)$ is continuous and Fréchet differentiable in $E_0$. By Lemma 3.1, $\tilde{I}(v)$ is bounded above, satisfies the $(P.S.)$ condition and $\tilde{I}(v)\to -\mathrm{\infty }$ as ${\parallel v\parallel }_E\to \mathrm{\infty }$. By Lemma 3.2, $v=0$ is a strict local point of minimum of $\tilde{I}(v)$ with a critical value $\tilde{I}(0)=0$. We note that ${max}_{v\in E_0}\tilde{I}(v)>0$ is another critical value of $\tilde{I}$. By the shape of the graph of the functional $\tilde{I}$ on the one-dimensional subspace $E_0$, there exists the third critical point of $\tilde{I}(v)$. Thus (1.1) has at least three solutions, one of which is a trivial solution $u=v+\theta (v)=0+0=0$. □

The authors appreciate very much the referees for their kind corrections. This work (Tacksun Jung) was supported by Basic Science Research Program through the National Research Foundation of Korea (NRF) funded by the Ministry of Education, Science and Technology (KRF-2011-0026920).

Authors and Affiliations

1. Department of Mathematics, Kunsan National University, Kunsan, 573-701, Korea

   Tacksun Jung

2. Department of Mathematics Education, Inha University, Incheon, 402-751, Korea

   Q-Heung Choi

Corresponding author

Correspondence to Q-Heung Choi.

Competing interests

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The authors did not provide this information.

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