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The estimates on the energy functional of an elliptic system with Neumann boundary conditions

Abstract

We consider an elliptic system of the form ε 2 Δu+u=f(v), ε 2 Δv+v=g(u) in Ω with Neumann boundary conditions, where Ω is a C 2 domain in R N , f and g are nonlinearities having superlinear and subcritical growth at infinity. We prove the existence of nonconstant positive solutions of the system, and estimate the energy functional on a configuration space H ¯ by a different technique, which is an important step in the proof of the solution’s concentrative property. We conclude that the least energy solutions of the system concentrate at the point of boundary, which maximizes the mean curvature of Ω.

1 Introduction

We are concerned with the following singularly perturbed system with Neumann conditions:

{ ε 2 Δ u + u = g ( v ) , in  Ω , ε 2 Δ v + v = f ( u ) , u , v > 0 ,  in  Ω , u n = v n = 0 , on  Ω ,
(1.1)

where ε>0 is a small parameter, Ω is a C 2 bounded domain in R N (N3), 0Ω. f and g are nonlinearities having superlinear and subcritical growth at infinity.

Problem (1.1) arises in many applied models concerning biological pattern formations. For example, the steady states in the Keller-Segel model, the Gierer-Meinhardt model, see [1, 2] for more details. Problem (1.1) has been studied extensively for last twenty years. The motivation for the study of such a problem goes back to the pioneering work of [2, 3] concerning the scalar case (single equation),

{ ε 2 Δ u + u = u p , u > 0 ,  in  Ω , u n = 0 , on  Ω .
(1.2)

They proved a priori estimates, existence of least energy solutions and the concentrative properties of the solution. Furthermore, in [4, 5], Ni and Takagi proved the existence of a nontrivial solution u ε to problem (1.2) for ε small enough. They showed that u ε attains its maximum value at a point P ε Ω, and the subsequences of P ε converge to P, which is the maximum point of mean curvature on Ω.

The subject was studied by many authors for both Neumann and Dirichlet boundary conditions. There are many well-known results about (1.2). Del Pino and Felmer in [6] introduced shorter and more elementary arguments with respect to those in [4, 7]. Wang in [8] obtained multiple solutions of (1.2) by using Ljusternik-Schnirelman method. In [9], Grossi et al., obtained a solution of (1.2) with k maxima points, k is a given positive integer. We refer the reader to [1014] for further references.

As far as we know, Avial and Yang [15] were the first to approach the singularly perturbed system (1.1) with Neumann boundary conditions; they considered (1.1) with special nonlinearities f(s)= s p 1 , g(s)= s q 1 (2<p,q<2N/N2). By means of a dual variational formulation, they proved that there exist nontrivial positive solutions u ε and v ε in C 2 ( Ω ¯ ), which have global maximum point at different points.

A more direct approach was proposed in [1618]. In these papers, the authors extend the idea, which is introduced by Del Pino and Felmer in [6], to system (1.1). In [18], Pistoia and Ramos proved the least energy solutions of system (1.1) concentrate at a point of the boundary, which maximizes the mean curvature of the boundary of Ω. Pistoia and Ramos [19] consider system (1.1) with Dirichlet boundary condition, they proved the existence of the least energy solutions. The solutions are concentrated, as ε goes to zero, at a point of Ω, which is maximized in distance to the boundary of Ω.

Let us recall the idea mentioned in [35], their proof based on the well-known result of Gidas et al. [20], that is, the uniqueness solution of the equation

{ Δ w + w = w p , w > 0 ,  in  R N , w ( 0 ) = max y R N w ( y ) , w 0 ,  as  | y | + ,
(1.3)

here w is radially symmetric and is strictly decreasing, and w (r)<0 for r>0. But the uniqueness result for the following system corresponding to (1.1) is not known.

{ Δ u + u = g ( v ) , in  R N , Δ v + v = f ( u ) , in  R N , u , v > 0 , in  R N .

Besides, it is known that the underlying minimax theorem associated to ground-state level of (1.1) is an infinite-dimensional linking, this is in contrast with (1.2). We refer the reader to [18, 21] for more details on this.

In this paper, we prove the existence of nonconstant positive solutions u ε , v ε C 2 (Ω) H 1 (Ω) of system (1.1), and estimate the energy functional of (1.1) on the configuration space H ¯ (defined in Section 2) by a different technique, which is compared with [18]. This estimation is an important step in the proof of H( P 0 )= max P Ω H(P), where H(P) denotes the mean curvature of Ω at the boundary point P. We conclude the least energy solutions of system (1.1), concentrated at the point of boundary, which maximizes the mean curvature of the boundary of Ω.

2 Statement of main results

The assumption to f,g C 1 ( R N ) is a typical superlinear subcritical one, as in [18], we assume that the following holds.

(S1) f(s)=g(s)=0, for s0. f(0)=0= f (0), g(0)=0= g (0). There exist two real numbers l 1 , l 2 >0, 2<p,q<2N/(N2) such that

lim | s | f (s) | s | 2 p = l 1 , lim | s | g (s) | s | 2 q = l 2 .

(S2) For some δ>0, sR, s0,

f (s) s 2 (1+δ)f(s)s>0, g (s) s 2 (1+δ)g(s)s>0.

(S3) f 2 (s)2 f (s)F(s), g 2 (s)2 g (s)G(s), for sR, s0, where F(s)= 0 s f(t)dt, G(s)= 0 s g(t)dt.

Remark 2.1 Examples of nonlinearities satisfying (S1)-(S3) are

f(s)= a 1 | s | b 1 + | s | p 1 ,g(s)= a 2 | s | b 2 + | s | q 1 ,

where a 1 , a 2 >0, 2< b 1 p1, 2< b 2 q1, 2<p,q<2N/(N2).

We should point out that (S1)-(S3) are the natural extension of the assumptions for the scalar case (single equation). Let us recall the assumptions on single equation such as (1.2).

Assume that f:RR is continuous and satisfies the following structure assumptions.

(f1) f(t)=0 for t0 and f(t)=o(t) near t=0. f(t)=O( t s ) as t, for some 1<s<(N+2)/(N2) if N>=3, and s>1 if N=1,2.

(f2) There exists a constant θ>2 such that θF(t)tf(t) for t0, in which F(t)= 0 t f(s)ds.

(f3) The function tf(t)/t is strictly increasing.

Remark 2.2 Assumption (S1) is the ‘system edition’ of (f1). (f2) is the famous Ambrosetti-Rabinowitz superlinear condition [22], which has appeared in most of studies for superlinear problems. In fact, it implies that the super-quadratic condition on F(t). It has been used in a crucial way not only in establishing the mountain-pass geometry of the functional, but also in obtaining bounds of (PS) sequences. Assumption (S2) implies that f(s)s(2+δ)F(s)>0, g(s)s(2+δ)G(s)>0, which play a important roll in the proof of the existence of system’s solutions. So it is the ‘system edition’ of (f2).

Without loss of generally, we may assume that 0Ω. By the following rescaling:

z=εx,x Ω ε :={εxΩ},

equation (1.1) becomes

{ Δ u + u = g ( v ) , in  Ω ε , Δ v + v = f ( u ) , u , v > 0  in  Ω ε , u n = v n = 0 , on  Ω ε .
(2.1)

To simplify the notations, we define Ω:= Ω ε . Associated with (2.1) is the energy functional

I(u,v)= Ω ( u , v + u v ) Ω ( F ( u ) + G ( v ) ) ,
(2.2)

(2.2) is a C 2 functional defined over the Hilbert space H:= H 1 (Ω)× H 1 (Ω).

We define the norm

( u , v ) 2 := u 2 + v 2 ,

where u 2 = Ω ( | u | 2 + u 2 ).

It can be observed that the following orthogonal splitting holds: H= H H + , here, H :={(ϕ,ϕ),ϕ H 1 (Ω)}, H + :={(ϕ,ϕ),ϕ H 1 (Ω)}. We set H ˜ ={t(u,v)t R + ,u,v H 1 (Ω),uv}, H ¯ = H H ˜ .

Theorem 2.3 Assume (S1)-(S3), then there exists ε 0 >0, such that for any 0<ε< ε 0 , system (1.1) has nonconstant positive solutions u ε , v ε C 2 (Ω) H 1 (Ω). If u ε v ε , the estimation of the energy functional on H ¯ is

I( u ε , v ε )= sup H ¯ I.
(2.3)

Remark 2.4 We point out that, in contrast with Theorem 2.3, only constant positive solutions are expected to exist for large values of ε [3, 15].

Remark 2.5 The estimation (2.3) is an important step in the proof of

H( P 0 )= max P Ω H(P),

where H(P) denotes the mean curvature of Ω at the boundary point P. So we can conclude the least energy solutions of system (1.1) concentrate at a point of the boundary, which maximizes the mean curvature of the boundary of Ω.

3 Proof of Theorem 2.3

To prove Theorem 2.3, we need the following lemma. Let u ε , v ε be the solutions of (1.1), in order to simplify the notations, we define u:= u ε , v:= v ε ,

I 1 (t):=I ( ( 1 t ) ϕ + t u , ( 1 t ) ( ϕ ) + t v ) ,ϕ H 1
(3.1)

and u ¯ =ϕ+t(uϕ), v ¯ =ϕ+t(v+ϕ).

Lemma 3.1 Supposing the assumptions in Theorem 2.3 hold, I 1 (t) admits the following properties:

(i)1 I 1 (1)=0, I 1 (0)0, I 1 (1)>0,

(ii)1 I 1 (t), t,

(iii)1 I 1 (1)<0.

Proof Proof of (i)1. By the definition of I 1 , I 1 (t)= I ( u ¯ , v ¯ )(uϕ,v+ϕ), then I 1 (1)= I (u,v)(uϕ,v+ϕ), where u and v are the solutions of (1.1), that follows I 1 (1)=0.

Again by (3.1),

I 1 ( 0 ) = I ( ϕ , ϕ ) = Ω ( ϕ , ( ϕ ) + ϕ ( ϕ ) ) Ω ( F ( ϕ ) + G ( ϕ ) ) = ϕ 2 Ω ( F ( ϕ ) + G ( ϕ ) ) ,

by (S2), we have F0, G0, so I 1 (0)0.

Next, we want to show I 1 (1)>0.

I 1 ( 1 ) = Ω ( u , v + u v ) Ω ( F ( u ) + G ( v ) ) = Ω ( 1 2 u , v + 1 2 u v ) + Ω ( 1 2 u , v + 1 2 u v ) Ω ( F ( u ) + G ( v ) ) = 1 2 Ω Δ u + u , v + 1 2 Ω Δ v + v , u Ω ( F ( u ) + G ( v ) ) = 1 2 Ω g ( v ) v + 1 2 Ω f ( u ) u Ω ( F ( u ) + G ( v ) ) = Ω ( 1 2 f ( u ) u F ( u ) ) + Ω ( 1 2 g ( v ) v G ( v ) ) .
(3.2)

From (S2), we can deduce there exist δ>0, such that f (t)t(1+δ)f(t), then

0 s f (t)t(1+δ) 0 s f(t)=(1+δ)F(s).

The left side in last inequality is equal to f(s)sF(s), so f(s)s(2+δ)F(s). By the same way, g(s)s(2+δ)G(s). Then (3.2) can change to

I 1 (1) ( 1 2 1 2 + δ ) Ω ( f ( u ) u + g ( v ) v ) >0.

So, we get the properties (i)1.

To prove (ii)1 is equal to show

I( u ¯ , v ¯ ),t.

We only need to prove for 2<p<2N/(N2),

lim inf t 1 | 1 t | p Ω ( F ( u ¯ ) + G ( v ¯ ) ) >0,
(3.3)

By (S1), there exist C such that

1 | 1 t | p Ω F ( ( 1 t ) ϕ + t u ) = C | 1 t | p Ω | ( 1 t ) ϕ + t u | p +o(1).

As the same,

1 | 1 t | p Ω G ( ( t 1 ) ϕ + t v ) = C | 1 t | p Ω | ( t 1 ) ϕ + t v | p +o(1).

We prove (3.3) by contradiction. Assume that there exists a subsequence t n such that

1 | 1 t n | p Ω ( F ( ϕ + t n ( u ϕ ) ) + G ( ϕ + t n ( v + ϕ ) ) ) 0,

that is,

Ω ( | ϕ + t n 1 t n u | p + | ϕ + t n 1 t n v | p ) +o(1)=0.

So, for any ϕ H 1 (Ω), we have

Ω ( | ϕ + t n 1 t n u | p + | ϕ + t n 1 t n v | p ) =o(1).

Take ϕ=0 in the last equality, then

| t n 1 t n | p Ω ( u p + v p ) =o(1).

For p is a number between 2 and 2N/(N2), u0, we deduce u=v. It contradicts with the original assumption of uv.

Now, we turn to the prove of (iii)1. By (3.1),

I 1 ( t ) = Ω ( ( ϕ + t ( u ϕ ) ) , ( ϕ + t ( v + ϕ ) ) + ( ϕ + t ( u ϕ ) ) ( ϕ + t ( v + ϕ ) ) ) Ω ( F ( u ¯ ) + G ( v ¯ ) ) = Ω ( ϕ , ϕ + ϕ , t ( v + ϕ ) + t ( u ϕ ) , ϕ ) + Ω t ( u ϕ ) , t ( v + ϕ ) + Ω ( ϕ ( ϕ ) + t ϕ ( v + ϕ ) t ϕ ( u ϕ ) ) + Ω t 2 ( u ϕ ) ( v + ϕ ) Ω ( F ( u ¯ ) + G ( v ¯ ) ) ,

then

I 1 ( t ) = 2 Ω ( ( u ϕ ) , ( v + ϕ ) + ( u ϕ ) ( v + ϕ ) ) Ω f ( u ¯ ) ( u ϕ ) 2 Ω g ( v ¯ ) ( v + ϕ ) 2 = 2 Ω ( u , v + u , ϕ + ϕ , v + ϕ , ϕ ) + 2 Ω ( u v + u ϕ ϕ v ϕ 2 ) Ω f ( u ¯ ) ( u ϕ ) 2 Ω g ( v ¯ ) ( v + ϕ ) 2 = Ω ( ( Δ v + v ) u + ( Δ u + u ) v + 2 ( Δ u + u ) ϕ + 2 ( Δ v v ) ϕ ) + 2 Ω ( | ϕ | 2 ϕ 2 ) Ω f ( u ¯ ) ( u ϕ ) 2 Ω g ( v ¯ ) ( v + ϕ ) 2 = 2 ϕ 2 + Ω ( f ( u ) u + g ( v ) v + 2 g ( v ) ϕ 2 f ( u ) ϕ ) Ω f ( u ¯ ) ( u ϕ ) 2 Ω g ( v ¯ ) ( v + ϕ ) 2 ,

take t=1, then

I 1 ( 1 ) = 2 ϕ 2 + Ω ( f ( u ) ( u 2 ϕ ) f ( u ) ( u ϕ ) 2 ) + Ω g ( v ) ( v + 2 ϕ ) Ω g ( v ) ( v ( ϕ ) ) 2 .
(3.4)

By (S2), for some δ>0,

Ω f(u)(u2ϕ) f (u) ( u ϕ ) 2 Ω δf(u)u,

in the same way,

Ω g(v)(v+2ϕ) g (v) ( v ( ϕ ) ) 2 Ω δg(v)v.

Thus, we obtain I 1 (1)<0. □

Proposition 3.2 (Theorem 1.1 in [18])

Under assumptions (H), there exists ε 0 >0 such that for any 0<ε< ε 0 , problem (1.1) has nonconstant positive solutions u ε , v ε C 2 (Ω). Moreover, both functions u ε and v ε attain their maximum value at some unique and common point P ε Ω. (The assumption (H) is composed of (S1), (S3) and the following (3.5).)

Remark 3.3 We will compare our assumptions (S1)-(S3) with the conditions (H) of Proposition 3.2 in the following proof of Theorem 2.3.

Proof of Theorem 2.3 The existence of solutions of (1.1) can follow the steps of Theorem 1.1 in [18]. They use some ideas introduced by Del Pino and Felmer [6], and differ from the method of Ni and Takagi. It needs to be pointed out that (S2) implies the following conditions:

For some δ>0, sR, s0,

f(s)s(2+δ)F(s)>0,g(s)s(2+δ)G(s)>0.
(3.5)

The assumption (H) in Proposition 3.2 is composed of (S1), (S3) and (3.5). By Proposition 3.2, the existence of solutions can be proved under (H). So, we can get the existence of solutions of (1.1) under (S1)-(S3).

The rest of the paper is devoted to the proof of (2.3). By the definition of space H ¯ , we only need to prove for any ϕ H 1 (Ω), tR, t>0 the following holds,

I(ϕ+tu,ϕ+tv)I(u,v).
(3.6)

Obviously t1. By (3.1), (3.6) is equal to

I 1 (t) I 1 (1).
(3.7)

We prove (3.7) by contradiction, suppose that the maximum point of I 1 (t) is t 0 0, and t 0 1.

I 1 ( t ) = Ω ( ϕ , ( v + ϕ ) + ( u ϕ ) , ϕ + 2 t ( u ϕ ) , ( v + ϕ ) ) + Ω ( ϕ ( v + ϕ ) ϕ ( u ϕ ) + 2 t ( u ϕ ) ( v + ϕ ) ) Ω f ( u ¯ ) ( u ϕ ) Ω g ( v ¯ ) ( v + ϕ ) = Ω ( ( ϕ + t ( u ϕ ) ) , ( v + ϕ ) + ( u ϕ ) , ( ϕ + t ( v + ϕ ) ) ) + Ω ( ( u ϕ ) ( ϕ + t ( v + ϕ ) ) + ( v + ϕ ) ( ϕ + t ( u ϕ ) ) ) Ω f ( u ¯ ) ( u ϕ ) Ω g ( v ¯ ) ( v + ϕ ) = Ω ( u ¯ , ( v + ϕ ) + ( u ϕ ) , v ¯ + ( u ϕ ) v ¯ + ( v + ϕ ) u ¯ ) Ω ( f ( u ¯ ) ( u ϕ ) + g ( v ¯ ) ( v + ϕ ) ) .

Let I 1 (t)=0, we get

Ω ( u ¯ , ( v + ϕ ) + ( u ϕ ) , v ¯ + ( u ϕ ) v ¯ + ( v + ϕ ) u ¯ ) = Ω ( f ( u ¯ ) ( u ϕ ) + g ( v ¯ ) ( v + ϕ ) ) .
(3.8)

Thus, by (3.8), we have

2 I ( u ¯ , v ¯ ) = Ω ( u ¯ , ( ϕ + t ( v + ϕ ) ) + u ¯ ( ϕ + t ( v + ϕ ) ) + ( ϕ + t ( u ϕ ) ) , v ¯ ) + Ω ( ϕ + t ( u ϕ ) ) v ¯ 2 Ω ( F ( u ¯ ) + G ( v ¯ ) ) = Ω ( u ¯ , ( ϕ ) + u ¯ ( ϕ ) + ϕ , v ¯ + ϕ v ¯ ) + Ω u ¯ , t ( v + ϕ ) + Ω ( u ¯ t ( v + ϕ ) + t ( u ϕ ) , v ¯ + t ( u ϕ ) v ¯ ) 2 Ω ( F ( u ¯ ) + G ( v ¯ ) ) = Ω ( u ¯ , ( ϕ ) + u ¯ ( ϕ ) + ϕ , v ¯ + ϕ v ¯ ) + Ω f ( u ¯ ) t ( u ϕ ) + Ω g ( v ¯ ) t ( v + ϕ ) 2 Ω ( F ( u ¯ ) + G ( v ¯ ) ) = : 2 I 2 ( t ) .
(3.9)

We claim that the function I 2 (t), defined in (3.9), has the following properties:

(i)2 I 2 (0)0, I 2 (1)>0, I 2 (1)>0;

(ii)2 For any t0, if I 2 (t)=0, then I 2 (t)0;

(iii)2 I 2 (t), as t.

First, we prove (i)2. In fact, by (3.1) and (3.9),

I 2 ( 0 ) = 1 2 { Ω 2 ( ϕ , ( ϕ ) + ϕ ( ϕ ) ) 2 Ω ( F ( ϕ ) + G ( ϕ ) ) } = ϕ 2 Ω ( F ( ϕ ) + G ( ϕ ) ) .

Following from assumption (S2), we obtain I 2 (0)0.

Again by (3.9) and Lemma 3.1, I 2 (1)= I 1 (1) and I 1 (1)>0, so I 2 (1)>0. Next, we want to compute I 2 (1). From (3.9),

2 I 2 ( t ) = Ω ( ϕ , ( ϕ ) + ( t ( u ϕ ) ) , ( ϕ ) + ϕ ( ϕ ) + t ( u ϕ ) ( ϕ ) ) + Ω ( ϕ , ( ϕ ) + ϕ , ( t ( v + ϕ ) ) + ϕ ( ϕ ) + ϕ t ( v + ϕ ) ) + Ω ( f ( u ¯ ) t ( u ϕ ) + g ( v ¯ ) t ( v + ϕ ) ) 2 Ω ( F ( u ¯ ) + G ( v ¯ ) ) ,
(3.10)
2 I 2 ( t ) = Ω ( ( u ϕ ) , ( ϕ ) + ( u ϕ ) ( ϕ ) ) + Ω ( ϕ , ( v + ϕ ) + ϕ ( v + ϕ ) ) + Ω ( f ( u ¯ ) t ( u ϕ ) 2 f ( u ¯ ) ( u ϕ ) + g ( v ¯ ) t ( v + ϕ ) 2 g ( v ¯ ) ( v + ϕ ) ) .
(3.11)

Then

2 I 2 ( 1 ) = Ω ( ( u ϕ ) , ( ϕ ) + ( u ϕ ) ( ϕ ) ) + Ω ( ϕ , ( v + ϕ ) + ϕ ( v + ϕ ) ) + Ω ( f ( u ) ( u ϕ ) 2 f ( u ) ( u ϕ ) + g ( v ) ( v + ϕ ) 2 g ( v ) ( v + ϕ ) ) = 2 ϕ 2 + Ω ( Δ u , ϕ + u ( ϕ ) + Δ v , ϕ + v ϕ ) + Ω ( f ( u ) ϕ + g ( v ) ( ϕ ) ) + Ω ( f ( u ) ( u ϕ ) 2 + g ( v ) ( v + ϕ ) 2 f ( u ) u g ( v ) v ) = 2 ϕ 2 + 2 Ω ( f ( u ) ϕ + g ( v ) ( ϕ ) ) + Ω ( f ( u ) ( u ϕ ) 2 + g ( v ) ( v + ϕ ) 2 ) Ω ( f ( u ) u + g ( v ) v ) .

Combined with (3.4), 2 I 2 (1)= I 1 (1). By Lemma 3.1, I 1 (1)<0, so I 2 (1)>0.

Now, we turn to the proof of (ii)2. Let I 2 (t)=0, by (3.11),

t Ω ( ( u ϕ ) , ( ϕ ) + ( u ϕ ) ( ϕ ) ) + t Ω ( ϕ , ( v + ϕ ) + ϕ ( v + ϕ ) ) = Ω ( f ( u ¯ ) t 2 ( u ϕ ) 2 t f ( u ¯ ) ( u ϕ ) + g ( v ¯ ) t 2 ( v + ϕ ) 2 t g ( v ¯ ) ( v + ϕ ) ) .

Then by (3.10),

2 I 2 ( t ) = ϕ 2 Ω ( f ( u ¯ ) t 2 ( u ϕ ) 2 2 t f ( u ¯ ) ( u ϕ ) + 2 F ( u ¯ ) ) Ω ( g ( v ¯ ) t 2 ( v + ϕ ) 2 2 t g ( v ¯ ) ( v + ϕ ) + 2 G ( v ¯ ) ) .
(3.12)

By (S3), we get

f ( u ¯ ) t 2 ( u ϕ ) 2 + 2 F ( u ¯ ) 2 t ( u ϕ ) 2 f ( u ¯ ) F ( u ¯ ) 2 t ( u ϕ ) f ( u ¯ ) ,

similarly,

g ( v ¯ ) t 2 ( v + ϕ ) 2 +2G( v ¯ )2t(v+ϕ)g( v ¯ ),

then by (3.12), I 2 (t)0. We proved the property (ii)2.

The proof of (iii)2 is similar to (ii)1. Then we complete the proof of the claim.

Suppose that the maximum point of I 1 (t) is t 0 0, t 0 1, then either t 0 (0,1) or t 0 (1,+). If t 0 (0,1), I 1 ( t 0 )> I 1 (1), by (3.1), (3.9) and property (i)2 of I 2 , I 2 ( t 0 )> I 2 (1)>0, I 2 (0)0. By the property (iii)2 of I 2 , there exist t ˆ >0, such that

I 2 ( t ˆ )=0and I 2 ( t ˆ )>0.
(3.13)

If t 0 (1,+), then I 1 ( t 0 )> I 1 (1). By Lemma 3.1, I 1 (1)=0, I 1 (1)<0, so there exist t 1 (1, t 0 ), such that I 1 ( t 1 )< I 1 (1), and I 1 ( t 1 )=0. Thus, I 2 ( t 1 )< I 2 (1). I 2 (1)>0, so there exist t ˜ (1, t 1 ), such that

I 2 ( t ˜ )=0and I 2 ( t ˜ )>0.
(3.14)

In fact, (3.13) and (3.14) is a contradiction to the nature (ii)2 of I 2 (t), that is, for any t0, if I 2 (t)=0, the value of I 2 (t) must be smaller than 0.

Having reached a contradiction, this completes the proof of Theorem 2.3. □

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Acknowledgements

The author is supported by the project of ‘Youth Innovation,’ funded by the Department of Science and Technology of Fujian province (2011J05003), and supported by the Projects A of the Educational Department of Fujian Province (JA11053).

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Zeng, J. The estimates on the energy functional of an elliptic system with Neumann boundary conditions. Bound Value Probl 2013, 194 (2013). https://doi.org/10.1186/1687-2770-2013-194

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