1 Introduction

The purpose of this article is to study the multiplicity of solutions for the system with small sources:

where Ω ⊂ RNis a bounded domain with smooth boundary∂Ω,N ≥ 2,1＜ r＜ p＜ ∞,1 ＜ s＜ q＜ ∞;h1(x)and h2(x)are allowed to have“essential” zeroes at some points in Ω;d(x)and f(x)can be very small,in particular,small supports and sign changing for d(x)and f(x)are permitted and the terms Gu(x,u,v)and Gv(x,u,v)will be considered as high-order perturbations of the small sources d(x)|u|r−2u and f(x)|v|s−2v with respect to(u,v)near the origin respectively.

For the semilinear case of single equation

where r∈ (1,2)and λ ＞ 0,existence of in finitely many solutions has attracted much attention and has been extensively studied in the last three decades.For example,in[1]Ambrosetti-Badiale obtained in finitely many solutions of(1.2)with negative energy when g(x,u)≡0,using a dual variational formulation.Ambrosetti-Brezis-Cerami[2]and Garcia-Peral[3]proved that(1.2)has in finitely many solutions with negative energy provided that g(x,u)=|u|m−2u,m ∈ (2,2∗],where 2∗=2N/(N −2)for N ≥ 3 and 2∗= ∞ for N=1,2,and 0＜ λ ＜ λ∗for some finite λ∗.For 2 ＜ m ＜ 2∗,Bartsch-Willem[4]removed the restriction on λ and obtained in finitely many solutions under the assumptions that g(x,u)= µ|u|m−2u,m ∈ (2,2∗),µ ∈ R,and λ ＞ 0.It should be noted that in all quoted articles above,the global property of g(x,u)for u large was used in an essential way to derive multiplicity results of solutions with negative energy.It was Wang[5]who first observed that existence of in finitely many solutions of(1.2)with negative energy relies only on local behavior of the equation and assumptions on g(x,u)only for small u are required.More precisely,he proved that if 1 ＜ r＜ 2,g ∈ C(Ω ×(−δ,δ),R)for some δ＞ 0,g is odd in u and g(x,u)=o(|u|r−1)as|u|→ 0 uniformly in x ∈ Ω,then for all λ＞0,(1.2)has a sequence of weak solutions with negative energy,thus improving all the previous results.It is worth pointing out that positivity λ＞0 plays a crucial role in his argument.Recently,Guo[6]and Jing-Liu[7]considered the following problem

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where d∈ C(Ω)is allowed to change sign,more exactly,

In[6],Guo proved that if 1 ＜ r ＜ 2,(1.4)holds,g ∈ C(Ω × (−δ,δ),R)for some δ＞ 0,g is odd in u and g(x,u)=o(|u|)as|u|→ 0 uniformly in x∈Ω,then(1.3)has a sequence of nontrivial solutions whose L∞-norms converge to zero.Jing-Liu[7]removed the oddness of the perturbation term g,and assumed that g ∈ C(Ω×(−δ,δ),R)for some δ＞ 0,g(x,u)=o(|u|τ−1)as|u|→0 uniformly in x∈Ω,where 2+N(2−r)/r＜τ≤2∗for N ≥3 and 2+N(2−r)/r＜ τ for N=1,2.Chung[8]further showed the existence of in finitely many solutions of the system(1.1)with linear principal parts,that is,

where the diffusion coefficients h1and h2are from the space(H)σ with σ ∈ [0,∞),defined by

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r=s∈ (1,2),d,f ∈,andfor small positive constants ρ1,ρ2,G is even in(u,v)and

hold uniformly in x ∈ Ω for some θ,τ≥ 0.The degeneracy of problem(1.1)is considered in the sense that the measurable,non-negative diffusion coefficient h ∈ (H)σ is allowed to have at most a finite number of zeroes at some points in Ω.For more details,we refer the reader to[9].The physical motivation of the assumption h∈(H)σis related to the modeling of reaction diffusion processes in composite materials,occupying a bounded domain Ω,in which at some points they behave as “perfect” insulators and so it is natural to assume that h(x)vanishes at these points(see[10]).

Motivated by the above mentioned works,in this article,we aim to extend the result to system(1.1)with the principal parts consisting of weighted(p,q)-Laplacian without the restriction r=s.Just as the interests in[5,6,8],we will establish the existence of a sequence of solutions with negative energy for system(1.1).

This article is organized as follows.In Section 2,we present some preliminaries and the main result of this article,which will be proved in Section 3.

2 Main Result

In this section,we formulate the main result of this article.Before that,we give the fundamental hypotheses and the definition of solutions to system(1.1).

Throughout this article,we always assume that the following conditions hold:

(H1)h1 ∈ (H)α for some αand h2 ∈ (H)β for some β ∈

(H2)d,and either

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For the completeness and the convenience of the reader,we recall that the weighted Sobolev spacewhere 1＜ m ＜ ∞ and h∈ (H)σ for someis defined as the closure of(Ω)with respect to the norm

for which,we have the following embedding result(see[11]).

Lemma 2.1 Let Ω be a bounded domain in RN,N≥2,1＜m＜∞and h∈(H)σfor someThen,the following properties hold:

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and its associated functional

(ii)If 1＜m≤N+σ,then the embeddingis compact for every r ∈ [1,m∗σ),whereif 1＜ m ＜ N+σ and

(iii)If m＞N+σ,then the embeddingis compact.

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According to the assumption(H1),the space setting for our problem is naturally the product space

equipped with the norm ‖ω‖H= ‖u‖h1+ ‖v‖h2.Now,we can give the definition of solutions to system(1.1).

Definition 2.2 We say that ω =(u,v)∈ H is a weak solution to system(1.1)if‖u‖L∞(Ω)＜ ρ1,‖v‖L∞(Ω)＜ ρ2,and the identity

holds for any

(i)There exists a sequence of critical points{ωk}satisfying Φ(ωk)＜ 0 for all k and ‖ωk‖ → 0 as k→∞;

hold uniformly in x ∈ Ω,where γ and δ are some nonnegative constants such that

Theorem 2.3 Let 1＜ r＜ p＜ ∞,1＜ s＜ q＜ ∞,and the conditions(H1)–(H3)be fulfilled.Then,system(1.1)has in finitely many solutions ωksuch that ‖ωk‖L∞(Ω) → 0 as k→∞.

（ 来源：国家统计局 2018-08-24 http://www.stats.gov.cn/tjsj/sjjd/201808/t20180824_1618769.html ）

We conclude this section by the following lemma,which will play an essential role in our arguments.

Lemma 2.4([12]) Let X be a Banach space and Φ ∈ C1(X,R).Assume that Φ satisfies the(PS)condition,being even and bounded from below,and Φ(0)=0.If for any k ∈ N,there exist a k-dimensional subspace Xkof X and ρk ＞ 0 such thatwhere Sρ={ω ∈ X|‖ω‖= ρ},then at least one of the following conclusions holds:

Our main result of this article reads as follows.

(ii)There exists r＞0 such that for any 0＜a＜r,there exists a critical point ω such that‖ω‖ =a and Φ(ω)=0.

3 Proof of Main Result

In this section,we prove Theorem 2.3,following the approach introduced in[5].Denote by λ1the positive principal eigenvalue of the following Dirichlet problem

where γ,δ≥ 0 satisfy(2.1),seeing[13]for p=q=2 and[14]for general p,q.Namely,

As in[5,6,8],we first modify G so that Guand Gvare well-defined for all(x,u,v)∈×R2.

Proposition 3.1 Let condition(H3)hold.Then,for any λ ∈ (0,λ1),there exist∈(0,ρ1/2),∈ (0,ρ2/2),and ∈ C1(× R2,R)such thateG is even in(u,v)and satisfies

for all x ∈ Ω,|u|≤and|v|≤

(H3)for small positive constants ρ1,ρ2and G is even in(u,v),G(x,0,0)≡0,and

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for all(x,u,v)∈Ω×R2.

Proof First,given λ ∈ (0,λ1),choose ε such that

for which,by(H3),there exist ∈ (0,ρ1/2)and∈ (0,ρ2/2)such that for any|u| ≤ |v|≤ and x ∈ Ω,

and then

Thus,for anyby(3.5)and G(x,0,0) ≡ 0,we have

where 0 ＜ θ1,θ2＜ 1.

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Next,setting η(t1,t2)= φ(t1)ψ(t2)in which φ,ψ ∈ C∞(R),they are even and satisfy

Define

Obviously,G is even in(u,v)and(3.2)holds.Furthermore,the choice of ε implies

for all(x,u,v)∈Ω×R2,that is,(3.4)holds.Finally,a direct calculation shows that ifthen

while,if x ∈ Ω and eitherthen

which together with the choice of ε proves(3.3).Thus,the proof is completed.

Now,we are ready to prove Theorem 2.3.

Proof of Theorem 2.3 Without loss of generality,we may assume that 1＜p＜N+α and 1＜q＜N+β.Consider the modified elliptic problem

(i)for every

From the construction ofeG,it is easy to see that J∈C1(H),J is even and J(0)=0.In the sequel,for the sake of clarity,we divide the proof of the theorem into several steps.

for all(x,u,v)∈Ω×R2;

Step 1 We claim that the functional J is coercive and bounded from below in H.Let ω=(u,v)∈H.Then,in virtue of(3.4)and(3.1),using Lemma 2.1,we have

As λ ∈ (0,λ1),1＜ r＜ p,and 1 ＜ s＜ q,by applying Young’s inequality to(3.9),we conclude the claim.

由于三算子分裂算法中，g和h所定义的迭代序列不是对称的，所以交换g和h，则会得到不同形式的算法迭代格式。从而对于问题(2.3)的求解，我们给出两种不同形式的三算子迭代形式。

Step 2 We show that the functional J satisfies the Palais-Smale condition in H.Let{ωn}={(un,vn)}be a(PS)sequence,namely,

where M is independent of n and H−1is the dual space of H.Then,{ωn}is uniformly bounded in H.Thus,by Lemma 2.1,there exists a subsequence of{ωn},denoted by{ωnj}and ω0=(u0,v0)∈ H,such that

and

for anyandas j→∞.Noticing that

using(3.10),(3.11),and(3.12),we deduce that

as j→∞.That is to say

and

On the other hand,an application of Hölder’s inequality shows that

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Using the elementary inequalities

and the fact that{unj}is bounded,it is easy to see that

Hence,unj→u0in (Ω,h1)as j→ ∞ and similarly,vnj→v0in(Ω,h2)as j→ ∞.

Step 3 We prove that for any given positive integer k,there exist a k-dimensional subspace Hkand an associated positive number ρk,such that

where Sρ ={ω ∈ H:‖ω‖H= ρ}.By(H2),without loss of generality,we may assume that/= ∅ and moreover,d(x)≥ d0＞ 0 onThen,for any given positive integer k,we can choose k manually disjoint open ball Bj⊂BR(x0),define ξj∈(Bj)such that‖ξj‖h1=1,j=1,2,···,k,and set

Now,let ω0 ∈ Hk ∩ Sρkbe fixed,where ρkis chosen such that

Then,according to the definition of Hk,there uniquely exist real numbers a1,a2,···,ak,such that

Thus,

which together with the arbitrariness of ω0shows(3.13).

Step 4 It is obtained that J(ω)=0 and DJ(ω)=0 if and only if ω =(0,0).Evidently,J((0,0))=0 and DJ((0,0))=0.Conversely,if both J(ω)=0 and DJ(ω)=0 hold for some ω=(u,v)∈H,then

and

Thus,

Furthermore,on one hand,using(3.1),we have

On the other hand,by virtue of(3.3),

From(3.14)–(3.16)and 0 ＜ λ ＜ λ1,it follows that ω =(0,0),as required.

Step 5 We complete the proof of Theorem 2.3.Now,we appeal to Lemma 2.4 to obtain in finitely many solutions{ωk(=(uk,vk))}for(3.7)such that‖ωk‖H → 0 as k → ∞.A standard regularity argument(see[14])then shows that‖ωk‖L∞(Ω)→ 0 as k → ∞,and therefore for k large ωkare solutions of(1.1).Thus,the proof is completed.

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