Sturm-Liouville BVP in Banach space

We consider the existence of single and multiple positive solutions for fourth-order Sturm-Liouville boundary value problem in Banach space. The sufficient condition for the existence of single and multiple positive solutions is obtained by fixed theorem of strict set contraction operator in the frame of the ODE technique. Our results significantly extend and improve many known results including singular and nonsingular cases.

The boundary value problems (BVPs) for ordinary differential equations play a very important role in both theory and application. They are used to describe a large number of physical, biological, and chemical phenomena. In this article, we will study the existence of positive solutions for the following fourth-order nonlinear Sturm-Liouville BVP in a real Banach space E

where α _i , β _i , δ _i , γ _i ≥ 0 (i = 1, 2) are constants such that ρ ₁ = β ₁ γ ₁ + α ₁ γ ₁ + α ₁ δ ₁ > 0, $B\left(t,s\right)={\int }_t^s\frac{d\tau }{p\left(\tau \right)}$, ρ ₂ = β ₂ γ ₂ + α ₂ γ ₂ B(0, 1) + α ₂ δ ₂ > 0, and p ∈ C ¹((0, 1), (0, +∞)). Moreover p may be singular at t = 0 and/or 1. BVP (1.1) is often referred to as the deformation of an elastic beam under a variety of boundary conditions, for detail, see [1–17]. For example, BVP (1.1) subject to Lidstone boundary value conditions u(0) = u(1) = u″(0) = u″ (1) = 0 are used to model such phenomena as the deflection of elastic beam simply supported at the endpoints, see [1, 3, 5, 7–11, 13, 14]. We notice that the above articles use the completely continuous operator and require f satisfies some growth condition or assumptions of monotonicity which are essential for the technique used.

The aim of this article is to consider the existence of positive solutions for the more general Sturm-Liouville BVP by using the properties of strict set contraction operator. Here, we allow p have singularity at t = 0, 1, as far as we know, there were fewer works to be done. This article attempts to fill part of this gap in the literature.

This article is organized as follows. In Section 2, we first present some properties of the Green functions that are used to define a positive operator. Next we approximate the singular fourth-order BVP to singular second-order BVP by constructing an integral operator. In Section 3, the sufficient condition for the existence of single and multiple positive solutions for BVP (1.1) will be established. In Section 4, we give one example as the application.

In this article, we all suppose that (E, || · ||₁) is a real Banach space. A nonempty closed convex subset P in E is said to be a cone if λP ∈ P for λ ≥ 0 and P ∩ {-P} = {θ}, where θ denotes the zero element of E. The cone P defines a partial ordering in E by x ≤ y iff y - x ∈ P. Recall the cone P is said to be normal if there exists a positive constant N such that 0 ≤ x ≤ y implies ||x||₁ ≤ N||y||₁. The cone P is normal if every order interval [x, y] = {z ∈ E|x ≤ z ≤ y} is bounded in norm.

In this article, we assume that P ⊆ E is normal, and without loss of generality, we may assume that the normality of P is 1. Let J = [0,1], and

For u = u(t) ∈ C(J, E), let $\left|\left|u\right|\right|=\underset{t\in J}{\text{max}}\left|\right|u\left(t\right)|{|}_{\mathsf{\text{1}}}$, then C(J, E) is a Banach space with the norm || · ||.

Definition 2.1 A function u(t) is said to be a positive solution of the BVP (1.1), if u ∈ C ²([0,1], E) ⋂ C ³((0, 1), E) satisfies u(t) ≥ 0, t ∈ (0, 1], pu″' ∈ C ¹((0, 1), E) and the BVP (1.1), i.e., u ∈ C ²([0,1], P) ⋂ C ³((0, 1), P) and $u\left(t\right)\not\equiv \theta$, t ∈ J.

We notice that if u(t) is a positive solution of the BVP (1.1) and p ∈ C ¹(0, 1), then u ∈ C ⁴ (0, 1).

Now we denote that H(t, s) and G(t, s) are the Green functions for the following boundary value problem

and

respectively. It is well known that H(t, s) and G(t, s) can be written by

and

where ρ ₁ = γ ₁ β ₁ + α ₁ γ ₁ + α ₁ δ ₁ > 0, $B\left(t,s\right)={\int }_t^s\frac{\mathsf{\text{d}}\tau }{p\left(\tau \right)}$, ρ ₂ = α ₂ δ ₂ + α ₂ γ ₂ B(0, 1) + β ₂ γ ₂ > 0.

It is easy to verify the following properties of H(t, s) and G(t, s)

1. (I)

   G(t, s) ≤ G(s, s) < +∞, H(t, s) ≤ H(s, s) < +∞;

2. (II)

   G(t, s) ≥ ρG(s, s), H(t, s) ≥ ξH(s, s), for any t ∈ [a, b] ⊂ (0, 1), s ∈ [0,1], where

   $$\rho =min\left\{\frac{{\delta }_2+{\gamma }_{2}B\left(b,1\right)}{{\delta }_2+{\gamma }_{2}B\left(0,1\right)},\frac{{\beta }_2+{\alpha }_{2}B\left(0,a\right)}{{\beta }_2+{\alpha }_{2}B\left(0,1\right)}\right\},$$
   $$\xi =min\left\{\frac{{\delta }_1+{\gamma }_1\left(1-b\right)}{{\delta }_1+{\gamma }_1},\frac{{\beta }_1+{\alpha }_{1}a}{{\beta }_1+{\alpha }_1}\right\}.$$

Throughout this article, we adopt the following assumptions

(H ₁) p ∈ C ¹((0, 1), (0,+∞)) and satisfies

(H ₂) f(u) ∈ C(P \ {θ}, P) and there exists M > 0 such that for any bounded set B ⊂ C(J, E), we have

where α( ) denote the Kuratowski measure of noncompactness in C(J, E).

The following lemmas play an important role in this article.

Lemma 2.1 [17]. Let B ⊂ C[J, E] be bounded and equicontinuous on J, then $\alpha \left(B\right)=\underset{t\in J}{sup}\alpha \left(B\left(t\right)\right)$.

Lemma 2.2 [16]. Let B ⊂ C(J, E) be bounded and equicontinuous on J, let α(B) is continuous on J and

Lemma 2.3 [16]. Let B ⊂ C(J, E) be a bounded set on J. Then α(B(t)) ≤ 2α(B).

Now we define an integral operator S : C(J, E) → C(J, E) by

Then, S is linear continuous operator and by the expressed of H(t, s), we have

Lemma 2.4. The Sturm-Liouville BVP (1.1) has a positive solution if and only if the following integral-differential boundary value problem has a positive solution of

where S is given in (2.4).

Proof In fact, if u is a positive solution of (1.1), let u = Sv, then v = -u″. This implies u″ = -v is a solution of (2.6). Conversely, if v is a positive solution of (2.6). Let u = Sv, by (2.5), u″ = (Sv)″ = -v. Thus, u = Sv is a positive solution of (1.1). This completes the proof of Lemma 2.1.

So, we only need to concentrate our study on (2.6). Now, for the given [a, b] ⊂ (0, 1), ρ as above in (II), we introduce

It is easy to check that K is a cone in C[0,1]. Further, for u(t) ∈ K, t ∈ [a, b], we have by normality of cone P with normal constant 1 that ||u(t)||₁ ≥ ρ||u||.

Next, we define an operator T given by

Clearly, v is a solution of the BVP (2.6) if and only if v is a fixed point of the operator T.

Through direct calculation, by (II) and for v ∈ K, t ∈ [a, b], s ∈ J, we have

So, this implies that T K ⊂ K.

Lemma 2.5. Assume that (H ₁), (H ₂) hold. Then T : K → K is strict set contraction.

Proof Firstly, The continuity of T is easily obtained. In fact, if v _n , v ∈ K and v _n → v in the sup norm, then for any t ∈ J, we get

so, by the continuity of f, S, we have

This implies that Tv _n → Tv in the sup norm, i.e., T is continuous.

Now, let B ⊂ K is a bounded set. It follows from the the continuity of S and (H ₂) that there exists a positive number L such that || f(Sv(t)) ||₁ ≤ L for any v ∈ B. Then, we can get

So, T (B) ⊂ K is a bounded set in K.

For any ε > 0, by (H ₁), there exists a δ ' > 0 such that

Let $P=\underset{t\in \left[{\delta }^{\prime },1-{\delta }^{\prime }\right]}{max}p\left(t\right)$. It follows from the continuity of G(t, s) on [0,1] × [0,1] that there exists δ > 0 such that

Consequently, when |t - t'| < δ, t, t' ∈ [0,1], v ∈ B, we have

This implies that T(B) is equicontinuous set on J. Therefore, by Lemma 2.1, we have

Without loss of generality, by condition (H ₁), we may assume that p(t) is singular at t = 0, 1. So, There exists $\left\{a_{n_i}\right\}$, $\left\{b_{n_i}\right\}\subset \left(0,1\right)$, {n _i } ⊂ N with {n _i } is a strict increasing sequence and $\underset{i\to +1}{lim}{n}_i=+1$ such that

Next, we let

Then, from the above discussion we know that ${\left(p\right)}_{n_i}$ is continuous on J for every i ∈ N and

For any ε > 0, by (2.9) and (H ₁), there exists a i ₀ such that for any i > i ₀, we have that

Therefore, for any bounded set B ⊂ C[J, E], by (2.4), we have S(B) ⊂ B. In fact, if v ∈ B, there exists D > 0 such that ||v|| ≤ D, t ∈ J. Then by the properties of H(t, s), we can have

i.e., S(B) ⊂ B.

Then, by Lemmas 2.2 and 2.3, (H ₂), the above discussion and note that $p_{n_i}\left(t\right)\le p\left(t\right)$, t ∈ (0, 1), as t ∈ J, i > i ₀, we know that

Since the randomness of ε, we get

So, it follows from (2.8) (2.11) that for any bounded set B ⊂ C[J, E], we have

And note that 2M λ < 1, we have T : K → K is a strict set contraction. The proof is completed.

Remark 1. When E = R, (2.3) naturally hold. In this case, we may take M as 0, consequently,

T : K → K is a completely continuous operator. So, our condition (H ₁) is weaker than those of the above mention articles.

Our main tool of this article is the following fixed point theorem of cone.

Theorem 2.1 [16]. Suppose that E is a Banach space, K ⊂ E is a cone, let Ω₁, Ω₂ be two bounded open sets of E such that θ ∈ Ω₁, ${\bar{\Omega }}_1\subset {\Omega }_2$. Let operator $T:K\cap \left({\bar{\Omega }}_2\backslash {\Omega }_1\right)\to K$ be strict set contraction. Suppose that one of the following two conditions hold,

1. (i)

   ||Tx|| ≤ ||x||, ∀ x ∈ K ∩ ∂Ω₁, ||Tx|| ≥ ||x||, ∀ x ∈ K ∩ ∂Ω₂;

2. (ii)

   ||Tx|| ≥ ||x||, ∀ x ∈ K ∩ ∂Ω₁, ||Tx|| ≤ ||x||, ∀ x ∈ K ∩ ∂Ω₂.

Then, T has at least one fixed point in $K\cap \left({\bar{\Omega }}_2\backslash {\Omega }_1\right)$.

Theorem 2.2 [16]. Suppose E is a real Banach space, K ⊂ E is a cone, let Ω _r = {u ∈ K : ||u|| ≤ r}. Let operator T : Ω _r → K be completely continuous and satisfy Tx ≠ x, ∀ x ∈ ∂Ω _r . Then

1. (i)

   If ||Tx|| ≤ ||x||, ∀ x ∈ ∂Ω _r , then i(T, Ω _r , K) = 1;

2. (ii)

   If ||Tx|| ≥ ||x||, ∀ x ∈ ∂Ω _r , then i(T, Ω _r , K) = 0.

Denote

In this section, we will give our main results.

Theorem 3.1. Suppose that conditions (H ₁), (H ₂) hold. Assume that f also satisfy

(A ₁): f(x) ≥ ru*, $\xi {∥\underset{0}{\overset{1}{\int }}H\left(\tau ,\tau \right)x\left(\tau \right)\mathsf{\text{d}}\tau ∥}_1\le \left|\right|x|{|}_1\le r;$

(A ₂): f(x) ≤ Ru*, 0 ≤ ||x||₁ ≤ R,

where u* and u* satisfy

Then, the boundary value problem (1.1) has a positive solution.

Proof of Theorem 3.1. Without loss of generality, we suppose that r < R. For any u ∈ K, we have

we define two open subsets Ω₁ and Ω₂ of E

For u ∈ ∂Ω₁, by (3.1), we have

Then, for u ∈ K ∩ ∂Ω₁, by (2.4), (3.2), (II), for any s ∈ [a, b], u ∈ K ∩ ∂Ω₁, we have

So, for u ∈ K ∩ ∂Ω₁, if (A₁) holds, we have

Therefore, we have

On the other hand, as u ∈ K ∩ ∂Ω₂, by (2.4), (3.2), (II), for any s ∈ [a, b], u ∈ K ∩ ∂Ω₂, we have

For u ∈ K ∩ ∂Ω₂, if (A₂) holds, we know

Thus

Therefore, by (3.2), (3.3), Lemma 2.5 and r < R, we have that T has a fixed point $v\in \left({\Omega }_2\backslash {\bar{\Omega }}_1\right)$. Obviously, v is positive solution of problem (2.6).

Now, by Lemma 2.4 we see that u = Sv is a position solution of BVP (1.1). The proof of Theorem 3.1 is complete.

Theorem 3.2. Suppose that conditions (H ₁), (H ₂) and (A ₁) in Theorem 3.1 hold. Assume that f also satisfy

(A ₃): f ₀ = 0;

(A ₄): f _∞ = 0.

Then, the boundary value problem (1.1) have at least two solutions.

Proof of Theorem 3.2. First, by condition (A ₃), (2.4) and the property of limits, we can have

$\underset{\left|\right|u{\left|\right|}_1\to 0+}{lim}\left|f\left(Su\right)\right|{|}_1∕\left|\right|u|{|}_1=0$. Then, for any m > 0 such that $m{\int }_a^{b}G\left(s,s\right)p\left(s\right)\mathsf{\text{d}}s\le 1$, there exists a constant ρ _* ∈ (0, r) such that

Set Ω _ρ* = {u ∈ K : ||u|| < ρ _*}, for any u ∈ K ∩ ∂Ω _ρ* , by (3.4), we have

For u ∈ K ∩ ∂Ω _ρ* , we have

Therefore, we can have

Then by Theorem 2.2, we have

Next, by condition (A ₄), (2.4) and the property of limits, we can have $\underset{\left|\right|u|{|}_1\to 1}{lim}\left|\right|f\left(Su\right)|{|}_1∕|\left|u\right|{|}_1=0$. Then, for any $\bar{m}>0$ such that $\bar{m}{\int }_a^{b}G\left(s,s\right)p\left(s\right)\mathsf{\text{d}}s\le 1$, there exists a constant ρ ₀ > 0 such that

We choose a constant ρ* > max {r, ρ ₀}, obviously, ρ _* < r < ρ*. Set ${\Omega }_{\rho *}=\left\{u\in K:\left|\right|u\left|\right|<{\rho }^{*}\right\}$, for any u ∈ K ∩ ∂Ω _ρ* , by (3.6), we have

For u ∈ K ∩ ∂Ω _ρ* , we have

Therefore, we can have

Then by Theorem 2.2, we have

Finally, set Ω _r = {u ∈ K : ||u|| < r}, For any u ∈ ∂Ω _r , by (A ₂), Lemma 2.2 and also similar to the latter proof of Theorem 3.1, we can also have

Then by Theorem 2.2, we have

Therefore, by (3.5), (3.7), (3.8), and ρ _* < r < ρ*, we have

Then T have fixed point $v_1\in {\Omega }_r\backslash {\bar{\Omega }}_{\rho *}$, and fixed point $v_2\in {\Omega }_{\rho *}\backslash {\bar{\Omega }}_r$. Obviously, v ₁, v ₂ are all positive solutions of problem (2.6).

Now, by Lemma 2.4 we see that u ₁ = Sv ₁, u ₂ = Sv ₂ are two position solutions of BVP (1.1). The proof of Theorem 3.2 is complete.

In this section, in order to illustrate our results, we consider some examples.

Now, we consider the following concrete second-order singular BVP (SBVP)

Example 4.1. Consider the following SBVP

where

Then obviously,

By computing, we know that the Green's function are

It is easy to note that 0 ≤ G(s, s) ≤ 1 and conditions (H ₁), (H ₂), (A ₃), (A ₄) hold.

Next, by computing, we know that ρ = 0.44, ξ = 0.8. We choose r = 3, u* = 104, as 1.05 = ρξr ≤ ||u|| = max{u(t), t ∈ J} ≤ 3 and $\rho ∥\underset{a}{\overset{b}{\int }}G\left(s,s\right)p\left(s\right)u^{*}\left(s\right)\mathsf{\text{d}}s∥=1.3>1$, because of the monotone increasing of f(u) on [0, ∞), then

Therefore, as

so we have

then conditions (A ₁) holds. Then by Theorem 3.2, SBVP (4.1) has at least two positive solutions u ₁, u ₂ and 0 < ||u ₁|| < 3 < ||u ₂||.

The authors would like to thank the reviewers for their valuable comments and constructive suggestions. HS and LL were supported financially by the Shandong Province Natural Science Foundation (ZR2009AQ004), NSFC (11026108, 11071141) and XW was supported by the Shandong Province planning Foundation of Social Science (09BJGJ14), Shandong Province Natural Science Foundation (Z2007A04).

Authors and Affiliations

1. School of Mathematic and Quantitative Economics, Shandong University of Finance and Economics, Jinan, Shandong, 250014, China

   Hua Su

2. School of Mathematical Sciences, Qufu Normal University, Qufu, Shandong, 273165, China

   Lishan Liu

3. School of Economics, Shandong University, Jinan, Shandong, 250014, China

   Xinjun Wang

Corresponding author

Correspondence to Hua Su.

Competing interests

We declare that we have no significant competing financial, professional, or personal interests that might have influenced the performance or presentation of the work described in this manuscript.

Authors' contributions

All authors contributed equally to the manuscript and read and approved the final manuscript.

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