Positive solutions of m-point integral boundary value problems for second-order p-Laplacian dynamic equations on time scales

In this article, we use the Krasnosel’skii fixed point theorem, the Avery-Henderson fixed point theorem and the Leggett-Williams fixed point theorem to obtain some results for the existence of at least one, two or three positive solutions of m-point integral boundary value problems for nonlinear second-order p-Laplacian dynamic equations on time scales. Two examples are presented to illustrate the applications of the results.

MSC:34B15, 34N05.

Analysis on measure chains was initiated by Stefan Hilger [1] as a bridge between continuous and discrete calculus. Dynamic equations on time scales have been a component of applied analysis on measure chains to describe the processes that feature both continuous and discrete elements [2–6]. This subject not only gives a unified approach to the study of differential and difference equations, but also gives an extended approach to the study of dynamic equations with nonuniform step size or a combination of real and discrete domains. Further, the study of time scale equations has led to several important applications, e.g., in the study of economics, insect population models, heat transfer, stock market and epidemic models (see [7–10]), etc. Integral boundary value problems occur in the study of nonlocal phenomena in many different areas of applied mathematics, physics and engineering, e.g., in heat conduction, chemical engineering, underground water flow, thermo-elasticity, plasma physics, etc. (see [11–15] and the references therein).

Throughout this paper, we denote the one-dimensional p-Laplacian operator by ${\phi }_p(u)$, i.e., ${\phi }_p(u)={|u|}^{p-2}u$ for $p>1$ with ${\phi }_p^{-1}={\phi }_q$, where $1/p+1/q=1$. For convenience, we make the blanket assumption that 0, T are points in a time scale ; for an interval ${(0,T)}_{\mathbb{T}}$, we always mean $(0,T)\cap \mathbb{T}$. Other types of an interval are defined similarly.

In 2007, Sun and Li [16] discussed the existence of at least one, two or three positive solutions of the following boundary value problem:

They used the Krasnosel’skii fixed point theorem, the Avery-Henderson fixed point theorem and the Leggett-Williams fixed point theorem to prove the existence of multiple positive solutions to problem (1.1)-(1.2).

In 2009, Zhang and Qiao [17] studied the existence criteria for the m-point boundary value problem:

They obtained some results for the existence of multiple positive solutions of problem (1.3)-(1.4) by using the Krasnosel’skii fixed point theorem, the Avery-Henderson fixed point theorem and the Leggett-Williams fixed point theorem.

In 2011, Li and Zhang [18] considered the existence of at least three positive solutions for the boundary value problem with integral boundary conditions:

They established some sufficient conditions for the existence of positive solutions to problem (1.5)-(1.6) by using the Legget-Williams fixed point theorem. For some recent results on the existence of positive solutions for p-Laplacian dynamic equations on time scales, see [19–27]. However, to the best of the authors’ knowledge, existence results for positive solutions of m-point integral boundary value problems for nonlinear p-Laplacian dynamic equations on time scales have not been studied.

In this article, we are concerned with the existence of multiple positive solutions to the m-point integral boundary value problem for a second-order p-Laplacian dynamic equation on time scale :

where is a time scale, $0={\xi }_0<{\xi }_1<{\xi }_2<\cdots <{\xi }_{m-2}<{\xi }_{m-1}=1$ and

(H₁) $0<{\sum }_{i=1}^{m-1}{\alpha }_i({\xi }_i-{\xi }_{i-1})<1$ such that ${\alpha }_i\ge 0$ for $i\in \{1,2,\dots ,m-3\}\cup \{m-1\}$, ${\alpha }_{m-2}>0$;

(H₂) $f\in C_{rd}({[0,1]}_{\mathbb{T}}\times [0,\mathrm{\infty }),[0,\mathrm{\infty }))$;

(H₃) $a\in C_{rd}({[0,1]}_{\mathbb{T}},[0,\mathrm{\infty }))$ and there exists $t_0\in {({\xi }_{m-2},1)}_{\mathbb{T}}$ such that $a(t_0)>0$.

The rest of the paper is organized as follows. In Section 2, we state and prove some lemmas which are used later. In Section 3, we use the Krasnosel’skii [28] fixed point theorem to obtain the existence of at least one positive solution of problem (1.7)-(1.8). In Section 4, by using the Avery-Henderson [29] fixed point theorem, we establish sufficient conditions for the existence of at least two positive solutions of problem (1.7)-(1.8). In Section 5, the existence of at least three positive solutions of problem (1.7)-(1.8) are proved by using the Leggett-Williams [30] fixed point theorem. Two illustrative examples are given in Section 6.

For convenience, we list the following well-known definitions which can be found in [4] and the references therein.

Definition 1.1 A time scale is an arbitrary nonempty closed subset of the real set ℝ with topology and ordering inherited from ℝ.

The forward and backward jump operators $\sigma ,\rho :\mathbb{T}\to \mathbb{T}$ and the graininess $\mu :\mathbb{T}\to {\mathbb{R}}^{+}$ are defined, respectively, by

for all $t\in \mathbb{T}$. If $\sigma (t)>t$, t is said to be right scattered, and if $\rho (t)<t$, t is said to be left scattered; if $\sigma (t)=t$, t is said to be right dense, and if $\rho (t)=t$, t is said to be left dense. If has a left-scattered maximum M, define ${\mathbb{T}}^k=\mathbb{T}-\{M\}$; otherwise set ${\mathbb{T}}^k=\mathbb{T}$.

Definition 1.2 A function $f:\mathbb{T}\to \mathbb{R}$ is rd-continuous (rd-continuous is short for right-dense continuous) provided it is continuous at each right-dense point in and has a left-sided limit at each left-dense point in . The set of rd-continuous functions $f:\mathbb{T}\to \mathbb{R}$ will be denoted by $C_{rd}(\mathbb{T})=C_{rd}(\mathbb{T},\mathbb{R})$.

Definition 1.3 For $f:\mathbb{T}\to \mathbb{R}$ and $t\in {\mathbb{T}}^k$, the delta derivative of f at the point t is defined to be the number $f^{\mathrm{▵}}(t)$ (provided it exists), with the property that for each $ϵ>0$, there is a neighborhood U of t such that

for all $s\in U$.

Definition 1.4 For a function $f:\mathbb{T}\to \mathbb{R}$, the delta derivative is defined at the point t by

if f is continuous at t and t is right-scattered. If t is not right-scattered, then the derivative is defined by

provided this limit exists.

Definition 1.5 If $F^{\mathrm{▵}}(t)=f(t)$, then we define the delta integral by

In this section, we first prove and recall some lemmas which are used in what follows.

Lemma 2.1 Let ${\sum }_{i=1}^{m-1}{\alpha }_i({\xi }_i-{\xi }_{i-1})\ne 1$. Then, for $y\in C_{rd}({[0,1]}_{\mathbb{T}},\mathbb{R})$, the problem

has a unique solution

Proof Integrating (2.1) from 0 to t and using the first condition of (2.2), one gets

Integrating (2.4) from 0 to t, we obtain

In particular, for $t=1$, we have

Using the second condition of (2.2), we get that

Hence,

Substituting the value of $u(0)$ in (2.5), we obtain the solution (2.3). □

Lemma 2.2 Let ${\sum }_{i=1}^{m-1}{\alpha }_i({\xi }_i-{\xi }_{i-1})\ne 1$. If $y\in C_{rd}({[0,1]}_{\mathbb{T}},[0,\mathrm{\infty }))$, then the unique solution u of problem (2.1)-(2.2) satisfies

Proof From (2.4), we have $u^{\mathrm{\Delta }}(t)\le 0$ for $t\in {[0,1]}_{\mathbb{T}}$. In fact, ${\phi }_q(x)$ is a monotone increasing continuously differentiable function and

Then, by the chain rule [4], we get $u^{\mathrm{\Delta }\mathrm{\Delta }}(t)\le 0$ for $t\in {[0,1]}_{\mathbb{T}}$. □

Lemma 2.3 Let $0<{\sum }_{i=1}^{m-1}{\alpha }_i({\xi }_i-{\xi }_{i-1})<1$. If $y\in C_{rd}({[0,1]}_{\mathbb{T}},[0,\mathrm{\infty }))$, then the unique solution u of problem (2.1)-(2.2) satisfies

Proof From Lemma 2.2, $u^{\mathrm{\Delta }}(t)\le 0$ for $t\in {[0,1]}_{\mathbb{T}}$, we know that u is nonincreasing on ${[0,1]}_{\mathbb{T}}$. Consequently, for each $t_1,t_2\in \mathbb{T}$ and $t_1\le t_2$, it holds that $u(t_1)\ge u(t_2)$.

Therefore,

If $u(1)<0$, then the second condition of (2.2) together with (2.6) implies that

This contradicts the fact that $0<{\sum }_{i=1}^{m-1}{\alpha }_i({\xi }_i-{\xi }_{i-1})<1$.

If $u(0)<0$, it follows that $u(1)<0$ since u is nonincreasing. Hence, we get a contradiction. Indeed, if $u(0)<0$ and $u(1)<0$, we again obtain a contradiction. □

Lemma 2.4 Let ${\sum }_{i=1}^{m-1}{\alpha }_i({\xi }_i-{\xi }_{i-1})>1$. If $y\in C_{rd}({[0,1]}_{\mathbb{T}},[0,\mathrm{\infty }))$, then problem (2.1)-(2.2) has no positive solutions.

Proof Suppose that problem (2.1)-(2.2) has a positive solution u satisfying $u(t)\ge 0$ for $t\in {[0,1]}_{\mathbb{T}}$. Then $u({\xi }_i)\ge 0$ for all $i=1,\dots ,m-1$. By the second condition of (2.2) and (2.6), we have

getting a contradiction. □

Let E denote the Banach space $C_{rd}{[0,1]}_{\mathbb{T}}$ with the norm $\parallel u\parallel ={sup}_{t\in {[0,1]}_{\mathbb{T}}}|u(t)|$. Define the cone $P\subset E$, by

Define the operator $A:P\to E$ by

where a positive constant $\mathrm{\Lambda }={\sum }_{i=1}^{m-1}{\alpha }_i({\xi }_i-{\xi }_{i-1})<1$. In view of Lemma 2.1, the solutions of problem (1.7)-(1.8) are given by the operator equation, $u(t)=Au(t)$.

From (2.8), we claim that for each $u\in P$, $Au\in P$ and satisfies (1.8). In fact, for $t\in {[0,1]}_{\mathbb{T}}$, we get

This implies that $Au(t)\ge 0$ for $t\in {[0,1]}_{\mathbb{T}}$. As in Lemma 2.2, we can prove that ${(Au)}^{\mathrm{\Delta }}(t)\le 0$, ${(Au)}^{\mathrm{\Delta }\mathrm{\Delta }}(t)\le 0$ for $t\in {[0,1]}_{\mathbb{T}}$. In addition, we find that ${(Au)}^{\mathrm{\Delta }}(0)=0$ and $(Au)(1)={\sum }_{i=1}^{m-1}{\alpha }_i{\int }_{{\xi }_{i-1}}^{{\xi }_i}Au(s)\mathrm{\Delta }s$. So, $A:P\to P$. It is also easy to check that $A:P\to P$ is completely continuous.

Lemma 2.5 Let (H₁) hold. If $u\in P$, then

where

which $\gamma >0$.

Proof Since $u^{\mathrm{\Delta }}(t)\le 0$ for $t\in {[0,1]}_{\mathbb{T}}$, we have $\parallel u\parallel =u(0)$, ${min}_{t\in {[0,1]}_{\mathbb{T}}}u(t)=u(1)$.

Thus,

From $u^{\mathrm{\Delta }\mathrm{\Delta }}(t)\le 0$ for $t\in {[0,1]}_{\mathbb{T}}$ and (2.11), we get

This implies that

Note that (H₁) yields

Thus we have $\gamma >0$. The proof of Lemma 2.5 is complete. □

In the following, for the sake of convenience, we set constants

Now we are in a position to establish the main result. Our first result is based on the Krasnosel’skii fixed point theorem.

Theorem 3.1 (see [28])

Let E be a Banach space, and let $P\subset E$ be a cone. Assume that ${\mathrm{\Omega }}_1$ and ${\mathrm{\Omega }}_2$ are bounded open subsets of E with $0\in {\mathrm{\Omega }}_1$, ${\overline{\mathrm{\Omega }}}_1\subset {\mathrm{\Omega }}_2$, and let $A:P\cap ({\overline{\mathrm{\Omega }}}_2\setminus {\mathrm{\Omega }}_1)\to P$ be a completely continuous operator such that either

1. (i)

   $\parallel Au\parallel \le \parallel u\parallel$ for $u\in P\cap \partial {\mathrm{\Omega }}_1$, $\parallel Au\parallel \ge \parallel u\parallel$ for $u\in P\cap \partial {\mathrm{\Omega }}_2$; or

2. (ii)

   $\parallel Au\parallel \ge \parallel u\parallel$ for $u\in P\cap \partial {\mathrm{\Omega }}_1$, $\parallel Au\parallel \le \parallel u\parallel$ for $u\in P\cap \partial {\mathrm{\Omega }}_2$ hold.

Then A has a fixed point in $P\cap ({\overline{\mathrm{\Omega }}}_2\setminus {\mathrm{\Omega }}_1)$.

Theorem 3.2 Assume that (H₁)-(H₃) hold. In addition, suppose that there exist numbers $0<r<R<\mathrm{\infty }$ such that

(A₁) $f(t,u)\le {\phi }_p(L){\phi }_p(r)$ for $t\in {[0,1]}_{\mathbb{T}}$ and $0\le u\le r$;

(A₂) $f(t,u)\ge {\phi }_p(Mr){\phi }_p(R)$ for $t\in {[{\xi }_{m-2},1]}_{\mathbb{T}}$ and $R\le u<\mathrm{\infty }$,

where constants L, M are defined by (2.12) and (2.13), respectively.

Then problem (1.7)-(1.8) has at least one positive solution.

Proof Firstly, we define a cone P and a completely continuous operator $A:P\to P$ as in (2.7) and (2.8), respectively.

Let ${\mathrm{\Omega }}_1=\{u\in C_{rd}({[0,1]}_{\mathbb{T}}):\parallel u\parallel <r\}$. For any $u\in P\cap \partial {\mathrm{\Omega }}_1$ with $\parallel u\parallel =r$, from condition (A₁), we obtain

This implies that $\parallel Au\parallel \le \parallel u\parallel$ for $u\in P\cap \partial {\mathrm{\Omega }}_1$.

Set ${\mathrm{\Omega }}_2=\{u\in C_{rd}({[0,1]}_{\mathbb{T}}):\parallel u\parallel <R\}$. Since $u\in P\cap \partial {\mathrm{\Omega }}_2$, it follows that ${min}_{t\in {[0,1]}_{\mathbb{T}}}u(t)\ge \gamma \parallel u\parallel =\gamma R$. Hence from condition (A₂), for any $u\in P\cap \partial {\mathrm{\Omega }}_2$, we have

Therefore, $\parallel Au\parallel \ge \parallel u\parallel$ for $u\in P\cap \partial {\mathrm{\Omega }}_2$.

Thus, from Theorem 3.1, it follows that A has a fixed point u in $P\cap ({\overline{\mathrm{\Omega }}}_2\setminus {\mathrm{\Omega }}_1)$ such that $r\le \parallel u\parallel \le R$. Therefore, problem (1.7)-(1.8) has at least one positive solution. □

In this section, we obtain the existence of at least two positive solutions of problem (1.7)-(1.8) by using the Avery-Henderson fixed point theorem which is as follows.

Theorem 4.1 (see [29])

Let P be a cone in a real Banach space E. Set

Let ν and Φ be increasing nonnegative continuous functionals on P, and let θ be a nonnegative continuous functional on P with $\theta (0)=0$ such that, for some ${\rho }_3>0$ and $N>0$,

for all $u\in \overline{P(\mathrm{\Phi },{\rho }_3)}$. Suppose there exist a completely continuous operator $A:\overline{P(\mathrm{\Phi },{\rho }_3)}\to P$ and $0<{\rho }_1<{\rho }_2<{\rho }_3$ such that

and

1. (i)

   $\mathrm{\Phi }(Au)>{\rho }_3$ for all $u\in \partial P(\mathrm{\Phi },{\rho }_3)$;

2. (ii)

   $\theta (Au)<{\rho }_2$ for all $u\in \partial P(\theta ,{\rho }_2)$;

3. (iii)

   $P(\nu ,{\rho }_1)\ne \mathrm{\varnothing }$ and $\nu (Au)>{\rho }_1$ for all $u\in \partial P(\nu ,{\rho }_1)$.

Then A has at least two fixed points $u_1$ and $u_2$ belonging to $\overline{P(\mathrm{\Phi },{\rho }_3)}$ satisfying

Define a constant $l\in {(0,1)}_{\mathbb{T}}$ such that $0<{\xi }_{m-2}<l<1$. Let Φ, θ and ν be increasing, nonnegative and continuous functionals on P, defined by

Obviously, $\mathrm{\Phi }(u)=\theta (u)\le \nu (u)$ for each $u\in P$. Moreover, Lemma 2.5 implies $\mathrm{\Phi }(u)=u({\xi }_{m-2})\ge \gamma \parallel u\parallel$ for each $u\in P$. It is easy to see that $\theta (0)=0$ and $\theta (\lambda u)=\lambda \theta (u)$ for all $0\le \lambda \le 1$ and $u\in \partial P(\theta ,{\rho }_2)$.

We can now prove the following theorem.

Theorem 4.2 Assume that (H₁)-(H₃) hold, and suppose that there exist positive numbers ${\rho }_1<{\rho }_2<{\rho }_3$ such that the function f satisfies the following conditions:

(B₁) $f(t,u)>{\phi }_p(N\gamma ){\phi }_p({\rho }_1)$ for $t\in {[{\xi }_{m-2},l]}_{\mathbb{T}}$ and $u\in [\gamma {\rho }_1,{\rho }_1]$;

(B₂) $f(t,u)<{\phi }_p(L){\phi }_p({\rho }_2)$ for $t\in {[{\xi }_{m-2},1]}_{\mathbb{T}}$ and $u\in [0,{\rho }_2]$;

(B₃) $f(t,u)>{\phi }_p(M\gamma ){\phi }_p({\rho }_3)$ for $t\in {[{\xi }_{m-2},l]}_{\mathbb{T}}$ and $u\in [{\rho }_3,(1/\gamma ){\rho }_3]$,

where constants L, M, N are defined by (2.12), (2.13) and (2.14), respectively.

Then problem (1.7)-(1.8) has at least two positive solutions $u_1$ and $u_2$ such that ${\rho }_1<u_1(l)$ with $u_1({\xi }_{m-2})<{\rho }_2$ and ${\rho }_2<u_2({\xi }_{m-2})$ with $u_2({\xi }_{m-2})<{\rho }_3$.

Proof We now wish to prove that all of the conditions of Theorem 4.1 are satisfied. For this purpose, we define the cone P as (2.7) and a completely continuous operator $A:P\to P$ by (2.8).

To check condition (i) of Theorem 4.1, we choose $u\in \partial P(\mathrm{\Phi },{\rho }_3)$, then $\mathrm{\Phi }(u)={\rho }_3$. This implies that ${\rho }_3\le \parallel u\parallel \le (1/\gamma )\mathrm{\Phi }(u)=(1/\gamma ){\rho }_3$. For $t\in {[{\xi }_{m-2},1]}_{\mathbb{T}}$, we have ${\rho }_3\le u(t)\le (1/\gamma ){\rho }_3$. From condition (B₃), we get that $f(t,u)>{\phi }_p(M\gamma ){\phi }_p({\rho }_3)$ for $t\in {[{\xi }_{m-2},l]}_{\mathbb{T}}$. Since $Au\in P$, we obtain

Hence, condition (i) of Theorem 4.1 holds.

We now prove that condition (ii) in Theorem 4.1 holds. In fact, for $u\in \partial P(\theta ,{\rho }_2)$, we have $\theta (u)={\rho }_2$. This implies that $0\le u(t)\le \parallel u\parallel \le (1/\gamma ){\rho }_2$ for $t\in {[{\xi }_{m-2},1]}_{\mathbb{T}}$. From condition (B₂), we have

This shows that condition (ii) of Theorem 4.1 is satisfied.

Now, we assert that condition (iii) of Theorem 4.1 also holds. If $u(t)={\rho }_1/2$ for $t\in {[0,1]}_{\mathbb{T}}$, then $\nu (u)={\rho }_1/2$. Thus $P(\nu ,{\rho }_1)\ne \mathrm{\varnothing }$. Let $u\in \partial P(\nu ,{\rho }_1)$, then $\nu (u)=u(l)={\rho }_1$. So that $\gamma {\rho }_1\le u(t)\le \parallel u\parallel \le {\rho }_1$. From condition (B₁), for any $Au\in P$, we have