Three-point boundary value problems for nonlinear second-order impulsive q-difference equations

Tariboon, Jessada; Ntouyas, Sotiris K

doi:10.1186/1687-1847-2014-31

Research
Open Access
Published: 27 January 2014

Three-point boundary value problems for nonlinear second-order impulsive q-difference equations

Jessada Tariboon¹ &
Sotiris K Ntouyas²

Advances in Difference Equations volume 2014, Article number: 31 (2014) Cite this article

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Abstract

The quantum calculus on finite intervals was studied recently by the authors in Adv. Differ. Equ. 2013:282, 2013, where the concepts of $q_{k}$ -derivative and $q_{k}$ -integral of a function $f : J_{k} : = [t_{k}, t_{k + 1}] \to R$ have been introduced. In this paper, we prove existence and uniqueness results for nonlinear second-order impulsive $q_{k}$ -difference three-point boundary value problems, by using Banach’s contraction mapping principle and Krasnoselskii’s fixed-point theorem.

MSC:26A33, 39A13, 34A37.

1 Introduction

In this article, we investigate the nonlinear second-order impulsive $q_{k}$ -difference equation with three-point boundary conditions

{\begin{matrix} D_{q_{k}}^{2} x (t) = f (t, x (t)), t \in J : = [0, T], t \neq t_{k}, \\ Δ x (t_{k}) = I_{k} (x (t_{k})), k = 1, 2, \dots, m, \\ D_{q_{k}} x (t_{k}^{+}) - D_{q_{k - 1}} x (t_{k}) = I_{k}^{*} (x (t_{k})), k = 1, 2, \dots, m, \\ x (0) = 0, x (T) = x (η), \end{matrix}

(1.1)

where $0 = t_{0} < t_{1} < t_{2} < \dots < t_{k} < \dots < t_{m} < t_{m + 1} = T$ , $f : J \times R \to R$ is a continuous function, $I_{k}, I_{k}^{*} \in C (R, R)$ , $Δ x (t_{k}) = x (t_{k}^{+}) - x (t_{k})$ for $k = 1, 2, \dots, m$ , $x (t_{k}^{+}) = {lim}_{h \to 0} x (t_{k} + h)$ , $η \in (t_{j}, t_{j + 1})$ a constant for some $j \in {0, 1, 2, \dots, m}$ and $0 < q_{k} < 1$ for $k = 0, 1, 2, \dots, m$ .

The theory of quantum calculus on finite intervals was developed recently by the authors in [1]. In [1] the concepts of $q_{k}$ -derivative and $q_{k}$ -integral of a function $f : J_{k} : = [t_{k}, t_{k + 1}] \to R$ , are defined and their basic properties proved. As applications, existence and uniqueness results for initial value problems for first- and second-order impulsive $q_{k}$ -difference equations are proved.

The book by Kac and Cheung [2] covers many of the fundamental aspects of the quantum calculus. In recent years, the topic of q-calculus has attracted the attention of several researchers and a variety of new results can be found in the papers [3–15] and the references cited therein.

Impulsive differential equations, that is, differential equations involving an impulse effect, appear as a natural description of observed evolution phenomena of several real-world problems. For some monographs on impulsive differential equations we refer to [16–18].

In the present paper we prove existence and uniqueness results for the impulsive boundary value problem (1.1) by using Banach’s contraction mapping principle and Krasnoselskii’s fixed-point theorem. The rest of this paper is organized as follows: In Section 2 we present the notions of $q_{k}$ -derivative and $q_{k}$ -integral on finite intervals and collect their properties. The main results are proved in Section 3, while examples illustrating the results are presented in Section 4.

2 Preliminaries

In this section we present the notions of $q_{k}$ -derivative and $q_{k}$ -integral on finite intervals. For a fixed $k \in N \cup {0}$ let $J_{k} : = [t_{k}, t_{k + 1}] \subset R$ be an interval and $0 < q_{k} < 1$ be a constant. We define $q_{k}$ -derivative of a function $f : J_{k} \to R$ at a point $t \in J_{k}$ as follows.

Definition 2.1 Assume $f : J_{k} \to R$ is a continuous function and let $t \in J_{k}$ . Then the expression

D_{q_{k}} f (t) = \frac{f (t) - f (q_{k} t + (1 - q_{k}) t_{k})}{(1 - q_{k}) (t - t_{k})}, t \neq t_{k}, D_{q_{k}} f (t_{k}) = lim_{t \to t_{k}} D_{q_{k}} f (t),

(2.1)

is called the $q_{k}$ -derivative of function f at t.

We say that f is $q_{k}$ -differentiable on $J_{k}$ provided $D_{q_{k}} f (t)$ exists for all $t \in J_{k}$ . Note that if $t_{k} = 0$ and $q_{k} = q$ in (2.1), then $D_{q_{k}} f = D_{q} f$ , where $D_{q}$ is the well-known q-derivative of the function $f (t)$ defined by

D_{q} f (t) = \frac{f (t) - f (q t)}{(1 - q) t} .

(2.2)

In addition, we should define the higher $q_{k}$ -derivative of functions.

Definition 2.2 Let $f : J_{k} \to R$ is a continuous function, we call the second-order $q_{k}$ -derivative $D_{q_{k}}^{2} f$ provided $D_{q_{k}} f$ is $q_{k}$ -differentiable on $J_{k}$ with $D_{q_{k}}^{2} f = D_{q_{k}} (D_{q_{k}} f) : J_{k} \to R$ . Similarly, we define the higher-order $q_{k}$ -derivative $D_{q_{k}}^{n} : J_{k} \to R$ .

The properties of the $q_{k}$ -derivative are summarized in the following theorem.

Theorem 2.3 Assume $f, g : J_{k} \to R$ are $q_{k}$ -differentiable on $J_{k}$ . Then:

(i)
The sum $f + g : J_{k} \to R$ is $q_{k}$ -differentiable on $J_{k}$ with
$D_{q_{k}} (f (t) + g (t)) = D_{q_{k}} f (t) + D_{q_{k}} g (t) .$
(ii)
For any constant α, $α f : J_{k} \to R$ is $q_{k}$ -differentiable on $J_{k}$ with
$D_{q_{k}} (α f) (t) = α D_{q_{k}} f (t) .$
(iii)
The product $f g : J_{k} \to R$ is $q_{k}$ -differentiable on $J_{k}$ with
$\begin{array}{rcl} D_{q_{k}} (f g) (t) & = & f (t) D_{q_{k}} g (t) + g (q_{k} t + (1 - q_{k}) t_{k}) D_{q_{k}} f (t) \\ = & g (t) D_{q_{k}} f (t) + f (q_{k} t + (1 - q_{k}) t_{k}) D_{q_{k}} g (t) . \end{array}$
(iv)
If $g (t) g (q_{k} t + (1 - q_{k}) t_{k}) \neq 0$ , then $\frac{f}{g}$ is $q_{k}$ -differentiable on $J_{k}$ with
$D_{q_{k}} (\frac{f}{g}) (t) = \frac{g (t) D_{q_{k}} f (t) - f (t) D_{q_{k}} g (t)}{g (t) g (q_{k} t + (1 - q_{k}) t_{k})} .$

Definition 2.4 Assume $f : J_{k} \to R$ is a continuous function. Then the $q_{k}$ -integral is defined by

\int_{t_{k}}^{t} f (s) d_{q_{k}} s = (1 - q_{k}) (t - t_{k}) \sum_{n = 0}^{\infty} q_{k}^{n} f (q_{k}^{n} t + (1 - q_{k}^{n}) t_{k}),

(2.3)

for $t \in J_{k}$ . Moreover, if $a \in (t_{k}, t)$ then the definite $q_{k}$ -integral is defined by

\begin{array}{rcl} \int_{a}^{t} f (s) d_{q_{k}} s & = & \int_{t_{k}}^{t} f (s) d_{q_{k}} s - \int_{t_{k}}^{a} f (s) d_{q_{k}} s \\ = & (1 - q_{k}) (t - t_{k}) \sum_{n = 0}^{\infty} q_{k}^{n} f (q_{k}^{n} t + (1 - q_{k}^{n}) t_{k}) \\ - (1 - q_{k}) (a - t_{k}) \sum_{n = 0}^{\infty} q_{k}^{n} f (q_{k}^{n} a + (1 - q_{k}^{n}) t_{k}) . \end{array}

Note that if $t_{k} = 0$ and $q_{k} = q$ , then (2.3) reduces to the q-integral of a function $f (t)$ , defined by $\int_{0}^{t} f (s) d_{q} s = (1 - q) t \sum_{n = 0}^{\infty} q^{n} f (q^{n} t)$ for $t \in [0, \infty)$ .

Theorem 2.5 For $t \in J_{k}$ , the following formulas hold:

(i)
$D_{q_{k}} \int_{t_{k}}^{t} f (s) d_{q_{k}} s = f (t)$ ;
(ii)
$\int_{t_{k}}^{t} D_{q_{k}} f (s) d_{q_{k}} s = f (t)$ ;
(iii)
$\int_{a}^{t} D_{q_{k}} f (s) d_{q_{k}} s = f (t) - f (a)$ for $a \in (t_{k}, t)$ .

3 Main results

Let $J = [0, T]$ , $J_{0} = [t_{0}, t_{1}]$ , $J_{k} = (t_{k}, t_{k + 1}]$ for $k = 1, 2, \dots, m$ . Let $P C (J, R)$ = { $x : J \to R : x (t)$ is continuous everywhere except for some $t_{k}$ at which $x (t_{k}^{+})$ and $x (t_{k}^{-})$ exist and $x (t_{k}^{-}) = x (t_{k})$ , $k = 1, 2, \dots, m$ }. $P C (J, R)$ is a Banach space with the norm ${∥ x ∥}_{P C} = sup {| x (t) |; t \in J}$ .

Lemma 3.1 The unique solution of problem (1.1) is given by

\begin{aligned} x (t) = & - t \sum_{k = 1}^{j} (\int_{t_{k - 1}}^{t_{k}} f (s, x (s)) d_{q_{k - 1}} s + I_{k}^{*} (x (t_{k}))) \\ - \frac{t}{T - η} \sum_{k = j + 1}^{m} (\int_{t_{k - 1}}^{t_{k}} \int_{t_{k - 1}}^{s} f (σ, x (σ)) d_{q_{k - 1}} σ d_{q_{k - 1}} s + I_{k} (x (t_{k}))) \\ - \frac{t}{T - η} \sum_{k = j + 1}^{m} (\int_{t_{k - 1}}^{t_{k}} f (s, x (s)) d_{q_{k - 1}} s + I_{k}^{*} (x (t_{k}))) (T - t_{k}) \\ + \frac{t}{T - η} \int_{t_{j}}^{η} \int_{t_{j}}^{s} f (σ, x (σ)) d_{q_{j}} σ d_{q_{j}} s \\ - \frac{t}{T - η} \int_{t_{m}}^{T} \int_{t_{m}}^{s} f (σ, x (σ)) d_{q_{m}} σ d_{q_{m}} s \\ + \sum_{0 < t_{k} < t} (\int_{t_{k - 1}}^{t_{k}} \int_{t_{k - 1}}^{s} f (σ, x (σ)) d_{q_{k - 1}} σ d_{q_{k - 1}} s + I_{k} (x (t_{k}))) \\ + \sum_{0 < t_{k} < t} (\int_{t_{k - 1}}^{t_{k}} f (s, x (s)) d_{q_{k - 1}} s + I_{k}^{*} (x (t_{k}))) (t - t_{k}) \\ + \int_{t_{k}}^{t} \int_{t_{k}}^{s} f (σ, x (σ)) d_{q_{k}} σ d_{q_{k}} s, \end{aligned}

(3.1)

with $\sum_{0 < 0} (\cdot) = 0$ .

Proof For $t \in J_{0}$ , taking the $q_{0}$ -integral for the first equation of (1.1), we get

D_{q_{0}} x (t) = D_{q_{0}} x (0) + \int_{0}^{t} f (s, x (s)) d_{q_{0}} s,

(3.2)

which yields

D_{q_{0}} x (t_{1}) = D_{q_{0}} x (0) + \int_{0}^{t_{1}} f (s, x (s)) d_{q_{0}} s .

(3.3)

For $t \in J_{0}$ we obtain by $q_{0}$ -integrating (3.2),

\begin{aligned} x (t) & = x (0) + D_{q_{0}} x (0) t + \int_{0}^{t} \int_{0}^{s} f (σ, x (σ)) d_{q_{0}} σ d_{q_{0}} s \\ : = A + B t + \int_{0}^{t} \int_{0}^{s} f (σ, x (σ)) d_{q_{0}} σ d_{q_{0}} s (x (0) = A, D_{q_{0}} x (0) = B) . \end{aligned}

In particular, for $t = t_{1}$

x (t_{1}) = A + B t_{1} + \int_{0}^{t_{1}} \int_{0}^{s} f (σ, x (σ)) d_{q_{0}} σ d_{q_{0}} s .

(3.4)

For $t \in J_{1} = (t_{1}, t_{2}]$ , $q_{1}$ -integrating (1.1), we have

D_{q_{1}} x (t) = D_{q_{1}} x (t_{1}^{+}) + \int_{t_{1}}^{t} f (s, x (s)) d_{q_{1}} s .

Using the third condition of (1.1) with (3.3), it follows that

D_{q_{1}} x (t) = B + \int_{0}^{t_{1}} f (s, x (s)) d_{q_{0}} s + I_{1}^{*} (x (t_{1})) + \int_{t_{1}}^{t} f (s, x (s)) d_{q_{1}} s .

(3.5)

Taking the $q_{1}$ -integral to (3.5) for $t \in J_{1}$ , we obtain

\begin{array}{rcl} x (t) & = & x (t_{1}^{+}) + [B + \int_{0}^{t_{1}} f (s, x (s)) d_{q_{0}} s + I_{1}^{*} (x (t_{1}))] (t - t_{1}) \\ + \int_{t_{1}}^{t} \int_{t_{1}}^{s} f (σ, x (σ)) d_{q_{1}} σ d_{q_{1}} s . \end{array}

(3.6)

Applying the second equation of (1.1) with (3.4) and (3.6), we get

\begin{array}{rcl} x (t) & = & A + B t_{1} + \int_{0}^{t_{1}} \int_{0}^{s} f (σ, x (σ)) d_{q_{0}} σ d_{q_{0}} s + I_{1} (x (t_{1})) \\ + [B + \int_{0}^{t_{1}} f (s, x (s)) d_{q_{0}} s + I_{1}^{*} (x (t_{1}))] (t - t_{1}) \\ + \int_{t_{1}}^{t} \int_{t_{1}}^{s} f (σ, x (σ)) d_{q_{1}} σ d_{q_{1}} s \\ = & A + B t + \int_{0}^{t_{1}} \int_{0}^{s} f (σ, x (σ)) d_{q_{0}} σ d_{q_{0}} s + I_{1} (x (t_{1})) \\ + [\int_{0}^{t_{1}} f (s, x (s)) d_{q_{0}} s + I_{1}^{*} (x (t_{1}))] (t - t_{1}) \\ + \int_{t_{1}}^{t} \int_{t_{1}}^{s} f (σ, x (σ)) d_{q_{1}} σ d_{q_{1}} s . \end{array}

Repeating the above process, for $t \in J$ , we get

\begin{aligned} x (t) = & A + B t \\ + \sum_{0 < t_{k} < t} (\int_{t_{k - 1}}^{t_{k}} \int_{t_{k - 1}}^{s} f (σ, x (σ)) d_{q_{k - 1}} σ d_{q_{k - 1}} s + I_{k} (x (t_{k}))) \\ + \sum_{0 < t_{k} < t} (\int_{t_{k - 1}}^{t_{k}} f (s, x (s)) d_{q_{k - 1}} s + I_{k}^{*} (x (t_{k}))) (t - t_{k}) \\ + \int_{t_{k}}^{t} \int_{t_{k}}^{s} f (σ, x (σ)) d_{q_{k}} σ d_{q_{k}} s . \end{aligned}

(3.7)

The first boundary condition of (1.1) implies $A = 0$ . The second boundary condition of (1.1) yields

\begin{aligned} \sum_{k = 1}^{m} (\int_{t_{k - 1}}^{t_{k}} \int_{t_{k - 1}}^{s} f (σ, x (σ)) d_{q_{k - 1}} σ d_{q_{k - 1}} s + I_{k} (x (t_{k}))) \\ + \sum_{k = 1}^{m} (\int_{t_{k - 1}}^{t_{k}} f (s, x (s)) d_{q_{k - 1}} s + I_{k}^{*} (x (t_{k}))) (T - t_{k}) \\ + \int_{t_{m}}^{T} \int_{t_{m}}^{s} f (σ, x (σ)) d_{q_{m}} σ d_{q_{m}} s + B T \\ = \sum_{k = 1}^{j} (\int_{t_{k - 1}}^{t_{k}} \int_{t_{k - 1}}^{s} f (σ, x (σ)) d_{q_{k - 1}} σ d_{q_{k - 1}} s + I_{k} (x (t_{k}))) \\ + \sum_{k = 1}^{j} (\int_{t_{k - 1}}^{t_{k}} f (s, x (s)) d_{q_{k - 1}} s + I_{k}^{*} (x (t_{k}))) (η - t_{k}) \\ + \int_{t_{j}}^{η} \int_{t_{j}}^{s} f (σ, x (σ)) d_{q_{j}} σ d_{q_{j}} s + B η, \end{aligned}

which implies

\begin{aligned} B = & - \sum_{k = 1}^{j} (\int_{t_{k - 1}}^{t_{k}} f (s, x (s)) d_{q_{k - 1}} s + I_{k}^{*} (x (t_{k}))) \\ - \frac{1}{T - η} \sum_{k = j + 1}^{m} (\int_{t_{k - 1}}^{t_{k}} \int_{t_{k - 1}}^{s} f (σ, x (σ)) d_{q_{k - 1}} σ d_{q_{k - 1}} s + I_{k} (x (t_{k}))) \\ - \frac{1}{T - η} \sum_{k = j + 1}^{m} (\int_{t_{k - 1}}^{t_{k}} f (s, x (s)) d_{q_{k - 1}} s + I_{k}^{*} (x (t_{k}))) (T - t_{k}) \\ + \frac{1}{T - η} \int_{t_{j}}^{η} \int_{t_{j}}^{s} f (σ, x (σ)) d_{q_{j}} σ d_{q_{j}} s - \frac{1}{T - η} \int_{t_{m}}^{T} \int_{t_{m}}^{s} f (σ, x (σ)) d_{q_{m}} σ d_{q_{m}} s . \end{aligned}

Substituting the constant B into (3.7), we obtain (3.1) as required. □

In view of Lemma 3.1, we define an operator $A : P C (J, R) \to P C (J, R)$ by

\begin{aligned} (A x) (t) = & - t \sum_{k = 1}^{j} (\int_{t_{k - 1}}^{t_{k}} f (s, x (s)) d_{q_{k - 1}} s + I_{k}^{*} (x (t_{k}))) \\ - \frac{t}{T - η} \sum_{k = j + 1}^{m} (\int_{t_{k - 1}}^{t_{k}} \int_{t_{k - 1}}^{s} f (σ, x (σ)) d_{q_{k - 1}} σ d_{q_{k - 1}} s + I_{k} (x (t_{k}))) \\ - \frac{t}{T - η} \sum_{k = j + 1}^{m} (\int_{t_{k - 1}}^{t_{k}} f (s, x (s)) d_{q_{k - 1}} s + I_{k}^{*} (x (t_{k}))) (T - t_{k}) \\ + \frac{t}{T - η} \int_{t_{j}}^{η} \int_{t_{j}}^{s} f (σ, x (σ)) d_{q_{j}} σ d_{q_{j}} s \\ - \frac{t}{T - η} \int_{t_{m}}^{T} \int_{t_{m}}^{s} f (σ, x (σ)) d_{q_{m}} σ d_{q_{m}} s \\ + \sum_{0 < t_{k} < t} (\int_{t_{k - 1}}^{t_{k}} \int_{t_{k - 1}}^{s} f (σ, x (σ)) d_{q_{k - 1}} σ d_{q_{k - 1}} s + I_{k} (x (t_{k}))) \\ + \sum_{0 < t_{k} < t} (\int_{t_{k - 1}}^{t_{k}} f (s, x (s)) d_{q_{k - 1}} s + I_{k}^{*} (x (t_{k}))) (t - t_{k}) \\ + \int_{t_{k}}^{t} \int_{t_{k}}^{s} f (σ, x (σ)) d_{q_{k}} σ d_{q_{k}} s . \end{aligned}

(3.8)

It should be noticed that problem (1.1) has solutions if and only if the operator $A$ has fixed points.

For convenience, we set

Φ_{k} = [(t_{k} - t_{k - 1}) (T - t_{k}) + \frac{{(t_{k} - t_{k - 1})}^{2}}{1 + q_{k - 1}}] M_{1} + M_{2} + (T - t_{k}) M_{3},

(3.9)

Ψ_{k} = [(t_{k} - t_{k - 1}) (T - t_{k}) + \frac{{(t_{k} - t_{k - 1})}^{2}}{1 + q_{k - 1}}] L_{1} + L_{2} + (T - t_{k}) L_{3},

(3.10)

for $k = 1, \dots, m$ .

Theorem 3.2 Assume that:

(H₁) The function $f : [0, T] \times R \to R$ is a continuous and there exists a constant $L_{1} > 0$ such that $| f (t, x) - f (t, y) | \leq L_{1} | x - y |$ , for each $t \in J$ and $x, y \in R$ .

(H₂) The functions $I_{k}, I_{k}^{*} : R \to R$ are continuous and there exist constants $L_{2}, L_{3} > 0$ such that $| I_{k} (x) - I_{k} (y) | \leq L_{2} | x - y |$ and $| I_{k}^{*} (x) - I_{k}^{*} (y) | \leq L_{3} | x - y |$ for each $x, y \in R$ , $k = 1, 2, \dots, m$ .

If

\begin{array}{rcl} Λ & : = & T \sum_{k = 1}^{j} [(t_{k} - t_{k - 1}) L_{1} + L_{3}] + \frac{T}{T - η} \sum_{k = j + 1}^{m} Ψ_{k} + \frac{T L_{1}}{T - η} (\frac{{(η - t_{j})}^{2}}{1 + q_{j}} + \frac{{(T - t_{m})}^{2}}{1 + q_{m}}) \\ + \sum_{k = 1}^{m} Ψ_{k} + \frac{{(T - t_{m})}^{2}}{1 + q_{m}} L_{1} \leq δ < 1, \end{array}

(3.11)

then the impulsive $q_{k}$ -difference boundary value problem (1.1) has a unique solution on J.

Proof First, we transform the problem (1.1) into a fixed-point problem, $x = A x$ , where the operator $A$ is defined by (3.8). By using Banach’s contraction principle, we shall show that $A$ has a fixed point which is the unique solution of problem (1.1).

Set ${sup}_{t \in J} | f (t, 0) | = M_{1} < \infty$ , $sup {| I_{k} (0) | : k = 1, 2, \dots, m} = M_{2} < \infty$ , $sup {| I_{k}^{*} (0) | : k = 1, 2, \dots, m} = M_{3} < \infty$ and a constant

\begin{aligned} ρ = & T \sum_{k = 1}^{j} [(t_{k} - t_{k - 1}) M_{1} + M_{3}] + \frac{T}{T - η} \sum_{k = j + 1}^{m} Φ_{k} \\ + \frac{T M_{1}}{T - η} (\frac{{(η - t_{j})}^{2}}{1 + q_{j}} + \frac{{(T - t_{m})}^{2}}{1 + q_{m}}) \\ + \sum_{k = 1}^{m} Φ_{k} + \frac{{(T - t_{m})}^{2}}{1 + q_{m}} M_{1} . \end{aligned}

(3.12)

Choosing $r \geq \frac{ρ}{1 - ε}$ , where $δ \leq ε < 1$ , we show that $A B_{r} \subset B_{r}$ , where $B_{r} = {x \in P C (J, R) : ∥ x ∥ \leq r}$ . For $x \in B_{r}$ , we have

\begin{aligned} ∥ A x ∥ \\ \leq sup_{t \in J} {t \sum_{k = 1}^{j} (\int_{t_{k - 1}}^{t_{k}} | f (s, x (s)) | d_{q_{k - 1}} s + | I_{k}^{*} (x (t_{k})) |) \\ + \frac{t}{T - η} \sum_{k = j + 1}^{m} (\int_{t_{k - 1}}^{t_{k}} \int_{t_{k - 1}}^{s} | f (σ, x (σ)) | d_{q_{k - 1}} σ d_{q_{k - 1}} s + | I_{k} (x (t_{k})) |) \\ + \frac{t}{T - η} \sum_{k = j + 1}^{m} (\int_{t_{k - 1}}^{t_{k}} | f (s, x (s)) | d_{q_{k - 1}} s + | I_{k}^{*} (x (t_{k})) |) (T - t_{k}) \\ + \frac{t}{T - η} \int_{t_{j}}^{η} \int_{t_{j}}^{s} | f (σ, x (σ)) | d_{q_{j}} σ d_{q_{j}} s + \frac{t}{T - η} \int_{t_{m}}^{T} \int_{t_{m}}^{s} | f (σ, x (σ)) | d_{q_{m}} σ d_{q_{m}} s \\ + \sum_{0 < t_{k} < t} (\int_{t_{k - 1}}^{t_{k}} \int_{t_{k - 1}}^{s} | f (σ, x (σ)) | d_{q_{k - 1}} σ d_{q_{k - 1}} s + | I_{k} (x (t_{k})) |) \\ + \sum_{0 < t_{k} < t} (\int_{t_{k - 1}}^{t_{k}} | f (s, x (s)) | d_{q_{k - 1}} s + | I_{k}^{*} (x (t_{k})) |) (t - t_{k}) \\ + \int_{t_{k}}^{t} \int_{t_{k}}^{s} | f (σ, x (σ)) | d_{q_{k}} σ d_{q_{k}} s} \\ \leq T \sum_{k = 1}^{j} (\int_{t_{k - 1}}^{t_{k}} (| f (s, x (s)) - f (s, 0) | + | f (s, 0) |) d_{q_{k - 1}} s + | I_{k}^{*} (x (t_{k})) - I_{k}^{*} (0) | + | I_{k}^{*} (0) |) \\ + \frac{T}{T - η} \sum_{k = j + 1}^{m} (\int_{t_{k - 1}}^{t_{k}} \int_{t_{k - 1}}^{s} (| f (σ, x (σ)) - f (σ, 0) | + | f (σ, 0) |) d_{q_{k - 1}} σ d_{q_{k - 1}} s \\ + | I_{k} (x (t_{k})) - I_{k} (0) | + | I_{k} (0) |) \\ + \frac{T}{T - η} \sum_{k = j + 1}^{m} (\int_{t_{k - 1}}^{t_{k}} (| f (s, x (s)) - f (s, 0) | + | f (s, 0) |) d_{q_{k - 1}} s \\ + | I_{k}^{*} (x (t_{k})) - I_{k}^{*} (0) | + | I_{k}^{*} (0) |) (T - t_{k}) \\ + \frac{T}{T - η} \int_{t_{j}}^{η} \int_{t_{j}}^{s} (| f (σ, x (σ)) - f (σ, 0) | + | f (σ, 0) |) d_{q_{j}} σ d_{q_{j}} s \\ + \frac{T}{T - η} \int_{t_{m}}^{T} \int_{t_{m}}^{s} (| f (σ, x (σ)) - f (σ, 0) | + | f (σ, 0) |) d_{q_{m}} σ d_{q_{m}} s \\ + \sum_{k = 1}^{m} (\int_{t_{k - 1}}^{t_{k}} \int_{t_{k - 1}}^{s} (| f (σ, x (σ)) - f (σ, 0) | + | f (σ, 0) |) d_{q_{k - 1}} σ d_{q_{k - 1}} s \\ + | I_{k} (x (t_{k})) - I_{k} (0) | + | I_{k} (0) |) \\ + \sum_{k = 1}^{m} (\int_{t_{k - 1}}^{t_{k}} (| f (s, x (s)) - f (s, 0) | + | f (s, 0) |) d_{q_{k - 1}} s \\ + | I_{k}^{*} (x (t_{k})) - I_{k}^{*} (0) | + | I_{k}^{*} (0) |) (T - t_{k}) \\ + \int_{t_{m}}^{T} \int_{t_{m}}^{s} (| f (σ, x (σ)) - f (σ, 0) | + | f (σ, 0) |) d_{q_{m}} σ d_{q_{m}} s \\ \leq T \sum_{k = 1}^{j} ((t_{k} - t_{k - 1}) (L_{1} r + M_{1}) + L_{3} r + M_{3}) \\ + \frac{T}{T - η} \sum_{k = j + 1}^{m} (\frac{{(t_{k} - t_{k - 1})}^{2}}{1 + q_{k - 1}} (L_{1} r + M_{1}) + L_{2} r + M_{2}) \\ + \frac{T}{T - η} \sum_{k = j + 1}^{m} ((t_{k} - t_{k - 1}) (L_{1} r + M_{1}) + L_{3} r + M_{3}) (T - t_{k}) \\ + \frac{T}{T - η} (\frac{{(η - t_{j})}^{2}}{1 + q_{j}} + \frac{{(T - t_{m})}^{2}}{1 + q_{m}}) (L_{1} r + M_{1}) \\ + \sum_{k = 1}^{m} (\frac{{(t_{k} - t_{k - 1})}^{2}}{1 + q_{k - 1}} (L_{1} r + M_{1}) + L_{2} r + M_{2}) \\ + \sum_{k = 1}^{m} ((t_{k} - t_{k - 1}) (L_{1} r + M_{1}) + L_{3} r + M_{3}) (T - t_{k}) + \frac{{(T - t_{m})}^{2}}{1 + q_{m}} (L_{1} r + M_{1}) \\ = r Λ + ρ \leq (δ + 1 - ε) r \leq r . \end{aligned}

It follows that $A B_{r} \subset B_{r}$ .

For $x, y \in P C (J, R)$ and for each $t \in J$ , we have

\begin{aligned} ∥ A x - A y ∥ \\ \leq sup_{t \in J} {t \sum_{k = 1}^{j} (\int_{t_{k - 1}}^{t_{k}} | f (s, x (s)) - f (s, y (s)) | d_{q_{k - 1}} s + | I_{k}^{*} (x (t_{k})) - I_{k}^{*} (y (t_{k})) |) \\ + \frac{t}{T - η} \sum_{k = j + 1}^{m} (\int_{t_{k - 1}}^{t_{k}} \int_{t_{k - 1}}^{s} | f (σ, x (σ)) - f (σ, y (σ)) | d_{q_{k - 1}} σ d_{q_{k - 1}} s \\ + | I_{k} (x (t_{k})) - I_{k} (y (t_{k})) |) \\ + \frac{t}{T - η} \sum_{k = j + 1}^{m} (\int_{t_{k - 1}}^{t_{k}} | f (s, x (s)) - f (s, y (s)) | d_{q_{k - 1}} s + | I_{k}^{*} (x (t_{k})) - I_{k}^{*} (y (t_{k})) |) (T - t_{k}) \\ + \frac{t}{T - η} \int_{t_{j}}^{η} \int_{t_{j}}^{s} | f (σ, x (σ)) - f (σ, y (σ)) | d_{q_{j}} σ d_{q_{j}} s \\ + \frac{t}{T - η} \int_{t_{m}}^{T} \int_{t_{m}}^{s} | f (σ, x (σ)) - f (σ, y (σ)) | d_{q_{m}} σ d_{q_{m}} s \\ + \sum_{0 < t_{k} < t} (\int_{t_{k - 1}}^{t_{k}} \int_{t_{k - 1}}^{s} | f (σ, x (σ)) - f (σ, y (σ)) | d_{q_{k - 1}} σ d_{q_{k - 1}} s + | I_{k} (x (t_{k})) - I_{k} (y (t_{k})) |) \\ + \sum_{0 < t_{k} < t} (\int_{t_{k - 1}}^{t_{k}} | f (s, x (s)) - f (s, y (s)) | d_{q_{k - 1}} s + | I_{k}^{*} (x (t_{k})) - I_{k}^{*} (y (t_{k})) |) (t - t_{k}) \\ + \int_{t_{k}}^{t} \int_{t_{k}}^{s} | f (σ, x (σ)) - f (σ, y (σ)) | d_{q_{k}} σ d_{q_{k}} s} \\ \leq T ∥ x - y ∥ \sum_{k = 1}^{j} [(t_{k} - t_{k - 1}) L_{1} + L_{3}] + \frac{T ∥ x - y ∥}{T - η} \sum_{k = j + 1}^{m} (\frac{{(t_{k} - t_{k - 1})}^{2}}{1 + q_{k - 1}} L_{1} + L_{2}) \\ + \frac{T ∥ x - y ∥}{T - η} \sum_{k = j + 1}^{m} ((t_{k} - t_{k - 1}) L_{1} + L_{3}) (T - t_{k}) \\ + \frac{T ∥ x - y ∥}{T - η} (\frac{{(η - t_{j})}^{2}}{1 + q_{j}} + \frac{{(T - t_{m})}^{2}}{1 + q_{m}}) L_{1} \\ + \sum_{k = 1}^{m} (\frac{{(t_{k} - t_{k - 1})}^{2}}{1 + q_{k - 1}} L_{1} + L_{2}) ∥ x - y ∥ + \sum_{k = 1}^{m} ((t_{k} - t_{k - 1}) L_{1} + L_{3}) (T - t_{k}) ∥ x - y ∥ \\ + \frac{{(T - t_{m})}^{2}}{1 + q_{m}} L_{1} ∥ x - y ∥ \\ = Λ ∥ x - y ∥ . \end{aligned}

As $Λ < 1$ , $A$ is a contraction. Hence, by Banach’s contraction mapping principle, we find that $A$ has a fixed point which is the unique solution of problem (1.1). □

Our next result is based on Krasnoselskii’s fixed-point theorem.

Lemma 3.3 (Krasnoselskii’s fixed-point theorem) [19]

Let M be a closed, bounded, convex and nonempty subset of a Banach space X. Let A, B be the operators such that (a) $A x + B y \in M$ whenever $x, y \in M$ ; (b) A is compact and continuous; (c) B is a contraction mapping. Then there exists $z \in M$ such that $z = A z + B z$ .

Further, we use the notation

\begin{array}{rcl} θ_{1} & = & T \sum_{k = 1}^{j} (t_{k} - t_{k - 1}) + \frac{T}{T - η} \sum_{k = j + 1}^{m} \frac{{(t_{k} - t_{k - 1})}^{2}}{1 + q_{k - 1}} \\ + \frac{T}{T - η} \sum_{k = j + 1}^{m} (T - t_{k}) (t_{k} - t_{k - 1}) + \frac{T {(η - t_{j})}^{2}}{(T - η) (1 + q_{j})} \\ + \frac{T {(T - t_{m})}^{2}}{(T - η) (1 + q_{m})} + \sum_{k = 1}^{m + 1} \frac{{(t_{k} - t_{k - 1})}^{2}}{1 + q_{k - 1}} + \sum_{k = 1}^{m} (T - t_{k}) (t_{k} - t_{k - 1}), \end{array}

(3.13)

and

θ_{2} = j T N_{2} + \frac{(m - j) T N_{1}}{T - η} + m N_{1} + N_{2} \sum_{k = 1}^{m} (T - t_{k}) + \frac{T N_{2}}{T - η} \sum_{j + 1}^{m} (T - t_{k}) .

(3.14)

Theorem 3.4 Let $f : J \times R \to R$ be a continuous function. Assume that (H₂) holds and in addition suppose that:

(H₃) $| f (t, x) | \leq μ (t)$ , $\forall (t, x) \in J \times R$ , and $μ \in C (J, R^{+})$ .

(H₄) There exist constants $N_{1}, N_{2} > 0$ such that $| I_{k} (x) | \leq N_{1}$ and $| I_{k}^{*} (x) | \leq N_{2}$ for all $x \in R$ , for $k = 1, 2, \dots, m$ .

Then the impulsive $q_{k}$ -difference boundary value problem (1.1) has at least one solution on J provided that

j T L_{3} + m L_{2} + \frac{T (m - j) L_{2}}{T - η} + L_{3} \sum_{k = 1}^{m} (T - t_{k}) < 1 .

(3.15)

Proof Firstly, we define ${sup}_{t \in J} | μ (t) | = ∥ μ ∥$ . Choosing a suitable ball $B_{R} = {x \in P C (J, R) : ∥ x ∥ \leq R}$ , where

R \geq ∥ μ ∥ θ_{1} + θ_{2},

(3.16)

and $θ_{1}$ , $θ_{2}$ are defined by (3.13), (3.14), respectively, we define the operators $S_{1}$ and $S_{2}$ on $B_{R}$ by

\begin{aligned} (S_{1} x) (t) \\ = - t \sum_{k = 1}^{j} \int_{t_{k - 1}}^{t_{k}} f (s, x (s)) d_{q_{k - 1}} s - \frac{t}{T - η} \sum_{k = j + 1}^{m} \int_{t_{k - 1}}^{t_{k}} \int_{t_{k - 1}}^{s} f (σ, x (σ)) d_{q_{k - 1}} σ d_{q_{k - 1}} s \\ - \frac{t}{T - η} \sum_{k = j + 1}^{m} (T - t_{k}) \int_{t_{k - 1}}^{t_{k}} f (s, x (s)) d_{q_{k - 1}} s + \frac{t}{T - η} \int_{t_{j}}^{η} \int_{t_{j}}^{s} f (σ, x (σ)) d_{q_{j}} σ d_{q_{j}} s \\ - \frac{t}{T - η} \int_{t_{m}}^{T} \int_{t_{m}}^{s} f (σ, x (σ)) d_{q_{m}} σ d_{q_{m}} s + \sum_{0 < t_{k} < t} \int_{t_{k - 1}}^{t_{k}} \int_{t_{k - 1}}^{s} f (σ, x (σ)) d_{q_{k - 1}} σ d_{q_{k - 1}} s \\ + \sum_{0 < t_{k} < t} (t - t_{k}) \int_{t_{k - 1}}^{t_{k}} f (s, x (s)) d_{q_{k - 1}} s + \int_{t_{k}}^{t} \int_{t_{k}}^{s} f (σ, x (σ)) d_{q_{k}} σ d_{q_{k}} s, t \in [0, T], \end{aligned}

and

\begin{aligned} (S_{2} x) (t) = & - t \sum_{k = 1}^{j} I_{k}^{*} (x (t_{k})) - \frac{t}{T - η} \sum_{k = j + 1}^{m} I_{k} (x (t_{k})) - \frac{t}{T - η} \sum_{k = j + 1}^{m} (T - t_{k}) I_{k}^{*} (x (t_{k})) \\ + \sum_{0 < t_{k} < t} I_{k} (x (t_{k})) + \sum_{0 < t_{k} < t} (t - t_{k}) I_{k}^{*} (x (t_{k})), t \in [0, T] . \end{aligned}

For any $x, y \in B_{R}$ , we have

\begin{array}{rcl} ∥ S_{1} x + S_{2} y ∥ & \leq & ∥ μ ∥ [T \sum_{k = 1}^{j} (t_{k} - t_{k - 1}) + \frac{T}{T - η} \sum_{k = j + 1}^{m} \frac{{(t_{k} - t_{k - 1})}^{2}}{1 + q_{k - 1}} \\ + \frac{T}{T - η} \sum_{k = j + 1}^{m} (T - t_{k}) (t_{k} - t_{k - 1}) + \frac{T {(η - t_{j})}^{2}}{(T - η) (1 + q_{j})} \\ + \frac{T {(T - t_{m})}^{2}}{(T - η) (1 + q_{m})} + \sum_{k = 1}^{m + 1} \frac{{(t_{k} - t_{k - 1})}^{2}}{1 + q_{k - 1}} + \sum_{k = 1}^{m} (T - t_{k}) (t_{k} - t_{k - 1})] \\ + j T N_{2} + \frac{(m - j) T N_{1}}{T - η} + m N_{1} + N_{2} \sum_{k = 1}^{m} (T - t_{k}) + \frac{T N_{2}}{T - η} \sum_{j + 1}^{m} (T - t_{k}) \\ = & ∥ μ ∥ θ_{1} + θ_{2} \\ \leq & R . \end{array}

Hence, $S_{1} x + S_{2} y \in B_{R}$ .

To show that $S_{2}$ is a contraction, for $x, y \in P C (J, R)$ , we have

\begin{array}{rcl} ∥ S_{2} x - S_{2} y ∥ & \leq & T \sum_{k = 1}^{j} | I_{k}^{*} (x (t_{k})) - I_{k}^{*} (y (t_{k})) | + \frac{T}{T - η} \sum_{k = j + 1}^{m} | I_{k} (x (t_{k})) - I_{k} (y (t_{k})) | \\ + \sum_{k = 1}^{m} | I (x (t_{k})) - I_{k} (y (t_{k})) | + \sum_{k = 1}^{m} (t - t_{k}) | I_{k}^{*} (x (t_{k})) - I_{k}^{*} (y (t_{k})) | \\ \leq & [j T L_{3} + m L_{2} + \frac{T (m - j) L_{2}}{T - η} + L_{3} \sum_{k = 1}^{m} (T - t_{k})] ∥ x - y ∥ . \end{array}

From (3.15), it follows that $S_{2}$ is a contraction.

Next, the continuity of f implies that the operator $S_{1}$ is continuous. Further, $S_{1}$ is uniformly bounded on $B_{R}$ by

∥ S_{1} x ∥ \leq ∥ μ ∥ θ_{1} .

Now we shall prove the compactness of $S_{1}$ . Setting ${sup}_{(t, x) \in J \times B_{R}} | f (t, x) | = f^{*} < \infty$ , then for each $τ_{1}, τ_{2} \in (t_{l}, t_{l + 1})$ for some $l \in {0, 1, \dots, m}$ with $τ_{2} > τ_{1}$ , we have

\begin{aligned} | (S_{1} x) (τ_{2}) - (S_{1} x) (τ_{1}) | \\ \leq | τ_{2} - τ_{1} | \sum_{k = 1}^{j} \int_{t_{k - 1}}^{t_{k}} | f (s, x (s)) | d_{q_{k - 1}} s \\ + \frac{| τ_{2} - τ_{1} |}{T - η} \sum_{k = j + 1}^{m} \int_{t_{k - 1}}^{t_{k}} \int_{t_{k - 1}}^{s} | f (σ, x (σ)) | d_{q_{k - 1}} σ d_{q_{k - 1}} s \\ + \frac{| τ_{2} - τ_{1} |}{T - η} \sum_{k = j + 1}^{m} (T - t_{k}) \int_{t_{k - 1}}^{t_{k}} | f (s, x (s)) | d_{q_{k - 1}} s \\ + \frac{| τ_{2} - τ_{1} |}{T - η} \int_{t_{j}}^{η} \int_{t_{j}}^{s} | f (σ, x (σ)) | d_{q_{j}} σ d_{q_{j}} s \\ + \frac{| τ_{2} - τ_{1} |}{T - η} \int_{t_{m}}^{T} \int_{t_{m}}^{s} | f (σ, x (σ)) | d_{q_{m}} σ d_{q_{m}} s + | τ_{2} - τ_{1} | \sum_{k = 1}^{l} \int_{t_{k - 1}}^{t_{k}} | f (s, x (s)) | d_{q_{k - 1}} s \\ + | \int_{t_{l}}^{τ_{2}} \int_{t_{l}}^{s} | f (σ, x (σ)) | d_{q_{l}} σ d_{q_{l}} s - \int_{t_{l}}^{τ_{1}} \int_{t_{l}}^{s} | f (σ, x (σ)) | d_{q_{l}} σ d_{q_{l}} s | \\ \leq | τ_{2} - τ_{1} | f^{*} [\sum_{k = 1}^{j} (t_{k} - t_{k - 1}) + \frac{1}{T - η} \sum_{k = j + 1}^{m} \frac{{(t_{k} - t_{k - 1})}^{2}}{1 + q_{k - 1}} + \frac{{(η - t_{j})}^{2}}{(T - η) (1 + q_{j})} \\ + \frac{{(T - t_{m})}^{2}}{(T - η) (1 + q_{m})} + \frac{1}{T - η} \sum_{k = j + 1}^{m} (T - t_{k}) (t_{k} - t_{k - 1}) \\ + \sum_{k = 1}^{l} (t_{k} - t_{k - 1}) + \frac{(τ_{1} + τ_{2} + 2 t_{l})}{1 + q_{l}}] . \end{aligned}

As $τ_{1} \to τ_{2}$ , the right hand side above (which is independent of x) tends to zero. Therefore, the operator $S_{1}$ is equicontinuous. Since $S_{1}$ maps bounded subsets into relatively compact subsets, it follows that $S_{1}$ is relative compact on $B_{R}$ . Hence, by the Arzelá-Ascoli theorem, $S_{1}$ is compact on $B_{R}$ . Thus all the assumptions of Lemma 3.3 are satisfied. Hence, by the conclusion of Lemma 3.3, the impulsive $q_{k}$ -difference boundary value problem (1.1) has at least one solution on J. □

4 Examples

Example 4.1 Consider the following nonlinear second-order impulsive $q_{k}$ -difference equation with three-point boundary condition:

{\begin{matrix} D_{\frac{4}{5 + k}}^{2} x (t) = \frac{e^{- {cos}^{2} t} | x (t) |}{{(6 + t)}^{2} (1 + | x (t) |)}, t \in J = [0, 1], t \neq t_{k} = \frac{k}{10}, \\ Δ x (t_{k}) = \frac{| x (t_{k}) |}{8 (7 + | x (t_{k}) |)}, k = 1, 2, \dots, 9, \\ D_{\frac{4}{5 + k}} x (t_{k}^{+}) - D_{\frac{4}{4 + k}} x (t_{k}) = \frac{1}{6} {tan}^{- 1} (\frac{1}{8} x (t_{k})), k = 1, 2, \dots, 9, \\ x (0) = 0, x (1) = x (\frac{1}{4}) . \end{matrix}

(4.1)

Here $q_{k} = 4 / (5 + k)$ for $k = 0, 1, 2, \dots, 9$ , $m = 9$ , $T = 1$ , $η = 1 / 4$ , $j = 2$ , $f (t, x) = (e^{- {cos}^{2} t} | x |) / ({(6 + t)}^{2} (1 + | x |))$ , $I_{k} (x) = | x | / (8 (7 + | x |))$ and $I_{k}^{*} (x) = (1 / 6) {tan}^{- 1} (x / 8)$ . Since

\begin{aligned} | f (t, x) - f (t, y) | \leq (1 / 36) | x - y |, \\ | I_{k} (x) - I_{k} (y) | \leq (1 / 56) | x - y | and | I_{k}^{*} (x) - I_{k}^{*} (y) | \leq (1 / 48) | x - y |, \end{aligned}

then (H₁) and (H₂) are satisfied with $L_{1} = (1 / 36)$ , $L_{2} = (1 / 56)$ , $L_{3} = (1 / 48)$ . We can show that

Λ \approx 0.5730986482 < 1 .

Hence, by Theorem 3.2, the three-point impulsive $q_{k}$ -difference boundary value problem (4.1) has a unique solution on $[0, 1]$ .

Example 4.2 Consider the following nonlinear second-order impulsive $q_{k}$ -difference equation with three-point boundary condition:

{\begin{matrix} D_{\frac{3}{6 + k}}^{2} x (t) = \frac{{sin}^{2} (π t)}{{(t + 4)}^{2}} \frac{| x (t) |}{(1 + | x (t) |)}, t \in J = [0, 1], t \neq t_{k} = \frac{k}{10}, \\ Δ x (t_{k}) = \frac{| x (t_{k}) |}{9 (7 + | x (t_{k}) |)}, k = 1, 2, \dots, 9, \\ D_{\frac{3}{6 + k}} x (t_{k}^{+}) - D_{\frac{3}{5 + k}} x (t_{k}) = \frac{| x (t_{k}) |}{4 (5 + | x (t_{k}) |)}, k = 1, 2, \dots, 9, \\ x (0) = 0, x (1) = x (\frac{9}{20}) . \end{matrix}

(4.2)

Set $q_{k} = 3 / (6 + k)$ for $k = 0, 1, 2, \dots, 9$ , $m = 9$ , $T = 1$ , $η = 9 / 20$ , $j = 4$ , $f (t, x) = ({sin}^{2} (π t) | x |) / ({(t + 4)}^{2} (1 + | x |))$ , $I_{k} (x) = | x | / (9 (7 + | x |))$ and $I_{k}^{*} (x) = | x | / (4 (5 + | x |))$ . Since

| I_{k} (x) - I_{k} (y) | \leq (1 / 63) | x - y | and | I_{k}^{*} (x) - I_{k}^{*} (y) | \leq (1 / 20) | x - y |,

then (H₂) is satisfied with $L_{2} = (1 / 63)$ , $L_{3} = (1 / 20)$ . It is easy to verify that $| f (t, x) | \leq μ (t) \equiv 1$ , $I_{k} (x) \leq N_{1} = 1 / 9$ and $I_{k}^{*} (x) \leq N_{2} = 1 / 4$ for all $t \in [0, 1]$ , $x \in R$ , $k = 1, \dots, m$ . Thus (H₃) and (H₄) are satisfied. We can show that

j T L_{3} + m L_{2} + \frac{T (m - j) L_{2}}{T - η} + L_{3} \sum_{k = 1}^{m} (T - t_{k}) = \frac{19741}{27720} < 1 .

Hence, by Theorem 3.3, the three-point impulsive $q_{k}$ -difference boundary value problem (4.2) has at least one solution on $[0, 1]$ .

Authors’ information

Sotiris K Ntouyas is a member of Nonlinear Analysis and Applied Mathematics (NAAM)-Research Group at King Abdulaziz University, Jeddah, Saudi Arabia.

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Acknowledgements

This research of J Tariboon is supported by King Mongkut’s University of Technology North Bangkok, Thailand.

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Department of Mathematics, Faculty of Applied Science, King Mongkut’s University of Technology North Bangkok, Bangkok, Thailand
Jessada Tariboon
Department of Mathematics, University of Ioannina, Ioannina, 451 10, Greece
Sotiris K Ntouyas

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Jessada Tariboon
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Sotiris K Ntouyas
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Correspondence to Jessada Tariboon.

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Both authors contributed equally in this article. They read and approved the final manuscript.

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Tariboon, J., Ntouyas, S.K. Three-point boundary value problems for nonlinear second-order impulsive q-difference equations. Adv Differ Equ 2014, 31 (2014). https://doi.org/10.1186/1687-1847-2014-31

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Received: 11 November 2013
Accepted: 07 January 2014
Published: 27 January 2014
DOI: https://doi.org/10.1186/1687-1847-2014-31

Keywords

$q_{k}$ -derivative
$q_{k}$ -integral
impulsive $q_{k}$ -difference equation
existence
uniqueness
three-point boundary conditions
fixed-point theorems

Three-point boundary value problems for nonlinear second-order impulsive q-difference equations

Abstract

1 Introduction

2 Preliminaries

3 Main results

4 Examples

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