Boundary value problems for fractional q-difference equations with nonlocal conditions

Abstract

In this paper, we study the boundary value problem of a fractional q-difference equation with nonlocal conditions involving the fractional q-derivative of the Caputo type, and the nonlinear term contains a fractional q-derivative of Caputo type. By means of Bananch’s contraction mapping principle and Schaefer’s fixed-point theorem, some existence results for the solutions are obtained. Finally, examples are presented to illustrate our main results.

MSC:39A13, 34B18, 34A08.

1 Introduction

The q-difference calculus is an interesting and old subject. The q-difference calculus or quantum calculus was first developed by Jackson [1, 2], while basic definitions and properties can be found in the papers [3, 4]. The origin of the fractional q-difference calculus can be traced back to the work in [5, 6] by Al-Salam and by Agarwal. The q-difference calculus describes many phenomena in various fields of science and engineering [1].

The q-difference calculus is an important part of discrete mathematics. More recently, the fractional q-difference calculus has caused wide attention of scholars, many researchers devoted themselves to studying it [7–14]. The relevant theory of fractional q-difference calculus has been established [15], such as q-analogues of the fractional integral and the difference operators properties as Mitlagel Leffler function [16], q-Laplace transform, q-Taylor’s formula [17, 18], just to mention some. It is not only the requirements of the fractional q-difference calculus theory but also its the broad application.

Apart from this old history of q-difference equations, the subject received a considerable interest of many mathematicians and from many aspects, theoretical and practical. So specifically, q-difference equations have been widely used in mathematical physical problems, for dynamical system and quantum models [19], for q-analogues of mathematical physical problems including heat and wave equations [20], for sampling theory of signal analysis [21, 22]. What is more, the fractional q-difference calculus plays an important role in quantum calculus.

As generalizations of integer order q-difference, fractional q-difference can describe physical phenomena much better and more accurately. Perhaps due to the development of fractional differential equations [23–25], an interest has been aroused in studying boundary value problems of fractional q-difference equations, especially as regards the existence of solutions for boundary value problems [3, 4, 26–33].

In 2010, Ferreira [3] considered the existence of nontrivial solutions to the fractional q-difference equation

$$\left(D_q^{\alpha }y\right)(x)=-f(x,y(x)),0<x<1,$$

subject to the boundary conditions

$$y(0)=0,y(1)=0,$$

where $1<\alpha \le 2$ and $f:[0,1]\times \mathbb{R}\to \mathbb{R}$ is a nonnegative continuous function.

In 2011, El-Shahed and Al-Askar [27] studied the existence of a positive solution for the boundary value problem of the nonlinear factional q-difference equation

$${}_{c}D_q^{\alpha }u+a(t)f(t)=0,0\le t\le 1,2<\alpha \le 3,$$

with the boundary conditions

$$u(0)=D_q^{2}u(0)=0,\gamma D_{q}u(1)+\beta D_q^{2}u(1)=0,$$

where $\gamma ,\beta \le 0$ and ${}_{c}D_q^{\alpha }$ is a fractional q-derivative of Caputo type.

In 2012, Liang and Zhang [26] studied the existence and uniqueness of positive solutions for the three-point boundary problem of fractional q-differences

$$\begin{array}{c}\left(D_q^{\alpha }u\right)(t)+f(t,u(t))=0,0<t<1,2<\alpha <3,\hfill \\ u(0)=(D_{q}u)(0)=0,(D_{q}u)(1)=\beta (D_{q}u)(\eta ),\hfill \end{array}$$

where $0<\beta {\eta }^{\alpha -2}<1$. By using a fixed-point theorem in partially ordered sets, they got some sufficient conditions for the existence and uniqueness of positive solutions to the above boundary problem.

In 2013, Zhou and Liu [28] considered the existence of solutions for the boundary value problems of the following nonlinear fractional q-difference equations:

$$\begin{array}{c}{}_{c}D_q^{\alpha }u+f(t,u)=0,t\in J=[0,1],2<\alpha \le 3,\hfill \\ u(0)=\left(D_q^{2}u\right)(0)=0,\gamma (D_{q}u)(1)+\beta D_q^{2}u(1)=0,\hfill \end{array}$$

where $\gamma ,\beta \ge 0$ and ${}_{c}D_q$ is the fractional q-derivative of Caputo type. By virtue of Mönch’s fixed-point theorem and the technique of measure of weak noncompactness and got some conditions of positive solutions.

In 2013, Zhou et al. [32] studied the existence results for fractional q-difference equations with nonlocal q-integral boundary conditions,

$$\begin{array}{r}\left(D_q^{\alpha }u\right)(t)+f(t,u(t))=0,t\in (0,1),\\ u(0)=0,u(1)=\mu I_q^{\beta }u(\eta )=\mu {\int }_0^{\eta }\frac{{(\eta -qs)}^{(\beta -1)}}{{\mathrm{\Gamma }}_q(\beta )}u(s)d_{q}s,\end{array}$$

where $\mu >0$ is a parameter, $D_q^{\alpha }$ is the q-derivative of Rieman-Liouville type of order α. By using the generalized Banach contraction principle, the monotone iterative method and Krasnoselskii’s fixed-point theorem, some existence results of positive solutions to the above boundary value problems have been enunciated.

In 2013, Li et al. [33] investigated the existence of solutions for the following two-point boundary value problem of nonlinear fractional q-difference equations:

$$\begin{array}{c}\left(D_q^{\alpha }u\right)(x)+\lambda f(u(x))=0,0<x<1,\hfill \\ u(0)=D_{q}u(0)=D_{q}u(1)=0,\hfill \end{array}$$

where $0<q<1$, $2<\alpha <3$, $f:C((0,1),(0,\mathrm{\infty }))$. They proved the existence of positive solutions for boundary value problems by utilizing a fixed-point theorem in cones. Several existence results for positive solutions in terms of different values of the parameter λ were obtained.

In 2009, Benchohra et al. [34] studied the boundary value problem for fractional differential equations with nonlocal conditions

$$\begin{array}{c}{}^{c}D_{0+}^{\alpha }y(t)=f(t,y(t)),t\in J=[0,T],1<\alpha <2,\hfill \\ y(0)=g(y),y(T)=y_T,\hfill \end{array}$$

where ${}^{c}D_{0+}^{\alpha }$ is the Caputo fractional derivative, $f:[1,T]\times \mathbb{R}\to \mathbb{R}$ is a continuous function, $g:C(J,\mathbb{R})\to \mathbb{R}$ is a continuous function, and $y_T\in \mathbb{R}$.

To the best of our knowledge, there are a few papers that consider the boundary value of nonlinear fractional q-difference equations with nonlocal conditions and in which the nonlinear term contains a fractional q-derivative of Caputo type. Theory and applications seem to be just being initiated. In this paper we investigate the existence of solutions for the following boundary value problem of nonlinear fractional q-difference equations:

$$\left({}^c{D}_q^{\alpha }x\right)(t)+f(t,{}^c{D}_q^{\sigma }x(t))=0,0<t<1,$$

(1.1)

subject to the boundary conditions

$$x(0)=y(x),\gamma (D_{q}x)(1)-\beta D_q^{2}x(1)=0,$$

(1.2)

where $0<q<1$, $1<\alpha <2$, $0<\sigma <1$, $\beta \gamma \ge 0$ and $\frac{{(1-t)}^{(\alpha -2)}}{{(1-t)}^{(\alpha -3)}}\ge \frac{{[\alpha ]}_q\beta }{\gamma }$, $f:C((0,1)\times \mathbb{R})$, and y is a continuous functional. The condition of $\gamma (D_{q}x)(1)-\beta D_q^{2}x(1)=0$ is representative and general; the conditions of $D_{q}x(1)=0$ in [29] and $D_{q}x(1)=\beta$ in [4] can be viewed as two special cases. We will prove the existence of solutions for the boundary value problem (1.1)-(1.2) by utilizing Banach’s contraction mapping principle and Schaefer’s fixed-point theorem. Several existence results for the solutions are obtained. This work is motivated by papers [28, 34].

The paper is organized as follows. In Section 2, we introduce some definitions of q-fractional integral and differential operator together with some basic properties and lemmas to prove our main results. In Section 3, we investigate the existence of solutions for the boundary value problem (1.1)-(1.2) by the Banach contraction mapping principle and Schaefer’s fixed-point theorem. Moreover, some examples are given to illustrate our main results.

2 Preliminaries

In the following section, we collect some definitions and lemmas about the fractional q-integral and fractional q-derivative for the full theory for which one is referred to [3, 33].

Let $q\in (0,1)$ and define

$${[a]}_q=\frac{1-q^a}{1-q},a\in \mathbb{R},$$

and

$${(a;q)}_{\mathrm{\infty }}=\prod _{i=0}^{\mathrm{\infty }}(1-a{q}^i),{(a;q)}_{\alpha }={\frac{{(a;q)}_{\mathrm{\infty }}}{(a{q}^{\alpha };q)}}_{\mathrm{\infty }}(a,\alpha \in \mathbb{R}).$$

The q-analogue of the power function ${(a-b)}^n$ with $n\in {\mathbb{N}}_0$ is

$${(a-b)}^0=1,{(a-b)}^n=\prod _{k=0}^{n-1}(a-b{q}^k),n\in \mathbb{N},a,b\in \mathbb{R}.$$

More generally, if $\alpha \in \mathbb{R}$, then

$${(a-b)}^{(\alpha )}=a^{\alpha }\prod _{n=0}^{\mathrm{\infty }}\frac{a-b{q}^n}{a-b{q}^{\alpha +n}}.$$

It is easy to see that ${[a(t-s)]}^{(\alpha )}=a^{\alpha }{(t-s)}^{(\alpha )}$. And note that, if $b=0$, then $a^{(\alpha )}=a^{\alpha }$.

The q-gamma function is defined by

$${\mathrm{\Gamma }}_q(x)=\frac{{(1-q)}^{(x-1)}}{{(1-q)}^{x-1}},x\in \mathbb{R}\mathrm{\setminus }\{0,-1,-2,\dots \},$$

and it satisfies ${\mathrm{\Gamma }}_q(x+1)={[x]}_q{\mathrm{\Gamma }}_q(x)$.

The q-derivative of a function f is here defined by

$$(D_{q}f)(x)=\frac{f(x)-f(qx)}{(1-q)x},(D_{q}f)(0)=\underset{x\to 0}{lim}(D_{q}f)(x),\text{for }x\ne 0,$$

and q-derivatives of higher order are defined by

$$\left(D_q^{0}f\right)(x)=f(x)\text{and}\left(D_q^{n}f\right)(x)=D_q\left(D_q^{n-1}f\right)(x),n\in \mathbb{N}.$$

The q-integral of a function f defined on the interval $[0,b]$ is given by

$$(I_{q}f)(x)={\int }_0^{x}f(t)d_{q}t=x(1-q)\sum _{n=0}^{\mathrm{\infty }}f\left(x{q}^n\right)q^n,x\in [0,b].$$

If $a\in [0,b]$ and f is defined on the interval $[0,b]$, its q-integral from a to b is defined by

$${\int }_a^{b}f(t)d_{q}t={\int }_0^{b}f(t)d_{q}t-{\int }_0^{a}f(t)d_{q}t.$$

Similarly as done for derivatives, an operator $I_q^n$ can be defined,

$$\left(I_q^{0}f\right)(x)=f(x)\text{and}\left(I_q^{n}f\right)(x)=I_q\left(I_q^{n-1}f\right)(x),n\in \mathbb{N}.$$

From the definition of q-integral and the properties of series, we can get the following results concerning q-integral, which are helpful in the proofs of our main results.

Lemma 2.1

1. (1)

   If f and g are q-integral on the interval $[a,b]$, $\alpha \in \mathbb{R}$, $c\in [a,b]$, then

   1. (i)

      ${\int }_a^b(f(t)+g(t))d_{q}t={\int }_a^{b}f(t)d_{q}t+{\int }_a^{b}g(t)d_{q}t$;

   2. (ii)

      ${\int }_a^b\alpha f(t)d_{q}t=\alpha {\int }_b^{a}f(t)d_{q}t$;

   3. (iii)

      ${\int }_a^{b}f(t)d_{q}t={\int }_a^{c}f(t)d_{q}t+{\int }_c^{b}f(t)d_{q}t$.

2. (2)

   If $|f|$ is q-integral on the interval $[0,x]$, then $|{\int }_0^{x}f(t)d_{q}t|\le {\int }_0^x|f(t)|d_{q}t$.

3. (3)

   If f and g are q-integral on the interval $[0,x]$, $f(t)\le g(t)$ for all $t\in [0,x]$, then ${\int }_0^{x}f(t)d_{q}t\le {\int }_0^{x}g(t)d_{q}t$.

The fundamental theorem of calculus applies to the operators $I_q$ and $D_q$, i.e.,

$$(D_q{I}_{q}f)(x)=f(x),$$

and if f is continuous at $x=0$, then

$$(I_q{D}_{q}f)(x)=f(x)-f(0).$$

The basic properties of the q-integral operator and the q-differential operator can be found in the book [15].

We now point out three formulas that will be used later (${}_{i}D_q$ denotes the derivative with respect to variable i)

$$\begin{array}{c}{}_{t}D_q{(t-s)}^{(\alpha )}={[\alpha ]}_q{(t-s)}^{(\alpha -1)},\hfill \\ ({}_x{D}_q{\int }_0^{x}f(x,t)d_{q}t)(x)={\int }_0^x{}_x{D}_{q}f(x,t)d_{q}t+f(qx,x).\hfill \end{array}$$

Remark 2.1 We note that if $\alpha >0$ and $a\le b\le t$, then ${(t-a)}^{(\alpha )}\ge {(t-b)}^{(\alpha )}$.

Definition 2.1 [6]

Let $\alpha \ge 0$ and f be a function defined on $[0,b]$. The fractional q-integral of the Riemann-Liouville type is $(I_q^{0}f)(x)=f(x)$ and

$$\left(I_q^{\alpha }f\right)(x)=\frac{1}{{\mathrm{\Gamma }}_q(\alpha )}{\int }_0^x{(x-qt)}^{(\alpha -1)}f(t)d_{q}t,\alpha >0,x\in [0,b].$$

Definition 2.2 [16]

The fractional q-derivative of the Caputo type of order $\alpha >0$ is defined by

$$\left({}^c{D}_q^{\alpha }f\right)(x)=\left(I_q^{\lceil \alpha \rceil -\alpha }{D}_q^{\lceil \alpha \rceil }f\right)(x),\alpha >0,$$

where $\lceil \alpha \rceil$ is the smallest integer greater than or equal to α.

Next, we list some properties of the q-derivative and the q-integral that are already known in the literature.

Lemma 2.2 [6]

Let $\alpha ,\beta \ge 0$ and f be a function defined on $[0,b]$. Then the following formulas hold:

1. (i)

   $(I_q^{\beta }{I}_q^{\alpha }f)(x)=(I_q^{\alpha +\beta }f)(x)$;

2. (ii)

   $(D_q^{\alpha }{I}_q^{\alpha }f)(x)=f(x)$.

Lemma 2.3 [16]

Let $\alpha \in {\mathbb{R}}^{+}\mathrm{\setminus }\mathbb{N}$ and $a<x$, then the following is valid:

$$\left(I_q^{\alpha }{}^c{D}_q^{\alpha }f\right)(x)=f(x)-\sum _{k=0}^{\lceil \alpha \rceil -1}\frac{(D_q^{k}f)(a)}{{\mathrm{\Gamma }}_q(k+1)}{x}^k{(a/x;q)}_k.$$

Lemma 2.4 [35]

Let B be a Banach space with $C\subseteq B$ closed and convex. Assume U is a relatively open subset of C with $0\in U$ and $F:\overline{U}\to C$ is a continuous, compact map. Then either

1. (1)

   F has a fixed point in $\overline{U}$; or

2. (2)

   there exist $u\in \partial U$ and $\lambda \in (0,1)$ with $u=\lambda Fu$.

The next result is important in the sequel.

Lemma 2.5 Let $1<\alpha <2$ and h is continuous functional, a function x is a solution of the fractional integral equation

$$\begin{array}{rl}x(t)=& y(x)+({\int }_0^1(\frac{{(1-qs)}^{(\alpha -2)}}{{\mathrm{\Gamma }}_q(\alpha -1)}-\frac{\beta {(1-qs)}^{(\alpha -3)}}{\gamma {\mathrm{\Gamma }}_q(\alpha -2)})h(s)d_{q}s)t\\ -{\int }_0^t\frac{{(t-qs)}^{(\alpha -1)}}{{\mathrm{\Gamma }}_q(\alpha )}h(s)d_{q}s,\end{array}$$

(2.1)

if and only if x is a solution of the equation

$$\left({}^c{D}_q^{\alpha }x\right)(t)+h(t)=0,0<t<1,$$

(2.2)

$$x(0)=y(x),\gamma (D_{q}x)(1)-\beta D_q^{2}x(1)=0.$$

(2.3)

Proof By Definition 2.2 and Lemma 2.3, we can reduce (2.2) to an equivalent integral equation

$$x(t)=x(0)+At-I_q^{\alpha }h(t),$$

(2.4)

where $A=\frac{D_{q}x(0)}{{\mathrm{\Gamma }}_q(2)}$. Applying the boundary conditions $x(0)=y(x)$, we have

$$x(t)=y(x)+At-{\int }_0^t\frac{{(t-qs)}^{(\alpha -1)}}{{\mathrm{\Gamma }}_q(\alpha )}h(s)d_{q}s.$$

Thus, we obtain

$$\begin{array}{c}(D_{q}x)(t)=A-{\int }_0^t\frac{{[\alpha -1]}_q{(t-qs)}^{(\alpha -2)}}{{\mathrm{\Gamma }}_q(\alpha )}h(s)d_{q}s,\hfill \\ \left(D_q^{2}x\right)(t)=-{\int }_0^t\frac{{[\alpha -1]}_q{[\alpha -2]}_q{(t-qs)}^{(\alpha -3)}}{{\mathrm{\Gamma }}_q(\alpha )}h(s)d_{q}s.\hfill \end{array}$$

Next by the condition $\gamma (D_{q}x)(1)-\beta D_q^{2}x(1)=0$, we have

$$A={\int }_0^1\frac{{(1-qs)}^{(\alpha -2)}}{{\mathrm{\Gamma }}_q(\alpha -1)}h(s)d_{q}s-{\int }_0^1\frac{\beta {(1-qs)}^{(\alpha -3)}}{\gamma {\mathrm{\Gamma }}_q(\alpha -2)}h(s)d_{q}s.$$

(2.5)

Therefore, the unique solution of the problem (2.2)-(2.3) is

$$x(t)=y(x)+({\int }_0^1(\frac{{(1-qs)}^{(\alpha -2)}}{{\mathrm{\Gamma }}_q(\alpha -1)}-\frac{\beta {(1-qs)}^{(\alpha -3)}}{\gamma {\mathrm{\Gamma }}_q(\alpha -2)})h(s)d_{q}s)t-{\int }_0^t\frac{{(t-qs)}^{(\alpha -1)}}{{\mathrm{\Gamma }}_q(\alpha )}h(s)d_{q}s,$$

which completes the proof. □

3 Main results

We are now in a position to state and prove our main results in this paper.

Let $B=\{x\mid x\in C[0,1]\text{ and }{D}_{q}x\in C[0,1]\}$ be the Banach space endowed with the norm $\parallel x\parallel ={max}_{t\in [0,1]}\{|x(t)|,|{}^c{D}_q^{\sigma }x(t)|\}$. Define the closed subset $K\subset B$ by $K=\{x(t)\in C[0,1]\mid x(t)\ge 0\}$.

Define the operator $F:K\to K$ by

$$\begin{array}{rl}(Fx)(t)=& y(x)+\left({\int }_0^1(\frac{{(1-qs)}^{(\alpha -2)}}{{\mathrm{\Gamma }}_q(\alpha -1)}-\frac{\beta {(1-qs)}^{(\alpha -3)}}{\gamma {\mathrm{\Gamma }}_q(\alpha -2)})f(s,{}^c{D}_q^{\sigma }x(s))d_{q}s\right)t\\ -{\int }_0^t\frac{{(t-qs)}^{(\alpha -1)}}{{\mathrm{\Gamma }}_q(\alpha )}f(s,{}^c{D}_q^{\sigma }x(s))d_{q}s,t\in [0,1].\end{array}$$

(3.1)

Obviously, the fixed points of the operator F are solutions of the boundary value problem (1.1)-(1.2).

For convenience, we define

$$\begin{array}{c}{C}_1={\int }_0^1(\frac{{(1-qs)}^{(\alpha -2)}}{{\mathrm{\Gamma }}_q(\alpha -1)}-\frac{\beta {(1-qs)}^{(\alpha -3)}}{\gamma {\mathrm{\Gamma }}_q(\alpha -2)})d_{q}s,\hfill \\ C_2={\int }_0^1\frac{{(1-qs)}^{(\alpha -1)}}{{\mathrm{\Gamma }}_q(\alpha )}{d}_{q}s.\hfill \end{array}$$

Then we have the following results.

Theorem 3.1 Assume that

(H1) there exists a constant $l_1>0$ such that $|f(t,z_2)-f(t,z_1)|\le l_1(|z_2-z_1|)$, for each $t\in [0,1]$ and all $z_1,z_2\in \mathbb{R}$;

(H2) there exists a constant $l_2>0$ such that $|y(x_2)-y(x_1)|\le l_2\parallel x_2-x_1\parallel$, for each $x_1,x_2\in K$;

(H3) $\theta =max\{l_2+l_1(C_1+C_2),l_1(C_1+\frac{{[\alpha -1]}_q}{{\mathrm{\Gamma }}_q(\alpha )}{C}_3)\frac{C_4}{{\mathrm{\Gamma }}_q(1-\sigma )}\}<1$, where $C_3$ and $C_4$ are defined as (3.8) and (3.9).

Then the boundary value problem (1.1)-(1.2) has at least one positive solution.

Proof Let $x_1,x_2\in K$, then for all $t\in [0,1]$, the following inequality holds:

$$\begin{array}{r}|(F{x}_2)(t)-(F{x}_1)(t)|\\ \le \left|{\int }_0^1(\frac{{(1-qs)}^{(\alpha -2)}}{{\mathrm{\Gamma }}_q(\alpha -1)}-\frac{\beta {(1-qs)}^{(\alpha -3)}}{\gamma {\mathrm{\Gamma }}_q(\alpha -2)})(f(s,{}^c{D}_q^{\sigma }{x}_2(s))-f(s,{}^c{D}_q^{\sigma }{x}_1(s)))d_{q}s\right|\\ +\left|{\int }_0^t\frac{{(t-qs)}^{(\alpha -1)}}{{\mathrm{\Gamma }}_q(\alpha )}(f(s,{}^c{D}_q^{\sigma }{x}_2(s))-f(s,{}^c{D}_q^{\sigma }{x}_1(s)))d_{q}s\right|+|y(x_2)-y(x_1)|\\ \le {\int }_0^1(\frac{{(1-qs)}^{(\alpha -2)}}{{\mathrm{\Gamma }}_q(\alpha -1)}-\frac{\beta {(1-qs)}^{(\alpha -3)}}{\gamma {\mathrm{\Gamma }}_q(\alpha -2)})|f(s,{}^c{D}_q^{\sigma }{x}_2(s))-f(s,{}^c{D}_q^{\sigma }{x}_1(s))|d_{q}s\\ +{\int }_0^t\frac{{(t-qs)}^{(\alpha -1)}}{{\mathrm{\Gamma }}_q(\alpha )}|f(s,{}^c{D}_q^{\sigma }{x}_2(s))-f(s,{}^c{D}_q^{\sigma }{x}_1(s))|d_{q}s+|y(x_2)-y(x_1)|.\end{array}$$

(3.2)

By (H1) and (H2), we may arrange (3.2) as follows:

$$\begin{array}{r}|(F{x}_2)(t)-(F{x}_1)(t)|\\ \le l_2\parallel x_2-x_1\parallel +{\int }_0^1(\frac{{(1-qs)}^{(\alpha -2)}}{{\mathrm{\Gamma }}_q(\alpha -1)}-\frac{\beta {(1-qs)}^{(\alpha -3)}}{\gamma {\mathrm{\Gamma }}_q(\alpha -2)})l_1|{}^c{D}_q^{\sigma }{x}_2(s)-{}^c{D}_q^{\sigma }{x}_1(s)|d_{q}s\\ +{\int }_0^t\frac{{(t-qs)}^{(\alpha -1)}}{{\mathrm{\Gamma }}_q(\alpha )}{l}_1|{}^c{D}_q^{\sigma }{x}_2(s)-{}^c{D}_q^{\sigma }{x}_1(s)|d_{q}s\\ \le l_2\parallel x_2-x_1\parallel +{\int }_0^1(\frac{{(1-qs)}^{(\alpha -2)}}{{\mathrm{\Gamma }}_q(\alpha -1)}-\frac{\beta {(1-qs)}^{(\alpha -3)}}{\gamma {\mathrm{\Gamma }}_q(\alpha -2)})l_1\parallel {}^c{D}_q^{\sigma }{x}_2-{}^c{D}_q^{\sigma }{x}_1\parallel d_{q}s\\ +{\int }_0^1\frac{{(1-qs)}^{(\alpha -1)}}{{\mathrm{\Gamma }}_q(\alpha )}{l}_1\parallel {}^c{D}_q^{\sigma }{x}_2-{}^c{D}_q^{\sigma }{x}_1\parallel d_{q}s\\ \le l_2\parallel x_2-x_1\parallel +(C_1+C_2)l_1\parallel {}^c{D}_q^{\sigma }{x}_2-{}^c{D}_q^{\sigma }{x}_1\parallel \\ \le l_2\parallel x_2-x_1\parallel +(C_1+C_2)l_1\parallel x_2-x_1\parallel \\ =(l_2+l_1(C_1+C_2))\parallel x_2-x_1\parallel .\end{array}$$

As

$$\begin{array}{rl}{D}_q(Fx)(t)=& {\int }_0^1\frac{{(1-qs)}^{(\alpha -2)}}{{\mathrm{\Gamma }}_q(\alpha -1)}-\frac{\beta {(1-qs)}^{(\alpha -3)}}{\gamma {\mathrm{\Gamma }}_q(\alpha -2)}f(s,{}^c{D}_q^{\sigma }x(s))d_{q}s\\ -{\int }_0^t\frac{{[\alpha -1]}_q{(t-qs)}^{(\alpha -2)}}{{\mathrm{\Gamma }}_q(\alpha )}f(s,{}^c{D}_q^{\sigma }x(s))d_{q}s,\end{array}$$

(3.3)

by the Definition 2.2, here $0<\sigma <1$, $\lceil \sigma \rceil =1$, and

$$\begin{array}{rl}\left({}^c{D}_q^{\sigma }Fx\right)(t)& =\left(I_q^{\lceil \sigma \rceil -\sigma }{D}_q^{\lceil \sigma \rceil }Fx\right)(t)\\ ={\int }_0^t\frac{{(t-qs)}^{(\lceil \sigma \rceil -\sigma -1)}}{{\mathrm{\Gamma }}_q(\lceil \sigma \rceil -\sigma )}\left(D_q^{\lceil \sigma \rceil }Fx\right)(s)d_{q}s\\ ={\int }_0^t\frac{{(t-qs)}^{(-\sigma )}}{{\mathrm{\Gamma }}_q(1-\sigma )}(D_{q}Fx)(s)d_{q}s.\end{array}$$

(3.4)

We can get the following deduction:

$$\begin{array}{r}|D_q(F{x}_2)(t)-D_q(F{x}_1)(t)|\\ \le \left|{\int }_0^1(\frac{{(1-qs)}^{(\alpha -2)}}{{\mathrm{\Gamma }}_q(\alpha -1)}-\frac{\beta {(1-qs)}^{(\alpha -3)}}{\gamma {\mathrm{\Gamma }}_q(\alpha -2)})(f(s,{}^c{D}_q^{\sigma }{x}_2(s))-f(s,{}^c{D}_q^{\sigma }{x}_1(s)))d_{q}s\right|\\ +|{\int }_0^t\frac{{[\alpha -1]}_q{(t-qs)}^{(\alpha -2)}}{{\mathrm{\Gamma }}_q(\alpha )}f(s,{}^c{D}_q^{\sigma }{x}_2(s))-f(s,{}^c{D}_q^{\sigma }{x}_1(s))d_{q}s|\\ \le {\int }_0^1(\frac{{(1-qs)}^{(\alpha -2)}}{{\mathrm{\Gamma }}_q(\alpha -1)}-\frac{\beta {(1-qs)}^{(\alpha -3)}}{\gamma {\mathrm{\Gamma }}_q(\alpha -2)})|f(s,{}^c{D}_q^{\sigma }{x}_2(s))-f(s,{}^c{D}_q^{\sigma }{x}_1(s))|d_{q}s\\ +{\int }_0^t\frac{{[\alpha -1]}_q{(t-qs)}^{(\alpha -2)}}{{\mathrm{\Gamma }}_q(\alpha )}|f(s,{}^c{D}_q^{\sigma }{x}_2(s))-f(s,{}^c{D}_q^{\sigma }{x}_1(s))|d_{q}s.\end{array}$$

(3.5)

By (H1) and (H2), we arrange (3.5) as follows:

$$\begin{array}{r}|D_q(F{x}_2)(t)-D_q(F{x}_1)(t)|\\ \le {\int }_0^1(\frac{{(1-qs)}^{(\alpha -2)}}{{\mathrm{\Gamma }}_q(\alpha -1)}-\frac{\beta {(1-qs)}^{(\alpha -3)}}{\gamma {\mathrm{\Gamma }}_q(\alpha -2)})l_1\parallel {}^c{D}_q^{\sigma }{x}_2-{}^c{D}_q^{\sigma }{x}_1\parallel d_{q}s\\ +{\int }_0^t\frac{{[\alpha -1]}_q{(t-qs)}^{(\alpha -2)}}{{\mathrm{\Gamma }}_q(\alpha )}{l}_1\parallel {}^c{D}_q^{\sigma }{x}_2-{}^c{D}_q^{\sigma }{x}_1\parallel d_{q}s\\ \le {\int }_0^1(\frac{{(1-qs)}^{(\alpha -2)}}{{\mathrm{\Gamma }}_q(\alpha -1)}-\frac{\beta {(1-qs)}^{(\alpha -3)}}{\gamma {\mathrm{\Gamma }}_q(\alpha -2)})l_1\parallel {}^c{D}_q^{\sigma }{x}_2-{}^c{D}_q^{\sigma }{x}_1\parallel d_{q}s\\ +\frac{{[\alpha -1]}_q(1-q)}{{\mathrm{\Gamma }}_q(\alpha )}{t}^{(\alpha -1)}\sum _{n=0}^{\mathrm{\infty }}{(1-q^{n+1})}^{(\alpha -2)}{q}^n{l}_1\parallel {}^c{D}_q^{\sigma }{x}_2-{}^c{D}_q^{\sigma }{x}_1\parallel d_{q}s\\ \le (C_1{l}_1+\frac{{[\alpha -1]}_q(1-q)}{{\mathrm{\Gamma }}_q(\alpha )}\sum _{n=0}^{\mathrm{\infty }}{(1-q^{n+1})}^{(\alpha -2)}{q}^n{l}_1)\parallel {}^c{D}_q^{\sigma }{x}_2-{}^c{D}_q^{\sigma }{x}_1\parallel d_{q}s.\end{array}$$

(3.6)

By the theory of series, let

$$\begin{array}{c}\begin{array}{rl}{a}_n& ={(1-q^{n+1})}^{(\alpha -2)}{q}^n=\prod _{k=0}^{\mathrm{\infty }}\frac{1-q^{n+k+1}}{1-q^{n+k+\alpha -1}}{q}^n\\ =q^n{e}^{{\sum }_{k=0}^{\mathrm{\infty }}ln(1-q^{n+k+1})-ln(1-q^{n+k+\alpha -1})},\end{array}\hfill \\ b_n=\sum _{k=0}^{\mathrm{\infty }}(ln(1-q^{n+k+1})-ln(1-q^{n+k+\alpha -1})).\hfill \end{array}$$

Note that $0<q<1$, so ${\sum }_{k=0}^{\mathrm{\infty }}{q}^{n+k+1}$ and ${\sum }_{k=0}^{\mathrm{\infty }}{q}^{n+k+\alpha +1}$ are convergent, which imply that ${\sum }_{k=0}^{\mathrm{\infty }}ln(1-q^{n+k+1})$ and ${\sum }_{k=0}^{\mathrm{\infty }}ln(1-q^{n+k+\alpha -1})$ are convergent. Thus ${\sum }_{k=0}^{\mathrm{\infty }}{b}_n$ is convergent. Hence ${\sum }_{n=0}^{\mathrm{\infty }}{a}_n={\sum }_{n=0}^{\mathrm{\infty }}{(1-q^{n+1})}^{(\alpha -2)}{q}^n$ is convergent.

Setting

$$C_3=\sum _{n=0}^{\mathrm{\infty }}{(1-q^{n+1})}^{(\alpha -2)}{q}^n$$

(3.7)

and combining with (3.6), we get

$$|D_q(F{x}_2)(t)-D_q(F{x}_1)(t)|\le (C_1+\frac{{[\alpha -1]}_q(1-q)}{{\mathrm{\Gamma }}_q(\alpha )}{C}_3)l_1\parallel {}^c{D}_q^{\sigma }{x}_2-{}^c{D}_q^{\sigma }{x}_1\parallel .$$

So,

$$\begin{array}{r}|\left({}^c{D}_q^{\sigma }F{x}_2\right)(t)-\left({}^c{D}_q^{\sigma }F{x}_1\right)(t)|\\ \le {\int }_0^t\frac{{(t-qs)}^{(-\sigma )}}{{\mathrm{\Gamma }}_q(1-\sigma )}(C_1+\frac{{[\alpha -1]}_q(1-q)}{{\mathrm{\Gamma }}_q(\alpha )}{C}_3)l_1\parallel {}^c{D}_q^{\sigma }{x}_2-{}^c{D}_q^{\sigma }{x}_1\parallel d_{q}s\\ =l_1(C_1+\frac{{[\alpha -1]}_q(1-q)}{{\mathrm{\Gamma }}_q(\alpha )}{C}_3)\parallel {}^c{D}_q^{\sigma }{x}_2-{}^c{D}_q^{\sigma }{x}_1\parallel \frac{t(1-q){\sum }_{n=0}^{\mathrm{\infty }}{(t-q^{n+1}t)}^{(-\sigma )}{q}^n}{{\mathrm{\Gamma }}_q(1-\sigma )}\\ =l_1(C_1+\frac{{[\alpha -1]}_q(1-q)}{{\mathrm{\Gamma }}_q(\alpha )}{C}_3)\parallel {}^c{D}_q^{\sigma }{x}_2-{}^c{D}_q^{\sigma }{x}_1\parallel \\ \times \frac{t^{(1-\sigma )}(1-q){\sum }_{n=0}^{\mathrm{\infty }}{(1-q^{n+1})}^{(-\sigma )}{q}^n}{{\mathrm{\Gamma }}_q(1-\sigma )}.\end{array}$$

(3.8)

Choosing $u_n={(1-q^{n+1})}^{(-\sigma )}{q}^n$, we see that ${\sum }_{n=0}^{\mathrm{\infty }}{u}_n={\sum }_{n=0}^{\mathrm{\infty }}{(1-q^{n+1})}^{(-\sigma )}{q}^n$ is convergent, and we may as well set

$$C_4=\sum _{n=0}^{\mathrm{\infty }}{(1-q^{n+1})}^{(-\sigma )}{q}^n$$

(3.9)

and combining with (3.8), we get

$$\begin{array}{rl}|\left({}^c{D}_q^{\sigma }F{x}_2\right)(t)-\left({}^c{D}_q^{\sigma }F{x}_1\right)(t)|& \le l_1(C_1+\frac{{[\alpha -1]}_q(1-q)}{{\mathrm{\Gamma }}_q(\alpha )}{C}_3)\frac{(1-q)}{{\mathrm{\Gamma }}_q(1-\sigma )}{C}_4\parallel x_2-x_1\parallel \\ \le l_1(C_1+\frac{{[\alpha -1]}_q}{{\mathrm{\Gamma }}_q(\alpha )}{C}_3)\frac{C_4}{{\mathrm{\Gamma }}_q(1-\sigma )}\parallel x_2-x_1\parallel .\end{array}$$

It follows that

$$\begin{array}{rl}\parallel F{x}_2-F{x}_1\parallel & =\underset{t\in [0,1]}{max}\{|F(x_2)(t)-F(x_1)(t)|,|{}^c{D}_q^{\sigma }F(x_2)(t)-{}^c{D}_q^{\sigma }F(x_1)(t)|\}\\ \le \theta \parallel x_2-x_1\parallel .\end{array}$$

Consequently F is a contraction map as $\theta <1$. As a consequence of Banach’s fixed-point theorem, we deduce that F has a fixed point which is a solution of the problem (1.1)-(1.2). The proof is completed. □

Denote

$$\begin{array}{c}{M}_1=\underset{t\in [0,1]}{max}\left|y(x(t))\right|,M_2=\underset{t\in [0,1]}{max}\left|f(t,{}^c{D}_q^{\sigma }x(t))\right|,\hfill \\ A=M_1+M_2(C_1+C_2),B=\frac{C_4{M}_2}{{\mathrm{\Gamma }}_q(1-\sigma )}(C_1+\frac{{[\alpha -1]}_q{C}_3}{{\mathrm{\Gamma }}_q(\alpha )}).\hfill \end{array}$$

Theorem 3.2 Assume $D_{q}x(t)$ and $f:[0,1]\times \mathbb{R}\to \mathbb{R}$ are continuous, and $y>0$ is a continuous functional. Suppose the following conditions are satisfied:

(H4) there exists a continuous function $\phi :(0,+\mathrm{\infty })\to \mathbb{R}$ with $|f(t,z)|\le \phi (z)$ on $[0,1]\times (0,+\mathrm{\infty })$;

(H5) there exists $r>0$, with $\parallel \phi \parallel \le \frac{r-M_1}{C_1+C_2}$.

Then the boundary value problem (1.1)-(1.2) has a solution.

Proof We will prove the result by using Schaefer’s fixed-point theorem and divide the proof into four steps.

First, set $U=\{x\mid x\in K,\parallel x\parallel <r\}$, then $\overline{U}=\{x\mid x\in K,\parallel x\parallel \le r\}$, we show $F:\overline{U}\to K$ is continuous.

Since $D_{q}x(t)$ is continuous, then ${}^{c}D_q^{\sigma }x(t)={\int }_0^t\frac{{(1-qs)}^{(-\sigma )}}{{\mathrm{\Gamma }}_q(1-\sigma )}{D}_{q}x(s)d_{q}s$ is continuous. Choosing $\{x_n\}$ to be a sequence such that $x_n\to x$ in $\overline{U}$, then

$$\begin{array}{r}|(F{x}_n)(t)-(Fx)(t)|\\ \le {\int }_0^1(\frac{{(1-qs)}^{(\alpha -2)}}{{\mathrm{\Gamma }}_q(\alpha -1)}-\frac{\beta {(1-qs)}^{(\alpha -3)}}{\gamma {\mathrm{\Gamma }}_q(\alpha -2)})|f(s,{}^c{D}_q^{\sigma }{x}_n(s))-f(s,{}^c{D}_q^{\sigma }x(s))|d_{q}s\\ +{\int }_0^t\frac{{(t-qs)}^{(\alpha -1)}}{{\mathrm{\Gamma }}_q(\alpha )}|f(s,{}^c{D}_q^{\sigma }{x}_n(s))-f(s,{}^c{D}_q^{\sigma }x(s))|d_{q}s+|y(x_n)-y(x)|\\ \le {\int }_0^1(\frac{{(1-qs)}^{(\alpha -2)}}{{\mathrm{\Gamma }}_q(\alpha -1)}-\frac{\beta {(1-qs)}^{(\alpha -3)}}{\gamma {\mathrm{\Gamma }}_q(\alpha -2)})\underset{s\in [0,1]}{max}|f(s,{}^c{D}_q^{\sigma }{x}_n(s))-f(s,{}^c{D}_q^{\sigma }x(s))|d_{q}s\\ +{\int }_0^t\frac{{(t-qs)}^{(\alpha -1)}}{{\mathrm{\Gamma }}_q(\alpha )}\underset{s\in [0,1]}{max}|f(s,{}^c{D}_q^{\sigma }{x}_n(s))-f(s,{}^c{D}_q^{\sigma }x(s))|d_{q}s+|y(x_n)-y(x)|.\end{array}$$

From f and y are continuous, we have

$$\parallel F(x_n)-F(x)\parallel \to 0\text{as }n\to \mathrm{\infty }.$$

Now, we prove that $F:\overline{U}\to K$ is a compact map. For any $0<\eta \le r$, set $E=\{x\in K\mid \parallel x\parallel \le \eta \}$, it suffices to show that $F(E)$ is relatively compact set in K. In fact, for each $t\in [0,1]$,

$$\begin{array}{rl}|(Fx)(t)|=& |y(x)+\left({\int }_0^1(\frac{{(1-qs)}^{(\alpha -2)}}{{\mathrm{\Gamma }}_q(\alpha -1)}-\frac{\beta {(1-qs)}^{(\alpha -3)}}{\gamma {\mathrm{\Gamma }}_q(\alpha -2)})f(s,{}^c{D}_q^{\sigma }x(s))d_{q}s\right)t\\ -{\int }_0^t\frac{{(t-qs)}^{(\alpha -1)}}{{\mathrm{\Gamma }}_q(\alpha )}f(s,{}^c{D}_q^{\sigma }x(s))d_{q}s|\\ \le & |y(x)|+{\int }_0^1(\frac{{(1-qs)}^{(\alpha -2)}}{{\mathrm{\Gamma }}_q(\alpha -1)}-\frac{\beta {(1-qs)}^{(\alpha -3)}}{\gamma {\mathrm{\Gamma }}_q(\alpha -2)})\left|f(s,{}^c{D}_q^{\sigma }x(s))\right|d_{q}s\\ +{\int }_0^t\frac{{(t-qs)}^{(\alpha -1)}}{{\mathrm{\Gamma }}_q(\alpha )}\left|f(s,{}^c{D}_q^{\sigma }x(s))\right|d_{q}s\\ \le & M_1+M_2{\int }_0^1\frac{{(1-qs)}^{(\alpha -2)}}{{\mathrm{\Gamma }}_q(\alpha -1)}-\frac{\beta {(1-qs)}^{(\alpha -3)}}{\gamma {\mathrm{\Gamma }}_q(\alpha -2)}{d}_{q}s+M_2{\int }_0^1\frac{{(1-qs)}^{(\alpha -1)}}{{\mathrm{\Gamma }}_q(\alpha )}{d}_{q}s\\ \le & M_1+M_2(C_1+C_2)=A.\end{array}$$

We consider

$$\begin{array}{rl}|D_q(Fx)(t)|=& |{\int }_0^1(\frac{{(1-qs)}^{(\alpha -2)}}{{\mathrm{\Gamma }}_q(\alpha -1)}-\frac{\beta {(1-qs)}^{(\alpha -3)}}{\gamma {\mathrm{\Gamma }}_q(\alpha -2)})f(s,{}^c{D}_q^{\sigma }x(s))d_{q}s\\ -{\int }_0^t\frac{{[\alpha -1]}_q{(t-qs)}^{(\alpha -2)}}{{\mathrm{\Gamma }}_q(\alpha )}f(s,{}^c{D}_q^{\sigma }x(s))d_{q}s|\\ \le & {\int }_0^1(\frac{{(1-qs)}^{(\alpha -2)}}{{\mathrm{\Gamma }}_q(\alpha -1)}-\frac{\beta {(1-qs)}^{(\alpha -3)}}{\gamma {\mathrm{\Gamma }}_q(\alpha -2)})\left|f(s,{}^c{D}_q^{\sigma }x(s))\right|d_{q}s\\ +{\int }_0^t\frac{{[\alpha -1]}_q{(t-qs)}^{(\alpha -2)}}{{\mathrm{\Gamma }}_q(\alpha )}\left|f(s,{}^c{D}_q^{\sigma }x(s))\right|d_{q}s\\ =& [{\int }_0^1(\frac{{(1-qs)}^{(\alpha -2)}}{{\mathrm{\Gamma }}_q(\alpha -1)}-\frac{\beta {(1-qs)}^{(\alpha -3)}}{\gamma {\mathrm{\Gamma }}_q(\alpha -2)})d_{q}s\\ +\frac{{[\alpha -1]}_q(1-q)}{{\mathrm{\Gamma }}_q(\alpha )}{t}^{(\alpha -1)}\sum _{n=0}^{\mathrm{\infty }}{(1-q^{n+1})}^{(\alpha -2)}{q}^n]\left|f(s,{}^c{D}_q^{\sigma }x(s))\right|\\ \le & M_2(C_1+\frac{{[\alpha -1]}_q}{{\mathrm{\Gamma }}_q(\alpha )}\sum _{n=0}^{\mathrm{\infty }}{(1-q^{n+1})}^{(\alpha -2)}{q}^n)\\ \le & M_2(C_1+\frac{{[\alpha -1]}_q{C}_3}{{\mathrm{\Gamma }}_q(\alpha )}).\end{array}$$

We get

$$\begin{array}{rl}|\left({}^c{D}_q^{\sigma }Fx\right)(t)|& =|{\int }_0^t\frac{{(t-qs)}^{(-\sigma )}}{{\mathrm{\Gamma }}_q(1-\beta )}{D}_{q}F(x)d_{q}s|\\ \le M_2(C_1+\frac{{[\alpha -1]}_q{C}_3}{{\mathrm{\Gamma }}_q(\alpha )}){\int }_0^t\frac{{(t-qs)}^{(-\sigma )}}{{\mathrm{\Gamma }}_q(1-\sigma )}{d}_{q}s\\ =M_2(C_1+\frac{{[\alpha -1]}_q{C}_3}{{\mathrm{\Gamma }}_q(\alpha )})t(1-q)\sum _{n=0}^{\mathrm{\infty }}\frac{{(t-t{q}^{n+1})}^{(-\sigma )}}{{\mathrm{\Gamma }}_q(1-\sigma )}{q}^n\\ \le \frac{C_4{M}_2}{{\mathrm{\Gamma }}_q(1-\sigma )}(C_1+\frac{{[\alpha -1]}_q{C}_3}{{\mathrm{\Gamma }}_q(\alpha )})=B.\end{array}$$

For each $t\in [0,1]$, we have

$$\parallel Fx\parallel \le M_1+M_2(C_1+C_2)=A,$$

(3.10)

$$\parallel \left({}^c{D}_q^{\sigma }Fx\right)\parallel \le \frac{C_4{M}_2}{{\mathrm{\Gamma }}_q(1-\sigma )}(C_1+\frac{{[\alpha -1]}_q{C}_3}{{\mathrm{\Gamma }}_q(\alpha )})=B.$$

(3.11)

Hence, we conclude that

$$\parallel Fx\parallel =max\{|(Fx)(t)|,|{}^c{D}_q^{\sigma }(Fx)(t)|\}\le l=max\{A,B\},$$

which shows $F(E)$ is uniform bounded.

On the other hand, for any given $\epsilon >0$, setting

$$\delta =min\{\frac{1}{2},\frac{\epsilon }{M_2(C_1+2C_2)}\},$$

for each $x\in E$, $0\le t_1\le t_2\le 1$ and $|t_2-t_1|<\delta$, one has $|(Fx)(t_2)-(Fx)(t_1)|<\epsilon$, that is to say, $F(E)$ is equicontinuous. In fact,

$$\begin{array}{r}|(Fx)(t_2)-(Fx)(t_1)|\\ \le {\int }_0^1(\frac{{(1-qs)}^{(\alpha -2)}}{{\mathrm{\Gamma }}_q(\alpha -1)}-\frac{\beta {(1-qs)}^{(\alpha -3)}}{\gamma {\mathrm{\Gamma }}_q(\alpha -2)})\left|f(s,{}^c{D}_q^{\sigma }x(s))\right|d_{q}s(t_2-t_1)\\ +|{\int }_0^{t_2}\frac{{(t_2-qs)}^{(\alpha -1)}}{{\mathrm{\Gamma }}_q(\alpha )}f(s,{}^c{D}_q^{\sigma }x(s))d_{q}s-{\int }_0^{t_1}\frac{{(t_1-qs)}^{(\alpha -1)}}{{\mathrm{\Gamma }}_q(\alpha )}f(s,{}^c{D}_q^{\sigma }x(s))d_{q}s|\\ \le M_2{\int }_0^1(\frac{{(1-qs)}^{(\alpha -2)}}{{\mathrm{\Gamma }}_q(\alpha -1)}-\frac{\beta {(1-qs)}^{(\alpha -3)}}{\gamma {\mathrm{\Gamma }}_q(\alpha -2)})d_{q}s(t_2-t_1)\\ +\frac{M_2}{{\mathrm{\Gamma }}_q(\alpha )}|{\int }_0^{t_2}{(t_2-qs)}^{(\alpha -1)}{d}_{q}s-{\int }_0^{t_1}{(t_1-qs)}^{(\alpha -1)}{d}_{q}s|\\ \le M_2{\int }_0^1(\frac{{(1-qs)}^{(\alpha -2)}}{{\mathrm{\Gamma }}_q(\alpha -1)}-\frac{\beta {(1-qs)}^{(\alpha -3)}}{\gamma {\mathrm{\Gamma }}_q(\alpha -2)})d_{q}s(t_2-t_1)\\ +\frac{M_2}{{\mathrm{\Gamma }}_q(\alpha )}|t_2^{(\alpha )}{\int }_0^1{(1-qs)}^{(\alpha -1)}{d}_{q}s-t_1^{(\alpha )}{\int }_0^1{(1-qs)}^{(\alpha -1)}{d}_{q}s|\\ =M_2{C}_1(t_2-t_1)+M_2{C}_2|t_2^{(\alpha )}-t_1^{(\alpha )}|.\end{array}$$

Now, we estimate $t_2^{(\alpha )}-t_1^{(\alpha )}$:

1. (1)

   for $0\le t_1<\delta$, $\delta \le t_2<2\delta$, $t_2^{(\alpha )}-t_1^{(\alpha )}\le t_2^{(\alpha )}<{(2\delta )}^{(\alpha )}\le 2\delta$;

2. (2)

   for $0\le t_1<t_2\le \delta$, $t_2^{(\alpha )}-t_1^{(\alpha )}\le t_2^{(\alpha -1)}<{\delta }^{(\alpha -1)}\le 2\delta$;

3. (3)

   for $\delta \le t_1<t_2\le 1$. From the mean value theorem of differentiation, we have $t_2^{(\alpha )}-t_1^{(\alpha )}\le [\alpha ](t_2-t_1)\le 2\delta$. Thus, we have

   $$|Fx(t_2)-Fx(t_1)|<M_2{C}_1\delta +2M_2{C}_2\delta <\epsilon .$$

Therefore, $F(E)$ is equicontinuous. By means of the Arzela-Ascoli theorem, $F(E)$ is a relatively compact set in K, then the operator $F:\overline{U}\to K$ is completely continuous.

In the fourth step, we have a priori bounds.

Suppose $x\in \partial U$ is a solution of

$$x(t)=\lambda Fx(t),$$

(3.12)

for $\lambda \in (0,1)$, where F is given by (3.1). We know that $F:\overline{U}\to K$ is continuous and completely continuous. Furthermore, by (H4) and (H5) we have

$$\begin{array}{rl}x(t)=& \lambda Fx(t)\\ =& \lambda (y(x)+\left[{\int }_0^1(\frac{{(1-qs)}^{(\alpha -2)}}{{\mathrm{\Gamma }}_q(\alpha -1)}-\frac{\beta {(1-qs)}^{(\alpha -3)}}{\gamma {\mathrm{\Gamma }}_q(\alpha -2)})f(s,{}^c{D}_q^{\sigma }x(s))d_{q}s\right]t\\ -{\int }_0^t\frac{{(t-qs)}^{(\alpha -1)}}{{\mathrm{\Gamma }}_q(\alpha )}f(s,{}^c{D}_q^{\sigma }x(s))d_{q}s)\\ <& y(x)+{\int }_0^1(\frac{{(1-qs)}^{(\alpha -2)}}{{\mathrm{\Gamma }}_q(\alpha -1)}-\frac{\beta {(1-qs)}^{(\alpha -3)}}{\gamma {\mathrm{\Gamma }}_q(\alpha -2)})\phi ({}^c{D}_q^{\sigma }x(s))d_{q}s\\ +{\int }_0^t\frac{{(t-qs)}^{(\alpha -1)}}{{\mathrm{\Gamma }}_q(\alpha )}\phi ({}^c{D}_q^{\sigma }x(s))d_{q}s\\ \le & y(x)+{\int }_0^1(\frac{{(1-qs)}^{(\alpha -2)}}{{\mathrm{\Gamma }}_q(\alpha -1)}-\frac{\beta {(1-qs)}^{(\alpha -3)}}{\gamma {\mathrm{\Gamma }}_q(\alpha -2)})\phi ({}^c{D}_q^{\sigma }x(s))d_{q}s\\ +{\int }_0^1\frac{{(1-qs)}^{(\alpha -1)}}{{\mathrm{\Gamma }}_q(\alpha )}\phi ({}^c{D}_q^{\sigma }x(s))d_{q}s\\ =M_1+\parallel \phi \parallel (C_1+C_2)\le r,\end{array}$$

where r is defined as (H5). It follows that $\parallel x\parallel <r$, that is, there is no $x\in \partial U$ such that $x=\lambda F(x)$ for $\lambda \in (0,1)$. As a consequence of Lemma 2.4, F has a fixed point $x\in \overline{U}$ which is a solution of the boundary value problem (1.1)-(1.2), and the proof is completed. □

4 Examples

In this section, we present some examples to illustrate our main results.

Example 4.1 Consider the following boundary value problem:

$${}^{c}D_q^{\frac{5}{4}}x(t)+f(t,{}^c{D}_q^{\frac{1}{3}}x(t))=0,$$

(4.1)

$$x(0)=y(x)=c,\gamma (D_{q}x)(1)-\beta D_q^{2}x(1)=0,$$

(4.2)

here $\alpha =\frac{5}{4}$, $\sigma =\frac{1}{3}$, $\beta =0$, and c is a constant. Note that

$$\begin{array}{c}{C}_1={\int }_0^1\frac{{(1-qs)}^{(-\frac{3}{4})}}{{\mathrm{\Gamma }}_q(\frac{1}{4})}{d}_{q}s,C_2={\int }_0^1\frac{{(1-qs)}^{(\frac{1}{4})}}{{\mathrm{\Gamma }}_q(\frac{5}{4})}{d}_{q}s,\hfill \\ C_3=\sum _{n=0}^{\mathrm{\infty }}{(1-q^{n+1})}^{(-\frac{3}{4})}{q}^n{d}_{q}s,C_4=\sum _{n=0}^{\mathrm{\infty }}{(1-q^{n+1})}^{(-\frac{1}{3})}{q}^n{d}_{q}s.\hfill \end{array}$$

For convenience, we denote $A_1=\frac{C_4}{{\mathrm{\Gamma }}_q(1-\sigma )}(C_1+\frac{{[\alpha -1]}_q}{{\mathrm{\Gamma }}_q(\alpha )}{C}_3)$, $A_2=(C_1+C_2)$. Choosing $A_3>max\{A_1,A_2\}$, let $l_1=\frac{1}{A_3}>0$, $l_2=1-\frac{A_2}{A_3}>0$, and we get $\theta =max\{l_1{A}_1,l_2+l_1(C_1+C_2)\}<1$. When $f(t,{}^c{D}_q^{\frac{1}{3}}x(t))=l_1{}^c{D}_q^{\frac{1}{3}}x(t)$ and $y(x)=c$, for any $t_1,t_2\in [0,1]$, $x_1,x_2\in K$, the following equalities hold:

$$|f(t_1,{}^c{D}_q^{\frac{1}{3}}x(t_1)-f(t_2,{}^c{D}_q^{\frac{1}{3}}x(t_2))|=l_1\left(|{}^c{D}_q^{\frac{1}{3}}x(t_1)-{}^c{D}_q^{\frac{1}{3}}x(t_2)|\right),$$

and

$$|y(x_1)-y(x_2)|=0.$$

Hence, by Theorem 3.1, the boundary value problem (4.1)-(4.2) has a solution.

Example 4.2 Consider the following boundary value problem:

$${}^{c}D_q^{\frac{3}{2}}x(t)-\frac{{\mathrm{\Gamma }}_q(\frac{3}{2}){(tsin({}^{c}D_q^{\frac{1}{2}}x(t)))}^2}{{\int }_0^1{[\frac{1}{2}]}_q{(1-qs)}^{(-\frac{1}{2})}{d}_{q}s+{\int }_0^1{(1-qs)}^{(\frac{1}{2})}{d}_{q}s}=0,$$

(4.3)

$$x(0)=y(x)=sinx(t),\gamma (D_{q}x)(1)-\beta D_q^{2}x(1)=0,$$

(4.4)

here $\alpha =\frac{3}{2}$, $\beta =0$, $\sigma =\frac{1}{2}$, $f(t,{}^{c}D^{\frac{1}{2}}x(t))=-\frac{{\mathrm{\Gamma }}_q(\frac{3}{2}){(tsin({}^{c}D_q^{\frac{1}{2}}x(t)))}^2}{{\int }_0^1{[\frac{1}{2}]}_q{(1-qs)}^{(-\frac{1}{2})}{d}_{q}s+{\int }_0^1{(1-qs)}^{(\frac{1}{2})}{d}_{q}s}$, $x(0)=y(x)=sinx(t)$ and

$$C_1={\int }_0^1\frac{{(1-qs)}^{(-\frac{1}{2})}}{{\mathrm{\Gamma }}_q(\frac{1}{2})}{d}_{q}s,C_2={\int }_0^1\frac{{(1-qs)}^{(\frac{1}{2})}}{{\mathrm{\Gamma }}_q(\frac{3}{2})}{d}_{q}s.$$

Note that

$$\begin{array}{c}{M}_1=\underset{t\in [0,1]}{max}\left|y(x(t))\right|=1,\hfill \\ \phi ({}^c{D}_q^{\frac{1}{2}}x(t))=\frac{1}{C_1+C_2}=\frac{{\mathrm{\Gamma }}_q(\frac{3}{2})}{{\int }_0^1{[\frac{1}{2}]}_q{(1-qs)}^{(-\frac{1}{2})}{d}_{q}s+{\int }_0^1{(1-qs)}^{(\frac{1}{2})}{d}_{q}s},\hfill \end{array}$$

and we get $|f(t,{}^c{D}^{\frac{1}{2}}x(t))|\le \phi ({}^c{D}_q^{\frac{1}{2}}x(t))$ with $\parallel \phi \parallel =\frac{1}{C_1+C_2}$. Choosing $r=3$, it is clear that $\parallel \phi \parallel \le \frac{r-M}{C_1+C_2}=\frac{2}{C_1+C_2}$. By Theorem 3.2, the boundary value problem (4.3)-(4.4) has a solution.