q-Lidstone polynomials and existence results for q-boundary value problems

Mansour, Zeinab; Al-Towailb, Maryam

doi:10.1186/s13661-017-0908-4

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Published: 22 November 2017

q-Lidstone polynomials and existence results for q-boundary value problems

Zeinab Mansour^1,2 &
Maryam Al-Towailb³

Boundary Value Problems volume 2017, Article number: 178 (2017) Cite this article

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Abstract

In this paper, we study some properties of q-Lidstone polynomials by using Green’s function of certain q-differential systems. The q-Fourier series expansions of these polynomials are given. As an application, we prove the existence of solutions for the linear q-difference equations

$$ (-1)^{n} D_{q^{-1}}^{2n} y(x)= \phi\bigl(x,y(x), D_{q^{-1}}y(x), D_{q^{-1}}^{2}y(x), \ldots , D_{q^{-1}}^{k}y(x)\bigr), $$

subject to the boundary conditions

$$ D_{q^{-1}}^{2j}y(0)= \beta_{j},\qquad D_{q^{-1}}^{2j}y(1)= \gamma_{j} \quad(\beta _{j},\gamma_{j} \in\mathbb{C}, j=0,1,\ldots,n-1), $$

where $n\in\mathbb{N}$ and $0\leq k\leq2n-1$. These results are a q-analogue of work by Agarwal and Wong of 1989.

1 Introduction

In the classical Lidstone expansion theorem [1], an entire function $f(x)$ may be expanded with respect to the points 0 and 1 in the form

$$f(x)=\sum_{n=0}^{\infty} \bigl(f^{(2n)}(1)A_{n}(x)-f^{{(2n)}}(0)A_{n}(x-1) \bigr), $$

where $A_{n}$ is a polynomial of degree $2n+1$ that satisfies

(i)
$A_{0}(x)=x$,
(ii)
$A_{n}(0)=A_{n}(1)=0$ for $n\in\mathbb{N}$,
(iii)
$A_{n}''(x)=A_{n-1}(x)$.

The polynomial $A_{n}$ is called Lidstone polynomial.

Ismail and Mansour [2] introduced a q-analogue of Lidstone’s theorem where the two points are 0 and 1. They expanded the function in q-analogues of Lidstone polynomials which are in fact q-Bernoulli polynomials as in the classical case (see Section 2).

It is the object of this paper to give a q-analogue of the results of [3] using the terminology and results given in [2].

This article is organized as follows. In the next section, we state the q-definitions and present some preliminaries of q-calculus which will play an important role in our main results. In Section 3, we define the Green’s functions of certain q-differential systems which are related to q-Lidstone polynomials, and Section 4 gives q-Fourier expansions of these functions and for q-Lidstone polynomials. Some interesting results and relationships are obtained. In Section 5, we are interested in the existence of solutions to the following boundary value problem:

$$ (-1)^{n} D_{q^{-1}}^{2n}y(x)= \phi \bigl(x,y(x), D_{q^{-1}}y(x), D_{q^{-1}}^{2}y(x), \ldots , D_{q^{-1}}^{k}y(x)\bigr), $$

(1.1)

$n\in\mathbb{N}$ and $0\leq k\leq2n-1$, subject to the boundary conditions

$$ D_{q^{-1}}^{2j}y(0)= \beta_{j}, D_{q^{-1}}^{2j}y(1)= \gamma_{j}\quad (\beta _{j}, \gamma_{j} \in\mathbb{C}, j=0,1,\ldots,n-1), $$

(1.2)

with some conditions imposed on y.

2 Preliminaries

In this paper, we assume that q is a positive number less than one with

$$[x]= \frac{1-q^{x}}{1-q}. $$

For $t>0$, the sets $A_{q,t}$, $A^{*}_{q,t}$ are defined by

$$A_{q,t}:=\bigl\{ tq^{n}: n\in\mathbb{N}_{0}\bigr\} , \qquad A^{*}_{q,t} := A_{q,t}\cup \{0\}, $$

where $\mathbb{N}_{0}:=\{0,1,2,\ldots\}$. Notice, if $t=1$, we simply use $A_{q}$ and $A^{*}_{q}$ to denote $A_{q,1}$ and $A^{*}_{q,1}$, respectively.

In the following, we state some of the needed q-notations and results (see [4] and [5]).

The q-shifted fractional is defined by

$$(a;q)_{\infty}= \prod_{j=0}^{\infty} \bigl(1-aq^{j}\bigr)\quad \mbox{and}\quad (a;q)_{n} := \frac{(a;q)_{\infty}}{(aq^{n};q)_{\infty}}\quad \mbox{for } n\in\mathbb{Z}, a\in\mathbb{C}. $$

The q-gamma function is defined by

$$\Gamma_{q}(z) = \frac{(q;q)_{\infty}}{ (q^{z};q)_{\infty}} (1 - q)^{1-z} \quad \mbox{for } z\in\mathbb{C}\setminus\{-n: n\in\mathbb{N}_{0}\}. $$

Let f be a function defined on a q-geometric set A, i.e., $qx\in A$ for all $x \in A$. The q-difference operator is defined by

$$ D_{q} f(x):= \frac{f(x)-f(qx)}{(1-q)x} \quad\mbox{if } x\in A-\{0\}. $$

The q-integration by parts rule (see [4]) is

$$\int_{0}^{a} f(qt) D_{q}g(t)\, d_{q}t= (fg) (a)-\lim_{n\rightarrow\infty} (fg) \bigl(aq^{n}\bigr)- \int_{0}^{a} D_{q}f(t) g(t) \,d_{q}t. $$

If X is the set $A_{q,t}$ or $A^{*}_{q,t}$, then for $n>1$, $C_{q}^{n}(X)$ is the space of all continuous functions with continuous q-derivatives up to order $n-1$ on X. The space $C^{n}_{q}(X)$ associated with the norm function

$$\|f\|:= \sum_{k=0}^{n-1} \max _{x\in X} \big| D_{q}^{k} f(t)\big|\quad \bigl(f \in C^{n}_{q}(X)\bigr) $$

is a Banach space (see [4]).

Ismail and Mansour [2] defined a q-analogue of the Bernoulli polynomials $B_{n}(z;q)$, $z\in\mathbb{C}$ by the generating function

$$\frac{tE_{q}(zt)}{E_{q}(t/2)e_{q}(t/2)-1}=\sum_{n=0}^{\infty}B_{n}(z;q)\frac {t^{n}}{[n]!}, $$

where the functions $E_{q}(z)$ and $e_{q}(z)$ have the series representation

$$e_{q}(z)=\sum_{k=0}^{\infty} \frac{z^{k}}{\Gamma_{q}(k+1)}; \quad|z|< 1 \quad \mbox{and} \quad E_{q}(z)=\sum _{k=0}^{\infty} \frac {q^{k(k-1)/2}z^{k}}{\Gamma_{q}(k+1)}; \quad z\in\mathbb{C}. $$

The q-Bernoulli numbers are defined by

$$\beta_{n}:= B_{n}(0;q). $$

Hence, in terms of the generating function,

$$ \frac{t}{E_{q}(t/2)e_{q}(t/2)-1}=\sum_{n=0}^{\infty}\beta_{n}\frac{t^{n}}{[n]!}. $$

(2.1)

Also, they defined two q-analogues of the Euler polynomials through the generating functions

$$\begin{aligned}& \frac{2 E_{q}(xt)}{E_{q}(t/2)e_{q}(t/2)+1}=\sum_{n=0}^{\infty}E_{n}(x;q) \frac{t^{n}}{[n]!}, \end{aligned}$$

(2.2)

$$\begin{aligned}& \frac{2 e_{q}(xt)}{E_{q}(t/2)e_{q}(t/2)+1}=\sum_{n=0}^{\infty}e_{n}(x;q) \frac{t^{n}}{[n]!}. \end{aligned}$$

(2.3)

Notice, $E_{0}(x;q)=e_{0}(x;q)=1$, and $\tilde{E}_{n}:= E_{n}(0;q)=e_{n}(0;q)$ for all $n\in\mathbb{N}_{0}$.

Proposition 2.1

For $n\in\mathbb{N}$, the q-Bernoulli and q-Euler polynomials satisfy the following q-difference equations:

$$\begin{gathered}D_{q^{-1}}B_{n}(x;q)=[n]B_{n-1}(x;q); \\ D_{q^{-1}}E_{n}(x;q)=[n]E_{n-1}(x;q) \quad\textit{and} \quad D_{q}e_{n}(x;q)=[n]e_{n-1}(x;q). \end{gathered} $$

Proposition 2.2

The q-Euler polynomials $E_{n}(x;q)$ and $e_{n}(x;q)$ are given by

$$E_{0}(x;q)= e_{0}(x;q)=1, $$

and for $n\in\mathbb{N}$,

$$E_{n}(x;q)=\sum_{k=0}^{n}{n \brack k}_{q} q^{\frac{k(k-1)}{2}} \tilde{E}_{n-k} x^{k},\qquad e_{n}(x;q)=\sum_{k=0}^{n}{n \brack k}_{q} \tilde {E}_{n-k} x^{k}. $$

Recall that (see [6]) an entire function f has a p-exponential growth of order k and a finite type ($p, k\in\mathbb{R}-\{0\}$ with $p >1$) if there exists a real number $K>0$, α such that

$$\big|f(x)\big|< K p^{\frac{k}{2} (\frac{\log|x|}{\log p} )^{2}} |x|^{\alpha}. $$

The following results from [2] will be needed in the sequel.

Theorem 2.3

Let $0 < q < 1$ and f be a function of $q^{-1}$-exponential growth of order less than or equal to 1. Then

$$f(z)= \sum_{n=0}^{\infty} \bigl( D_{q^{-1}}^{2n} f(1)A_{n}(z)- D_{q^{-1}}^{2n} f(0)B_{n}(z) \bigr), $$

where $A_{n}$ and $B_{n}$ are polynomials of degree $2n+1$ defined by

$$\begin{gathered} A_{n}(z) = \frac{2^{2n+1}}{[2n+1]!} \sum _{j=0}^{2n+1} \left [ \textstyle\begin{array}{c} 2n+1 \\ j \end{array}\displaystyle \right ]_{q} (-z;q)_{j} 2^{-j} \beta_{2n+1-j}, \\ B_{n}(z) = \frac{2^{2n+1}}{[2n+1]!}B_{2n+1} (z/2;q). \end{gathered} $$

Furthermore, the polynomials $A_{n}$ are defined recursively by $A_{0}(z)= z$ and, for $n\in\mathbb{N}$, $A_{n}$ satisfies the second order q-difference equation

$$ D^{2}_{q^{-1}} A_{n}(z)= A_{n-1}(z),\qquad A_{n}(0)= A_{n}(1)=0 \quad(n\in \mathbb{N}). $$

(2.4)

The polynomials $B_{n}$ are defined recursively by $B_{0}(z)= 1-z$ and, for $n\in\mathbb{N}$, $B_{n}$ satisfies the second order q-difference equation

$$ D^{2}_{q^{-1}} B_{n}(z)= B_{n-1}(z),\qquad B_{n}(0)= B_{n}(1)=0 \quad(n\in \mathbb{N}). $$

(2.5)

Lemma 2.4

Let $z\in\mathbb{C}$. Then

$$A_{n}(z):= \varepsilon_{q^{-1}}^{1} B_{n}(z), $$

where $\varepsilon_{q^{-1}}^{y}$ is a q-translation operator defined by

$$\varepsilon_{q^{-1}}^{y} x^{n} =x^{n} \bigl(-y/x;q^{-1}\bigr)_{n}=q^{-\frac{n(n-1)}{2}}y^{n}(-x/y;q)_{n}. $$

3 The Green’s function of a certain q-differential system

In this section, we consider certain boundary value problems which are related to q-Lidstone polynomials, and then we define these polynomials by using Green’s function.

Consider the following q-differential equation:

$$ D_{q^{-1}}^{2}y(x) - f(x)= 0 \quad\bigl(x\in A^{*}_{q}\bigr), $$

(3.1)

subject to the boundary conditions

$$ y(0)= 0, \qquad y(1)= 0. $$

(3.2)

Theorem 3.1

The boundary value problem (3.1)-(3.2) is equivalent to the basic Fredholm q-integral equation

$$ y(x)= \int_{0}^{1} G\bigl(x,q^{2}t\bigr) f \bigl(q^{2}t\bigr)\, d_{q}t, $$

(3.3)

where

$$ G(x,t)= \left \{ \textstyle\begin{array}{l@{\quad}l} -t(1-x), & 0\leq t< x\leq1; \\ -x (q-t), & 0\leq x< t\leq1. \end{array}\displaystyle \right . $$

(3.4)

Proof

Since $D^{2}_{q^{-1}} y(x)= \frac{1}{q}(D^{2}_{q} y)(\frac{x}{q^{2}})$, Equation (3.1) can be written as

$$ D_{q}^{2}y(x) - qf\bigl(q^{2}x \bigr)= 0 \quad\bigl(x\in A^{*}_{q}\bigr). $$

(3.5)

By taking double q-integral for (3.5), we obtain

$$ y(x)=q \int_{0}^{x} (x-qt) f\bigl(q^{2}t\bigr)\, d_{q}t+c_{1}x+c_{2}, $$

(3.6)

where $c_{1}$ and $c_{2}$ are arbitrary constants. Now, using the boundary conditions, we get

$$c_{1}=-q \int_{0}^{1} (1-qt) f\bigl(q^{2}t\bigr)\, d_{q}t \quad\mbox{and}\quad c_{2}=0. $$

Substituting in (3.6), we obtain the required result. □

Now, consider the following equations:

$$ \begin{gathered} G_{1}\bigl(x,q^{2} t\bigr):= G\bigl(x,q^{2} t\bigr), \\ \begin{aligned}G_{n}\bigl(x,q^{2} t\bigr)&= \int_{0}^{1} G\bigl(x,q^{2}y\bigr) G_{n-1}\bigl(q^{2}y, q^{2} t\bigr) \, d_{q}y \quad(n=2,3, \ldots) \\ &= \int_{0}^{1} \cdots \int_{0}^{1} G\bigl(x,q^{2}t_{1} \bigr) G\bigl(q^{2}t_{1},q^{2}t_{2} \bigr)\cdots G\bigl(q^{2}t_{n-1},q^{2}t\bigr) \, d_{q}t_{1}\,d_{q}t_{2}\cdots d_{q}t_{n-1}.\end{aligned} \end{gathered} $$

(3.7)

Corollary 3.2

The q-Lidstone polynomials $A_{m}$ and $B_{m}$ are given by

$$ \begin{gathered} A_{0}(x) = x, \\ A_{m}(x) = \int_{0}^{1} G\bigl(x,q^{2}t\bigr) A_{m-1}\bigl(q^{2}t\bigr) \,d_{q}t = q^{2} \int_{0}^{1} t G_{m}\bigl(x,q^{2}t \bigr)\,d_{q}t, \end{gathered} $$

(3.8)

and

$$ \begin{gathered} B_{0}(x) = 1-x, \\ B_{m}(x) = \int_{0}^{1} G\bigl(x,q^{2}t\bigr) B_{m-1}\bigl(q^{2}t\bigr) \,d_{q}t = \int_{0}^{1} G_{m}\bigl(x,q^{2}t \bigr) \bigl(1-q^{2} t\bigr)\,d_{q}t. \end{gathered} $$

(3.9)

Proof

The proof follows immediately from Theorem 3.1, Equation (3.7), Equation (2.4) and Equation (2.5). □

Theorem 3.3

Let $0 < q < 1$ and $g \in C^{2n}(A^{*}_{q})$. Then

$$g(x)= \sum_{m=0}^{n-1} \bigl[ D_{q^{-1}}^{2m} g(1)A_{m}(x)- D_{q^{-1}}^{2m} g(0)B_{m}(x) \bigr]+ \int_{0}^{1} G_{n}\bigl(x,q^{2}t \bigr) D_{q^{-1}}^{2n}g\bigl(q^{2}t\bigr)\, d_{q}t, $$

where $A_{m}$ and $B_{m}$ are q-Lidstone polynomials of degree $2m+1$.

Proof

From Theorem 3.1 we can verify that, for $q\in(0,1)$ and $g\in C^{2n}( A^{*}_{q} )$, the q-integral equation

$$g(x)= \int_{0}^{1} G_{n}\bigl(x,q^{2}t \bigr) f\bigl(q^{2}t\bigr)\, d_{q}t $$

is the solution of the q-differential system

$$\left \{ \textstyle\begin{array}{l} D_{q^{-1}}^{2n}g(x)- f(x)= 0 \quad(x\in A^{*}_{q}), \\ D_{q^{-1}}^{2k} g(0)= D_{q^{-1}}^{2k} g(1)= 0 \quad(k=0,1,\ldots,n-1). \end{array}\displaystyle \right . $$

Furthermore, the unique solution of the system

$$ \left \{ \textstyle\begin{array}{l} D_{q^{-1}}^{2n}g(x) - f(x)= 0 \quad(x\in A^{*}_{q}), \\ D_{q^{-1}}^{2k} g(0)=a_{k}, \qquad D_{q^{-1}}^{2k} g(1)= b_{k} \quad(k=0,1,\ldots,n-1) \end{array}\displaystyle \right . $$

(3.10)

is

$$ \begin{aligned} g(x)={}& a_{0} (x-1)+b_{0} x + \sum_{k=1}^{n-1} a_{k} \int_{0}^{1} \bigl(q^{2}t-1\bigr) G_{k}\bigl(x,q^{2}t\bigr)\,d_{q}t \\ &+\sum_{k=1}^{n-1} b_{k} \int_{0}^{1} q^{2}t G_{k} \bigl(x,q^{2}t\bigr)\,d_{q}t + \int_{0}^{1} G_{n}\bigl(x,q^{2}t \bigr) f\bigl(q^{2}t\bigr)\, d_{q}t. \end{aligned} $$

Replacing $a_{k}$, $b_{k}$ and $f(x)$ by their values in terms of $g(x)$ as given by the q-differential system (3.10), we get

$$ \begin{aligned} g(x)={}& g(0) (x-1)+g(1) x +\sum _{k=1}^{n-1} D_{q^{-1}}^{2k} g(0) \int_{0}^{1} \bigl(q^{2}t-1\bigr) G_{k}\bigl(x,q^{2}t\bigr)\,d_{q}t \\ &+\sum_{k=1}^{n-1} D_{q^{-1}}^{2k} g(1) \int_{0}^{1} q^{2}t G_{k} \bigl(x,q^{2}t\bigr)\, d_{q}t + \int_{0}^{1} G_{n}\bigl(x,q^{2}t \bigr) D_{q^{-1}}^{2n} g\bigl(q^{2}t\bigr)\, d_{q}t. \end{aligned} $$

Therefore, according to Equations (3.8) and (3.9), we obtain the required result. □

Remark 3.4

By using Theorem 3.3, and from Equations (2.4) and (2.5), we have

$$\begin{gathered} \begin{aligned}D^{2j}_{q^{-1}}g(x)={}& \sum _{m=j}^{n-1} \bigl[ D_{q^{-1}}^{2m} g(1) D_{q^{-1}}^{2j}A_{m}(x)+ D_{q^{-1}}^{2m} g(0) D_{q^{-1}}^{2j} B_{m}(x) \bigr] \\ &+ \int_{0}^{1} G_{n-j}\bigl(x,q^{2}t \bigr) D_{q^{-1}}^{2n}g(t)\, d_{q}t \\ ={}&\sum_{m=j}^{n-1} \bigl[ D_{q^{-1}}^{2m} g(1) A_{m-j}(x) + D_{q^{-1}}^{2m} g(0) B_{m-j}(x) \bigr] \\ &+ \int_{0}^{1} G_{n-j}\bigl(x,q^{2}t \bigr) D_{q^{-1}}^{2n}g(t)\, d_{q}t \\ ={}&\sum_{m=0}^{n-j-1} \bigl[ D_{q^{-1}}^{2(m+j)} g(1)A_{m}(x) + D_{q^{-1}}^{2(m+j)} g(0)B_{m}(x) \bigr] \\ &+ \int_{0}^{1} G_{n-j}\bigl(x,q^{2}t \bigr) D_{q^{-1}}^{2n}g(t)\, d_{q}t,\end{aligned} \\ \begin{aligned}D^{(2j+1)}_{q^{-1}}g(x)={}& \sum_{m=0}^{n-j-1} \bigl[ D_{q^{-1}}^{2(m+j)} g(1)D_{q^{-1}} A_{m}(x) + D_{q^{-1}}^{2(m+j)} g(0)D_{q^{-1}} B_{m}(x) \bigr] \\ &+ \int_{0}^{1} D_{q^{-1},x}G_{n-j} \bigl(x,q^{2}t\bigr) D_{q^{-1}}^{2n}g(t)\, d_{q}t.\end{aligned} \end{gathered} $$

4 Certain q-Fourier expansions

The purpose of this section is to obtain the q-Fourier series expansions of the following q-integrals:

$$\int_{0}^{1} \bigl(q^{2}t \bigr)^{k} G_{n}\bigl(x,q^{2}t\bigr) \, d_{q}t, \quad k=0,1, n\leq4, $$

and then to compute the series expansions of some of q-Lidstone polynomials which will be used to solve the boundary value problem (1.1)-(1.2).

First, recall that the q-trigonometric functions $C_{q}(z)$ and $S_{q}(z)$ are defined for $z\in\mathbb{C}$ by

$$\begin{gathered} C_{q}(z) = \sum _{n=0}^{\infty}(-1)^{n} \frac {q^{n(n-1/2)}z^{2n}}{(q;q)_{2n}}= \frac{z}{1-q} {_{1}\phi _{1}}\bigl(0;q;q^{2},q^{1/2}z^{2} \bigr), \\ S_{q}(z) = \sum_{n=0}^{\infty}(-1)^{n} \frac {q^{n(n+1/2)}z^{2n+1}}{(q;q)_{2n+1}}= \frac{z}{1-q} {_{1}\phi _{1}} \bigl(0;q^{3};q^{2},q^{3/2}z^{2}\bigr). \end{gathered} $$

The Fourier series expansion for any function defined on the q-linear grid $\mathcal{A}_{q}$ is the following (see [7, 8]):

$$S_{q}(f):= \frac{a_{0}}{2}+\sum_{k=1}^{\infty} \bigl[a_{k}C_{q}\bigl(q^{1/2}w_{k}z \bigr)+b_{k}S_{q}(qw_{k}z) \bigr], $$

where $a_{0}=\int_{-1}^{1} f(t)\, d_{q}t$ and, for $k=1,2,\ldots$ ,

$$\begin{gathered} a_{k} =\frac{1}{\mu_{k}} \int_{-1}^{1} f(t)C_{q} \bigl(q^{1/2}w_{k}t\bigr)\, d_{q}t, \quad b_{k}=\frac{\sqrt{q}}{\mu_{k}} \int_{-1}^{1} f(t)S_{q}(qw_{k}t) \, d_{q}t, \\ \mu_{k} = (1-q)C_{q}\bigl(q^{1/2}w_{k} \bigr)S'_{q}(w_{k}) \end{gathered} $$

on the q-linear grid $\mathcal{A}_{q}$, where $\{w_{k}: k\in\mathbb {N}\}$ is the set of positive zeroes of $S_{q}(z)$.

One can verify that

$$D_{q,z}C_{q}(wz) = - \frac{w}{1-q} S_{q}(wz \sqrt{q}) \quad\mbox{and} \quad D_{q,z}S_{q}(wz) = \frac{w}{1-q} C_{q}(wz\sqrt{q}). $$

Lemma 4.1

Let $x\in A^{*}_{q} $ and $n\in\mathbb{N}$. Then

$$ \int_{0}^{1} G\bigl(x,q^{2}y\bigr) S_{q}\bigl(q^{n}w_{k}y\bigr) \, d_{q}y = \frac {(1-q)^{2}}{q^{2n-5/2}w_{k}^{2}} \bigl(xS_{q}\bigl(q^{n-1}w_{k} \bigr)-S_{q}\bigl(q^{n-1}w_{k} x\bigr) \bigr). $$

Proof

By using Equations (3.1) and (3.3), the q-integral

$$y(x)= \int_{0}^{1} G_{1}\bigl(x,q^{2}y \bigr) S_{q}\bigl(q^{n}w_{k}y\bigr) \, d_{q}y $$

is the solution of the q-differential system

$$ \left \{ \textstyle\begin{array}{l} D_{q^{-1}}^{2}y(x) - S_{q}(q^{n-2}w_{k}x)= 0 \quad(x\in A^{*}_{q}), \\ y(0)= 0, \qquad y(1)= 0. \end{array}\displaystyle \right . $$

(4.1)

Therefore,

$$ \begin{gathered} D_{q} y(x)= \frac{-(1-q)}{q^{n-\frac{3}{2}}w_{k}} C_{q}\bigl(q^{n-\frac {1}{2}}w_{k} x \bigr)+c_{1}, \\ y(x) = \frac{-(1-q)^{2}}{q^{2n-\frac{5}{2}}w_{k}^{2}} S_{q}\bigl(q^{n-1}w_{k} x\bigr)+c_{1} x+c_{2}. \end{gathered} $$

(4.2)

From the boundary conditions, we get

$$c_{1}= \frac{(1-q)^{2}}{q^{2n-\frac{5}{2}}w_{k}^{2}} S_{q}\bigl(q^{n-1}w_{k} \bigr) \quad \mbox{and} \quad c_{2}=0. $$

Substituting the values of $c_{1}$ and $c_{2}$ into Equation (4.2), we obtain the required result. □

Lemma 4.2

For $x\in A^{*}_{q} $, the following q-Fourier series expansion holds:

$$ \int_{0}^{1} G\bigl(x,q^{2}t\bigr)\, d_{q}t=-2\sqrt{q}(1-q)^{2} \sum _{k=1}^{\infty} \frac{L_{k}}{w_{k}^{2}} S_{q}(w_{k}x), $$

(4.3)

where

$$L_{k}:= \frac{1-C_{q}(q^{1/2}w_{k})}{ w_{k} C_{q}(q^{1/2}w_{k})S'_{q}(w_{k})}. $$

Proof

By computing the q-Fourier series expansion of the function $f(x)= 1$ for $0< x<1$, we get

$$ 1= 2 \sum_{k=1}^{\infty} \frac{1-C_{q}(q^{1/2}w_{k})}{ w_{k} C_{q}(q^{1/2}w_{k})S'_{q}(w_{k})} S_{q}(qw_{k}t), \quad t\in A^{*}_{q}. $$

(4.4)

Multiplying (4.4) by $G_{1}(x,q^{2}t)$ and integrating with respect to t from zero to unity, we get

$$ \int_{0}^{1} G_{1}\bigl(x,q^{2}t \bigr) \, d_{q}t= 2 \sum_{k=1}^{\infty} L_{k} \int_{0}^{1} G_{1}\bigl(x,q^{2}t \bigr) S_{q}(w_{k}qt) \, d_{q}t, $$

(4.5)

where

$$L_{k}:= \frac{1-C_{q}(q^{1/2}w_{k})}{ w_{k} C_{q}(q^{1/2}w_{k})S'_{q}(w_{k})}, \quad x\in A^{*}_{q}. $$

By using Lemma 4.1, we get

$$ \int_{0}^{1} G_{1}\bigl(x,q^{2}t \bigr) S_{q}(w_{k}qt) \, d_{q}t= \frac{-\sqrt{q}(1-q)^{2}}{ w_{k}^{2}}S_{q}(w_{k}x). $$

(4.6)

Substituting from (4.6) into (4.5), we obtain the required series. □

Lemma 4.3

For $x\in A^{*}_{q} $, the following q-Fourier series expansion holds:

$$ \int_{0}^{1} G\bigl(x,q^{2}t\bigr) \bigl(q^{2}t\bigr)\, d_{q}t= -2q^{5/2}(1-q)^{2} \sum_{k=1}^{\infty} \frac{\widetilde{L_{k}}}{w_{k}^{2}} S_{q}(w_{k}x), $$

where

$$\widetilde{L_{k}}:= \frac{qw_{k}C_{q}(q^{1/2}w_{k})-(1-q)S_{q}(qw_{k})}{q^{2} w_{k}^{2} C_{q}(q^{1/2}w_{k})S'_{q}(w_{k})}. $$

Proof

Considering the function $g(t)= t$ for $0< t<1$ and computing the q-Fourier series of the extension of g as an odd function on $[-1,1]$, we get

$$ t= 2 \sum_{k=1}^{\infty} \widetilde{L_{k}} S_{q}(qw_{k}t) \quad\mbox{for all } 0< t < 1, $$

(4.7)

where

$$ \widetilde{L_{k}}:= \frac{qw_{k}C_{q}(q^{1/2}w_{k})-(1-q)S_{q}(qw_{k})}{q^{2} w_{k}^{2} C_{q}(q^{1/2}w_{k})S'_{q}(w_{k})}. $$

(4.8)

Hence, the proof can be performed by using (4.7) similar to the proof of Lemma 4.2. So, we will omit it. □

Throughout the following results, we define the constants $L_{k}$ and $\widetilde{L_{k}}$ as in Lemma 4.3 and Lemma 4.3, respectively.

Note that, by using Equation (3.7), we get

$$ G_{2}\bigl(x,q^{2}t\bigr)= \int_{0}^{1} G\bigl(x,q^{2}y\bigr) G \bigl(q^{2}y,q^{2}t\bigr) \, d_{q}y. $$

(4.9)

Integrating (4.9) with respect to t from 0 to unity and using Lemma 4.2, we obtain

$$ \int_{0}^{1} G_{2}\bigl(x,q^{2}t \bigr)\, d_{q}t= -2\sqrt{q}(1-q)^{2} \sum _{k=1}^{\infty } \frac{L_{k}}{w_{k}^{2}} \int_{0}^{1} G\bigl(x,q^{2}y\bigr) S_{q}\bigl(q^{2} w_{k} y\bigr) \, d_{q}y. $$

Again, using Lemma 4.1, we get

$$\int_{0}^{1} G\bigl(x,q^{2}y\bigr) S_{q}\bigl(q^{2}w_{k}y\bigr) \, d_{q}y = \frac {(1-q)^{2}}{q^{3/2}w_{k}^{2}} \bigl(xS_{q}(qw_{k})-S_{q}(qw_{k} x) \bigr). $$

Hence,

$$ \int_{0}^{1} G_{2}\bigl(x,q^{2}t \bigr) \, d_{q}t = -2\frac{(1-q)^{4}}{q} \sum _{k=1}^{\infty} \frac{L_{k}}{w_{k}^{4}} \bigl(xS_{q}(qw_{k})-S_{q}(qw_{k} x) \bigr). $$

Repeating the process for $n=3$ and $n=4$, we obtain the following result.

Theorem 4.4

For $x\in A^{*}_{q} $ and $n\leq4$, the following expansion holds:

$$ \begin{aligned}[b] q^{2} \int_{0}^{1} G_{n}\bigl(x,q^{2}t \bigr) \, d_{q}t ={}& \frac{(-1)^{n-1}(1-q)^{2n}}{ q^{n(n-3/2)}} \Biggl[\sum _{k=1}^{\infty} \frac{L_{k}}{w_{k}^{2n}} \bigl(xS_{q} \bigl(w_{k}q^{n-1}\bigr)-S_{q}\bigl(w_{k}q^{n-1} x\bigr) \bigr) \\ &+ 2\sum_{i=1}^{n-2} (-1)^{i} q^{2(n+i-1)} \sum_{k=1}^{\infty} \frac {L_{k}}{w_{k}^{2(n-i)}}S_{q}\bigl(q^{n-i-1}w_{k}\bigr) \\ &\times\sum_{k=1}^{\infty} \frac{\widetilde{L_{k}}}{w_{k}^{2i}} \bigl(xS_{q}\bigl(q^{i-1}w_{k}\bigr)-S_{q} \bigl(q^{i-1}w_{k} x\bigr) \bigr) \Biggr]. \end{aligned} $$

(4.10)

Remark 4.5

In the classical case, Widder [9] concluded a general formula for a Fourier series of the integral of Green’s functions $G_{n}$ for all $n\in\mathbb{N}$. Theorem 4.4 gives a formula for the q-Fourier series of $\int_{0}^{1} G_{n}(x,q^{2}t) \, d_{q}t $ for $n\leq4$, we could not put it in a closed form for all $n\in\mathbb{N}$. However, we can verify that

$$ \int_{0}^{1} G_{n}\bigl(x,q^{2}t \bigr) \, d_{q}t = \frac{(-1)^{n-1}(1-q)^{2n}}{ q^{n(n-3/2)}} S_{k,n} \quad(n\in \mathbb{N}), $$

where $S_{k,n}$ denotes a sum of q-series which converge uniformly on $A^{*}_{q}$ and depend on the q-trigonometric function $S_{q}$ and the constants $L_{k}$ and $\widetilde{L_{k}}$.

Theorem 4.6

For $x\in A^{*}_{q}$ and $n\leq4$, the following expansion holds:

$$ \begin{aligned} \int_{0}^{1} G_{n}\bigl(x,q^{2}t \bigr) t \, d_{q}t ={}& \frac {(-1)^{n-1}(1-q)^{2n}}{q^{n(n-3/2)}} \Biggl[\sum _{k=1}^{\infty} \frac {\widetilde{L_{k}}}{w_{k}^{2n}} \bigl(xS_{q} \bigl(w_{k}q^{n-1}\bigr)-S_{q}\bigl(w_{k}q^{n-1} x\bigr) \bigr) \\ &+ 2\sum_{i=1}^{n-2} (-1)^{i} q^{2(n+i-1)} \sum_{k=1}^{\infty} \frac {\widetilde{L_{k}}}{w_{k}^{2(n-i)}}S_{q}\bigl(q^{n-i-1}w_{k}\bigr) \\ &\times\sum_{k=1}^{\infty} \frac{\widetilde{L_{k}}}{w_{k}^{2i}} \bigl(xS_{q}\bigl(q^{i-1}w_{k}\bigr)-S_{q} \bigl(q^{i-1}w_{k} x\bigr) \bigr) \Biggr]. \end{aligned} $$

Proof

The proof is similar to the proof of Theorem 4.4 and is omitted. □

The following corollary follows immediately from Theorems 4.4 and 4.6.

Corollary 4.7

For $x\in A^{*}_{q}$ and $n\leq4$, the following expansion holds:

$$ \begin{aligned} &\int_{0}^{1} G_{n}\bigl(x,q^{2}t \bigr) \bigl(1-q^{2}t\bigr)\, d_{q}t \\ &\quad= \frac {(-1)^{n-1}(1-q)^{2n}}{q^{n(n-3/2)}} \Biggl[\sum_{k=1}^{\infty} \frac {1}{w_{k}^{2n}} \bigl(L_{k}-q^{2}\widetilde{L_{k}}\bigr)\bigl(xS_{q}\bigl(w_{k}q^{n-1} \bigr)-S_{q}\bigl(w_{k}q^{n-1} x\bigr) \bigr) \\ &\qquad{} + 2 \sum_{i=1}^{n-2} (-1)^{i} q^{2(n+i-1)} \sum_{k=1}^{\infty } \frac{S_{q}(q^{n-i-1}w_{k})}{w_{k}^{2(n-i)}} \bigl(L_{k}-q^{2}\widetilde{L_{k}}\bigr)\\ &\qquad{}\times \sum _{k=1}^{\infty} \frac{\widetilde{L_{k}}}{w_{k}^{2i}} \bigl(xS_{q}\bigl(q^{i-1}w_{k}\bigr)-S_{q} \bigl(q^{i-1}w_{k} x\bigr) \bigr) \Biggr]. \end{aligned} $$

Corollary 4.8

For $x\in A^{*}_{q}$ and $n\leq4$, the q-Fourier series for the q-Lidstone polynomials $A_{n}(x)$ and $B_{n}(x)$ are given by

$$\begin{aligned}& \begin{aligned} A_{n}(x) = {}&\frac{(-1)^{n-1}(1-q)^{2n}}{q^{n(n-3/2)}} \Biggl[\sum _{k=1}^{\infty} \frac{\widetilde{L_{k}}}{w_{k}^{2n}} \bigl(xS_{q}\bigl(w_{k}q^{n-1}\bigr)- S_{q}\bigl(w_{k}q^{n-1} x\bigr) \bigr) \\ &+ 2\sum_{i=1}^{n-2} (-1)^{i} q^{2(n+i-1)} \sum_{k=1}^{\infty} \frac{\widetilde {L_{k}}}{w_{k}^{2(n-i)}}S_{q}\bigl(q^{n-i-1}w_{k}\bigr) \\ &\times\sum_{k=1}^{\infty} \frac{\widetilde{L_{k}}}{w_{k}^{2i}} \bigl(xS_{q}\bigl(q^{i-1}w_{k}\bigr)-S_{q} \bigl(q^{i-1}w_{k} x\bigr) \bigr) \Biggr], \end{aligned} \\& \begin{aligned} B_{n}(x)={} &\frac{(-1)^{n-1}(1-q)^{2n}}{q^{n(n-3/2)}} \Biggl[\sum _{k=1}^{\infty} \frac{1}{w_{k}^{2n}} \bigl(L_{k}-q^{2}\widetilde{L_{k}}\bigr) \bigl(xS_{q}\bigl(w_{k}q^{n-1}\bigr)-S_{q}\bigl(w_{k}q^{n-1} x\bigr) \bigr) \\ & + 2\sum _{i=1}^{n-2} (-1)^{i} q^{2(n+i-1)} \sum_{k=1}^{\infty} \frac {S_{q}(q^{n-i-1}w_{k})}{w_{k}^{2(n-i)}} \bigl(L_{k}-q^{2}\widetilde{L_{k}} \bigr) \\ &\times \sum_{k=1}^{\infty} \frac{\widetilde{L_{k}}}{w_{k}^{2i}} \bigl(xS_{q}\bigl(q^{i-1}w_{k}\bigr)-S_{q} \bigl(q^{i-1}w_{k} x\bigr) \bigr) \Biggr]. \end{aligned} \end{aligned}$$

Proof

It follows immediately from Theorem 4.6, Corollary 4.7, Equations (3.8) and (3.9). □

Proposition 4.9

There exists a constant C such that

$$ 0\leq(-1)^{n} \int_{0}^{1} G_{n}\bigl(x,q^{2}t \bigr)\, d_{q}t \leq\frac {(1-q)^{2n}}{q^{n(n-3/2)}} C. $$

Proof

By using Equations (3.4) and (3.7), we get

$$(-1)^{n} \int_{0}^{1} G_{n}\bigl(x,tq^{-1} \bigr)\, d_{q}t\geq0. $$

Another inequality follows from Theorem 4.4 together with the result that the series in (4.10) converges uniformly at each fixed point $x\in A^{*}_{q} $. □

Proposition 4.10

There exists a constant C̃ such that

$$ \int_{0}^{1} \big| D_{q^{-1},x} G_{n} \bigl(x,q^{2}t\bigr) \big| \, d_{q}t \leq\frac {(1-q)^{2(n-1)}}{q^{(n-1)(n-5/2)}} \widetilde{C}. $$

Proof

By using (3.7), we have

$$\begin{aligned} \int_{0}^{1} \big| D_{q^{-1},x} G_{n} \bigl(x,q^{2}t\bigr) \big| \, d_{q}t ={}& \int_{0}^{1} \biggl[ D_{q^{-1},x} \int_{0}^{1} G\bigl(x,q^{2}y\bigr) (-1)^{n-1} G_{n-1}\bigl(q^{2}y,q^{2}t\bigr) \, d_{q}y \biggr]\,d_{q}t \\ ={}& \int_{0}^{1} \int_{0}^{x} (-1)^{n-1} \bigl(q^{2}y\bigr) G_{n-1}\bigl(q^{2}y,q^{2}t \bigr) \, d_{q}y \,d_{q}t \\ &- \int_{0}^{1} \int_{x}^{1} (-1)^{n-1} \bigl(q-q^{2}y\bigr) G_{n-1}\bigl(q^{2}y,q^{2}t \bigr) \, d_{q}y \,d_{q}t. \end{aligned} $$

Interchanging the order of the double q-integrations and using Proposition 4.9, we get

$$\begin{aligned} \int_{0}^{1} \big| D_{q^{-1},x} G_{n} \bigl(x,q^{2}t\bigr) \big| \, d_{q}t ={}& \int_{0}^{x} \bigl(q^{2}y\bigr) \biggl[ \int_{0}^{1} \big| G_{n-1}\bigl(q^{2}y,q^{2}t \bigr) \big| \, d_{q}t \biggr] \,d_{q}y \\ &- \int_{x}^{1} \bigl(q- q^{2}y\bigr) \biggl[ \int_{0}^{1} \big| G_{n-1}\bigl(q^{2}y,q^{2}t \bigr) \big| \, d_{q}t \biggr] \,d_{q}y \\ \leq{}&\frac{(1-q)^{2(n-1)}}{q^{(n-1)(n-5/2)}} C \biggl[ \int_{0}^{x} \bigl(q^{2}y\bigr)\, d_{q}y - \int_{x}^{1} \bigl(q- q^{2}y\bigr)\, d_{q}y \biggr] \\ ={}& \frac{(1-q)^{2(n-1)}}{q^{(n-1)(n-5/2)}} C \biggl[ q(1-x)+ \frac {q^{2}}{(q+1)} \biggr] \\ \leq{}&\frac{(1-q)^{2(n-1)}}{q^{(n-1)(n-5/2)}} C \biggl[ q+\frac {q^{2}}{(1+q)} \biggr]. \end{aligned} $$

Hence, if we define the constant C̃ as

$$\widetilde{C}:= \biggl(q+\frac{q^{2}}{(1+q)}\biggr) C, $$

we get the required result. □

We end this section by computing the q-Fourier expansion of the q-Euler polynomials of degree 2. We start by the following lemma.

Lemma 4.11

$$\sum_{k=1}^{\infty} \frac{L_{k}}{w_{k}} = \frac{\sqrt{q}}{2(1-q^{2})} \quad\textit{and} \quad\sum_{k=1}^{\infty} \frac{\widetilde {L_{k}}}{w_{k}}= -\frac{\sqrt{q}}{2[3]!(1-q)}. $$

Proof

By computing the q-Fourier series for the function $f(x)= |x|$, we obtain

$$f(x)=\frac{1}{1+q}-\frac{2(1-q)}{\sqrt{q}} \sum_{k=1}^{\infty} \frac{ 1-C_{q}(q^{1/2}w_{k})}{ w_{k}^{2} C_{q}(q^{1/2}w_{k})S'_{q}(w_{k})} C_{q}\bigl(q^{1/2}w_{k} x\bigr). $$

In particular, when $x=0$, this implies

$$0= \frac{1}{1+q}-\frac{2(1-q)}{\sqrt{q}} \sum_{k=1}^{\infty} \frac { 1-C_{q}(q^{1/2}w_{k})}{ w_{k}^{2} C_{q}(q^{1/2}w_{k})S'_{q}(w_{k})}. $$

Therefore,

$$\sum_{k=1}^{\infty} \frac{L_{k}}{w_{k}} = \frac{\sqrt{q}}{2(1-q^{2})}. $$

Similarly, computing the q-Fourier series for the function $g(x)= |x|^{2}$, we obtain

$$|x|^{2}= \frac{1}{[3]}+\frac{2[2](1-q)}{\sqrt{q}} \sum _{k=1}^{\infty } \frac{\widetilde{L_{k}}}{w_{k}} C_{q} \bigl(q^{1/2}w_{k} x\bigr). $$

At $x=0$, we have

$$\sum_{k=1}^{\infty} \frac{\widetilde{L_{k}}}{w_{k}}= - \frac{\sqrt {q}}{2[3]!(1-q)}. $$

□

Theorem 4.12

For $x\in A^{*}_{q} $, the q-Fourier series for q-Euler polynomials $e_{2}(x;q)$ is given by

$$ e_{2}(x;q)= \frac{[2]}{q} \Biggl[ -2 \sqrt{q}(1-q)^{2} \sum_{k=1}^{\infty} \frac{L_{k}}{w_{k}^{2}} S_{q}(w_{k} x)+\biggl(\frac{q}{1+q}-\frac {q}{2} \biggr)x \Biggr]. $$

Proof

By using Proposition 2.1, we have

$$1= e_{0}(x;q)=D_{q}e_{1}(x;q). $$

Therefore, for $x\in A^{*}_{q}$, the q-Fourier expansion of the function $D_{q}e_{1}(x;q)$ is

$$ D_{q}e_{1}(x;q)= 2 \sum _{k=1}^{\infty} \frac{1-C_{q}(q^{1/2}w_{k})}{ w_{k} C_{q}(q^{1/2}w_{k})S'_{q}(w_{k})} S_{q}(qw_{k}x). $$

(4.11)

Integrating (4.11) from 0 to x, we obtain

$$ e_{1}(x;q)= \frac{-2(1-q)}{\sqrt{q}} \sum _{k=1}^{\infty} \frac{L_{k} }{w_{k}} C_{q} \bigl(q^{1/2}w_{k}x\bigr)+C_{1}, $$

(4.12)

where C is a constant of integration. This constant is obtained by putting $x=0$ in Equation (4.12) and then using Lemma 4.11 and the result $e_{1}(0;q)= \widetilde {E}_{1}(0)=-\frac{1}{2}$. We get $C_{1}= -\frac{1}{2}+\frac{1}{1+q}$. Hence,

$$ e_{1}(x;q)= \frac{-2 (1-q)}{\sqrt{q}} \sum _{k=1}^{\infty} \frac {L_{k}}{w_{k}} C_{q} \bigl(q^{1/2}w_{k} x\bigr)+ \frac{1}{1+q}- \frac{1}{2}. $$

(4.13)

Again, using Proposition 2.1 with $n=2$, we get

$$ e_{2}(x;q)= [2] \int e_{1}(x,q)\, d_{q}x +C_{2}. $$

(4.14)

Substituting Equation (4.13) into Equation (4.14) gives us

$$ \begin{aligned} e_{2}(x;q)={}& [2] \Biggl[\frac{-2 (1-q)}{\sqrt{q}} \sum_{k=1}^{\infty} \frac{L_{k}}{w_{k}} \int C_{q}\bigl(q^{1/2}w_{k} x\bigr)\, d_{q}x + \int\biggl(\frac {1}{1+q}-\frac{1}{2}\biggr)\, d_{q}x \Biggr]+C_{2}. \end{aligned} $$

This implies

$$ e_{2}(x;q)= [2] \Biggl[\frac{-2 (1-q)^{2}}{\sqrt{q}} \sum _{k=1}^{\infty} \frac{L_{k}}{w_{k}^{2}} S_{q}(w_{k} x)+ \biggl(\frac{q}{1+q}-\frac{q}{2}\biggr)x \Biggr]+C_{2}. $$

In the last equation putting $x=0$, we get $C_{2}=0$, and hence the theorem. □

Corollary 4.13

For $x\in A^{*}_{q}$, the following holds:

$$e_{2}(x;q)= \frac{[2]}{q} \biggl[ \int_{0}^{1} G\bigl(x,q^{2}t\bigr)\, d_{q}t + \biggl(\frac {q}{1+q}-\frac{q}{2}\biggr)x \biggr]. $$

Proof

The proof follows immediately from Lemma 4.2 and Theorem 4.12. □

Remark 4.14

From Equation (3.9), we have

$$B_{n}(x) = \int_{0}^{1} G_{n}\bigl(x,q^{2}t \bigr) \,d_{q}t - q^{2} \int_{0}^{1} t G_{n}\bigl(x,q^{2}t \bigr) \,d_{q}t. $$

Thus, by using Corollary 4.13 and Equation (3.8), we obtain the following relation:

$$ B_{1}(x)+ q^{2}A_{1}(x)=q \biggl[ \frac{e_{2}(x;q)}{[2]}+ \biggl(\frac{1}{2}-\frac {1}{1+q}\biggr)x \biggr]. $$

(4.15)

If $q\rightarrow1$, Equation (4.15) coincides with the result which is given by Agarwal and Wong [3] in the classical case.

5 An application: q-boundary value problems

The q-difference equations are important in q-calculus. This subject initiated in the first quarter of the twentieth century [10–13], and it has been developed over the years. Recently, many authors have studied the existence and uniqueness of solutions for some problems of q-difference equations, for instance, see [7, 14–20].

The goal of this section is to solve the boundary value problem (1.1)-(1.2) by using the q-Lidstone expansion theorem. The results here attained are the q-analogue of those given by Agarwal and Wong [3], where they studied the existence of solutions for

$$\left \{ \textstyle\begin{array}{l} (-1)^{n} x^{(2m)} (t)=f(t,x(t),x'(t),\ldots,x^{(k)}(t)), \\ x^{(2i)}(0)=a_{i}, \\ x^{(2i)}(1)=b_{i}, \end{array}\displaystyle \right . $$

where $0\leq k\leq2m-1$ and $i=0,1,\ldots,m-1$ with some conditions imposed on f and x.

For our purpose, let us define two constants C and C̃ as in Proposition 4.9 and Proposition 4.10, respectively, and we introduce the following assumptions:

$H_{1}$: $K_{j}$, $0\leq j\leq k$ are given real numbers, and define the nonzero constant M to be the maximum of $|\phi(x,y_{0}, y_{1}, y_{2}, \ldots , y_{k})|$ on the compact set $A^{*}_{q} \times E$, where

$$\begin{gathered} E=\bigl\{ (y_{0}, y_{1}, y_{2}, \ldots , y_{k}), |y_{j} |\leq2K_{j}, 0\leq j\leq k\bigr\} . \\ H_{2} : \frac{(1-q)^{2(n-j)}}{q^{(n-j)(n-j-3/2)}} M C \leq K_{2j}, \quad j=0,1,2,\ldots,\frac{k}{2}; \\ H_{3} : \frac{(1-q)^{2(n-j-1)}}{q^{(n-j-1)(n-j-5/2)}} M \widetilde {C}\leq K_{2j+1}, \quad j=0,1,2,\ldots,\frac{k-1}{2}; \\ H_{4} : \max\bigl\{ |\gamma_{j}|, |\beta_{j}| \bigr\} + \sum_{i=1}^{n-j-1} \max\bigl\{ |\gamma_{i+j}|, |\beta_{i+j}| \bigr\} \frac {(1-q)^{2i}}{q^{i(i-3/2)}} C \leq K_{2j}; \\ H_{5} : |\gamma_{j} + \beta_{j} |+ \widetilde{C} \sum_{i=1}^{n-j-1} \max\bigl\{ |\gamma_{i+j}|, |\beta_{i+j}| \bigr\} \frac {(1-q)^{2(i-1)}}{q^{(i-1)(i-5/2)}}\leq K_{2j+1}. \end{gathered} $$

The proof of the existence results for boundary value problem (1.1)-(1.2) depends on q-Lidstone polynomials and the Arzela-Ascoli theorem [21].

Theorem 5.1

Let $q\in(0,1)$ and $y\in C_{q^{-1}}^{n} ( A^{*}_{q})$ be a real or complex-valued function. Assume that assumptions $H_{1}$, $H_{2}$, $H_{3}$ and $H_{4}$ hold. Then the boundary value problem (1.1)-(1.2) has a solution in E.

Proof

By using Theorem 3.3, we conclude that the boundary value problem (1.1)-(1.2) is equivalent to the following Fredholm q-integral equation:

$$ y(x)= \sum_{i=0}^{n-1} \bigl[ \gamma_{i} A_{i}(x)+ \beta_{i} B_{i}(x) \bigr]+ \int_{0}^{1} G_{n}\bigl(x,q^{2}t \bigr) \phi\bigl(t,y(t), \ldots , D_{q^{-1}}^{k}y(t)\bigr)\, d_{q}t. $$

(5.1)

Hence, this problem can be interpreted as a fixed point for the mapping $T: C_{q^{-1}}^{k} (A^{*}_{q})\rightarrow C_{q^{-1}}^{2n} (A^{*}_{q})$ which is defined by

$$ (Ty) (x)= \sum_{i=0}^{n-1} \bigl[\gamma_{i} A_{i}(x)+\beta_{i} B_{i}(x) \bigr]+ \int_{0}^{1} \big|G_{n}\bigl(x,q^{2}t \bigr)\big|\phi\bigl(t,y(t),\ldots,D_{q^{-1}}^{k}y(t)\bigr)\, d_{q}t. $$

(5.2)

We define the set

$$ J\bigl(A^{*}_{q}\bigr):= \Bigl\{ y(x)\in C_{q^{-1}}^{k} \bigl(A^{*}_{q}\bigr): \big\| D_{q^{-1}}^{j}y\big\| = \max _{0\leq x\leq1}\big| D_{q^{-1}}^{j}y(x)\big| \leq2K_{j}, \, 0\leq j\leq k\Bigr\} . $$

Notice that $J (A^{*}_{q})$ is a closed subset of the space $C_{q^{-1}}^{k} (A^{*}_{q})$. We prove that T maps $J(A^{*}_{q})$ into itself.

Let $y(x)\in J(A^{*}_{q})$. Then, from Equation (5.2), Remark 3.4, Proposition 4.9 and hypotheses $H_{1}$, $H_{2}$ and $H_{4}$, we get

$$ \begin{aligned}[b] \big|D^{(2j)}_{q^{-1}}(Ty) (x) \big| \leq{}&\sum_{i=0}^{n-j-1} \big| \gamma_{i+j} A_{i}(x)+ \beta_{i+j} B_{i}(x) \big|+ M \int_{0}^{1} \big|G_{n-j}\bigl(x,q^{2}t \bigr)\big| \, d_{q}t \\ \leq{}&|\gamma_{j} x|+ \big|\beta_{j}(1-x)\big|+ \sum _{i=1}^{n-j-1} \bigg| \gamma _{i+j} \int_{0}^{1} \bigl(q^{2}t\bigr) G_{i}\bigl(x,q^{2}t\bigr) \, d_{q}t + \beta_{i+j} \\ &\times \int_{0}^{1} \bigl(1-q^{2}t\bigr) G_{i}\bigl(x,q^{2}t\bigr) \,d_{q}t \bigg| + M \int _{0}^{1} \big|G_{n-j}\bigl(x,q^{2}t \bigr)\big| \,d_{q}t \\ \leq{}&\sup_{x\in A^{*}_{q}} \bigl[|\gamma_{j} x|+ \big| \beta_{j}(1-x)\big| \bigr] + \sum_{i=1}^{n-j-1} \max\bigl\{ |\gamma_{i+j}|, |\beta_{i+j}|\bigr\} \\ &\times \int_{0}^{1} \big|G_{i}\bigl(x,q^{2}t \bigr)\big| \, d_{q}t + M \int_{0}^{1} \big|G_{n-j}\bigl(x,q^{2}t \bigr)\big| \, d_{q}t \\ \leq{}&\max\bigl\{ |\gamma_{j}|, |\beta_{j}| \bigr\} + \sum _{i=1}^{n-j-1} \max \bigl\{ |\gamma_{i+j}|, | \beta_{i+j}| \bigr\} \frac{(1-q)^{2i}}{q^{i(i-3/2)}} C \\ &+ \frac{(1-q)^{2(n-j)}}{q^{(n-j)(n-j-3/2)}} M C \leq2K_{2j}, \quad j=0,1,2,\ldots, \frac{k}{2}. \end{aligned} $$

(5.3)

Similarly, from Equation (5.2), Remark 3.4, Proposition 4.10 and hypotheses $H_{3}$ and $H_{5}$, we get

$$ \begin{aligned}[b] \big|D^{(2j+1)}_{q^{-1}}(Ty) (x) \big| \leq{}& |\gamma_{j} + \beta_{j} |+ \widetilde{C}\sum _{i=1}^{n-j-1} \max\bigl\{ |\gamma_{i+j}|, | \beta_{i+j}| \bigr\} \frac{(1-q)^{2(i-1)}}{q^{(i-1)(i-5/2)}} \\ &+ \frac{(1-q)^{2(n-j-1)}}{q^{(n-j-1)(n-j-5/2)}} M \widetilde{C} \\ \leq{}& K_{2j+1}+ K_{2j+1}= 2K_{2j+1}, \quad j=0,1,2,\ldots, \frac{k-1}{2}. \end{aligned} $$

(5.4)

This completes the proof of $T(J (A^{*}_{q}))\subseteq J (A^{*}_{q})$. Furthermore, from the inequalities (5.3) and (5.4) we conclude that the set

$$\bigl\{ D_{q^{-1}}^{j} (T)y(x): y(x)\in J \bigl(A^{*}_{q} \bigr), 0\leq j\leq k\bigr\} $$

is uniformly bounded and equicontinuous on $J (A^{*}_{q})$. Therefore, from the Arzela-Ascoli theorem $\overline{T(J (A^{*}_{q}))}$ is compact. It means that we can find a fixed point of T in E which satisfies the boundary value problem (1.1)-(1.2). □

Corollary 5.2

Assume that the function $\phi(x,y_{0}, y_{1}, \ldots , y_{k})$ satisfies the following condition on $A^{*}_{q} \times\mathbb{R}^{k+1}$:

$$ \big|\phi(x,y_{0}, y_{1}, \ldots , y_{k})\big|\leq L+ \sum_{j=0}^{k} L_{j} |y_{j}|^{\alpha_{j}}, $$

(5.5)

where L, $L_{j}$ are nonnegative constants, and $0\leq\alpha_{j}<1$. Then the boundary value problem (1.1)-(1.2) has a solution.

Proof

By using (5.5), for $y(x)\in J (A^{*}_{q})$, we get

$$\big|\phi\bigl(x,y(x), D_{q^{-1}}y(x), D_{q^{-1}}^{2}y(x), \ldots , D_{q^{-1}}^{k}y(x)\bigr)\big|\leq N, $$

where $N:= L+ \sum_{j=0}^{k} L_{j} (2K_{j})^{\alpha_{j}}$. Hence, the result follows by observing that the hypotheses of Theorem 5.1 are satisfied and replacing M by N such that $K_{j}$ ($0\leq j\leq k$) are sufficiently large. □

6 Conclusion

The goal of this paper is to study some properties of q-Lidstone polynomials by using Green’s function of certain q-differential systems and then to solve the following boundary value problem:

$$\begin{gathered} (-1)^{n} D_{q^{-1}}^{2n} y(x)= \phi\bigl(x,y(x), D_{q^{-1}}y(x), D_{q^{-1}}^{2}y(x), \ldots , D_{q^{-1}}^{k}y(x)\bigr), \\D_{q^{-1}}^{2j}y(0)= \beta_{j},\qquad D_{q^{-1}}^{2j}y(1)= \gamma_{j}\quad (\beta _{j},\gamma_{j} \in\mathbb{C}, j=0,1,\ldots,n-1),\end{gathered} $$

where $n\in\mathbb{N}$ and $0\leq k\leq2n-1$.

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Department of Mathematics, Faculty of Science, King Saud University, Riyadh, Kingdom of Saudi Arabia
Zeinab Mansour
Department of Mathematics, Faculty of Science, Cairo University, Cairo, Egypt
Zeinab Mansour
Department of Natural and Engineering Science, Faculty of Applied Studies and Community Service, King Saud University, Riyadh, Kingdom of Saudi Arabia
Maryam Al-Towailb

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Mansour, Z., Al-Towailb, M. q-Lidstone polynomials and existence results for q-boundary value problems. Bound Value Probl 2017, 178 (2017). https://doi.org/10.1186/s13661-017-0908-4

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Received: 19 August 2017
Accepted: 14 November 2017
Published: 22 November 2017
DOI: https://doi.org/10.1186/s13661-017-0908-4

q-Lidstone polynomials and existence results for q-boundary value problems

Abstract

1 Introduction

2 Preliminaries

Proposition 2.1

Proposition 2.2

Theorem 2.3

Lemma 2.4

3 The Green’s function of a certain q-differential system

Theorem 3.1

Proof

Corollary 3.2

Proof

Theorem 3.3

Proof

Remark 3.4

4 Certain q-Fourier expansions

Lemma 4.1

Proof

Lemma 4.2

Proof

Lemma 4.3

Proof

Theorem 4.4

Remark 4.5

Theorem 4.6

Proof

Corollary 4.7

Corollary 4.8

Proof

Proposition 4.9

Proof

Proposition 4.10

Proof

Lemma 4.11

Proof

Theorem 4.12

Proof

Corollary 4.13

Proof

Remark 4.14

5 An application: q-boundary value problems

Theorem 5.1

Proof

Corollary 5.2

Proof

6 Conclusion

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