Exploring new geometric contraction mappings and their applications in fractional metric spaces

Haitham Qawaqneh; Hasanen A. Hammad; Hassen Aydi; Haitham Qawaqneh; Hasanen A. Hammad; Hassen Aydi

doi:10.3934/math.2024028

AIMS Mathematics

2024, Volume 9, Issue 1: 521-541. doi: 10.3934/math.2024028

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Research article

Exploring new geometric contraction mappings and their applications in fractional metric spaces

1.
Department of Mathematics, Faculty of Science and Information Technology, Al-Zaytoonah University of Jordan, Amman 11733, Jordan
2.
Department of Mathematics, Unaizah College of Sciences and Arts, Qassim University, Buraydah 52571, Saudi Arabia
3.
Department of Mathematics, Faculty of Science, Sohag University, Sohag 82524, Egypt
4.
Institut Supérieur d'Informatique et des Techniques de Communication, Université de Sousse, H. Sousse 4000, Tunisia
5.
China Medical University Hospital, China Medical University, Taichung 40402, Taiwan
6.
Department of Mathematics and Applied Mathematics, Sefako Makgatho Health Sciences University, Ga-Rankuwa, South Africa

Received: 14 September 2023 Revised: 10 November 2023 Accepted: 20 November 2023 Published: 30 November 2023
MSC : 34B15, 47H10, 54H25

This article delves deeply into some mathematical basic theorems and their diverse applications in a variety of domains. The major issue of interest is the Banach Fixed Point Theorem (BFPT), which states the existence of a unique fixed point in fractional metric spaces. The significance of this theorem stems from its utility in a variety of mathematical situations for approximating solutions and resolving iterative problems. On this foundational basis, the study expands by introducing the concept of fractional geometric contraction mappings, which provide a new perspective on how convergence develops in fractional metric spaces.

Keywords:

Citation: Haitham Qawaqneh, Hasanen A. Hammad, Hassen Aydi. Exploring new geometric contraction mappings and their applications in fractional metric spaces[J]. AIMS Mathematics, 2024, 9(1): 521-541. doi: 10.3934/math.2024028

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Abstract

1. Introduction

In 2005, Rodríguez ^[1] used the Lyapunov-Schmidt method and Brower fixed-point theorem to discuss the following discrete Sturm-Liouville boundary value problem

$\begin{aligned} \begin{cases} \Delta[p(t-1)\Delta y(t-1)]+q(t)y(t)+\lambda y(t) = f(y(t)), \ t\in[a+1, b+1]_{\mathbb{Z}}, \\ a_{11}y(a)+a_{12}\Delta y(a) = 0, \ a_{21}y(b+1)+a_{22}\Delta y(b+1) = 0, \end{cases} \end{aligned}$

where $\lambda$ is the eigenvalue of the corresponding linear problem and the nonlinearity $f$ is bounded.

Furthermore, in 2007, Ma ^[2] studied the following discrete boundary value problem

$\begin{aligned} \begin{cases} \Delta[p(t-1)\Delta y(t-1)]+q(t)y(t)+\lambda y(t) = f(t, y(t))+ h(t), \ t\in[a+1, b+1]_{\mathbb{Z}}, \\ a_{11}y(a)+a_{12}\Delta y(a) = 0, \ a_{21}y(b+1)+a_{22}\Delta y(b+1) = 0, \end{cases} \end{aligned}$

where $f$ is subject to the sublinear growth condition

$|f(t, s)|\leq A|s|^{\alpha}+B, s\in \mathbb{R}$

for some $0\leq\alpha < 1$ and $A, B\in (0, \infty)$ . Additional results to the existence of solutions to the related continuous and discrete problems on the nonresonance and the resonance can be found in ^{[3,4,5,6,7,8,9,10,11,12,13]} and the references therein. For example, Li and Shu ^[14] considered the existence of solutions to the continuous Sturm-Liouville problem with random impulses and boundary value problems using the Dhage's fixed-point theorem and considered the existence of upper and lower solutions to a second-order random impulsive differential equation in ^[15] using the monotonic iterative method.

Inspired by the above literature, we use the solution set connectivity theory of compact vector field ^[16] to consider the existence of solutions to discrete resonance problems

$\begin{align} \begin{aligned} \begin{cases} -\Delta[p(t-1)\Delta y(t-1)]+q(t)y(t) = \lambda_{k}r(t)y(t)\\ \quad+f(t, y(t))+\gamma\psi_{k}(t)+\overline{g}(t), \ \ \ t\in[1, T]_{\mathbb{Z}}, \\ (a_{0}\lambda_{k}+b_{0})y(0) = (c_{0}\lambda_{k}+d_{0})\Delta y(0), \\ (a_{1}\lambda_{k}+b_{1})y(T+1) = (c_{1}\lambda_{k}+d_{1})\nabla y(T+1), \end{cases} \end{aligned} \end{align}$

(1.1)

where $p:[0, T]_{\mathbb{Z}}\rightarrow (0, \infty), \ q:[1, T]_{\mathbb{Z}}\rightarrow \mathbb{R}$ , $\overline{g}:[1, T]_{\mathbb{Z}}\rightarrow \mathbb{R}$ , $r(t) > 0, \ t\in[1, T]_{\mathbb{Z}}$ , $(\lambda_{k}, \psi_{k})$ is the eigenpair of the corresponding linear problem

$\begin{align} \begin{aligned} \begin{cases} -\Delta[p(t-1)\Delta y(t-1)]+q(t)y(t) = \lambda r(t)y(t), \ t\in[1, T]_{\mathbb{Z}}, \\ (a_{0}\lambda+b_{0})y(0) = (c_{0}\lambda+d_{0})\Delta y(0), \\ (a_{1}\lambda+b_{1})y(T+1) = (c_{1}\lambda+d_{1})\nabla y(T+1). \end{cases} \end{aligned} \end{align}$

(1.2)

It is worth noting that the difference between the problem (1.1) and the above questions is the eigenvalue that not only appears in the equation but also in the boundary conditions, which causes us considerable difficulties. Furthermore, it should be noted that these problems also apply to a number of physical problems, including those involving heat conduction, vibrating strings, and so on. For instance, Fulton and Pruess ^[17] discussed a kind of heat conduction problem, which has the eigenparameter-dependent boundary conditions. However, to discuss this kind of problem, we should know the spectrum of the problem (1.2). Fortunately, in 2016, Gao and Ma ^[18] obtained the eigenvalue theory of problem (1.2) under the conditions listed as follows:

$({\rm{A}}_{1})$ $\delta_{0}: = a_{0}d_{0}-b_{0}c_{0} < 0, \, c_{0}\neq0$ , $d_{1}-b_{1}\neq0,$

$({\rm{A}}_{2})$ $\delta_{1}: = a_{1}d_{1}-b_{1}c_{1} > 0, \, c_{1}\neq0$ , $b_{0}+d_{0}\neq0,$

which laid a theoretical foundation for this paper.

Under the conditions $({\rm{A}}_{1})$ and $(A_{2})$ , we assume the following conditions hold:

$({\rm{H}}_{1})$ (Sublinear growth condition) $f:[1, T]_{\mathbb{Z}}\times\mathbb{R}\rightarrow \mathbb{R}$ is continuous and there exist $\alpha\in[0, 1)$ and $A, B\in(0, \infty)$ , such that

$|f(t, y)|\leq A|y|^{\alpha}+B,$

$({\rm{H}}_{2})$ (Symbol condition) There exists $\omega > 0$ , such that

$\begin{align} yf(t, y) > 0, \, \; \; \; \; \; \; \; \; \; \; \; t\in[1, T]_{\mathbb{Z}}\; \mbox{for}\; |y| > \omega, \end{align}$

(1.3)

$\begin{align} yf(t, y) < 0, \, \; \; \; \; \; \; \; \; \; \; \; t\in[1, T]_{\mathbb{Z}}\; \mbox{for}\; |y| > \omega, \end{align}$

(1.4)

$({\rm{H}}_{3})$ $\overline{g}:[1, T]_{\mathbb{Z}}\rightarrow \mathbb{R}$ satisfies

$\begin{align} \sum\limits_{s = 1}^{T}\overline{g}(s)\psi_{k}(s) = 0, \end{align}$

(1.5)

$({\rm{H}}_{4})$ $f:[1, T]_{\mathbb{Z}}\times\mathbb{R}\rightarrow \mathbb{R}$ is continuous and

$\lim\limits_{|y|\rightarrow \infty}f(t, y) = 0$

uniformly for $t\in[1, T]_{\mathbb{Z}}$ .

The organization of this paper is as follows. In the second section, we construct a completely new inner product space. In the new inner product space, we discuss the basic self-adjointness of the corresponding linear operator and the properties of the eigenpair of (1.2). Finally, under the above properties, the Lyapunov-Schmidit method is used to decompose the inner product space and transform our problem to an equivalent system, that is to say, finding the solutions of (1.1) is equivalent to finding the solutions of this system. Under the sublinear condition and sign conditions on nonlinear terms, an existence result of solutions to the problem (1.1) is obtained using Schauder's fixed-point theorem and the connectivity theories of the solution set of compact vector fields. Based on the first result, the existence of two solutions to the problem (1.1) is also obtained in this section.

2. Preliminaries

Definition 2.1. (^[19]) A linear operator $P$ from the linear space $X$ to itself is called the projection operator, if $P^{2} = P.$

Lemma 2.2. (^[16]) Let $\mathcal{C}$ be a bounded closed convex set in Banach space $E$ , $T:[\alpha, \beta]\times\mathcal{C}\rightarrow \mathcal{C}(\alpha < \beta)$ be a continuous compact mapping, then the set

$S_{\alpha, \beta} = \{(\rho, x)\in[\alpha, \beta]\times\mathcal{C}|T(\rho, x) = x\}$

contains a connected branch connecting $\{\alpha\}\times\mathcal{C}$ and $\{\beta\}\times\mathcal{C}$ .

Lemma 2.3. (^[20])(Schauder) Let $D$ be a bounded convex closed set in $E$ , $A:D\rightarrow D$ is completely continuous, then $A$ has a fixed point in $D$ .

First, we construct the inner product space needed in this paper.

Let

$Y: = \{u|u:[1, T]_{\mathbb{Z}}\rightarrow \mathbb{R}\},$

then $Y$ is a Hilbert space under the following inner product

$\langle y, z\rangle_{Y} = \sum\limits_{t = 1}^{T} y(t)z(t)$

and its norm is $\|y\|_{Y}: = \sqrt{\langle y, y\rangle_{Y}}$ .

Furthermore, consider the space $H: = Y\oplus\mathbb{R}^{2}$ . Define the inner product as follows:

$\langle[y, \alpha , \beta]^{\top}, [z, \zeta, \rho]^{\top} \rangle = \langle y , z\rangle_{Y}+\frac{p(0)}{|\delta_{0}|}\alpha\zeta+\frac{p(T)}{|\delta_{1}|}\beta\rho,$

which norm is defined as

$\|y^{*}\| = \langle[y, \alpha, \beta]^{\top}, [y, \alpha, \beta]^{\top}\rangle^{\frac{1}{2}},$

where $\top$ is transposition to a matrix.

Let

$y_{0, 0} = b_{0}y(0)-d_{0}\Delta y(0), \ y_{0, 1} = a_{0}y(0)-c_{0}\Delta y(0)$

and

$y_{T+1, 0} = b_{1}y(T+1)-d_{1}\nabla y(T+1), \ y_{T+1, 1} = a_{1}y(T+1)-c_{1}\nabla y(T+1).$

For $y^{*} = [y, \alpha, \beta]^{\top}$ , define an operator $L:D\rightarrow H$ as follows:

$Ly^{*} = \left[ \begin{array}{cc} -\Delta[p(t-1)\Delta y(t-1)]+q(t)y(t) \\ -y_{0, 0}\\ -y_{T+1, 0} \\ \end{array} \right]: = \left[ \begin{array}{cc} Ly \\ -y_{0, 0}\\ -y_{T+1, 0} \\ \end{array} \right],$

where $D = \left\{[y, \alpha, \beta]^{\top}:y\in Y, \ y_{0, 1} = \alpha, \ y_{T+1, 1} = \beta\right\}.$ Define $S:D\rightarrow H$ as follows:

$Sy^{*} = S \left[ \begin{array}{cc} y \\ \alpha\\ \beta \\ \end{array} \right] = \left[ \begin{array}{cc} ry \\ \alpha\\ \beta \\ \end{array} \right].$

Then, the problem (1.2) is equivalent to the eigenvalue problem as follows:

$\begin{align} Ly^{*} = \lambda Sy^{*}, \end{align}$

(2.1)

that is, if $(\lambda_{k}, y)$ is the eigenpair of the problem (1.2), then $(\lambda_{k}, y^{*})$ is the eigenpair of the opertor $L$ . Conversely, if $(\lambda_{k}, y^{*})$ is the eigenpair of the operator $L$ , then $(\lambda_{k}, y)$ is the eigenpair of the problem (1.2).

Eventually, we define $\mathcal{A}:D\rightarrow H$ as follows:

$\mathcal{A}y^{*} = \mathcal{F}(t, y^{*})+[\gamma \psi_{k}+\overline{g}, 0, 0]^{\top},$

where $\mathcal{F}(t, y^{*}) = \mathcal{F}(t, [y, \alpha, \beta]^{\top}) = [f(t, y), 0, 0]^{\top}$ . Obviously, the solution of the problem (1.1) is equivalent to the fixed point of the following operator

$\begin{align} Ly^{*} = \lambda_{k}Sy^{*}+\mathcal{A}y^{*}. \end{align}$

(2.2)

It can be seen that there is a homomorphism mapping $(\lambda_{k}, y)\leftrightarrow(\lambda_{k}, y^{*})$ between the problem (1.1) and the operator Eq (2.2).

Next, we are committed to obtaining the orthogonality of the eigenfunction.

Lemma 2.4. Assume that $(\lambda, y^{*})$ and $(\mu, z^{*})$ are eigenpairs of $L$ , then

$\langle y^{*}, Lz^{*}\rangle-\langle Ly^{*}, z^{*}\rangle = (\mu-\lambda)\langle y^{*}, Sz^{*}\rangle.$

Proof Let $y^{*} = [y, \alpha, \beta]^{\top}\in D, \ z^{*} = [z, \zeta, \rho]^{\top}\in D$ , then

$\begin{align} \begin{aligned} \langle y^{*}, Lz^{*}\rangle& = \langle [y, \alpha, \beta ]^{\top}, [Lz , -z_{0, 0}, -z_{T+1, 0} ]^{\top} \rangle\\ & = \langle y, Lz\rangle_{Y}+\frac{p(0)}{|\delta_{0}|}\alpha(-z_{0, 0})+\frac{p(T)}{|\delta_{1}|}\beta(-z_{T+1, 0})\\ & = \mu\langle y, rz\rangle_{Y}+\frac{p(0)}{|\delta_{0}|}\alpha(\mu\zeta)+\frac{p(T)}{|\delta_{1}|}\beta(\mu\rho)\\ & = \mu\langle y^{*}, Sz^{*}\rangle. \end{aligned} \end{align}$

(2.3)

Similarly, we have

$\begin{align} \begin{aligned} \langle Ly^{*}, z^{*}\rangle& = \langle [Ly, -y_{0, 0}, -y_{T+1, 0}]^{\top}, [z, \zeta, \rho]^{\top} \rangle\\ & = \langle Ly, z\rangle_{Y}+\frac{p(0)}{|\delta_{0}|}(-y_{0, 0})\zeta+\frac{p(T)}{|\delta_{1}|}(-y_{T+1, 0})\rho\\ & = \lambda\langle ry, z\rangle_{Y}+\frac{p(0)}{|\delta_{0}|}\lambda\alpha\zeta+\frac{p(T)}{|\delta_{1}|}\lambda\beta\rho\\ & = \lambda\langle y^{*}, Sz^{*}\rangle. \end{aligned} \end{align}$

(2.4)

It can be seen from (2.3) and (2.4)

$\langle y^{*}, Lz^{*}\rangle-\langle Ly^{*}, z^{*}\rangle = (\mu-\lambda)\langle y^{*}, Sz^{*}\rangle.$

□

Lemma 2.5. The operator $L$ is the self-adjoint operator in $H$ .

Proof For $y^{*} = [y, \alpha, \beta]^{\top}\in D, \, z^{*} = [z, \zeta, \rho]^{\top}\in D$ , we just need to prove that $\langle y^{*}, Lz^{*}\rangle = \langle Ly^{*}, z^{*}\rangle$ . By the definition of inner product in $H$ . we obtain

$\langle y^{*}, Lz^{*}\rangle = \langle y, Lz\rangle_{Y}+\frac{p(0)}{|\delta_{0}|}\alpha(-z_{0, 0})+\frac{p(T)}{|\delta_{1}|}\beta(-z_{T+1, 0}),$

and

$\langle Ly^{*}, z^{*}\rangle = \langle Ly, z\rangle_{Y}+\frac{p(0)}{|\delta_{0}|} (-y_{0, 0})\zeta+\frac{p(T)}{|\delta_{1}|}(-y_{T+1, 0})\rho.$

Therefore,

$\begin{aligned} \langle y^{*}, Lz^{*}\rangle-\langle Ly^{*}, z^{*}\rangle& = \langle y, Lz\rangle_{Y}-\langle Ly, z\rangle_{Y} +\frac{p(0)}{|\delta_{0}|}[\alpha(-z_{0, 0})-(-y_{0, 0})\zeta]\\ &+\frac{p(T)}{|\delta_{1}|}[\beta(-z_{T+1, 0})- (-y_{T+1, 0})\rho], \end{aligned}$

where

$\begin{aligned} \langle y, Lz\rangle_{Y}& = \sum\limits_{t = 1}^{T}y(t)(-\Delta[p(t-1)\Delta z(t-1)]+q(t)z (t))\\ & = \sum\limits_{t = 1}^{T}y(t)p(t-1)\Delta z(t-1)-\sum\limits_{t = 1}^{T}y(t)p(t)\Delta z(t)+\sum\limits_{t = 1}^{T}q(t)y(t)z(t)\\ & = \sum\limits_{t = 0}^{T-1}y(t+1)p(t)\Delta z(t)-\sum\limits_{t = 1}^{T}y(t)p(t)\Delta z(t)+\sum\limits_{t = 1}^{T}q(t)y(t)z(t)\\ & = \sum\limits_{t = 0}^{T-1}p(t)\Delta y(t)\Delta z(t) +p(0)y(0)\Delta z(0)-p(T)y(T)\Delta z(T)\\ &+\sum\limits_{t = 1}^{T}q(t)y(t)z(t) \end{aligned}$

and

$\begin{aligned} \langle Ly, z\rangle_{Y} = &\sum\limits_{t = 0}^{T-1}p(t)\Delta y(t)\Delta z(t) +p(0)\Delta y(0) z(0)-p(T)\Delta y(T)z(T)\\ &+\sum\limits_{t = 1}^{T}q(t)y(t)z(t). \end{aligned}$

Moreover, from

$\begin{aligned} \alpha(-z_{0, 0})-(-y_{0, 0})\zeta & = [a_{0}y(0)-c_{0}\Delta y(0)][d_{0}\Delta z(0)-b_{0}z(0)]\\ &-[d_{0}\Delta y(0)-b_{0}y(0)][a_{0}z(0)-c_{0}\Delta z(0)]\\ & = (a_{0}d_{0}-b_{0}c_{0})[y(0)\Delta z(0)-\Delta y(0)z(0)] \end{aligned}$

and

$\begin{aligned} &\beta(-z_{T+1, 0})-(-y_{T+1, 0})\rho\\ & = [a_{1}y(T+1)-c_{1}\nabla y(T+1)][-b_{1}z(T+1)+d_{1}\nabla z(T+1)]\\ &-[-b_{1}y(T+1)+d_{1}\nabla y(T+1)][a_{1}z(T+1)-c_{1}\nabla z(T+1)]\\ & = (a_{1}d_{1}-b_{1}c_{1})[y(T+1)\nabla z(T+1)-\nabla y(T+1)z(T+1)], \end{aligned}$

we have

$\begin{aligned} \langle y^{*}, Lz^{*}\rangle-\langle Ly^{*}, z^{*}\rangle& = p(0)\left| \begin{array}{cc} y(0) & \Delta y(0)\\ z(0) & \Delta z(0) \\ \end{array} \right|-p(T)\left| \begin{array}{cc} y(T) & \Delta y(T) \\ z(T) & \Delta z(T)\\ \end{array} \right|\\ &-p(0)\left| \begin{array}{cc} y(0) & \Delta y(0)\\ z(0) & \Delta z(0) \\ \end{array} \right|\\ &+p(T)\left| \begin{array}{cc} y(T+1) & \nabla y(T+1) \\ z(T+1) & \nabla z(T+1)\\ \end{array} \right|\\ & = 0. \end{aligned}$

□

In order to obtain the orthogonality of the eigenfunction, we define a weighted inner product related to the weighted function $r(t)$ in $H$ . First, we define the inner product in $Y$ as $\langle y, z\rangle_{r} = \sum\limits_{t = 1}^{T}r(t)y(t)z(t)$ .

Similarly, the inner product associated with the weight function $r(t)$ in the space $H$ is defined as follows:

$\langle [y, \alpha, \beta ]^{\top}, [z, \zeta, \rho ]^{\top}\rangle_{r} = \langle y , z\rangle_{r}+\frac{p(0)}{|\delta_{0}|}\alpha\zeta+\frac{p(T)}{|\delta_{1}|}\beta\rho.$

Lemma 2.6. (Orthogonality theorem) Assume that $({\rm{A}}_{1})$ and $(A_{2})$ hold. If $(\lambda, y^{*})$ and $(\mu, z^{*})$ are two different eigenpairs corresponding to $L$ , then $y^{*}$ and $z^{*}$ are orthogonal under the weight inner product related to the weight function $r(t)$ .

Proof Assume that $(\lambda, y^{*})$ and $(\mu, z^{*})$ is the eigenpair of $L$ , then it can be obtained from Lemmas 2.4 and 2.5

$0 = (\mu-\lambda)\langle y^{*}, Sz^{*}\rangle = (\mu-\lambda)\langle y^{*}, z^{*}\rangle_{r}.$

Therefore, if $\lambda\neq\mu$ , then $\langle y^{*}, z^{*}\rangle_{r} = 0$ , which implies that $y^{*}$ and $z^{*}$ are orthogonal to the inner product defined by the weighted function $r(t)$ . □

Lemma 2.7. (^[18]) Suppose that $({\rm{A}}_{1})$ and $(A_{2})$ hold. Then (1.2) has at least $T$ or at most $T+2$ simple eigenvalues.

In this paper, we consider that $\lambda_{k}$ is a simple eigenvalue, that is, the eigenspace corresponding to each eigenvalue is one-dimensional. Let $\psi_{k}^{*} = [\psi_{k}, \alpha, \beta]^{\top}\in D$ be the eigenfunction corresponding to $\lambda_{k}$ , and assume that it satisfies

$\begin{align} \langle\psi_{k}^{*}, \psi_{k}^{*}\rangle = 1. \end{align}$

(2.5)

Denote by $\mathcal{L}: = L-\lambda_{k}S$ , then the operator (2.2) is transformed into

$\begin{align} \mathcal{L}y^{*} = \mathcal{A}y^{*}. \end{align}$

(2.6)

Define $\mathcal{P}: D\rightarrow D$ by

$\begin{equation*} (\mathcal{P}x^{*})(t) = \psi_{k}^{*}(t)\langle\psi_{k}^{*}(t), x^{*}(t)\rangle. \end{equation*}$

Lemma 2.8. $\mathcal{P}$ is a projection operator and ${\rm Im}(\mathcal{P}) = \rm Ker(\mathcal{L}).$

Proof Obviously, $\mathcal{P}$ is a linear operator, next, we need to prove $\mathcal{P}^{2} = \mathcal{P}$ .

$\begin{aligned} (\mathcal{P}^{2}x^{*})(t)& = \mathcal{P}(\mathcal{P}x^{*})(t) = \psi_{k}^{*}(t)\langle\psi_{k}^{*}(t), \mathcal{P}x^{*}(t)\rangle\\ & = \psi_{k}^{*}(t)\langle\psi_{k}^{*}(t), \psi_{k}^{*}(t)\langle\psi_{k}^{*}(t), x^{*}(t)\rangle\rangle\\ & = \psi_{k}^{*}(t)\langle\psi_{k}^{*}(t), x^{*}(t)\rangle\langle\psi_{k}^{*}(t), \psi_{k}^{*}(t)\rangle\\ & = \psi_{k}^{*}(t)\langle\psi_{k}^{*}(t), x^{*}(t)\rangle\\ & = (\mathcal{P}x^{*})(t). \end{aligned}$

It can be obtained from the Definition 2.1, $\mathcal{P}$ is a projection operator. In addition, ${\rm Im}(\mathcal{P}) = {\rm span}\{\psi_{k}^{*}\} = {\rm Ker}(\mathcal{L})$ . □

Define $\mathcal{H}: H\rightarrow H$ by

$\mathcal{H}\left(\left[ \begin{array}{cc} y \\ \alpha\\ \beta\\ \end{array} \right]\right) = \left[ \begin{array}{cc} y \\ \alpha\\ \beta\\ \end{array} \right]-\langle\left[ \begin{array}{cc} y \\ \alpha\\ \beta\\ \end{array} \right], \psi_{k}^{*}\rangle\psi_{k}^{*}.$

Lemma 2.9. $\mathcal{H}$ is a projection operator and $\rm Im(\mathcal{H}) = Im(\mathcal{L}).$

Proof Obviously, $\mathcal{H}$ is a linear operator, next, we need to prove that $\mathcal{H}^{2} = \mathcal{H}$ .

$\begin{aligned} \mathcal{H}^{2}\left(\left[ \begin{array}{cc} y \\ \alpha\\ \beta\\ \end{array} \right]\right)& = \mathcal{H}\left(\mathcal{H}\left[ \begin{array}{cc} y \\ \alpha\\ \beta\\ \end{array} \right]\right) = \mathcal{H}\left[ \begin{array}{cc} y \\ \alpha\\ \beta\\ \end{array} \right] -\langle \mathcal{H}\left[ \begin{array}{cc} y \\ \alpha\\ \beta\\ \end{array} \right], \psi_{k}^{*}\rangle\psi_{k}^{*}\\ & = \left[ \begin{array}{cc} y \\ \alpha\\ \beta\\ \end{array} \right]-\langle\left[ \begin{array}{cc} y \\ \alpha\\ \beta\\ \end{array} \right], \psi_{k}^{*}\rangle\psi_{k}^{*}\\ &-\langle\left[ \begin{array}{cc} y \\ \alpha\\ \beta\\ \end{array} \right] -\langle\left[ \begin{array}{cc} y \\ \alpha\\ \beta\\ \end{array} \right], \psi_{k}^{*}\rangle\psi_{k}^{*}, \psi_{k}^{*}\rangle\psi_{k}^{*}\\ & = \left[ \begin{array}{cc} y \\ \alpha\\ \beta\\ \end{array} \right]-2\langle\left[ \begin{array}{cc} y \\ \alpha\\ \beta\\ \end{array} \right], \psi_{k}^{*}\rangle\psi_{k}^{*} +\langle\langle\left[ \begin{array}{cc} y \\ \alpha\\ \beta\\ \end{array} \right], \psi_{k}^{*}\rangle\psi_{k}^{*}, \psi_{k}^{*}\rangle\psi_{k}^{*}\\ & = \left[ \begin{array}{cc} y \\ \alpha\\ \beta\\ \end{array} \right]-2\langle\left[ \begin{array}{cc} y \\ \alpha\\ \beta\\ \end{array} \right], \psi_{k}^{*}\rangle\psi_{k}^{*} +\langle\left[ \begin{array}{cc} y \\ \alpha\\ \beta\\ \end{array} \right], \psi_{k}^{*}\rangle\langle \psi_{k}^{*}, \psi_{k}^{*}\rangle\psi_{k}^{*}\\ & = \mathcal{H}\left(\left[ \begin{array}{cc} y \\ \alpha\\ \beta\\ \end{array} \right]\right). \end{aligned}$

It can be obtained from Definition 2.1 that $\mathcal{H}$ is a projection operator. On the one hand, for any $[y, \alpha, \beta]^{\top}\in H$ , we have

$\begin{aligned} \langle\mathcal{ H}\left[ \begin{array}{cc} y \\ \alpha\\ \beta\\ \end{array} \right], \psi_{k}^{*}\rangle& = \langle\left[ \begin{array}{cc} y \\ \alpha\\ \beta\\ \end{array} \right]-\langle\left[ \begin{array}{cc} y \\ \alpha\\ \beta\\ \end{array} \right], \psi_{k}^{*}\rangle\psi_{k}^{*}, \psi_{k}^{*}\rangle\\ & = \langle\left[ \begin{array}{cc} y \\ \alpha\\ \beta\\ \end{array} \right], \psi_{k}^{*}\rangle-\langle\langle\left[ \begin{array}{cc} y \\ \alpha\\ \beta\\ \end{array} \right], \psi_{k}^{*}\rangle\psi_{k}^{*}, \psi_{k}^{*}\rangle\\ & = 0, \end{aligned}$

thus, ${\rm{Im}}(\mathcal{H})\subset {\rm{Im}}(\mathcal{L})$ . On the other hand, for any $y^{*}\in {\rm{Im}}(\mathcal{L})$ , we have

$\langle y^{*}, \psi_{k}^{*}\rangle = 0.$

In summary, ${\rm{Im}}(\mathcal{H}) = {\rm{Im}}(\mathcal{L}).$ □

Denote that $I$ is a identical operator, then

$D = {\rm Im}(\mathcal{P})\oplus {\rm Im}(I-\mathcal{P}), \, H = {\rm Im}(\mathcal{H})\oplus {\rm Im}(I-\mathcal{H}).$

The restriction of the operator $\mathcal{L}$ on $\mathcal{L}|_{{\rm Im}(I-\mathcal{P})}$ is a bijection from ${\rm Im}(I-\mathcal{P})$ to ${\rm Im}(\mathcal{H})$ . Define $\mathcal{M}: {\rm Im} (\mathcal{H})\rightarrow {\rm Im}(I-\mathcal{P})$ by

$\mathcal{M}: = (\mathcal{L}|_{{\rm Im}(I-\mathcal{P})})^{-1}.$

It can be seen from ${\rm Ker}\mathcal{L} = {\rm span}\{\psi_{k}^{*}\}$ that there is a unique decomposition for any $y^{*} = [y, \alpha, \beta]^{\top}\in D$

$y^{*} = \rho \psi_{k}^{*}+x^{*},$

where $\rho\in \mathbb{R}, \, x^{*} = [x, \alpha, \beta]^{\top}\in{\rm Im}(I-\mathcal{P}).$

Lemma 2.10. The operator Eq (2.6) is equivalent to the following system

$\begin{align} x^{*} = \mathcal{MHA}(\rho\psi_{k}^{*}+x^{*}), \end{align}$

(2.7)

$\begin{align} \sum\limits_{t = 1}^{T}\psi_{k}(t)f(t, \rho\psi_{k}(t)+x(t)) = \gamma(\frac{p(0)}{|\delta_{0}|}\alpha^{2}+ \frac{p(T)}{|\delta_{1}|}\beta^{2}-1): = \theta, \end{align}$

(2.8)

where $\alpha = a_{0}\psi_{k}(0)-c_{0}\Delta\psi_{k}(0), \, \beta = a_{1}\psi_{k}(T+1)-c_{1}\nabla\psi_{k}(T+1).$

Proof (ⅰ) For any $y^{*} = \rho\psi^{*}_{k}+ x^{*}$ , we have

$\begin{aligned} \mathcal{L}y^{*} = \mathcal{A}y^{*}\ \ &\Longleftrightarrow \mathcal{H}(\mathcal{L}(\rho \psi^{*}_{k} +x^{*})-\mathcal{A}(\rho\psi^{*}_{k} +x^{*})) = 0 \\ &\Longleftrightarrow \mathcal{L}x^{*}-\mathcal{HA}(\rho\psi_{k}^{*} +x^{*}) = 0\\ &\Longleftrightarrow x^{*} = \mathcal{MHA}(\rho\psi_{k}^{*} +x^{*}).\, \ \end{aligned}$

(ⅱ) Since $\langle \mathcal{L}y^{*}, \psi_{k}^{*} \rangle = 0$ , we have $\langle\mathcal{A}y^{*}, \psi_{k}^{*}\rangle = 0$ . Therefore,

$\begin{aligned} &\langle f(t, y)+\gamma \psi_{k}+\overline{g}, \psi_{k}\rangle_{Y}\\ = &\sum\limits_{t = 1}^{T}f(t, \rho\psi_{k}(t)+x(t))\psi_{k}(t)+\sum\limits_{t = 1}^{T}\gamma \psi_{k}(t)\psi_{k}(t)+\sum\limits_{t = 1}^{T}\overline{g}(t)\psi_{k}(t)\\ = &0. \end{aligned}$

Combining $({\rm{H}}_{3})$ with (2.5), we have

$\sum\limits_{t = 1}^{T}\psi_{k}(t)f(t, \rho\psi_{k}(t)+x(t)) = \gamma(\frac{p(0)}{|\delta_{0}|}\alpha^{2}+ \frac{p(T)}{|\delta_{1}|}\beta^{2}-1) = \theta,$

where $\alpha = a_{0}\psi_{k}(0)-c_{0}\Delta\psi_{k}(0), \beta = a_{1}\psi_{k}(T+1)-c_{1}\nabla\psi_{k}(T+1).$ □

3. Main results

Let

$A^{+} = \{t\in\{1, 2, \cdots, T\}\ \mbox{s.t.}\ \psi_{k}(t) > 0\},$

$A^{-} = \{t\in\{1, 2, \cdots, T\}\ \mbox{s.t.}\ \psi_{k}(t) < 0\}.$

Obviously,

$A^{+}\cup A^{-}\neq\emptyset, \ \min\{|\psi_{k}(t)||t\in A^{+}\cup A^{-}\} > 0.$

Lemma 3.1. Supposed that $({\rm{H}}_{1})$ holds, then there exist constants $M_{0}$ and $M_{1}$ , such that

$\|x^{*}\| \leq M_{1}(|\rho|\|\psi_{k}\|_{Y})^{\alpha},$

where $(\rho, x^{*})$ is the solution of (2.7) and satisfies $|\rho|\geq M_{0}$ .

Proof Since

$\mathcal{A}(\rho\psi_{k}^{*} +x^{*}) = \mathcal{F}(t, \rho\psi_{k}^{*} +x^{*})+ [\gamma \psi_{k}+\overline{g}, 0, 0]^{\top} = [f(t, \rho\psi_{k}+x)+\gamma \psi_{k}+\overline{g}, 0, 0]^{\top},$

we have

$\begin{aligned} &\|x^{*}\| \\ \leq&\|\mathcal{M}\|_{ {\rm{Im}}(\mathcal{H})\rightarrow {\rm Im}(I-\mathcal{P})}\|\mathcal{H}\|_{H\rightarrow {\rm Im}(\mathcal{H})}[\|\overline{g}\|_{Y}+\gamma\|\psi_{k}\|_{Y} +A(|\rho|\|\psi_{k}\|_{Y}+\|x\|_{Y})^{\alpha}+B]\\ = &\|\mathcal{M}\|_{{\rm Im}(\mathcal{H})\rightarrow {\rm Im}(I-\mathcal{P})}\|\mathcal{H}\|_{H\rightarrow {\rm Im}(\mathcal{H})}\bigg[\|\overline{g}\|_{Y} +A(|\rho|\|\psi_{k}\|_{Y})^{\alpha}\left(1+\frac{\|x\|_{Y}}{|\rho|\|\psi_{k}\|_{Y}}\right)^{\alpha}+B-\theta \bigg]\\ \leq&\|\mathcal{M}\|_{{\rm Im}(\mathcal{H})\rightarrow {\rm Im}(I-\mathcal{P})}\|\mathcal{H}\|_{H\rightarrow {\rm Im}(\mathcal{H})}\bigg[\|\overline{g}\|_{Y} +A(|\rho|\|\psi_{k}\|_{Y})^{\alpha}\left(1+\frac{\alpha\|x\|_{Y}}{|\rho|\|\psi_{k}\|_{Y}}\right) +B-\theta\bigg]\\ = &\|\mathcal{M}\|_{{\rm Im}(\mathcal{H})\rightarrow {\rm Im}(I-\mathcal{P})}\|\mathcal{H}\|_{H\rightarrow {\rm Im}(\mathcal{H})}\bigg[\|\overline{g}\|_{Y}\\ &+A(|\rho|\|\psi_{k}\|_{Y})^{\alpha}\left(1+\frac{\alpha}{(|\rho|\|\psi_{k}\|_{Y})^{1-\alpha}}\frac{\|x\|_{Y}}{(|\rho|\|\psi_{k}\|_{Y})^{\alpha}} \right)+B-\theta \bigg].\, \ \end{aligned}$

Denote that

$\begin{aligned} D_{0}& = \|\mathcal{M}\|_{{\rm Im}(\mathcal{H})\rightarrow {\rm Im}(I-\mathcal{P})}\|\mathcal{H}\|_{H\rightarrow {\rm Im}(\mathcal{H})}(\|\overline{g}\|_{Y}+B-\theta), \\ D_{1}& = A\|\mathcal{M}\|_{{\rm Im}(\mathcal{H})\rightarrow {\rm Im}(I-\mathcal{P})}\|\mathcal{H}\|_{H\rightarrow {\rm Im}(\mathcal{H})}. \end{aligned}$

Furthermore, we have

$\begin{aligned} \frac{\|x^{*}\|}{(|\rho|\|\psi_{k}\|_{Y})^{\alpha}}&\leq\frac{D_{0}}{(|\rho|\|\psi_{k}\|_{Y})^{\alpha}}+ D_{1}+\frac{\alpha D_{1}}{(|\rho|\|\psi_{k}\|_{Y})^{1-\alpha}}\frac{\|x\|_{Y}}{(|\rho|\|\psi_{k}\|_{Y})^{\alpha}}\\ &\leq\frac{D_{0}}{(|\rho|\|\psi_{k}\|_{Y})^{\alpha}}+ D_{1}+\frac{\alpha D_{1}}{(|\rho|\|\psi_{k}\|_{Y})^{1-\alpha}}\frac{\|x^{*}\|}{(|\rho|\|\psi_{k}\|_{Y})^{\alpha}}. \end{aligned}$

So, if we let

$\frac{\alpha D_{1}}{(|\rho|\|\psi_{k}\|_{Y})^{1-\alpha}}\leq\frac{1}{2},$

we have

$|\rho|\geq\frac{(2\alpha D_{1})^{\frac{1}{1-\alpha}}}{\|\psi_{k}\|_{Y}}: = M_{0}.$

Thus,

$\frac{\|x^{*}\|}{(|\rho|\|\psi_{k}\|_{Y})^{\alpha}}\leq\frac{2D_{0}}{(M_{0}\|\psi_{k}\|_{Y})^{\alpha}}+ 2D_{1}: = M_{1}.$

This implies that

$\|x^{*}\| \leq M_{1}(|\rho|\|\psi_{k}\|_{Y})^{\alpha}.$

□

Lemma 3.2. Suppose that $({\rm{H}}_{1})$ holds, then there exist constants $M_{0}$ and $\Gamma$ , such that

$\|x^{*}\|\leq \Gamma(|\rho|\min\{|\psi_{k}(t)||t\in A^{+}\cup A^{-}\})^{\alpha},$

where $(\rho, x^{*})$ is the solution of (2.7) and satisfies $|\rho|\geq M_{0}$ .

According to Lemma 3.2, choose constant $\rho_{0}$ , such that

$\begin{align} \rho_{0} > \max\{M_{0}, \; \Gamma(|\rho_{0}|\min\{|\psi_{k}(t)||t\in A^{+}\cup A^{-}\})^{\alpha}\}. \end{align}$

(3.1)

Let

$K: = \left\{x^{*}\in {\rm Im}(I-\mathcal{P})|x^{*} = \mathcal{MHA} (\rho\psi_{k}^{*}+x^{*}), \, \, |\rho|\leq\rho_{0}\right\}.$

Then, for sufficiently large $\rho\geq\rho_{0}$ , there is

$\begin{align} \rho\psi_{k}(t)+x(t)\geq\omega, \ \forall\; t\in A^{+}, x^{*}\in K, \end{align}$

(3.2)

$\begin{align} \rho\psi_{k}(t)+x(t)\leq-\omega, \ \forall\; t\in A^{-}, x^{*}\in K, \end{align}$

(3.3)

and for sufficiently small $\rho\leq-\rho_{0}$ , there is

$\begin{align} \rho\psi_{k}(t)+x(t)\leq-\omega, \ \forall\; t\in A^{+}, x^{*}\in K, \end{align}$

(3.4)

$\begin{align} \rho\psi_{k}(t)+x(t)\geq \omega, \ \forall\; t\in A^{-}, x^{*}\in K. \end{align}$

(3.5)

Theorem 3.3. Suppose that $({\rm{A}}_{1})$ , $({\rm{A}}_{2})$ and $({\rm{H}}_{1})$ – $({\rm{H}}_{3})$ hold, then there exists a non-empty bounded set $\Omega_{\overline{g}}\subset\mathbb{R}$ , such that the problem (1.1) has a solution if and only if $\theta\in\Omega_{\overline{g}}$ . Furthermore, $\Omega_{\overline{g}}$ contains $\theta = 0$ and has a non-empty interior.

Proof We prove only the case of (1.3) in $({\rm{H}}_{2})$ , and the case of (1.4) can be similarly proved.

From (1.3) and (3.2)–(3.5), it is not difficult to see that

$f(t, \rho\psi_{k}(t)+x(t)) > 0, \ \ \ \forall\; t\in A^{+}, \ x^{*}\in K,$

$f(t, \rho\psi_{k}(t)+x(t)) < 0, \ \ \ \forall\; t\in A^{-}, \ x^{*}\in K,$

for sufficiently large $\rho\geq\rho_{0}$ and for sufficiently small $\rho\leq-\rho_{0}$ ,

$f(t, \rho\psi_{k}(t)+x(t)) < 0, \ \ \ \forall\; t\in A^{+}, \ x^{*}\in K,$

$f(t, \rho\psi_{k}(t)+x(t)) > 0, \ \ \ \forall\; t\in A^{-}, \ x^{*}\in K.$

Therefore, if $\rho\geq\rho_{0}$ is sufficiently large,

$\begin{align} \psi_{k}(t)f(t, \rho\psi_{k}(t)+x(t)) > 0, \ \forall\; t\in A^{+}\cup A^{-}, \ x^{*}\in K, \end{align}$

(3.6)

if $\rho\leq-\rho_{0}$ is sufficiently small,

$\begin{align} \psi_{k}(t)f(t, \rho\psi_{k}(t)+x(t)) < 0, \ \forall\; t\in A^{+}\cup A^{-}, \ x^{*}\in K. \end{align}$

(3.7)

Let

$\mathcal{C}: = \{x^{*}\in {\rm Im}(I-\mathcal{P})|\|x^{*}\|\leq\rho_{0}\}.$

Define $\mathcal{T}_{\rho}: {\rm Im}(I-\mathcal{P})\rightarrow {\rm Im}(I-\mathcal{P})$ by

$\mathcal{T}_{\rho}: = \mathcal{MHA}(\rho\psi_{k}^{*}+x^{*}).$

Obviously, $\mathcal{T}_{\rho}$ is completely continuous. By (3.1), for $x^{*}\in\mathcal{C}$ and $\rho\in[-\rho_{0}, \rho_{0}]$ ,

$\begin{aligned} \|\mathcal{T}_{\rho}x^{*}\|&\leq\Gamma(|\rho|\min\{|\psi_{k}(t)||t\in A^{+}\cup A^{-}\})^{\alpha}\\ &\leq\Gamma(|\rho_{0}|\min\{|\psi_{k}(t)||t\in A^{+}\cup A^{-}\})^{\alpha}\\ &\leq\rho_{0}, \end{aligned}$

i.e.,

$\mathcal{T}_{\rho}(\mathcal{C})\subseteq\mathcal{C}.$

According to Schauder's fixed point theorem, $\mathcal{T}_{\rho}$ has a fixed point on $\mathcal{C}$ , such that $\mathcal{T}_{\rho}x^{*} = x^{*}$ . It can be seen from Lemma 2.10 that the problem (1.1) is equivalent to the following system

$\Psi(s, x^{*}) = \theta, \ \ \ (s, x^{*})\in S_{\overline{g}},$

where

$S_{\overline{g}}: = \left\{(\rho, x^{*})\in \mathbb{R}\times {\rm Im}(I-\mathcal{P})| x^{*} = \mathcal{MHA} (\rho\psi_{k}^{*}+x^{*})\right\},$

$\Psi(\rho, x^{*}): = \sum\limits_{s = 1}^{T}\psi_{k}(s)f(s, \rho\psi_{k}(s)+x(s)).$

At this time, the $\Omega_{\overline{g}}$ in Theorem 3.3 can be given by $\Omega_{\overline{g}} = \Psi(S_{\overline{g}})$ . There exists a solution to the problem (1.1) for $\theta\in\Omega_{\overline{g}}$ .

From (3.6), (3.7) and $A^{+}\cup A^{-}\neq\emptyset$ , we can deduce that for any $x^{*}\in K$

$\sum\limits_{s = 1}^{T}\psi_{k}(s)f(s, -\rho_{0}\psi_{k}(s)+x(s)) < 0, \ \sum\limits_{s = 1}^{T}\psi_{k}(s)f(s, \rho_{0}\psi_{k}(s)+x(s)) > 0.$

Thus,

$\begin{align} \Psi(-\rho_{0}, x^{*}) < 0 < \Psi(\rho_{0}, x^{*}), \ \forall\; x^{*}\in K. \end{align}$

(3.8)

According to Lemma 2.2, $S_{\overline{g}}\subset\mathbb{R}\times \overline{B}_{\rho_{0}}$ contains a connected branch $\xi_{-\rho_{0}, \rho_{0}}$ connecting $\{-\rho_{0}\}\times\mathcal{C}$ and $\{\rho_{0}\}\times\mathcal{C}$ . Combined with (3.8), $\Omega_{\overline{g}}$ contains $\theta = 0$ and has a non-empty interior. □

Theorem 3.4. Suppose that $({\rm{A}}_{1})$ , $({\rm{A}}_{2})$ , $({\rm{H}}_{2})$ – $({\rm{H}}_{4})$ hold. $\Omega_{\overline{g}}$ as shown in Theorem 3.3, then there exists a nonempty set $\Omega_{\overline{g}}^{*}\subset\Omega_{\overline{g}}\setminus\{0\}$ , such that problem (1.1) has at least two solutions for $\theta\in\Omega_{\overline{g}}^{*}$ .

Proof We prove only the case of (1.3), and the case of (1.4) can be similarly proved. Since the condition $({\rm{H}}_{4})$ implies that $({\rm{H}}_{1})$ , using Theorem 3.3, we know that there exists $\rho_{0} > 0$ , such that

$\Psi(\rho_{0}, x^{*}) > 0, \ \forall\; x^{*}\in K.$

Let

$\delta: = \min\{\Psi(\rho_{0}, x^{*})|x^{*}\in K\},$

then $\delta > 0$ .

Next, we prove that problem (1.1) has at least two solutions for any $\theta\in(0, \delta)$ .

Let

$S_{\overline{g}}: = \left\{(\rho, x^{*})\in \mathbb{R}\times {\rm Im}(I-\mathcal{P})| x^{*} = \mathcal{MHA} (\rho\psi_{k}^{*}+x^{*})\right\},$

$\overline{K}: = \{x^{*}\in {\rm Im}(I-\mathcal{P})|(\rho, x^{*})\in S_{\overline{g}}\}.$

By $({\rm{H}}_{4})$ , there exists a constant $A_{0}$ such that

$\|x^{*}\|\leq A_{0}, \ \forall\; x^{*}\in K.$

Similar to the derivation of Theorem 3.3, there exists $\rho^{*} > \rho_{0}$ such that the following results hold:

(ⅰ) For $\rho\geq\rho^{*}$ , there is

$\begin{align} \psi_{k}(t)f(t, \rho\psi_{k}(t)+x(t)) > 0, \ \forall\; t\in A^{+}\cup A^{-}, \ x^{*}\in \overline{K}, \end{align}$

(3.9)

(ⅱ) For $\rho\leq-\rho^{*}$ , there is

$\begin{align} \psi_{k}(t)f(t, \rho\psi_{k}(t)+x(t)) < 0, \ \forall\; t\in A^{+}\cup A^{-}, \ x^{*}\in \overline{K}. \end{align}$

(3.10)

Let

$\mathcal{C}^{*}: = \{x^{*}\in {\rm Im}(I-\mathcal{P})|\|x^{*}\|\leq A_{0}\}.$

According to $({\rm{H}}_{4})$ , (3.9) and (3.10), we have

$\lim\limits_{|\rho|\rightarrow \infty}\sum\limits_{s = 1}^{T}\psi_{k}(s)f(s, \rho\psi_{k}(s)+x(s)) = 0$

uniformly for $x^{*}\in \overline{K}$ , i.e.

$\lim\limits_{|\rho|\rightarrow \infty}\Psi(\rho, x^{*}) = 0, \ \ x^{*}\in \overline{K}.$

Therefore, there exists a constant $l:l > \rho^{*} > \rho_{0} > 0$ such that $S_{\overline{g}}$ contains a connected branch between $\{-l\}\times \mathcal{C}^{*}$ and $\{l\}\times \mathcal{C}^{*}$ , and

$\begin{align*} &\max\{|\Psi(\rho, x^{*})||\rho = \pm l, \ (\rho, x^{*})\in \xi_{-l, l}\}\\ \leq&\max\{|\Psi(\rho, x^{*})||(\rho, x^{*})\in \{-l, l\}\times\overline{K}\}\\ \leq& \frac{\theta}{3}. \end{align*}$

It can be seen from the connectivity of $\xi_{-l, l}$ that there exist $(\rho_{1}, x_{1}^{*})$ and $(\rho_{2}, x_{2}^{*})$ in $\xi_{-l, l}(\subset S_{\overline{g}})$ , such that

$\Psi(\rho_{1}, x_{1}^{*}) = \theta, \ \ \ \ \Psi(\rho_{2}, x_{2}^{*}) = \theta,$

where $\rho_{1}\in(-l, \rho_{0}), \rho_{2}\in(\rho_{0}, l)$ . It can be proved that $\rho_{1}\psi_{k}^{*}+x_{1}^{*}$ and $\rho_{2}\psi_{k}^{*}+x_{2}^{*}$ are two different solutions of problem (1.1). □

4. Example

In this section, we give a concrete example of the application of our major results of Theorems 3.3 and 3.4. We choose $T = 3, a_0, d_0, b_1, c_1 = 0$ and $a_1, d_1, b_0, c_0 = 1$ , which implies that the interval becomes $[1, 3]_{\mathbb{Z}}$ and the conditions $(A_1), (A_2)$ hold.

First, we consider the eigenpairs of the corresponding linear problem

$\begin{equation} \begin{cases} -\Delta^{2}y(t-1) = \lambda y(t), \ \ \ t\in[1, 3]_{\mathbb{Z}}, \\ y(0) = \lambda\Delta y(0), \ \ \ \lambda y(4) = \nabla y(4). \end{cases} \end{equation}$

(4.1)

Define the equivalent matrix of (4.1) as follows,

$A_{\lambda} = \begin{pmatrix} \lambda-2+\frac{\lambda}{1+\lambda}&1&0\\ 1&\lambda-2&1\\ 0&1&\lambda-2+\frac{1}{1-\lambda}\\ \end{pmatrix}$

Consequently, $A_{\lambda}y = 0$ is equivalent to (4.1). Let $|A_{\lambda}| = 0$ , we have

$\lambda_{1} = -1.4657, \lambda_{2} = 0.1149, \lambda_{3} = 0.8274, \lambda_{4} = 2.0911, \lambda_{5} = 3.4324,$

which are the eigenvalues of $(4.1).$ Next, we choose $\lambda = \lambda_{1} = -1.4657$ , then we obtain the corresponding eigenfunction

$\psi_{1}(t) = \begin{cases} \begin{aligned} &1, & t = 1, \\ &3.4657, & t = 2, \\ &3.4657^{2}-1, & t = 3. \end{aligned} \end{cases}$

Example 4.1. Consider the following problem

$\begin{equation} \begin{cases} -\Delta^{2}y(t-1) = -1.4657 y(t)+f(t, y(t))+\psi_{1}(t)+\overline{g}(t), \ \ \ t\in[1, 3]_{\mathbb{Z}}, \\ y(0) = -1.4657\Delta y(0), \ \ \ -1.4657 y(4) = \nabla y(4), \end{cases} \end{equation}$

(4.2)

where

$f(t, s) = \begin{cases} \begin{aligned} &ts^{3}, & s\in[-1, 1], \\ &t\sqrt[5]{s}, & s\in(-\infty, -1)\cup(1, +\infty), \\ \end{aligned} \end{cases}$

and

$\overline{g}(t) = \begin{cases} \begin{aligned} &0, & t = 1, \\ &3.4657^{2}-1, & t = 2, \\ &-3.4657, & t = 3. \end{aligned} \end{cases}$

Then, for $f(t, y(t))$ , we have $|f(t, y(t))|\leq 3|y(t)|^{\frac{1}{3}}$ . If we choose $\omega = 1$ , $yf(t, y) > 0$ for $|y(t)| > 1$ . For $\overline{g}(t)$ , we have $\sum\limits_{s = 1}^{3}\overline{g}(s)\psi_{1}(s) = 0$ .

Therefore, the problem (4.2) satisfies the conditions $({\rm{A}}_{1}), \; ({\rm{A}}_{2})$ , $({\rm{H}}_{1})$ – $({\rm{H}}_{3})$ , which implies that the problem (4.2) has at least one solution by Theorem 3.3.

Example 4.2. Consider the following problem

(4.3)

where

$f(t, s) = \frac{ts}{\text{e}^{|s|}}, \ \ \ t\in[1, 3]_{\mathbb{Z}}$

and

$\overline{g}(t) = \begin{cases} \begin{aligned} &0, & t = 1, \\ &1-3.4657^{2}, & t = 2, \\ &3.4657, & t = 3. \end{aligned} \end{cases}$

Then, for $f(t, y(t))$ , we always have $yf(t, y) > 0$ for all $y(t) > 0$ or $y(t) < 0$ , $f$ is continuous and satisfies

$\lim\limits_{|y|\rightarrow \infty}f(t, y) = 0.$

For $\overline{g}(t)$ , we have $\sum\limits_{s = 1}^{3}\overline{g}(s)\psi_{1}(s) = 0$ .

Therefore, the problem (4.3) satisfies the conditions $({\rm{A}}_{1}), \; ({\rm{A}}_{2})$ , $({\rm{H}}_{2})$ – $({\rm{H}}_{4})$ , which implies that the problem (4.3) has at least two solutions by Theorem 3.4.

Use of AI tools declaration

The authors declare that they have not used Artificial Intelligence (AI) tools in the creation of this article.

Acknowledgments

Supported by National Natural Science Foundation of China [Grant No. 11961060] and Natural Science Foundation of Qinghai Province(No.2024-ZJ-931).

Conflict of interest

The authors declare that there are no conflicts of interest.

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