Finite-time stability and applications of positive switched linear delayed impulsive systems

Yanchao He; Yuzhen Bai; Yanchao He; Yuzhen Bai

doi:10.3934/mmc.2024016

Mathematical Modelling and Control

2024, Volume 4, Issue 2: 178-194. doi: 10.3934/mmc.2024016

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Research article

Finite-time stability and applications of positive switched linear delayed impulsive systems

Yanchao He ,
Yuzhen Bai ^,

School of Mathematical Sciences, Qufu Normal University, Qufu 273165, China; yanchaohe1998@163.com

Received: 02 October 2023 Revised: 15 February 2024 Accepted: 06 March 2024 Published: 16 May 2024

In this paper, we study the finite-time stability and applications of positive switched linear delayed systems under synchronous impulse control, which includes two types of random switching and average dwell time switching. By constructing a type of linear time-varying co-positive Lyapunov functional, we first propose several new finite-time stability criteria. It should be emphasized that the linear term coefficient of the linear vector of the Lyapunov functional is adjusted to the difference between the weighting vector and the given vector. Then, we apply the obtained stability criteria to the linear time-varying delayed systems with impulsive effects. At last, three examples are given to demonstrate the validity of the obtained results, which includes the specific linear programming algorithm process.

Keywords:

Citation: Yanchao He, Yuzhen Bai. Finite-time stability and applications of positive switched linear delayed impulsive systems[J]. Mathematical Modelling and Control, 2024, 4(2): 178-194. doi: 10.3934/mmc.2024016

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Abstract

1. Introduction

The idea of a fixed point was started in 19th century and different mathematicians, like Schauder, Tarski, Brouwer ^[1,2,3] and others worked on it in 20th century. The presence for common fixed points of different families with nonexpansive and contractive mappings in Hilbert spaces as well as in Banach spaces was the exhaustive topic of research since the early 1960s as explored by many researchers like Banach, Brouwer and Browder etc. Latterly, Khamsi and Kozlowski ^[4,5] proved results in modular function spaces for common fixed points of nonexpansive, asymptotically nonexpansive and contractive mappings. The theory of a fixed point has a substantial position in the fields of analysis, geometry, engineering, topology, optimization theory, etc. For some latest algorithms developed in the fields of optimisation and inverse problems, we refer to ^[6,7]. For more detailed study of fixed point and applications, see ^{[8,9,10,11,12,13,14,15,16,17,18,19,20,21,22]} and the references there in.

The concept of fixed points of one parameter semigroups of linear operators on a Banach space was originated from 19th century from the remarkable work of Hille-Yosida in 1948. Now-a-days, it has a lot of applications in many fields such as stochastic processes and differential equations. Semigroups have a monumental position in the fields of functional analysis, quantum mechanics, control theory, functional equations and integro-differential equations. Semigroups also play a significant role in mathematics and application fields. For example, in the field of dynamical systems, the state space will be defined by the vector function space and the system of an evolution function of the dynamical system will be represented by the map $(\mathfrak{h})\mathfrak{k}\rightarrow \mathsf{T}(\mathfrak{h})\mathfrak{k}.$ For related study, we refer to ^[23].

Browder ^[24] gave a result for the fixed point of nonexpansive mappings in a Banach space. Suzuki ^[25] proved a result for strong convergence of a fixed point in a Hilbert space. Reich ^[26] gave a result for a weak convergence in a Banach space. Similarly, Ishikawa ^[27] presented a result for common fixed points of nonexpansive mappings in a Banach space. Reich and Shoikhet also proved some results about fixed points in non-linear semigroups, see ^[20]. Nevanlinna and Reich gave a result for strong convergence of contraction semigroups and of iterative methods for accretive operators in Banach spaces, see ^[28,29]. There are different results on strong convergence of a fixed point of semigroups and there are sets of common fixed points of semigroups by the intersection of two operators from the family. These results are much significant in the field of fixed point theory. In a recent time, different mathematicians are working to generalize such type of results for a subfamily of an evolution family, see ^[30,31,32].

The fixed point of a periodic evolution subfamily was discussed in ^[30] by Rahmat et al. They gave a result for finding common fixed points of the evolution subfamily with the help of a strongly converging sequence. The method applied in ^[30] is successfully useful for showing the presence of a fixed point of an evolution subfamily. The purpose of this work is to show the existence of a fixed point of an evolution subfamily with the help of a sequence acting on a Banach space.

Definition 1.1. Let $\mathfrak{v}$ : $\mathsf{A}\rightarrow \mathsf{A}$ be a self-mapping. A point $\mathsf{r}\in \mathsf{A}$ is a fixed point of $\mathfrak{v}$ if $\mathfrak{v}(\mathsf{r}) = \mathsf{r}.$

The idea of semigroups is originated from the solution of the Cuachy differnetial equations of the form:

$\begin{cases} \dot{\Lambda}(\mathfrak{b}) = \mathcal{K}(\Lambda(\mathfrak{b})), \, \, \mathfrak{b} \geq 0, \\ \Lambda(0) = \Lambda_{0}, \end{cases}$

where $\mathcal{K}$ is a linear operator.

Definition 1.2. A family ${\bf Y} = \{\mathtt{Y}(\mathfrak{a}); \mathfrak{a}\geq 0\}$ of bounded linear operators is a semigroup if the following conditions hold:

(i) $\mathtt{Y}(0) = I.$

(ii) $\mathtt{Y}(\mathsf{j}+\mathsf{k}) = \mathtt{Y}(\mathsf{j})\mathtt{Y}(\mathsf{k}), \ \forall \mathsf{j}, \mathsf{k}\geq 0.$

When $\mathcal{K} = \mathcal{K}(\mathfrak{t})$ , then such a system is called a non-autonomous system. The result of this system produces the idea of an evolution family.

Definition 1.3. A family ${\bf E} = \{\mathsf{E}(\mathfrak{u}, \mathfrak{g}); \mathfrak{u}\geq \mathfrak{g}\geq 0\}$ of bounded linear operators is said to be an evolution family if the following conditions hold:

(i) $\mathsf{E}(\mathfrak{p}, \mathfrak{p}) = \mathtt{I}, \ \forall \mathfrak{p}\geq 0.$

(ii) $\mathsf{E}(\mathfrak{j}, \mathfrak{q})\mathsf{E}(\mathfrak{q}, \mathfrak{b}) = \mathsf{E}(\mathfrak{j}, \mathfrak{b}), \ \forall \mathfrak{j}\geq \mathfrak{q}\geq \mathfrak{b} \geq 0.$

Remark 1.4. If the evolution family is periodic of each number $\mathfrak{r}\geq 0$ , then it forms a semigroup. If we take $\mathsf{E}(\mathfrak{c}, 0) = \mathtt{Y}(\mathfrak{c}),$ then

$(a1)$ $\mathtt{Y}(0) = \mathsf{E}(0, 0) = I.$

$(a2)$ $\mathtt{Y}(\mathfrak{c+y}) = \mathsf{E}(\mathfrak{c}+\mathfrak{y}, 0) = \mathsf{E}(\mathfrak{c}+\mathfrak{y}, \mathfrak{y})\mathsf{E}(\mathfrak{y}, 0) = \mathsf{E}(\mathfrak{c}, 0)\mathsf{E}(\mathfrak{y}, 0) = \mathtt{Y}(\mathfrak{c}) \mathtt{Y}(\mathfrak{y}),$ which shows that a periodic evolution family of each positive period, is a semigroup.

Similarly, if we take $\mathtt{Y}(\mathfrak{r-d}) = \mathsf{E}(\mathfrak{r}, \mathfrak{d})$ , then

$(b1)$ $\mathsf{E}(\mathfrak{r}, \mathfrak{r}) = \mathtt{Y}(0) = I.$

$(b2)$ $\mathsf{E}(\mathfrak{r}, \mathfrak{b}) = \mathsf{E}(\mathfrak{r}, \mathfrak{d})\mathsf{E}(\mathfrak{d}, \mathfrak{b}) = \mathtt{Y}(\mathfrak{r-d}) \mathtt{Y}(\mathfrak{d-b}) = \mathtt{Y}(\mathfrak{r-b}),$ which shows that a semigroup is an evolution family.

Remark 1.5. A semigroup is an evolution family, but the converse is not true. In fact, the converse holds if the evolution family is periodic of every number $\mathfrak{s}\geq 0.$

Remark 1.6. ^[33] Let $0\leq \mathsf{s}\leq 1$ and $\mathsf{b}, \mathsf{k}\in \mathcal{H},$ then the following equality holds:

$||\mathsf{s}\mathsf{b}+(1-\mathsf{s})\mathsf{k}||^2 = \mathsf{s}||\mathsf{b}||^2 +(1-\mathsf{s})||\mathsf{k}||^2 -\mathsf{s}(1-\mathsf{s})||\mathsf{b}-\mathsf{k}||^2.$

In this work, we will generalize results from ^[33] for an evolution subfamily and also give some other results for an evolution subfamily.

2. Preliminaries

First, denote the set of real numbers and natural numbers by $\mathbb{R}$ and $\mathbb{N}$ , respectively. We denote the family of semigroups by ${\bf Y}$ , evolution family by ${\bf E}$ and evolution subfamily by ${\bf G}$ . By $\mathsf{B}$ , $\mathcal{H}$ and $\mathcal{D}$ , we will indicate a Banach space, Hilbert space and a convex closed set, respectively. We use $\rightarrow$ for a strong and $\rightharpoonup$ for a weak convergence. The set of fixed points of

${\bf G} = \{\mathsf{G}(\mathfrak{s}, 0);\mathfrak{s}\geq 0\}$

is denoted by

$F({\bf G}) = \cap_{\mathfrak{s}\geq 0}F(\mathsf{G}(\mathfrak{s}, 0)).$

We generalize results of semigroups from ^[33] for an evolution subfamily ${\bf G}$ in a Banach space. These types of families are not semigroups. The following example illustrates this fact and gives the difference between them.

Example 2.1. As

${\bf E} = \{\mathsf{E}(\mathfrak{h}, \mathfrak{r}) = \frac{\mathfrak{h}+1}{\mathfrak{r}+1}; \mathfrak{h}\geq \mathfrak{r}\geq 0\}$

is an evolution family because it satisfies both conditions of an evolution family.

If we take $\mathfrak{r} = 0$ , that is, $\{\mathsf{E}(\mathfrak{h}, 0)\} = {\bf G}$ , then it becomes a subfamily of ${\bf E}$ and it is not a semigroup.

Suzuki proved the following result in ^[25]:

Theorem 2.2. Consider a family

${\bf Y} = \{\mathtt{Y}(\mathfrak{i}), \mathfrak{i}\geq 0\}$

of strongly continuous non-expansive operators on $\mathcal{D}$ (where $\mathcal{D}$ is a subset of a Hilbert space $\mathcal{H}$ ) such that $F({\bf Y})\neq \emptyset$ . Take two sequences $\{\gamma_{m}\}$ and $\{\mathfrak{q}_{m}\}$ in $\mathbb{R}$ with

$\lim\limits_{m\rightarrow \infty}\mathfrak{q}_{m} = \lim\limits_{m\rightarrow \infty}\frac{\gamma_{m}}{\mathfrak{q}_{m}} = 0,$

$\mathfrak{q}_{m} > 0$ and $\gamma_{m}\in (0, 1)$ . Let $\mathfrak{b}\in \mathcal{D}$ be fixed and $\{\mathfrak{k}_{m}\}$ be a sequence in $\mathcal{D}$ such that

$\mathfrak{k}_{m} = \gamma_{m}\mathfrak{b}+(1-\gamma_{m})\mathtt{Y}(\mathfrak{q}_{m})\mathfrak{k}_{m}, \ \ \forall m\in \mathbb{N},$

then $\{\mathfrak{k}_{m}\}\rightarrow \mathfrak{h}\in F({\bf Y}).$

The following result was given by Shimizu and Takahashi ^[15] in 1998:

Theorem 2.3. Take a family

${\bf Y} = \{\mathtt{Y}(\mathfrak{i}), \mathfrak{i}\geq 0\}$

of operators which are non-expansive and strongly continuous on $\mathcal{D}\subset \mathcal{H}$ such that $F({\bf Y})\neq \emptyset$ . Take two sequences $\{\zeta_{m}\}$ and $\{\lambda_{m}\}$ in $\mathbb{R}$ with

$\lim\limits_{m\rightarrow \infty}\zeta_{m} = 0, \quad \lim\limits_{m\rightarrow \infty}\lambda_{m} = \infty,$

where $\zeta_{m}\in (0, 1)$ and $\lambda_{m} > 0$ . Let $\mathfrak{c}\in \mathcal{D}$ be fixed and $\{\mathfrak{g}_{m}\}\in \mathcal{D}$ be a sequence such that

$\mathfrak{g}_{m} = \zeta_{m}\mathfrak{c}+(1-\zeta_{m})\frac{1}{\lambda_{m}}\int_{0}^{\lambda_{m}}\mathtt{Y}(\mathfrak{s})d\mathfrak{s}$

for all $m\in \mathbb{N}$ . Then $\{\mathfrak{g}_{m}\}\rightarrow \mathfrak{a}\in F({\bf Y}).$

Motivated from above results, we take an implicit iteration for ${\bf G} = \{\mathsf{G}(\mathfrak{b}, 0), \mathfrak{b}\geq 0\}$ of nonexpansive mappings, given as:

$\begin{equation} \begin{cases} \tau_{m} = \gamma_{m}\tau_{m-1} + (1-\gamma_{m})\mathsf{G}(\zeta_{m}, 0)\tau_{m}, \ m\geq 1, \\ \tau_{0}\in \mathcal{D}. \end{cases} \end{equation}$

(2.1)

We present some results for convergence of Eq (2.1) in a Banach space and a Hilbert space for a nonexpansive evolution subfamily.

3. Main results

We start with the following lemmas:

Lemma 3.1. Consider an evolution family ${\bf E}$ and a subfamily ${\bf G} = \{\mathsf{G}(\mathfrak{c, 0}); \mathfrak{c}\geq 0\}$ of ${\bf E}$ with period ${\bf r} \in \mathbb{R^{+}}$ , then

$\bigcap\limits_{\mathfrak{c}\geq 0}F(\mathsf{G}(\mathfrak{c}, 0)) = \bigcap\limits_{0\leq \mathfrak{c}\leq {\bf r}}F(\mathsf{G}(\mathfrak{c}, 0)).$

Proof. As it is obviously true that

$\bigcap\limits_{\mathfrak{c}\geq 0}F(\mathsf{G}(\mathfrak{c}, 0))\subset \bigcap\limits_{0\leq \mathfrak{c}\leq {\bf r}}F(\mathsf{G}(\mathfrak{c}, 0)),$

we are proving the other part, i.e.,

$\bigcap\limits_{0\leq \mathfrak{c}\leq {\bf r}}F(\mathsf{G}(\mathfrak{c}, 0)) \subset \bigcap\limits_{\mathfrak{c}\geq 0}F(\mathsf{G}(\mathfrak{c}, 0)).$

Take a real number

$\mathfrak{k}\in \bigcap\limits_{0\leq \mathfrak{c}\leq {\bf r}}F(\mathsf{G}(\mathfrak{c}, 0)),$

then

$\mathsf{G}(\mathfrak{c}, 0)\mathfrak{k} = \mathfrak{k}, \ \forall 0\leq \mathfrak{c}\leq {\bf r}.$

As we know that any real number $\mathfrak{c}\geq 0$ is written in the form of $\mathfrak{c} = \mathsf{m}{\bf r}+\varepsilon,$ for some $\mathsf{m}\in \mathbb{Z^{+}}$ and $0\leq \varepsilon \leq {\bf r}$ , consider

$\begin{equation*} \begin{split} \mathsf{G}(\mathfrak{c}, 0)\mathfrak{k}& = \mathsf{G}(\mathsf{m}{\bf r}+\varepsilon, 0)\mathfrak{k}\\& = \mathsf{G}(\mathsf{m}{\bf r}+\varepsilon, \mathsf{m}{\bf r})\mathsf{G}(\mathsf{m}{\bf r}, 0)\mathfrak{k}\\& = \mathsf{G}(\varepsilon, 0)\mathsf{G^{\mathsf{m}}}({\bf r}, 0)\mathfrak{k}\\& = \mathsf{G}(\varepsilon, 0)\mathfrak{k}\\& = \mathfrak{k}. \end{split} \end{equation*}$

This shows that

$\bigcap\limits_{0\leq \mathfrak{c}\leq {\bf r}}F(\mathsf{G}(\mathfrak{c}, 0)) \subset \bigcap\limits_{\mathfrak{c}\geq 0}F(\mathsf{G}(\mathfrak{c}, 0)).$

Hence, we conclude that

$\bigcap\limits_{\mathfrak{c}\geq 0}F(\mathsf{G}(\mathfrak{c}, 0)) = \bigcap\limits_{0\leq \mathfrak{c}\leq {\bf r}}F(\mathsf{G}(\mathfrak{c}, 0)).$

This completes the proof. □

Lemma 3.2. If ${\bf Y} = \{\mathtt{Y}(\beta); \beta\geq 0\}$ is a semigroup on a Hilbert space $\mathcal{H},$ then

$F({\bf Y}) = \bigcap\limits_{\beta\geq 0}F(\mathtt{Y}(\beta)) = \bigcap\limits_{0\leq \beta\leq 1}F(\mathtt{Y}(\beta)).$

Proof. Since

$\bigcap\limits_{\beta\geq 0}F(\mathtt{Y}(\beta))\subset \bigcap\limits_{0\leq \beta\leq 1}F(\mathtt{Y}(\beta)),$

we only prove the other part, that is,

$\bigcap\limits_{0\leq \beta\leq 1}F(\mathtt{Y}(\beta)) \subset \bigcap\limits_{\beta\geq 0}F(\mathtt{Y}(\beta)).$

Take a real number $\mathsf{u}$ such that

$\mathsf{u}\in \bigcap\limits_{0\leq \beta\leq 1}F(\mathtt{Y}(\beta)),$

then we have $\mathtt{Y}(\mathsf{u}) = \mathsf{u},$ for every $\beta\in [0, 1].$ Since $\beta\in [0, 1]$ , we can write it as $\beta = \mathsf{n}+\varrho$ , where $\mathsf{n}\in \mathbb{Z^{+}}$ and $0\leq \varrho \leq 1$ . Therefore, we have

$\begin{equation*} \begin{split} \mathtt{Y}(\beta)\mathsf{u}& = \mathtt{Y}(\mathsf{n}+\varrho)\mathsf{u}\\& = \mathtt{Y}(\mathsf{n})\mathtt{Y}(\varrho)\mathsf{u}\\& = \mathtt{Y}^{\mathsf{n}}(1)\mathtt{Y}(\varrho)\mathsf{u}\\& = \mathtt{Y}^{\mathsf{n}}(1)\mathsf{u}\\& = \mathsf{u}. \end{split} \end{equation*}$

This shows that $\mathsf{u}\in \bigcap_{\beta\geq 0}F(\mathtt{Y}(\beta)).$ It implies that

$\bigcap\limits_{0\leq \beta\leq 1}F(\mathtt{Y}(\beta)) \subset \bigcap\limits_{\beta\geq 0}F(\mathtt{Y}(\beta)).$

Thus,

$\bigcap\limits_{\beta\geq 0}F(\mathtt{Y}(\beta)) = \bigcap\limits_{0\leq \beta\leq 1}F(\mathtt{Y}(\beta)).$

This completes the proof. □

Now, we give a result for a weak convergence of a sequence in a Hilbert space.

Theorem 3.3. Let ${\bf G} = \{\mathsf{G}(a, 0)\}$ be a subfamily of ${\bf E}$ of strongly continuous nonexpansive operators on $\mathcal{D}$ and $\mathsf{F}({\bf G})\neq \varnothing$ , where $\mathcal{D}$ is a subset of $\mathcal{H}.$ Take two sequences $\{\gamma_{m}\}$ and $\{\zeta_{m}\}$ in $\mathbb{R}$ such that

$\{\gamma_{m}\}\subset (0, \mathsf{c}]\subset (0, 1), \quad \zeta_{m} > 0,$

$\liminf\limits_{m\rightarrow \infty}\zeta_{m} = 0, \quad \limsup\limits_{m\rightarrow \infty} \zeta_{m} > 0,$

and

$\lim\limits_{m\rightarrow \infty}(\zeta_{m+1} - \zeta_{m}) = 0.$

Then

$\tau_{m} = \gamma_{m}\tau_{m-1} + (1-\gamma_{m})\mathsf{G}(\zeta_{m}, 0)\tau_{m} \rightharpoonup \tau,$

where $\tau \in \mathsf{F}({\bf G}).$

Proof. Claim (ⅰ). For any $\mathsf{z}\in \mathsf{F}({\bf G}),$ $\lim_{m\rightarrow \infty}||\tau_{m}-\mathsf{z}||$ exists. In fact,

$\begin{equation*} \begin{split} ||\tau_{m}-\mathsf{z}||& = ||\gamma_{m}(\tau_{m-1}-\mathsf{z})+ (1-\gamma_{m})(\mathsf{G}(\zeta_{m}, 0)\tau_{m}-\mathsf{z})|| \\& \leq \gamma_{m}||\tau_{m-1}-\mathsf{z}|| + (1-\gamma_{m})||\mathsf{G}(\zeta_{m}, 0)\tau_{m}-\mathsf{z}|| \\& \leq \gamma_{m}||\tau_{m-1}-\mathsf{z}|| + (1-\gamma_{m})||\tau_{m-1}-\mathsf{z}||, \ \ \forall m\geq 1. \end{split} \end{equation*}$

Thus, we have

$||\tau_{m}-\mathsf{z}||\leq ||\tau_{m-1}-\mathsf{z}||, \ \ \forall m\geq 1.$

This shows that $\lim_{m\rightarrow \infty}||\tau_{m}-\mathsf{z}||$ exists. Therefore, the sequence $\{\tau_{m}\}$ is bounded.

Claim (ⅱ).

$\lim\limits_{m\rightarrow \infty} ||\mathsf{G}(\zeta_{m}, 0)\tau_{m} -\tau_{m}|| = 0 .$

From Remark 1.6, we have

$\begin{equation*} \begin{split} ||\tau_{m}-\mathsf{z}||^2& = ||\gamma_{m}(\tau_{m-1}-\mathsf{z})+ (1-\gamma_{m})(\mathsf{G}(\zeta_{m}, 0)\tau_{m}-\mathsf{z})||^2 \\& = \gamma_{m}||\tau_{m-1}-\mathsf{z}||^2 + (1-\gamma_{m})||\mathsf{G}(\zeta_{m}, 0)\tau_{m}-\mathsf{z}||^2\\& -\gamma_{m}(1-\gamma_{m})||\tau_{m-1}-\mathsf{G}(\zeta_{m}, 0)\tau_{m}||^2 \\& \leq \gamma_{m}||\tau_{m-1}-\mathsf{z}||^2 + (1-\gamma_{m})||\tau_{m}-\mathsf{z}||^2\\& -\gamma_{m}(1-\gamma_{m})||\tau_{m-1}-\mathsf{G}(\zeta_{m}, 0)\tau_{m}||^2. \end{split} \end{equation*}$

Thus, we have

$||\tau_{m}-\mathsf{z}||^2\leq ||\tau_{m-1}-\mathsf{z}||^2-(1-\gamma_{m})||\tau_{m-1}-\mathsf{G}(\zeta_{m}, 0)\tau_{m}||^2, \ \ \forall m\geq 1.$

As we know that $\{\gamma_{m}\}\subset (0, \mathsf{c}]\subset (0, 1)$ , so we have

$\begin{equation} (1-\mathsf{c})||\tau_{m-1}-\mathsf{G}(\zeta_{m}, 0)\tau_{m}||^2\leq ||\tau_{m-1}-\mathsf{z}||^2-||\tau_{m}-\mathsf{z}||^2, \end{equation}$

(3.1)

i.e.,

$(1-\mathsf{c})\limsup\limits_{m\rightarrow \infty}||\tau_{m-1}-\mathsf{G}(\zeta_{m}, 0)\tau_{m}||^2\leq \limsup\limits_{m\rightarrow \infty}||\tau_{m-1}-\mathsf{z}||^2-||\tau_{m}-\mathsf{z}||^2 = 0.$

Therefore,

$\lim\limits_{m\rightarrow \infty}||\tau_{m-1}-\mathsf{G}(\zeta_{m}, 0)\tau_{m}|| = 0.$

On the other hand,

$\lim\limits_{m\rightarrow \infty}||\tau_{m}-\mathsf{G}(\zeta_{m}, 0)\tau_{m}|| = \lim\limits_{m\rightarrow \infty}\gamma_{m-1}||\tau_{m-1}-\mathsf{G}(\zeta_{m}, 0)\tau_{m}|| = 0.$

Claim (ⅲ).

$\{\tau_{m}\} \rightharpoonup \tau, \ \ \text{where}\ \ \tau \in \mathsf{F}({\bf G}).$

As $\{\tau_{m}\}$ is bounded, take a subsequence $\{\omega_{m_{i}}\}$ of $\{\tau_{m}\}$ such that $\{\omega_{m_{i}}\} \rightharpoonup \tau$ . Let $\omega_{m_{i}} = \mathsf{h_{i}}$ , $\gamma_{m_{i}} = \xi_{i}$ and $\zeta_{m_{i}} = \mathsf{v_{i}}$ . From ^[34], we have

$\lim\limits_{i\rightarrow \infty}\mathsf{v}_{i} = \lim\limits_{i\rightarrow \infty}\frac{||\mathsf{h_{i}}-\mathsf{G}(\mathsf{v}_{i}, 0)\mathsf{h_{i}}||}{\mathsf{v}_{i}} = 0.$

Now, we will show that $\mathsf{G}(\zeta, 0)\tau = \tau$ .

We have

$\begin{equation*} \begin{split} ||\mathsf{h_{i}}-\mathsf{G}(\zeta, 0)\tau||&\leq \sum\limits_{\mathsf{a} = 0}^{[\frac{\zeta}{\mathsf{v_{i}}}]-1}||G((\mathsf{a}+1)\mathsf{v_{i}}, 0)\mathsf{h_{i}}-G(\mathsf{a}\mathsf{v_{i}}, 0)\mathsf{h_{i}}|| + ||G([\frac{\zeta}{\mathsf{v_{i}}}]\mathsf{v_{i}}, 0)\mathsf{h_{i}}\\&-G(\frac{\zeta}{\mathsf{v_{i}}} \mathsf{v_{i}}, 0)\tau|| + ||G(\frac{\zeta}{\mathsf{v_{i}}} \mathsf{v_{i}}, 0)\tau -G(\zeta, 0)|| \\& \leq \frac{\zeta}{\mathsf{v_{i}}}||G(\mathsf{v_{i}}, 0)\mathsf{h_{i}}-\mathsf{h_{i}}|| + ||\mathsf{h_{i}}-\tau||+||G(\zeta - [\frac{\zeta }{\mathsf{v_{i}}}]\mathsf{v_{i}}, 0)\tau -\tau|| \\& \leq \zeta \frac{||G(\mathsf{v_{i}}, 0)\mathsf{h_{i}}-\mathsf{h_{i}}||}{\mathsf{v_{i}}} + ||\mathsf{h_{i}} -\tau||+ \max\limits_{0 \leq \mathsf{v} \leq \mathsf{v_{i}}}||G(\mathsf{v}, 0)\tau -\tau||, \ \ \forall i\in \mathbb{N}. \end{split} \end{equation*}$

Thus, we get

$\limsup\limits_{i\rightarrow \infty}||\mathsf{h_{i}}-\mathsf{G}(\zeta, 0)\tau||\leq \limsup\limits_{i\rightarrow \infty}||\tau_{i}-\tau||.$

Hence, $\mathsf{G}(\zeta, 0)\tau = \tau$ by using Opial's condition. Therefore, $\tau \in F({\bf G}).$ Now, we need to show that $\{\tau_{m}\}\rightharpoonup \tau.$ For this, take a subsequence $\{\eta_{m_{j}}\}$ of $\{\tau_{m}\}$ such that $\eta_{m_{j}}\rightharpoonup \mathsf{u}$ and $\mathsf{u}\neq \tau.$ By above method, we can show that $\mathsf{u}\in F({\bf G})$ . Since both limits $\lim_{m\rightarrow \infty}||\tau_{m}-\tau||$ and $\lim_{m\rightarrow \infty}||\tau_{m}-\mathsf{u}||$ exist, we can write

$\begin{equation*} \begin{split} \lim\limits_{m\rightarrow \infty}||\tau_{m}-\tau||& = \limsup\limits_{i\rightarrow \infty}||\omega_{m_{i}}-\tau|| < \limsup\limits_{i\rightarrow \infty}||\omega_{m_{i}}-\mathsf{u}|| \\& = \lim\limits_{m\rightarrow \infty}||\tau_{m}-\mathsf{u}||\\& = \limsup\limits_{j\rightarrow \infty}||\eta_{m_{j}}-\mathsf{u}|| < \limsup\limits_{j\rightarrow \infty}||\eta_{m_{j}}-\tau||\\& = \lim\limits_{m\rightarrow \infty}||\tau_{m}-\tau||. \end{split} \end{equation*}$

It shows that $\mathsf{u} = \tau$ , which is a contradiction. Thus, $\tau_{m} \rightharpoonup \tau.$

This completes the proof. □

Now, we will provide a theorem in a Banach space for a weak convergence.

Theorem 3.4. Consider a reflexive Banach space $\mathsf{B}$ in $\mathbb{R}$ with Opial's property and a subset $\mathcal{D}$ of $\mathsf{B}.$ Let ${\bf G} = \{G(\mathsf{a}, 0)\}$ be a subfamily of ${\bf E}$ of nonexpansive and strongly continuous mappings such that $F({\bf G})\neq \emptyset.$ Take two sequences $\{\gamma_{m}\}$ and $\{\zeta_{m}\}$ such that $\gamma_{m}\subset (0, 1),$ $\zeta_{m} > 0$ and

$\lim\limits_{m\rightarrow \infty}\zeta_{m} = \lim\limits_{m\rightarrow \infty}\frac{\gamma_{m}}{\zeta_{m}} = 0.$

Then

$\tau_{m} = \gamma_{m}\tau_{m-1} + (1-\gamma_{m})\mathsf{G}(\zeta_{m}, 0)\tau_{m} \rightarrow \tau \in F({\bf G}).$

Proof. Claim 1. As

$\lim\limits_{m\rightarrow \infty}\zeta_{m} = \lim\limits_{m\rightarrow \infty}\frac{\gamma_{m}}{\zeta_{m}} = 0,$

then we have $\lim_{m\rightarrow \infty}\gamma_{m} = 0.$ This shows that there exists a positive integer $p$ , for all $k\in \mathbb{N}$ so that $\gamma_{m}\subset (0, \mathsf{c}]\subset (0, 1)$ .

From Theorem 3.3, $\lim_{m\rightarrow \infty}||\tau_{m}-\mathsf{z}||$ exists for each $\mathsf{z}\in F({\bf G}).$

Claim 2. $\{\mathsf{G}(\zeta_{m}, 0)\tau_{m}\}$ is bounded. From (2.1), we have

$\begin{equation*} \begin{split} ||\mathsf{G}(\zeta_{m}, 0)\tau_{m}\}||& = ||\frac{1}{1-\gamma_{m}}\tau_{m}-\frac{\gamma_{m}}{1-\gamma_{m}}\tau_{m-1}|| \\& \leq \frac{1}{1-\gamma_{m}}||\tau_{m}||+\frac{\gamma_{m}}{1-\gamma_{m}}||\tau_{m-1}|| \\& \leq \frac{1}{\mathsf{c}}||\tau_{m}||+\frac{\mathsf{c}}{1-\mathsf{c}}||\tau_{m-1}||, \end{split} \end{equation*}$

which shows that $\{\mathsf{G}(\zeta_{m}, 0)\tau_{m}\}$ is bounded.

Claim 3. $\{\tau_{m}\} \rightharpoonup \tau.$

As $\{\tau_{}m\}$ is bounded, take a sub-sequence $\{\omega_{m_{l}}\}$ of $\{\tau_{m}\}$ such that $\omega_{m_{l}} \rightharpoonup \tau.$ Let $\omega_{m_{l}} = \mathsf{b_{l}}$ , $\gamma_{m_{l}} = \rho_{l}$ and $\zeta_{m_{l}} = \mathsf{y_{l}}$ , $l\in \mathbb{N}.$ Let $\zeta > 0$ be fixed, then

$\begin{equation*} \begin{split} ||\mathsf{b_{l}}-\mathsf{G}(\zeta, 0)\tau||&\leq \sum\limits_{\mathsf{a} = 0}^{[\frac{\zeta}{\mathsf{y_{l}}}]-1}||G((\mathsf{a}+1)\mathsf{y_{l}}, 0)\mathsf{b_{l}}-G(\mathsf{a}\mathsf{y_{l}}, 0)\mathsf{b_{l}}|| + ||G([\frac{\zeta}{\mathsf{y_{l}}}]\mathsf{y_{l}}, 0)\mathsf{b_{l}}\\&-G(\frac{\zeta}{\mathsf{y_{l}}} \mathsf{y_{l}}, 0)\tau|| + ||G(\frac{\zeta}{\mathsf{y_{l}}} \mathsf{y_{l}}, 0)\tau -G(\zeta, 0)|| \\& \leq \frac{\zeta}{\mathsf{y_{l}}}||G(\mathsf{y_{l}}, 0)\mathsf{b_{l}}-\mathsf{b_{l}}|| + ||\mathsf{b_{l}}-\tau||+||G(\zeta - [\frac{\zeta }{\mathsf{y_{l}}}]\mathsf{y_{l}}, 0)\tau -\tau|| \\& \leq \zeta \frac{||G(\mathsf{y_{l}}, 0)\mathsf{b_{l}}-\mathsf{b_{l}}||}{\mathsf{y_{l}}} + ||\mathsf{b_{l}} -\tau||+ \max\limits_{0 \leq \mathsf{y} \leq \mathsf{y_{l}}}||G(\mathsf{y}, 0)\tau -\tau||, \ \ \forall l\in \mathbb{N}. \end{split} \end{equation*}$

Thus, we have

$\limsup\limits_{l\rightarrow \infty}||\mathsf{b_{l}}-\mathsf{G}(\zeta, 0)\tau||\leq \limsup\limits_{l\rightarrow \infty}||\mathsf{b_{l}}-\tau||.$

Therefore,

$G(\zeta, 0)\tau = \tau \in F({\bf G})$

by using Opial's property. By same method given in Theorem 3.3, we can prove that $\{\tau_{m}\} \rightharpoonup \tau.$

This completes the proof. □

Theorem 3.5. Consider a real reflexive Banach space $\mathsf{B}$ with Opial's property and a subset $\mathcal{D}$ of $\mathsf{B}.$ Let ${\bf G} = \{G(\mathsf{a}, 0)\}$ be a subfamily of ${\bf E}$ of strongly continuous nonexpansive mappings such that $F({\bf G})\neq \emptyset.$ Take two sequences $\{\gamma_{m}\}$ and $\{\zeta_{m}\}$ such that $\gamma_{m}\subset (0, 1),$ $\zeta_{m} > 0$ and

$\lim\limits_{m\rightarrow \infty}\zeta_{m} = \lim\limits_{m\rightarrow \infty}\frac{\gamma_{m}}{\zeta_{m}} = 0.$

Then

$\tau_{m} = \gamma_{m}\tau_{m-1} + (1-\gamma_{m})\mathsf{G}(\zeta_{m}, 0)\tau_{m} \rightarrow \tau \in F({\bf G}).$

Proof. Claim 1. For any $\mathsf{z}\in F({\bf G}),$ $\lim_{m\rightarrow \infty}||\tau_{m}-\mathsf{z}||$ exists.

Claim 2.

$\begin{equation} ||\mathsf{G}(\zeta_{m}, 0)\tau_{m} -\tau_{m}||\rightarrow 0 \ \ \text{as} \ \ m\rightarrow \infty. \end{equation}$

(3.2)

As from Theorem 3.4, $\{\mathsf{G}(\zeta_{m}, 0)\tau_{m}\}$ is bounded. Also, from (1.4), we have

$||\tau_{m}-\mathsf{G}(\zeta_{m}, 0)\tau_{m}|| = \gamma_{m}||\tau_{m-1}-\mathsf{G}(\zeta_{m}, 0)\tau_{m}|| \rightarrow 0 \ \ \text{as} \ \ m\rightarrow \infty .$

Therefore,

$||\mathsf{G}(\zeta_{m}, 0)\tau_{m} -\tau_{m}||\rightarrow 0 \ \ \text{as} \ \ m\rightarrow \infty.$

Claim 3. For any $\zeta > 0,$

$\lim\limits_{m\rightarrow \infty}||\mathsf{G}(\zeta_{m}, 0)\tau_{m} -\tau_{m}|| = 0 .$

In fact, we have

$\begin{equation*} \begin{split} ||\tau_{m}-\mathsf{G}(\zeta_{m}, 0)\tau_{m}||&\leq \sum\limits_{\mathsf{b} = 0}^{\frac{\zeta}{\zeta_{m}}-1}||\mathsf{G}((\mathsf{b}+1)\zeta_{m}, 0)\tau_{m} - \mathsf{G}(\mathsf{b}\zeta_{m}, 0)\tau_{m}|| \\& + ||\mathsf{G}((\frac{\zeta}{\zeta_{m}})\zeta_{m}, 0)\tau_{m}-\mathsf{G}(\zeta, 0)\tau_{m}||\\& \leq \frac{\zeta}{\zeta_{m}}||\mathsf{G}(\zeta_{m}, 0)\tau_{m}-\tau_{m}||+ ||\mathsf{G}((\zeta-\frac{\zeta}{\zeta_{m}})\zeta_{m}, 0)\tau_{m}-\tau_{m}||\\& \leq \zeta \frac{\gamma_{m}}{\zeta_{m}}||\tau_{m-1}-\mathsf{G}(\zeta_{m}, 0)|| + \max\limits_{s\in [0, \zeta_{m}]} \{||\mathsf{G}(\mathfrak{v}, 0)\tau_{m}-\tau_{m}||\}, \ \forall \ m\in \mathbb{N}. \end{split} \end{equation*}$

Thus, from this equation and Eq (3.2), we get

$\lim\limits_{m\rightarrow \infty}||\mathsf{G}(\zeta_{m}, 0)\tau_{m} -\tau_{m}|| = 0.$

Claim 4. Now, we will show that $\{\tau_{m}\}\rightarrow \tau \in F({\bf G}).$

Since $\{\tau_{m}\}$ is bounded, it must have a convergent sub-sequence $\{\mu_{m_{k}}\}$ such that $\mu_{m_{k}}\rightarrow \tau.$ From Claim 3, we have

$||\tau-\mathsf{G}(\zeta, 0)\tau|| = \lim\limits_{k\rightarrow \infty}||\mu_{m_{k}}-G(\zeta, 0)\mu_{m_{k}}|| = 0.$

Thus, $\tau\in F({\bf G}).$ Hence, we have

$\lim\limits_{m\rightarrow \infty}||\tau_{m}-\tau|| = \lim\limits_{k\rightarrow \infty}||\mu_{m_{k}}-\tau|| = 0.$

This completes the proof. □

4. An example and open problem

Example 4.1. Consider the Hilbert space $\mathcal{H} = \mathsf{L}^{2}([0, \pi], \mathbb{C})$ and let ${\bf T} = \{\mathsf{T}(\mathsf{a}); \mathsf{a}\geq 0\}$ be a semigroup such that

$(\mathsf{T}(\mathsf{a})\mathfrak{u})(\mathtt{t}) = \frac{2}{\pi}\sum\limits_{\mathsf{m} = 1}^{\infty}\mathsf{e}^{-\mathsf{a}\mathsf{m^{2}}} \mathsf{w_{\mathsf{m}}}(\mathfrak{u})sin\mathsf{m}\mathtt{t}, \quad \mathtt{t}\in [0, \pi], \ \mathsf{a}\geq 0.$

Here,

$\mathsf{w_{\mathsf{m}}}(\mathfrak{u}) = \int_{0}^{\pi}\mathfrak{k}(\mathsf{a})sin(\mathsf{ma})\mathsf{ds}.$

Surely, it is nonexpansive and strongly continuous semigroup in this Hilbert space. The linear operator $\Lambda$ generates this semigroup such that $\Lambda \mathfrak{u} = \ddot{\mathfrak{u}}$ . Let for all $\mathfrak{k}\in \mathcal{H}$ , the set $\mathcal{M}(\Lambda)$ represent the maximal domain of $\Lambda$ such that $\mathfrak{u}$ and $\ddot{\mathfrak{u}}$ must be continuous. Also, $\mathfrak{u}(0) = 0 = \mathfrak{u}(\pi).$ Now, consider the non-autonomous Cauchy problem:

$\left\{\begin{array}{lll} \frac{\partial\mathsf{h(\mathtt{t, \varepsilon})}}{\partial\mathtt{t}}\ = &\mathfrak{g}(\mathtt{t})\frac{\partial^{2}\mathsf{h}(\mathtt{t}, \varepsilon)}{\partial^{2}\varepsilon}, \ \ \mathtt{t} > 0, \ 0\leq \varepsilon \leq \pi, \\ \mathsf{h}(0, \varepsilon) = &\mathfrak{b}(\varepsilon), \\ \mathsf{h}(\mathtt{t}, 0) = &\mathsf{h}(\mathtt{t}, \pi) = 0, \ \mathtt{t}\geq 0, \end{array}\right.$

where $\mathfrak{b}(.)\in \mathcal{H}$ and $\mathfrak{g}$ : $\mathbb{R^{+}}\rightarrow [1, \infty)$ are nonexpansive functions on $\mathbb{R^{+}}$ . This function $\mathfrak{g}$ is periodic, i.e., $\mathfrak{g}(\mathsf{j+p}) = \mathfrak{g}(\mathsf{j})$ for every $\mathsf{j}\in \mathbb{R^{+}}$ and for some $\mathsf{p}\geq 1.$ Take the function

$\mathsf{K}(\mathtt{t}) = \int_{0}^{\mathtt{t}}\mathfrak{g}(\mathtt{t})\mathtt{dt},$

then the property of evolution equations will be satisfied by the solution $\mathfrak{k}(.)$ of the above non-autonomous Cauchy problem. Therefore,

$\mathfrak{k}(\mathtt{t}) = \mathsf{A}(\mathtt{t}, \mathfrak{h})\mathfrak{k}(\mathfrak{h}),$

where

$\mathsf{A}(\mathtt{t}, \mathfrak{h}) = \mathsf{T}(\mathsf{K}(\mathtt{t})-\mathsf{K}(\mathfrak{h})),$

see Example 2.9b ^[35].

As the function $\mathtt{t}\rightarrow \mathsf{e}^{\mathfrak{r}\mathtt{t}}||\mathsf{h}(\mathtt{t})||$ is bounded for any $\mathfrak{r}\geq 0$ on the set of non-negative real numbers, we have

$\begin{equation*} \begin{split} \int_{0}^{\infty}||\mathsf{A}(\mathtt{t}, 0)\mathfrak{u}||^{2} \mathtt{dt}& = \frac{2}{\pi}\int_{0}^{\infty}\sum\limits_{\mathfrak{r = 1}}^{\infty}\mathsf{w_{\mathfrak{r}}}^{2}(\mathfrak{u})\mathsf{e}^{-2\mathfrak{r}^{2}\mathsf{K}(\mathtt{t})}\mathtt{dt}\\& = \frac{2}{\pi}\sum\limits_{\mathfrak{r = 1}}^{\infty}\mathsf{w_{\mathfrak{r}}}^{2}(\mathfrak{u})\int_{0}^{\infty}\mathsf{e}^{-2\mathfrak{r}^{2}\mathsf{K}(\mathtt{t})}\mathtt{dt}\\& = ||\mathfrak{u}||_{2}^{2}\int_{0}^{\infty}\mathsf{e}^{-2\mathfrak{r}^{2}\mathsf{K}(\mathtt{t})}\mathtt{dt}\\& \leq ||\mathfrak{u}||_{2}^{2}\int_{0}^{\infty}\mathsf{e}^{-2\mathsf{K}(\mathtt{t})}\mathtt{dt}.\\& \end{split} \end{equation*}$

On the other side, we have

$\begin{equation*} \begin{split} \int_{0}^{\infty}\mathsf{e}^{-2\mathsf{K}(\mathtt{t})}\mathtt{dt}& = \sum\limits_{\mathsf{b = 0}}^{\infty}\int_{\mathsf{bc}}^{\mathsf{(b+1)c}}\mathsf{e}^{-2\mathsf{K}(\mathtt{t})}\mathtt{dt}\\& = \sum\limits_{\mathsf{b = 0}}^{\infty}\int_{0}^{\mathsf{c}}\mathsf{e}^{-2\mathsf{K}(\mathsf{bc}+\beta)}\mathtt{d\beta}\\& = \sum\limits_{\mathsf{b = 0}}^{\infty}\mathsf{e}^{-2\mathsf{b} \mathsf{K}(\mathsf{c})}\int_{0}^{\mathsf{c}}\mathsf{e}^{-2\mathsf{K}(\beta)}\mathtt{d\beta}\\& \leq \mathsf{c} \sum\limits_{\mathsf{b = 0}}^{\infty}\mathsf{e}^{-2\mathsf{b} \mathsf{K}(\mathsf{c})}\\& = \mathsf{c}\frac{\mathsf{e}^{2\mathsf{K}(\mathsf{c})}}{\mathsf{e}^{2\mathsf{K}(\mathsf{c})}-1}\\& = \mathsf{W}. \end{split} \end{equation*}$

Therefore, we have

$\int_{0}^{\infty}||\mathsf{A}(\mathtt{t}, 0)\mathfrak{u}||^{2} \mathtt{dt}\leq\mathsf{W}||\mathfrak{u}||_{2}^{2}.$

By using Theorem 3.2 from ^[36], we have $\mathfrak{a}(\mathsf{A})\leq \frac{-1}{2\mathsf{C}}$ , where $\mathfrak{a}(\mathsf{A})$ is the growth bound of the family $\mathsf{A}$ and $\mathsf{C}\geq 1$ . For more details, see ^[36].

This shows that the evolution family on the Hilbert space $\mathcal{H}$ is nonexpansive, so Theorem 3.5 can be applied to such evolution families and will be helpful in finding its solution and uniqueness.

Example 4.2. Let

$E(t, s) = \frac{t+1}{s+1}$

be an evolution family on the space $l_3$ , then clearly the space $l_3$ is not a Hilbert space, but it is reflexive. If we take its subfamily $\mathsf{G}(t, 0) = t+1$ then we still can apply our results to this subfamily. Let $\gamma_m = \frac{1}{m^2}$ and $\zeta_m = \frac{1}{m},$ then clearly

$\lim \limits_{m\rightarrow \infty}\frac{\gamma_{m}}{\zeta_{m}} = 0,$

so by Theorem 3.5 we have the sequence of iteration

$\tau_{m} = \frac{1}{m^2}\tau_{m-1} + (1-\frac{1}{m^2})\mathsf{G}(\frac{1}{m}, 0)\tau_{m} \rightarrow 0 \in F({\bf G}),$

where $0$ is the unique fixed point of the subfamily $\mathsf{G}$ .

Open problem. We have an open problem for the readers that whether Lemmas 3.1 and 3.2 and Theorem 3.5 can be generalized to all periodic and non-periodic evolution families?

5. Conclusions

The idea of semigroupos arise from the solution of autonomous abstract Cauchy problem while the idea of evolution family arise from the solution of non-autonomous abstrct Cauchy problem, which is more genreal than the semigroups. In ^[33], the strong convergence theorms for fixed points for nonexpansive semigroups on Hilbert spaces are proved. We generalized the results to a subfamily of an evolution family on a Hilbert space. These results may be come a gateway for many researchers to extends these ideas to the whole evolution family rather than the subfamily in future. Also these results are helpfull for the mathematician and others to use for existence and uniqeness of solution of non-autonomous abstarct Cauchy problems.

Use of AI tools declaration

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

Acknowledgments

The authors would like to thank the Deanship of Scientific Research at Umm Al-Qura University for supporting this work grant code: 23UQU4331214DSR003.

Conflict of interest

The authors declare that they have no conflicts of interest.

References

[1]	L. Farina, S. Rinaldi, Positive linear systems: theory and applications, John Wiley & Sons, Inc., New York, 2000. https://doi.org/10.1002/9781118033029
[2]	P. De Leenheer, D. Aeyels, Stabilization of positive linear systems, Syst. Control Lett., 44 (2001), 259–271. https://doi.org/10.1016/S0167-6911(01)00146-3 doi: 10.1016/S0167-6911(01)00146-3
[3]	R. Shorten, F. Wirth, D. Leith, A positive systems model of TCP-like congestion control: asymptotic results, IEEE/ACM Trans. Network, 14 (2006), 616–629. https://doi.org/10.1109/TNET.2006.876178 doi: 10.1109/TNET.2006.876178
[4]	D. Angeli, P. De Leenheer, E. D. Somgtag, Chemical networks with inflows and outflows: a positive linear differential inclusions approach, Biotechnol. Progr., 25 (2009), 632–642. https://doi.org/10.1002/btpr.162 doi: 10.1002/btpr.162
[5]	J. Lian, C. Li, B. Xia, Sampled-data control of switched linear systems with application to an F-18 aircraft, IEEE Trans. Ind. Electron., 64 (2016), 1332–1340. https://doi.org/10.1109/TIE.2016.2618872 doi: 10.1109/TIE.2016.2618872
[6]	Y. Sun, Y. Tian, X. Xie, Stabilization of positive switched linear systems and its application in consensus of multiagent systems, IEEE Trans. Autom. Control, 62 (2017), 6608–6613. https://doi.org/10.1109/TAC.2017.2713951 doi: 10.1109/TAC.2017.2713951
[7]	M. Xiang, Z. Xiang, Stability, $L_{1}$ -gain and control synthesis for positive switched systems with time-varying delay, Nonlinear Anal. Hybrid Syst., 9 (2013), 9–17. https://doi.org/10.1016/j.nahs.2013.01.001 doi: 10.1016/j.nahs.2013.01.001
[8]	S. Liu, Z. Xiang, Exponential $L_{1}$ output tracking control for positive switched linear systems with time-varying delays, Nonlinear Anal. Hybrid Syst., 11 (2014), 118–128. https://doi.org/10.1016/j.nahs.2013.07.002 doi: 10.1016/j.nahs.2013.07.002
[9]	X. Liu, Stability analysis of a class of nonlinear positive switched systems with delays, Nonlinear Anal. Hybrid Syst., 16 (2015), 1–12. https://doi.org/10.1016/j.nahs.2014.12.002 doi: 10.1016/j.nahs.2014.12.002
[10]	Y. Sun, Stability analysis of positive switched systems via joint linear copositive Lyapunov functions, Nonlinear Anal. Hybrid Syst., 19 (2016), 146–152. https://doi.org/10.1016/j.nahs.2015.09.001 doi: 10.1016/j.nahs.2015.09.001
[11]	W. Zhao, Y. Sun, Absolute exponential stability of switching Lurie systems with time-varying delay via dwell time switching, J. Franklin Inst., 360 (2023), 11871–11891. https://doi.org/10.1016/j.jfranklin.2023.09.023 doi: 10.1016/j.jfranklin.2023.09.023
[12]	F. Amato, R. Ambrosino, M. Ariola, G. De Tommasi, Robust finite-time stability of impulsive dynamical linear systems subject to norm-bounded uncertainties, Int. J. Robust Nonlinear Control, 21 (2011), 1080–1092. https://doi.org/10.1002/rnc.1620 doi: 10.1002/rnc.1620
[13]	G. Garcia, S. Tarbouriech, J. Bernussou, Finite-time stabilization of linear time-varying continuous systems, IEEE Trans. Autom. Control, 54 (2009), 364–369. https://doi.org/10.1109/TAC.2008.2008325 doi: 10.1109/TAC.2008.2008325
[14]	S. Zhao, J. Sun, L. Liu, Finite-time stability of linear time-varying singular systems with impulsive effects, Int. J. Control, 81 (2008), 1824–1829. https://doi.org/10.1080/00207170801898893 doi: 10.1080/00207170801898893
[15]	K. Wang, E. Tian, S. Shen, L. Wei, J. Zhang, Input-output finite-time stability for networked control systems with memory event-triggered scheme, J. Franklin Inst., 356 (2019), 8507–8520. https://doi.org/10.1016/j.jfranklin.2019.08.020 doi: 10.1016/j.jfranklin.2019.08.020
[16]	N. T. Thanh, P. Niamsup, V. N. Phat, Finite-time stability of singular nonlinear switched time-delay systems: a singular value decomposition approach, J. Franklin Inst., 354 (2017), 3502–3518. https://doi.org/10.1016/j.jfranklin.2017.02.036 doi: 10.1016/j.jfranklin.2017.02.036
[17]	J. Wei, X. Zhang, H. Zhi, X. Zhu, New finite-time stability conditions of linear discrete switched singular systems with finite-time unstable subsystems, J. Franklin Inst., 357 (2020), 279–293. https://doi.org/10.1016/j.jfranklin.2019.03.045 doi: 10.1016/j.jfranklin.2019.03.045
[18]	T. Zhang, F. Deng, W. Zhang, Finite-time stability and stabilization of linear discrete time-varying stochastic systems, J. Franklin Inst., 356 (2019), 1247–1267. https://doi.org/10.1016/j.jfranklin.2018.10.026 doi: 10.1016/j.jfranklin.2018.10.026
[19]	L. Hou, C. Sun, H. Ren, Y. Wei, Finite-time stability of switched linear systems, Proceedings of the 36th Chinese Control Conference, 2017, 2338–2342. https://doi.org/10.23919/ChiCC.2017.8027707
[20]	W. Xiang, J. Xiao, Finite-time stability and stabilisation for switched linear systems, Int. J. Syst. Sci., 44 (2013), 384–400. https://doi.org/10.1080/00207721.2011.604738 doi: 10.1080/00207721.2011.604738
[21]	L. Liu, N. Xu, G. Zong, X. Zhao, New results on finite-time stability and stabilization of switched positive linear time-delay systems, IEEE Access, 8 (2020), 4418–4427. https://doi.org/10.1109/ACCESS.2019.2961683 doi: 10.1109/ACCESS.2019.2961683
[22]	G. Chen, Y. Yang, Finite-time stability of switched positive linear systems, Int. J. Robust Nonlinear Control, 24 (2012), 179–190. https://doi.org/10.1002/rnc.2870 doi: 10.1002/rnc.2870
[23]	N. Xu, Y. Chen, A. Xue, G. Zong, Finite-time stabilization of continuous-time switched positive delayed systems, J. Franklin Inst., 359 (2022), 255–271. https://doi.org/10.1016/j.jfranklin.2021.04.022 doi: 10.1016/j.jfranklin.2021.04.022
[24]	M. Zhang, Q. Zhu, Finite-time input-to-state stability of switched stochastic time-varying nonlinear systems with time delays, Chaos Solitons Fract., 162 (2022), 112391. https://doi.org/10.1016/j.chaos.2022.112391 doi: 10.1016/j.chaos.2022.112391
[25]	T. Huang, Y. Sun, D. Tian, Finite-time stability of positive switched time-delay systems based on linear time-varying copositive Lyapunov functional, J. Franklin Inst., 359 (2022), 2244–2258. https://doi.org/10.1016/j.jfranklin.2022.01.029 doi: 10.1016/j.jfranklin.2022.01.029
[26]	M. Hu, Y. Wang, J. Xiao, W. Yang, $L_{1}$ -gain analysis and control of impulsive positive systems with interval uncertainty and time delay, J. Franklin Inst., 356 (2019), 9180–9205. https://doi.org/10.1016/j.jfranklin.2019.08.010 doi: 10.1016/j.jfranklin.2019.08.010
[27]	T. Liu, B. Wu, L. Liu, Y. Wang, Asynchronously finite-time control of discrete impulsive switched positive time-delay systems, J. Franklin Inst., 352 (2015), 4503–4514. https://doi.org/10.1016/j.jfranklin.2015.06.015 doi: 10.1016/j.jfranklin.2015.06.015
[28]	S. Peng, L. Yang, Global exponential stability of impulsive functional differential equations via Razumikhin technique, Abstr. Appl. Anal., 2010 (2010), 987372. https://doi.org/10.1155/2010/987372 doi: 10.1155/2010/987372
[29]	M. Hu, Y. Wang, J. Xiao, On finite-time stability and stabilization of positive systems with impulses, Nonlinear Anal. Hybrid Syst., 31 (2019), 275–291. https://doi.org/10.1016/j.nahs.2018.10.004 doi: 10.1016/j.nahs.2018.10.004
[30]	M. Hu, J. Xiao, R. Xiao, W. Chen, Impulsive effects on the stability and stabilization of positive systems with delays, J. Franklin Inst., 354 (2017), 4034–4054. https://doi.org/10.1016/j.jfranklin.2017.03.019 doi: 10.1016/j.jfranklin.2017.03.019
[31]	C. Briat, Dwell-time stability and stabilization conditions for linear positive impulsive and switched systems, Nonlinear Anal. Hybrid Syst., 24 (2017), 198–226. https://doi.org/10.1016/j.nahs.2017.01.004 doi: 10.1016/j.nahs.2017.01.004
[32]	G. Chen, C. Fan, J. Sun, J. Xia, Mean square exponential stability analysis for itô stochastic systems with aperiodic sampling and multiple time-delays, IEEE Trans. Autom. Control, 67 (2022), 2473–2480. https://doi.org/10.1109/TAC.2021.3074848 doi: 10.1109/TAC.2021.3074848
[33]	G. Chen, J. Xia, Ju H. Park, H. Shen, G. Zhuang, Sampled-data synchronization of stochastic Markovian jump neural networks with time-varying delay, IEEE Trans. Neural Networks Learn. Syst., 33 (2021), 3829–3841. https://doi.org/10.1109/TNNLS.2021.3054615 doi: 10.1109/TNNLS.2021.3054615
[34]	G. Chen, G. Du, J. Xia, X. Xie, J. H. Park, Controller synthesis of aperiodic sampled-data networked control system with application to interleaved flyback module integrated converter, IEEE Trans. Circuits Syst. I, 70 (2023), 4570–4580. https://doi.org/10.1109/TCSI.2023.3295940 doi: 10.1109/TCSI.2023.3295940

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