1 Introduction

More than half a century ago, when the Itô’s [1] landmark work “On stochastic differential equations” (Itô, 1951) came out, the stochastic differential equations (SDEs), as a new branch of mathematics, aroused great interest in academic circles. After more than half a century of glorious development, SDEs are famous all over the world. In recent decades, SDEs have accumulated many results, which played an important role in financial [2], control theory [3], biomathematics [4], game theory [5], and other models hidden in the observed data. It is well known that the essences of SDEs are based on an axiomatic probability theory, and large amounts of sample data are needed to obtain the frequency of their random disturbances. Furthermore, their distribution functions can be obtained. However, in reality, people seem to lack data or the size of sample data applied in practice is smaller in some cases, such as the emerging infectious disease model, the new stock model, and so on. Although sometimes we have a lot of available sample data, the frequency obtained by sample data is, unfortunately, not close enough to the distribution function obtained in some practical problems, and we need to invite some domain experts to evaluate the belief degree that each event may happen in these situations.

Human uncertainty with respect to belief degrees [6] can play an important role in addressing the issue of an indeterminate phenomenon. In order to describe the evolution of an uncertain phenomenon with respect to belief degrees, the uncertain differential equations were first proposed by Liu [7]. Following that, Liu [8] also proposed the concept of stability of uncertain differential equations. Later, Chen and Liu [9] proved an existence and uniqueness theorem for an uncertain differential equation, and Yao et al. [10] proved some related stability theorems. Besides, a large and growing body of literature [1115] about stability theorems for uncertain differential equations has been investigated. Furthermore, Yao and Chen [16] first proposed Euler’s method combined with 99-method or 999-method to obtain the numerical solution of the uncertain differential equation. With the perfect theory and maturity of numerical methods of the uncertain differential equation, uncertain differential equations have been successfully applied to many areas such as optimal control [17], differential game theory [18, 19], wave equation [2022], financial systems [23], fractional differential equations [24], and so on. To better understand the development of uncertain differential equations and applications of numerical methods, the readers can refer to the book [25].

V-jump uncertain processes proposed by Deng et al. [26] were often used to describe the evolution of an uncertain phenomenon with jumps, in which the uncertain process may undergo a sudden change because of emergency such as economic crisis, outbreaks of infectious diseases, earthquake, war, etc. The definition of V-jump uncertain process is as follows.

Definition 1

An uncertain process \(V_{k}\) with respect to time k is said to be a V-jump process with parameters \(\theta _{1}\) and \(\theta _{2}\)\((0 < \theta _{1} < \theta _{2} < 1)\) for \(k \geq 0\) if

  1. (i)

    \(V_{0} = 0\),

  2. (ii)

    \(V_{k}\) has stationary and independent increments,

  3. (iii)

    for any given time \(k>0\), every increment \(V_{r+k}-V_{r}\) is a \(\mathcal{Z}\) jump uncertain variable \(\xi \thicksim \mathcal{Z}(\theta _{1},\theta _{2},k)\) for \(\forall r>0\) whose uncertainty distribution is

    $$\begin{aligned} \varPhi (x)= \textstyle\begin{cases} 0& \mbox{if }x< 0, \\ \frac{2\theta _{1}}{k}x& \mbox{if }0\leq x< \frac{k}{2}, \\ \theta _{2}+\frac{2(1-\theta _{2})}{k}(x-\frac{k}{2})&\mbox{if } \frac{k}{2}\leq x< k, \\ 1&\mbox{if }x\geq k. \end{cases}\displaystyle \end{aligned}$$

Deng et al. [27] proved the existence and uniqueness of a solution to uncertain differential equation with V-jump under Lipschitz condition and linear growth condition on the coefficients. The definition of uncertain differential equation with V-jump is as follows.

Definition 2

Suppose that \(C_{k}\) is an uncertain canonical process with respect to time k, \(V_{k}\) is an uncertain V-jump process with respect to time k, and \(p_{1}\), \(p_{2}\), and \(p_{3}\) are some given functions. Then

$$ dZ_{k} = p_{1}(Z_{k},k)\,dk+ p_{2}(Z_{k},k)\,dC_{k}+p_{3}(Z_{k},k) \,dV_{k} $$

is called an uncertain differential equation with V-jump.

Uncertain differential equations with V-jumps were widely applied to uncertain optimal control with V-jumps, see Refs [2833]; whereas uncertain delay differential equations [3438] were often used to describe such uncertain physical systems that depend not only on the present state but also upon their past states. The main interest in the theory of uncertain delay differential equations was related to the existence, uniqueness as well as stability. Aiming at these phenomena, Barbacioru [34] proposed uncertain delay differential equations. Ge et al. [35] proved the existence and uniqueness of solutions under Lipschitz condition and linear growth condition on the coefficients. Later, Wang et al. [36, 37] proposed some concepts of the stability and proved the corresponding stability theorems. Jia and Sheng [38] proved stability in distribution. The definition of uncertain delay differential equation is as follows.

Definition 3

Suppose that \(C_{k}\) is a Liu process with respect to time k, and h and p are two continuous functions. Then

$$ \textstyle\begin{cases} dZ_{k}=h(k,Z_{k},Z_{k-\tau })\,dk+p(k,Z_{k},Z_{k-\tau })\,dC_{k},&k\in [0,+ \infty ), \\ Z_{k}=\varphi (k),&k\in [-\tau ,0] \end{cases} $$
(1)

is called an uncertain delay differential equation, where τ is called time delay. Its equivalent integral form is as follows:

$$ \textstyle\begin{cases} Z_{k}=Z_{0}+\int _{0}^{k}h(r,Z_{r},Z_{r-\tau })\,d r+\int _{0}^{k}p(r,Z_{r},Z_{r- \tau })\,dC_{r},&k\in [0,+\infty ), \\ Z_{k}=\varphi (k),&k\in [-\tau ,0]. \end{cases} $$
(2)

However, the uncertain delay differential equations with V-jump have not been studied so far. For describing the state of an uncertain delay system with jumps more accurately, we propose uncertain delay differential equations with V-jump. In contrast to earlier results of Refs [27, 35], we not only combine these two equations, but also prove the existence and uniqueness of solutions by one-sided local Lipschitz condition rather than the strict Lipschitz condition on the coefficients. Furthermore, under some reasonable conditions, we prove the stability.

The remainder of the paper is organized as follows. In Sect. 2, we prove an existence, uniqueness, and stability theorem of the solution to uncertain delay differential equations with V-jump and give some examples. Finally, a brief conclusion is given in Sect. 3.

2 Main results

We first give the concept of uncertain delay differential equations with V-jump and an example.

2.1 Uncertain delay differential equations with V-jump

Definition 4

Suppose that \(C_{k}\) is an uncertain canonical process, \(V_{k}\) is an uncertain V-jump process with respect to time k, and \(h(k,z), p(k,z), q(k,z) : [0, T]\times \mathbb{R}\rightarrow \mathbb{R}\) are continuous maps. Then

$$\begin{aligned} \textstyle\begin{cases} dZ_{k}= h(k,Z_{k},Z_{k-\tau })\,dk+p(k,Z_{k},Z_{k-\tau })\,dC_{k} \\ \hphantom{dZ_{k}= }{}+q(k,Z_{k},Z_{k-\tau })\,dV_{k},&k\in [0,+\infty ), \\ Z_{k}=\varphi (k),&k\in [-\tau ,0] \end{cases}\displaystyle \end{aligned}$$
(3)

is called an uncertain differential equation with V-jump. A solution is an uncertain process \(Z_{k}\) that satisfies (3) identically in time k. If τ is finite, the equation with V-jump is called the one with finite delay; otherwise, the one with infinite delay.

To solve an uncertain delay differential equations with V-jump, we first give an example. Consider the following uncertain delay differential equation with V-jump:

$$\begin{aligned} \textstyle\begin{cases} dZ_{k}=mZ_{k-\tau }\,dk+\mu \,dC_{k}+\nu \,dV_{k},&k\in [0,T], \\ Z_{k}=1,&k\in [-\tau ,0], \end{cases}\displaystyle \end{aligned}$$
(4)

where \(\tau > 0\), m, μ, and ν are constants.

For \(k\in [0, T]\), there exists \(n\in \mathbb{N}\) such that \(k\in [n\tau ,(n + 1)\tau ]\). If \(n = 0\), \(k\in [0, \tau ]\), then \(k-\tau \in [-\tau , 0]\), and \(Z_{k-\tau }=1\). Thus, we have

$$\begin{aligned} \begin{aligned} &\textstyle\begin{cases} dZ_{k}=m\,d k+\mu \,dC_{k}+\nu \,dV_{k}, \\ Z_{0}=1, \end{cases}\displaystyle \\ & Z_{k}=Z_{0}+ \int _{0}^{k}m\,d r+ \int _{0}^{k}\mu \,dC_{r}+ \int _{0}^{k} \nu \,dV_{r} \\ &\hphantom{Z_{k}}=1+mk+\mu C_{k}+\nu V_{k},\quad k\in [0,\tau ]. \end{aligned} \end{aligned}$$
(5)

If \(n = 1\), \(k\in [\tau , 2\tau ]\), then \(k-\tau \in [0, \tau ]\), and

$$ Z_{k-\tau }=1+m(k-\tau )+\mu C_{k-\tau }+\nu V_{k-\tau }. $$

So, we have

$$\begin{aligned} \begin{aligned} &\textstyle\begin{cases} dZ_{k}=m[1+m(k-\tau )+\mu C_{k-\tau }+\nu V_{k-\tau }]\,dk+\mu \,dC_{k}+ \nu \,dV_{k}, \\ Z_{\tau }=1+m\tau +\mu C_{\tau }+\nu V_{\tau }, \end{cases}\displaystyle \\ &Z_{k}=Z_{\tau }+ \int _{\tau }^{k}m\bigl[1+m(r-\tau )+\mu C_{r-\tau } \\ &\hphantom{Z_{k}=}{}+\nu V_{r-\tau }\bigr]\,d r+ \int _{\tau }^{k}\mu \,dC_{r}+ \int _{\tau }^{k}\nu \,dV_{r} \\ &\hphantom{Z_{k}}=1+m\tau +\mu C_{\tau }+\nu V_{\tau }+ \int _{\tau }^{k}m\bigl[1+m(r-\tau )+ \mu C_{r-\tau } \\ &\hphantom{Z_{k}=}{}+\nu V_{r-\tau }\bigr]\,d r+\mu (C_{k}-C_{\tau })+ \nu (V_{k}-V_{\tau }) \\ &\hphantom{Z_{k}}=1 + mk +m^{2}\frac{(k-\tau )^{2}}{2}+\mu C_{k}+\nu V_{k} \\ &\hphantom{Z_{k}=}{}+m\mu \int _{\tau }^{k}C_{r-\tau }\,dr+m\nu \int _{\tau }^{k}V_{r-\tau }\,dr. \end{aligned} \end{aligned}$$
(6)

Continuing this method, we can find the expression for \(Z(k)\) on each interval \([n\tau ,(n + 1)\tau ]\) with \(n\in \mathbb{N} \).

Remark 1

According to the definition of uncertain canonical \(C_{k}(\gamma )\), where \(\gamma \in \varGamma \) defined in Definition 2.2 [9], almost all sample paths of \(C_{k}\) are Lipschitz continuous functions. That is, there exists a set \(\varGamma _{0}\) in Γ with \(\mathcal{M}\{\varGamma _{0}\}=1\) such that, for any \(\gamma \in \varGamma _{0}\), \(C_{k}(\gamma )\) is Lipschitz continuous. To do this simply, we set \(\varGamma _{0}=\varGamma \). Thus, for each γ, by Lemma 4.1 in [9], there exists a positive number \(K(\gamma )\) such that

$$\begin{aligned} \bigl\vert C_{r}(\gamma )-C_{k}(\gamma ) \bigr\vert \leq K(\gamma ) \vert r-k \vert ,\quad \forall r,k\geq 0, \end{aligned}$$

and for each sample γ, it follows from the definition of uncertain V-jump process and Theorem 3.2 in [27] that

$$\begin{aligned} \bigl\vert V_{r}(\gamma )-V_{k}(\gamma ) \bigr\vert \leq \vert r-k \vert ,\quad \forall r,k\geq 0. \end{aligned}$$

Besides, the uncertain integrals of \(C_{k}\) and \(V_{k}\) are equivalent to the Riemann–Stieltjes integral from the point of each sample path. Hence, we can just focus on the following uncertain delay integral equation with V-jump:

$$\begin{aligned} \textstyle\begin{cases} Z_{k}(\gamma )=Z_{0}(\gamma )+\int _{0}^{k}h(r,Z_{r}(\gamma ),Z_{r- \tau }(\gamma ))\,d r \\ \hphantom{Z_{k}(\gamma )=}{}+\int _{0}^{k}p(r,Z_{r}(\gamma ),Z_{r-\tau }(\gamma ))\,dC_{r}(\gamma ) \\ \hphantom{Z_{k}(\gamma )=}{}+\int _{0}^{k}q(r,Z_{r}(\gamma ),Z_{r-\tau }(\gamma ))\,dV_{r},&k\in [0,+ \infty ), \\ Z_{k}(\gamma )= \varphi (k),&k\in [-\tau ,0]. \end{cases}\displaystyle \end{aligned}$$
(7)

Our goal is to prove that, for each sample path γ, the uncertain delay integral equation with V-jump (7) has a unique solution on \([0,+\infty )\) under certain reasonable conditions.

First of all, we discuss the existence and uniqueness for uncertain delay differential equations with V-jump in a local interval \([k_{0} ,k_{0}+\alpha ]\) for some positive α. Equation (7) becomes

$$\begin{aligned} \textstyle\begin{cases} Z_{k}(\gamma )=Z_{k_{0}}(\gamma )+\int _{k_{0}}^{k}h(r,Z_{r}(\gamma ),X_{r- \tau }(\gamma ))\,d r \\ \hphantom{Z_{k}(\gamma )=}{}+\int _{k_{0}}^{k}p(r,Z_{r}(\gamma ),Z_{r-\tau }(\gamma ))\,dC_{r}( \gamma ) \\ \hphantom{Z_{k}(\gamma )=}{}+\int _{k_{0}}^{k}q(r,Z_{r}(\gamma ),Z_{r-\tau }(\gamma ))\,dV_{r},&k \in [k_{0},k_{0}+\alpha ], \\ Z_{k}(\gamma )=\varphi (k),&k\in [k_{0}-\tau ,k_{0}], \end{cases}\displaystyle \end{aligned}$$
(8)

and the following Theorem 1 will give the result of existence and uniqueness of uncertain delay integral equation with V-jump (8).

2.2 Existence and uniqueness of the solution

Theorem 1

Fixing \(\gamma \in \varGamma \), the uncertain delay integral equation with V-jump (8) has a unique solution in \([k_{0},k_{0}+\alpha ]\)if the coefficients h, p, and q are locally Lipschitz continuous of z. In other words, for each

$$\begin{aligned} & D =\bigl\{ (k,z,\hat{z})|k \in [k_{0},k_{0}+a], z\in \bigl[Z_{k_{0}}(\gamma )-b,Z_{k_{0}}( \gamma )+b\bigr],\hat{z} \in \mathbb{R}\bigr\} , \end{aligned}$$

there exists a positive constant \(L_{D}\)such that

$$ \bigl\vert h(k, z_{1}, \hat{z})-h(k, z_{2}, \hat{z}) \bigr\vert \vee \bigl\vert p(k, z_{1}, \hat{z})-p(k, z_{2}, \hat{z}) \bigr\vert \vee \bigl\vert q(k, z_{1}, \hat{z})-q(k, z_{2}, \hat{z}) \bigr\vert \leq L_{D} \vert z_{1}-z_{2} \vert , $$

where \(a>0\), \(b>0\), \((k, z_{1}, \hat{z})\in D\), \((k, z_{2}, \hat{z})\in D\), and

$$ Q=\max_{D} \bigl\{ \bigl\vert h(k, z, \hat{z}) \bigr\vert +K(\gamma ) \bigl\vert p(k, z, \hat{z}) \bigr\vert + \bigl\vert q(k, z, \hat{z}) \bigr\vert \bigr\} , $$

\(K(\gamma )\)is the Lipschitz constant to \(C_{k}(\gamma )\), and \(\alpha =\min \{a,b/Q,\tau \}\).

Proof

By using successive approximations, we will prove this theorem in three steps.

$$\begin{aligned} \textstyle\begin{cases} Z_{k}^{(0)}(\gamma )= Z_{k_{0}}(\gamma ) \\ Z_{k-\tau }^{(0)}(\gamma )= Z_{k_{0}-\tau }(\gamma ) \\ Z_{k}^{(n+1)}(\gamma )= Z_{k_{0}}(\gamma )+\int _{k_{0}}^{k}h(r,Z_{r}^{(n)}( \gamma ),Z_{r-\tau }^{(n)}(\gamma ))\,d r \\ \hphantom{Z_{k}^{(n+1)}(\gamma )= }{}+\int _{k_{0}}^{k}p(r,Z_{r}^{(n)}(\gamma ),Z_{r-\tau }^{(n)}(\gamma ))\,dC_{r}(\gamma ) \\ \hphantom{Z_{k}^{(n+1)}(\gamma )= }{}+\int _{k_{0}}^{k}q(r,Z_{r}^{(n)}(\gamma ),Z_{r-\tau }^{(n)}(\gamma ))\,dV_{r},&k\in [k_{0},k_{0}+\alpha ], \\ Z_{k}(\gamma )=\varphi (k),&k\in [k_{0}-\tau ,k_{0}]. \end{cases}\displaystyle \end{aligned}$$
(9)

It is easy to find that \(\{Z_{k}^{(n)}(\gamma )\}\) is continuous in time k for any \(n \geq 0\).

Step 1. (existence) In this step, we will prove that

$$ \bigl(k,Z_{k}^{(n)}(\gamma ),Z_{k-\tau }^{(n)}( \gamma ) \bigr)\in D,\quad n \geq 0, $$

when \(k\in [k_{0},k_{0}+\alpha ]\).

Here, we use mathematical induction. When \(n = 0\),

$$\begin{aligned} \textstyle\begin{cases} k\in [k_{0},k_{0}+a], \\ Z_{k}^{(0)}(\gamma )=Z_{k_{0}}(\gamma )\in [Z_{k_{0}}(\gamma )-b,Z_{k_{0}}( \gamma )+b], \\ Z_{k-\tau }^{(0)}(\gamma )=Z_{k_{0}-\tau }(\gamma )\in \mathbb{R}. \end{cases}\displaystyle \end{aligned}$$
(10)

Thus the conclusion is obviously established. Assume that

$$ \bigl(k,Z_{k}^{(n)}(\gamma ),Z_{k-\tau }^{(n)}( \gamma ) \bigr)\in D,\quad n \geq 0, $$

when \(k\in [k_{0},k_{0}+\alpha ]\), we have

$$\begin{aligned} & \bigl\vert Z_{k}^{(n+1)}(\gamma )-Z_{k_{0}}( \gamma ) \bigr\vert \\ &\quad =\biggl\vert \int _{k_{0}}^{k}h\bigl(r,Z_{r}^{(n)}( \gamma ),Z_{r-\tau }^{(n)}( \gamma )\bigr)\,d r+ \int _{k_{0}}^{k}p\bigl(r,X_{r}^{(n)}( \gamma ),Z_{r-\tau }^{(n)}( \gamma )\bigr)\,dC_{r}( \gamma ) \\ &\qquad {}+ \int _{k_{0}}^{k}q\bigl(r,Z_{r}^{(n)}( \gamma ),Z_{r-\tau }^{(n)}( \gamma )\bigr)\,dV_{r} \biggr\vert \\ &\quad \leq \biggl\vert \int _{k_{0}}^{k}h\bigl(r,Z_{r}^{(n)}( \gamma ),Z_{r-\tau }^{(n)}( \gamma )\bigr)\,dr \biggr\vert +K( \gamma ) \biggl\vert \int _{k_{0}}^{k}p\bigl(r,Z_{r}^{(n)}( \gamma ),Z_{r-\tau }^{(n)}(\gamma )\bigr)\,d r \biggr\vert \\ &\qquad {}+ \biggl\vert \int _{k_{0}}^{k}q\bigl(r,Z_{r}^{(n)}( \gamma ),Z_{r-\tau }^{(n)}( \gamma )\bigr)\,d r \biggr\vert \\ &\quad = \int _{k_{0}}^{k} \bigl\vert h \bigl(r,Z_{r}^{(n)}(\gamma ),Z_{r-\tau }^{(n)}( \gamma )\bigr) \bigr\vert +K( \gamma ) \bigl\vert p\bigl(r,Z_{r}^{(n)}( \gamma ),Z_{r-\tau }^{(n)}(\gamma )\bigr) \bigr\vert \\ &\qquad {}+ \bigl\vert q\bigl(r,Z_{r}^{(n)}(\gamma ),Z_{r-\tau }^{(n)}(\gamma )\bigr) \bigr\vert \,d r \\ &\quad \leq Q\cdot \vert k-k_{0} \vert \\ &\quad \leq Q\cdot \alpha \leq b, \end{aligned}$$

and

$$ Z_{k-\tau }^{(n+1)}(\gamma )\in \mathbb{R}. $$

This indicates that \((k,Z_{k}^{(n)}(\gamma ),Z_{k-\tau }^{(n)}(\gamma ))\in D\) for \(n = 0,1,2,\ldots \) , when \(k\in [k_{0},k_{0}+\alpha ]\).

Step 2. In this step, we will prove that the sequence \(\{Z_{k}^{(n)}(\gamma )\}_{n=0}^{+\infty }\) given by (9) converges uniformly to the solution of equation (8) on \([k_{0},k_{0}+\alpha ]\) as \(n\rightarrow \infty \).

First, we will prove

$$\begin{aligned} & \bigl\vert Z_{k}^{(n+1)}(\gamma )-Z_{k}^{(n)}( \gamma ) \bigr\vert \leq \frac{Q(2L_{D}+K(\gamma )L_{D})^{n}}{(n+1)!} \vert k-k_{0} \vert ^{n+1}. \end{aligned}$$

Similar to Step 1, in this step, we also use mathematical induction. When \(n = 0\),

$$\begin{aligned} & \bigl\vert Z_{k}^{(1)}(\gamma )-Z_{k}^{(0)}( \gamma ) \bigr\vert \\ &\quad =\biggl\vert \int _{k_{0}}^{k}h\bigl(r,Z_{r}^{(0)}( \gamma ),Z_{r-\tau }^{(0)}( \gamma )\bigr)\,d r+ \int _{k_{0}}^{k}p\bigl(r,Z_{r}^{(0)}( \gamma ),Z_{r-\tau }^{(0)}( \gamma )\bigr)\,dC_{r}( \gamma ) \\ &\qquad {}+ \int _{k_{0}}^{k}q\bigl(r,Z_{r}^{(0)}( \gamma ),Z_{r-\tau }^{(0)}( \gamma )\bigr)\,dV_{r} \biggr\vert \\ &\quad = \biggl\vert \int _{k_{0}}^{k}h\bigl(r,Z_{r}^{(0)}( \gamma ),Z_{r-\tau }^{(0)}( \gamma )\bigr)\,d r \biggr\vert +K( \gamma ) \biggl\vert \int _{k_{0}}^{k}p\bigl(r,Z_{r}^{(0)}( \gamma ),Z_{r-\tau }^{(0)}(\gamma )\bigr)\,d r \biggr\vert \\ &\qquad {}+ \biggl\vert \int _{k_{0}}^{k}q\bigl(r,Z_{r}^{(0)}( \gamma ),Z_{r-\tau }^{(0)}( \gamma )\bigr)\,d r \biggr\vert \\ &\quad \leq \int _{k_{0}}^{k} \bigl\vert h \bigl(r,Z_{r}^{(0)}(\gamma ),Z_{r-\tau }^{(0)}( \gamma )\bigr) \bigr\vert +K(\gamma ) \bigl\vert p\bigl(r,Z_{r}^{(0)}( \gamma ),Z_{r-\tau }^{(0)}( \gamma )\bigr) \bigr\vert \\ &\qquad {}+ \bigl\vert q\bigl(r,Z_{r}^{(0)}(\gamma ),Z_{r-\tau }^{(0)}(\gamma )\bigr) \bigr\vert \,d r \\ &\quad \leq Q\cdot \vert k-k_{0} \vert . \end{aligned}$$

Assume that

$$\begin{aligned} & \bigl\vert Z_{k}^{(n)}(\gamma )-Z_{k}^{(n-1)}( \gamma ) \bigr\vert \\ &\quad \leq \frac{Q(2L_{D}+K(\gamma )L_{D})^{n-1}}{n!} \vert k-k_{0} \vert ^{n}, \end{aligned}$$

when \(k\in [k_{0},k_{0}+\alpha ]\), we have

$$\begin{aligned} & \bigl\vert Z_{k}^{(n+1)}(\gamma )-Z_{k}^{(n)}( \gamma ) \bigr\vert \\ &\quad =\biggl\vert \int _{k_{0}}^{k}h\bigl(r,Z_{r}^{(n)}( \gamma ),Z_{r-\tau }^{(n)}( \gamma )\bigr)\,d r+ \int _{k_{0}}^{k}p\bigl(r,Z_{r}^{(n)}( \gamma ),Z_{r-\tau }^{(n)}( \gamma )\bigr)\,dC_{r}( \gamma ) \\ &\qquad {}+ \int _{k_{0}}^{k}q\bigl(r,Z_{r}^{(n)}( \gamma ),Z_{r-\tau }^{(n)}(\gamma )\bigr)\,dV_{r}- \int _{k_{0}}^{k}h\bigl(r,Z_{r}^{(n-1)}( \gamma ),Z_{r-\tau }^{(n-1)}( \gamma )\bigr)\,dr \\ &\qquad {}- \int _{k_{0}}^{k}p\bigl(r,Z_{r}^{(n-1)}( \gamma ),Z_{r-\tau }^{(n-1)}( \gamma )\bigr)\,dC_{r}( \gamma )- \int _{k_{0}}^{k}q\bigl(r,Z_{r}^{(n-1)}( \gamma ),Z_{r- \tau }^{(n-1)}(\gamma )\bigr)\,dV_{r} \biggr\vert \\ &\quad \leq \int _{k_{0}}^{k} \biggl\vert h \bigl(r,Z_{r}^{(n)}(\gamma ),Z_{r-\tau }^{(n)}( \gamma )\bigr)\,d r- \int _{k_{0}}^{k}h\bigl(r,Z_{r}^{(n-1)}( \gamma ),Z_{r-\tau }^{(n-1)}( \gamma )\bigr) \biggr\vert \,dr \\ &\qquad {}+ \int _{k_{0}}^{k} \biggl\vert p \bigl(r,Z_{r}^{(n)}(\gamma ),Z_{r-\tau }^{(n)}( \gamma )\bigr)\,dC_{r}(\gamma )- \int _{k_{0}}^{k}p\bigl(r,Z_{r}^{(n-1)}( \gamma ),Z_{r- \tau }^{(n-1)}(\gamma )\bigr) \biggr\vert \,dC_{r}(\gamma ) \\ &\qquad {}+ \int _{k_{0}}^{k} \biggl\vert q \bigl(r,Z_{r}^{(n)}(\gamma ),Z_{r-\tau }^{(n)}( \gamma )\bigr)\,dV_{r}- \int _{k_{0}}^{k}q\bigl(r,Z_{r}^{(n-1)}( \gamma ),Z_{r- \tau }^{(n-1)}(\gamma )\bigr) \biggr\vert \,dV_{r} \\ &\quad \leq \int _{k_{0}}^{k}L_{D} \bigl\vert Z_{r}^{(n)}(\gamma )-Z_{r}^{(n-1)}( \gamma ) \bigr\vert \,d r+K(\gamma ) \int _{k_{0}}^{k}L_{D} \bigl\vert Z_{r}^{(n)}(\gamma )-Z_{r}^{(n-1)}( \gamma ) \bigr\vert \,d r \\ &\qquad {}+ \int _{k_{0}}^{k}L_{D} \bigl\vert Z_{r}^{(n)}(\gamma )-Z_{r}^{(n-1)}( \gamma ) \bigr\vert \,d r \\ &\quad \leq L_{D}\bigl(2+K(\gamma )\bigr) \int _{k_{0}}^{k} \bigl\vert Z_{r}^{(n)}( \gamma )-Z_{r}^{(n-1)}( \gamma ) \bigr\vert \,d r \\ &\quad \leq L_{D}\bigl(2+K(\gamma )\bigr) \int _{k_{0}}^{k} \frac{Q(2L_{D}+K(\gamma )L_{D})^{n-1}}{n!} \vert k-k_{0} \vert ^{n}\,d r \\ &\quad \leq \frac{Q(2L_{D}+K(\gamma )L_{D})^{n}}{n!} \int _{k_{0}}^{k} \vert r-k_{0} \vert ^{n}\,dr \\ & \quad \leq \frac{Q(2L_{D}+K(\gamma )L_{D})^{n}}{(n+1)!} \vert k-k_{0} \vert ^{n+1}. \end{aligned}$$

The above inequality gives an upper bound of

$$\begin{aligned} \bigl\vert Z_{k}^{(n+1)}(\gamma )-Z_{k}^{(n)}( \gamma ) \bigr\vert \end{aligned}$$

on \([k_{0},k_{0}+\alpha ]\) for \(n = 0,1,2,\ldots \) . Obviously, for any \(\epsilon > 0\), there exists an integer N \((N>0)\) such that

$$\begin{aligned} &\sum_{n\geq N} \bigl\vert Z_{k}^{(n+1)}( \gamma )-Z_{k}^{(n)}(\gamma ) \bigr\vert \\ &\quad \leq \sum_{n\geq N} \frac{Q(2L_{D}+K(\gamma )L_{D})^{n}}{(n+1)!} \vert k-k_{0} \vert ^{n+1} \\ &\quad =\frac{Q}{2L_{D}+K(\gamma )L_{D}}\sum_{n\geq N} \frac{(2L_{D}+K(\gamma )L_{D})^{n+1}}{(n+1)!} \vert k-k_{0} \vert ^{n+1} \\ &\quad \leq\frac{Q}{2L_{D}+K(\gamma )L_{D}}\sum_{n\geq N} \frac{(2L_{D}+K(\gamma )L_{D})^{n+1}}{(n+1)!}\alpha ^{n+1} \\ &\quad \leq\frac{Q}{2L_{D}+K(\gamma )L_{D}}\sum_{n\geq N} \frac{(\alpha L_{D}(2+K(\gamma )))^{n+1}}{(n+1)!} \\ &\quad < \epsilon , \end{aligned}$$

where the last inequality from

$$ \lim_{n\rightarrow +\infty }\frac{a^{n+1}}{(n+1)!}=0. $$

Because

$$ Z_{k}^{n}(\gamma )=Z_{k}^{0}( \gamma )+\sum_{i=1}^{n} \bigl(Z_{k}^{i}( \gamma )-Z_{k}^{i-1}( \gamma )\bigr), $$

the above inequality indicates that \(Z_{k}^{n}(\gamma )\) converges uniformly on \([k_{0},k_{0}+\alpha ]\) as \(n\rightarrow +\infty \).

Thus, we have

$$\begin{aligned} Z_{k}^{(n+1)}(\gamma )={}&Z_{k_{0}}(\gamma )+ \int _{k_{0}}^{k}h\bigl(r,Z_{r}^{(n)}( \gamma ),Z_{r-\tau }^{(n)}(\gamma )\bigr)\,d r \\ &{}+ \int _{k_{0}}^{k}p\bigl(r,Z_{r}^{(n)}( \gamma ),Z_{r-\tau }^{(n)}(\gamma )\bigr)\,dC_{r}( \gamma ) \\ &{}+ \int _{k_{0}}^{k}q\bigl(r,Z_{r}^{(n)}( \gamma ),Z_{r-\tau }^{(n)}(\gamma )\bigr)\,dV_{r}( \gamma ). \end{aligned}$$

Denote \(Z_{k}(\gamma )=\lim_{n\rightarrow +\infty }Z_{k}^{n}(\gamma )\). Taking the limit on both sides of the above equation, it holds that

$$\begin{aligned} Z_{k}(\gamma )={}&Z_{k_{0}}(\gamma )+ \int _{k_{0}}^{k}h\bigl(r,Z_{r}(\gamma ),Z_{r- \tau }(\gamma )\bigr)\,d r \\ &{}+ \int _{k_{0}}^{k}p\bigl(r,Z_{r}(\gamma ),Z_{r-\tau }(\gamma )\bigr)\,dC_{r}( \gamma )+ \int _{k_{0}}^{k}q\bigl(r,Z_{r}(\gamma ),Z_{r-\tau }(\gamma )\bigr)\,dV_{r}( \gamma ). \end{aligned}$$

That is, the sequence \(\{ Z_{k}^{n}(\gamma )\}\) given by (9) converges uniformly to the solution of equation (8) on \([k_{0},k_{0}+\alpha ]\) as \(n\rightarrow +\infty \).

Because each \(\{ Z_{k}^{n}(\gamma )\}\) is continuous, \(Z_{k}(\gamma )\) is also continuous on \([k_{0},k_{0}+\alpha ]\). The proof of existence is completed.

Step 3. (uniqueness) Step 3 will prove that \(Z_{k}(\gamma )\) obtained in Step 2 is the unique solution of equation (8) on \([k_{0},k_{0}+\alpha ]\).

Assume that \(\tilde{Z}_{k}(\gamma )\) is another solution of equation (8), i.e.,

$$\begin{aligned} \textstyle\begin{cases} \tilde{Z}_{k}(\gamma )=Z_{k_{0}}(\gamma )+\int _{k_{0}}^{k}h(r, \tilde{Z}_{r}(\gamma ),\tilde{Z}_{r-\tau }(\gamma ))\,d r \\ \hphantom{\tilde{Z}_{k}(\gamma )=}{}+\int _{k_{0}}^{k}p(r,\tilde{Z}_{r}(\gamma ),\tilde{Z}_{r-\tau }( \gamma ))\,dC_{r}(\gamma ) \\ \hphantom{\tilde{Z}_{k}(\gamma )=}{}+\int _{k_{0}}^{k}q(r,\tilde{Z}_{r}(\gamma ),\tilde{Z}_{r-\tau }( \gamma ))\,dV_{r},&k\in [k_{0},k_{0}+\beta ], \\ \tilde{Z}_{k}(\gamma )=\varphi (k),&k\in [k_{0}-\tau ,k_{0}], \end{cases}\displaystyle \end{aligned}$$
(11)

where \(0<\beta \leq \alpha \).

Following the local Lipschitz condition, we have

$$\begin{aligned} & \bigl\vert Z_{k}(\gamma )-\tilde{Z}_{k}(\gamma ) \bigr\vert \\ &\quad =\biggl\vert \int _{k_{0}}^{k}h\bigl(r,Z_{r}(\gamma ),Z_{r-\tau }(\gamma )\bigr)\,d r+ \int _{k_{0}}^{k}p\bigl(r,Z_{r}(\gamma ),Z_{r-\tau }(\gamma )\bigr)\,dC_{r}( \gamma ) \\ &\qquad {}+ \int _{k_{0}}^{k}q\bigl(r,Z_{r}(\gamma ),Z_{r-\tau }(\gamma )\bigr)\,dV_{r}- \int _{k_{0}}^{k}h\bigl(r,\tilde{Z}_{r}( \gamma ),\tilde{Z}_{r-\tau }( \gamma )\bigr)\,dr \\ &\qquad {}- \int _{k_{0}}^{k}p\bigl(r,\tilde{Z}_{r}( \gamma ),\tilde{Z}_{r- \tau }(\gamma )\bigr)\,dC_{r}(\gamma )- \int _{k_{0}}^{k}q\bigl(r,\tilde{Z}_{r}( \gamma ),\tilde{Z}_{r-\tau }(\gamma )\bigr)\,dV_{r}\biggr\vert \\ &\quad \leq \biggl\vert \int _{k_{0}}^{k}h\bigl(r,Z_{r}(\gamma ),Z_{r-\tau }(\gamma )\bigr)\,d r- \int _{k_{0}}^{k}h\bigl(r,\tilde{Z}_{r}( \gamma ),\tilde{Z}_{r-\tau }( \gamma )\bigr)\,dr \biggr\vert \\ &\qquad {}+ \biggl\vert \int _{k_{0}}^{k}p\bigl(r,Z_{r}(\gamma ),Z_{r-\tau }(\gamma )\bigr)\,dC_{r}( \gamma )- \int _{k_{0}}^{k}p\bigl(r,\tilde{Z}_{r}( \gamma ),\tilde{Z}_{r- \tau }(\gamma )\bigr)\,dC_{r}(\gamma ) \biggr\vert \\ &\qquad {}+ \biggl\vert \int _{k_{0}}^{k}q\bigl(r,Z_{r}(\gamma ),Z_{r-\tau }(\gamma )\bigr)\,dV_{r}- \int _{k_{0}}^{k}q\bigl(r,\tilde{Z}_{r}( \gamma ),\tilde{Z}_{r-\tau }( \gamma )\bigr)\,dV_{r} \biggr\vert \\ &\quad \leq \int _{k_{0}}^{k}L_{D} \bigl\vert Z_{r}(\gamma )-\tilde{Z}_{r}( \gamma ) \bigr\vert \,d r+K(\gamma ) \int _{k_{0}}^{k}L_{D} \bigl\vert Z_{r}( \gamma )-\tilde{Z}_{r}(\gamma ) \bigr\vert \,d r \\ &\qquad {}+ \int _{k_{0}}^{k}L_{D} \bigl\vert Z_{r}(\gamma )-\tilde{Z}_{r}(\gamma ) \bigr\vert \,d r \\ &\quad = L_{D}\bigl(2+K(\gamma )\bigr) \int _{k_{0}}^{k} \bigl\vert Z_{r}( \gamma )- \tilde{Z}_{r}(\gamma ) \bigr\vert \,d r. \end{aligned}$$

By Gronwall’s inequality of [39], we have

$$\begin{aligned} & \bigl\vert Z_{k}(\gamma )-\tilde{Z}_{k}(\gamma ) \bigr\vert \leq 0\cdot \exp \bigl(k\bigl(L_{D}\bigl(2+K( \gamma ) \bigr)\bigr) \bigr)=0. \end{aligned}$$

That is to say, \(Z_{k}(\gamma )=\tilde{Z}_{k}(\gamma )\) for any \([k_{0},k_{0}+\alpha ]\). The proof of uniqueness is completed. Until now, we have completed the proof of Theorem 1. □

According to Theorem 1, the uncertain delay integral equation with V-jump (8) has a unique solution on the local interval \([k_{0},k_{0}+\alpha ]\). Next, Theorem 2 will prove that the solution of uncertain delay integral equation with V-jump (8) can be extended to the infinite domain \([0,+\infty )\).

Theorem 2

Fixing \(\gamma \in \varGamma \), the uncertain delay integral equation with V-jump (8) has a unique solution on \([0,+\infty )\)if the coefficients h, p, and q satisfy one-sided local Lipschitz condition of Theorem 1and the local linear growth condition. In other words, for each \(T > 0\), there exists a constant \(M_{T}\)such that

$$\begin{aligned} & \bigl\vert h(k, z, \hat{z}) \bigr\vert \vee \bigl\vert p(k, z, \hat{z}) \bigr\vert \vee \bigl\vert q(k, z, \hat{z}) \bigr\vert \\ &\quad \leq M_{T}\bigl(1+ \vert z \vert + \vert \hat{z} \vert \bigr),\quad \forall z,\hat{z}\in \mathbb{R},k\in [0,T]. \end{aligned}$$

Proof

Define ρ = {k | uncertain delay integral equation with V-jump (7) has a unique continuous solution on \([0,k)\)}, and \(\rho =\sup \varrho \). According to Theorem 1, the set ρ is nonempty.

We will prove that \(\rho = +\infty \). Assume that \(\rho <+\infty \). By the definition, \(Z_{k}(\gamma )\) is the unique solution of equation (7) on \([0,\rho )\). Then we have

$$\begin{aligned} & \bigl\vert Z_{k}(\gamma ) \bigr\vert + \bigl\vert Z_{k-\tau }(\gamma ) \bigr\vert \\ &\quad =\biggl\vert Z_{0}(\gamma )+ \int _{0}^{k}h\bigl(r,Z_{r}(\gamma ),Z_{r-\tau }( \gamma )\bigr)\,d r+ \int _{0}^{k}p\bigl(r,Z_{r}(\gamma ),Z_{r-\tau }(\gamma )\bigr)\,dC_{r}( \gamma ) \\ &\qquad {}+ \int _{0}^{k}q\bigl(r,Z_{r}(\gamma ),Z_{r-\tau }(\gamma )\bigr)\,dV_{r} \biggr\vert +\biggl\vert Z_{-\tau }(\gamma )+ \int _{-\tau }^{k-\tau }h\bigl(r,Z_{r}( \gamma ),Z_{r-\tau }(\gamma )\bigr)\,dr \\ &\qquad {}+ \int _{-\tau }^{k-\tau }p\bigl(r,Z_{r}(\gamma ),Z_{r-\tau }(\gamma )\bigr)\,dC_{r}(\gamma )+ \int _{-\tau }^{k-\tau }q\bigl(r,Z_{r}(\gamma ),Z_{r-\tau }( \gamma )\bigr)\,dV_{r}\biggr\vert \\ &\quad \leq \bigl\vert Z_{0}(\gamma ) \bigr\vert + \biggl\vert \int _{0}^{k}h\bigl(r,Z_{r}(\gamma ),Z_{r- \tau }(\gamma )\bigr)\,d r \biggr\vert +K(\gamma ) \biggl\vert \int _{0}^{k}p\bigl(r,Z_{r}( \gamma ),Z_{r-\tau }(\gamma )\bigr)\,d r \biggr\vert \\ &\qquad {}+ \biggl\vert \int _{0}^{k}q\bigl(r,Z_{r}(\gamma ),Z_{r-\tau }(\gamma )\bigr)\,d r \biggr\vert + \bigl\vert Z_{-\tau }(\gamma ) \bigr\vert + \biggl\vert \int _{-\tau }^{k-\tau }h\bigl(r,Z_{r}( \gamma ),Z_{r-\tau }(\gamma )\bigr)\,dr \biggr\vert \\ &\qquad {}+K(\gamma ) \biggl\vert \int _{-\tau }^{k-\tau }p\bigl(r,Z_{r}(\gamma ),Z_{r-\tau }( \gamma )\bigr)\,d r \biggr\vert + \biggl\vert \int _{-\tau }^{k-\tau }q\bigl(r,Z_{r}(\gamma ),Z_{r- \tau }(\gamma )\bigr)\,d r \biggr\vert \\ &\quad = \bigl\vert Z_{0}(\gamma ) \bigr\vert + \bigl\vert Z_{-\tau }(\gamma ) \bigr\vert + \biggl\vert \int _{-\tau }^{0}h\bigl(r,Z_{r}(\gamma ),Z_{r-\tau }(\gamma )\bigr)+K(\gamma )p\bigl(r,Z_{r}( \gamma ),Z_{r-\tau }(\gamma )\bigr) \\ &\qquad {}+q\bigl(r,Z_{r}(\gamma ),Z_{r-\tau }(\gamma )\bigr)\,dr \biggr\vert + \biggl\vert \int _{0}^{k-\tau }h\bigl(r,Z_{r}( \gamma ),Z_{r-\tau }(\gamma )\bigr) \\ &\qquad {}+K(\gamma )p\bigl(r,Z_{r}(\gamma ),Z_{r-\tau }(\gamma ) \bigr)+q\bigl(r,Z_{r}(\gamma ),Z_{r- \tau }(\gamma )\bigr)\,dr \biggr\vert \\ &\qquad {}+ \biggl\vert \int _{0}^{k}h\bigl(r,Z_{r}(\gamma ),Z_{r-\tau }(\gamma )\bigr)+K(\gamma )p\bigl(r,Z_{r}( \gamma ),Z_{r-\tau }(\gamma )\bigr) +q\bigl(r,Z_{r}(\gamma ),Z_{r-\tau }(\gamma )\bigr)\,dr \biggr\vert \\ &\quad \leq \bigl\vert Z_{0}(\gamma ) \bigr\vert + \bigl\vert Z_{-\tau }(\gamma ) \bigr\vert +\Delta +M_{\rho }\bigl(2+K(\gamma )\bigr) \int _{0}^{k-\tau }1+ \bigl\vert Z_{r}(\gamma ) \bigr\vert + \bigl\vert Z_{r- \tau }(\gamma ) \bigr\vert \,d r \\ &\qquad {}+M_{\rho }\bigl(2+K(\gamma )\bigr) \int _{0}^{k}1+ \bigl\vert Z_{r}( \gamma ) \bigr\vert + \bigl\vert Z_{r-\tau }( \gamma ) \bigr\vert \,d r \\ &\quad \leq \bigl\vert Z_{0}(\gamma ) \bigr\vert + \bigl\vert Z_{-\tau }(\gamma ) \bigr\vert +\Delta +2\rho M_{\rho } \bigl(2+K( \gamma )\bigr) \\ &\qquad {}+2M_{\rho }\bigl(2+K(\gamma )\bigr) \int _{0}^{k} \bigl\vert Z_{r}( \gamma ) \bigr\vert + \bigl\vert Z_{r-\tau }( \gamma ) \bigr\vert \,d r \end{aligned}$$

for any \(k\in [0,\rho )\), where

$$ \Delta = \biggl\vert \int _{-\tau }^{0}h\bigl(r,Z_{r}(\gamma ),Z_{r-\tau }(\gamma )\bigr)+K( \gamma )p\bigl(r,Z_{r}(\gamma ),Z_{r-\tau }(\gamma )\bigr)+q\bigl(r,Z_{r}(\gamma ),Z_{r- \tau }(\gamma )\bigr)\,dr \biggr\vert . $$

Set

$$ A= \bigl\vert Z_{0}(\gamma ) \bigr\vert + \bigl\vert Z_{-\tau }(\gamma ) \bigr\vert +\Delta +2\rho M_{\rho } \bigl(2+K( \gamma )\bigr). $$

By Gronwall’s inequality [39], we have

$$\begin{aligned} & \bigl\vert Z_{k}(\gamma ) \bigr\vert + \bigl\vert Z_{k-\tau }(\gamma ) \bigr\vert \leq A\cdot \exp \bigl(2M_{\rho }\bigl(2+K(\gamma )\bigr)\bigr)\rho =N_{0}< +\infty ,\quad \forall k\in [0,\rho ). \end{aligned}$$

That is to say, \(|Z_{k}(\gamma )|+|Z_{k-\tau }(\gamma )|\) is bounded on \([0,\rho )\).

Thus, we have

$$\begin{aligned} & \bigl\vert Z_{k_{1}}(\gamma )-Z_{k_{2}}(\gamma ) \bigr\vert \\ &\quad =\biggl\vert Z_{0}(\gamma )+ \int _{0}^{k_{1}}h\bigl(r,Z_{r}(\gamma ),Z_{r-\tau }( \gamma )\bigr)\,d r+ \int _{0}^{k_{1}}p\bigl(r,Z_{r}(\gamma ),Z_{r-\tau }(\gamma )\bigr)\,dC_{r}(\gamma ) \\ &\qquad {}+ \int _{0}^{k_{1}}q\bigl(r,Z_{r}(\gamma ),Z_{r-\tau }(\gamma )\bigr)\,dV_{r}-Z_{0}( \gamma )- \int _{0}^{k_{2}}h\bigl(r,Z_{r}(\gamma ),Z_{r-\tau }(\gamma )\bigr)\,dr \\ &\qquad {}- \int _{0}^{k_{2}}p\bigl(r,Z_{r}(\gamma ),Z_{r-\tau }(\gamma )\bigr)\,dC_{r}( \gamma )- \int _{0}^{k_{2}}q\bigl(r,Z_{r}(\gamma ),Z_{r-\tau }(\gamma )\bigr)\,dV_{r} \biggr\vert \\ &\quad \leq \biggl\vert \int _{k_{1}}^{k_{2}}h\bigl(r,Z_{r}(\gamma ),Z_{r-\tau }( \gamma )\bigr)\,d r \biggr\vert + \biggl\vert \int _{k_{1}}^{k_{2}}p\bigl(r,Z_{r}(\gamma ),Z_{r- \tau }(\gamma )\bigr)\,dC_{r}(\gamma ) \biggr\vert \\ &\qquad {}+ \biggl\vert \int _{k_{1}}^{k_{2}}q\bigl(r,Z_{r}(\gamma ),Z_{r-\tau }(\gamma )\bigr)\,dV_{r} \biggr\vert \\ &\quad \leq \int _{k_{1}}^{k_{2}} \bigl\vert h \bigl(r,Z_{r}(\gamma ),Z_{r-\tau }(\gamma )\bigr) \bigr\vert \,d r+K( \gamma ) \int _{k_{1}}^{k_{2}} \bigl\vert p \bigl(r,Z_{r}(\gamma ),Z_{r-\tau }(\gamma )\bigr) \bigr\vert \,d r \\ &\qquad {}+ \int _{k_{1}}^{k_{2}} \bigl\vert q \bigl(r,Z_{r}(\gamma ),Z_{r-\tau }(\gamma )\bigr) \bigr\vert \,d r \\ &\quad \leq M_{\rho } \int _{k_{1}}^{k_{2}}1+ \bigl\vert Z_{r}(\gamma ) \bigr\vert + \bigl\vert Z_{r-\tau }( \gamma )) \bigr\vert \,d r \\ &\qquad {}+M_{\rho }K(\gamma ) \int _{k_{1}}^{k_{2}}1+ \bigl\vert Z_{r}(\gamma ) \bigr\vert + \bigl\vert Z_{r- \tau }(\gamma )) \bigr\vert \,d r \\ &\qquad {}+M_{\rho } \int _{k_{1}}^{k_{2}}1+ \bigl\vert Z_{r}(\gamma ) \bigr\vert + \bigl\vert Z_{r-\tau }(\gamma )) \bigr\vert \,d r \\ &\quad =M_{\rho }\bigl(2+K(\gamma )\bigr) \int _{k_{1}}^{k_{2}}1+ \bigl\vert Z_{r}(\gamma ) \bigr\vert + \bigl\vert Z_{r- \tau }(\gamma )) \bigr\vert \,d r \\ &\quad \leq M_{\rho }\bigl(2+K(\gamma )\bigr) \int _{k_{1}}^{k_{2}}(1+N_{0})\,d r \\ &\quad \leq M_{\rho }\bigl(2+K(\gamma )\bigr) (1+N_{0}) \vert k_{1}-k_{2} \vert ,\forall k_{1},k_{2} \in [0,\rho ). \end{aligned}$$

It holds that \(\lim_{k\rightarrow \rho ^{-}}Z_{k}(\gamma )\) exists. Set \(Z_{\rho }(\gamma )=\lim_{k\rightarrow \rho ^{-}}Z_{k}( \gamma )\). Thus \(Z_{k}(\gamma )\) is continuous on the interval \([0,\rho ]\), and

$$\begin{aligned} \textstyle\begin{cases} Z_{k}(\gamma )=Z_{0}(\gamma )+\int _{0}^{k}h(r,Z_{r}(\gamma ),Z_{r- \tau }(\gamma ))\,d r \\ \hphantom{Z_{k}(\gamma )=}{}+\int _{0}^{k}p(r,Z_{r}(\gamma ),Z_{r-\tau }(\gamma ))\,dC_{r}(\gamma ) \\ \hphantom{Z_{k}(\gamma )=}{}+\int _{0}^{k}q(r,Z_{r}(\gamma ),Z_{r-\tau }(\gamma ))\,dV_{r},&k\in [0, \rho ], \\ Z_{k}(\gamma )=\varphi (k),&k\in [-\tau ,0]. \end{cases}\displaystyle \end{aligned}$$
(12)

Consider the following uncertain delay integral equation with V-jump:

$$\begin{aligned} \textstyle\begin{cases} Z_{k}(\gamma )=Z_{\rho }(\gamma )+\int _{\rho }^{k}h(r,Z_{r}(\gamma ),Z_{r- \tau }(\gamma ))\,d r \\ \hphantom{Z_{k}(\gamma )=}{}+\int _{\rho }^{k}p(r,Z_{r}(\gamma ),Z_{r-\tau }(\gamma ))\,dC_{r}( \gamma ) \\ \hphantom{Z_{k}(\gamma )=}{}+\int _{\rho }^{k}q(r,Z_{r}(\gamma ),Z_{r-\tau }(\gamma ))\,dV_{r},&k \in (\rho ,+\infty ), \\ Z_{k}(\gamma )=Z_{0}(\gamma )+\int _{0}^{k}h(r,Z_{r}(\gamma ),Z_{r- \tau }(\gamma ))\,d r \\ \hphantom{Z_{k}(\gamma )=}{}+\int _{0}^{k}p(r,Z_{r}(\gamma ),Z_{r-\tau }(\gamma ))\,dC_{r}(\gamma ) \\ \hphantom{Z_{k}(\gamma )=}{}+\int _{0}^{k}q(r,Z_{r}(\gamma ),Z_{r-\tau }(\gamma ))\,dV_{r},&k\in [0, \rho ], \\ Z_{k}(\gamma )=\varphi (k),&k\in [-\tau ,0]. \end{cases}\displaystyle \end{aligned}$$
(13)

Theorem 1 means that there exists a positive number α such that uncertain delay with V-jump integral equation (13) has a unique continuous solution \(\tilde{Z}_{k}(\gamma )\) on the interval \([\rho , \rho + \alpha ]\).

Thus, setting the function

$$\begin{aligned} \hat{Z}_{k}(\gamma )= \textstyle\begin{cases} Z_{k}(\gamma ),& \mbox{if }k\in [0,\rho ], \\ \tilde{Z}_{k}(\gamma ),&\mbox{if }k\in (\rho ,\rho +\alpha ], \end{cases}\displaystyle \end{aligned}$$
(14)

\(\hat{Z}_{k}(\gamma )\) is the unique continuous solution of equation (8) on the interval \([0, \rho + \alpha ]\). We get a contradiction from \(\rho =\sup \varrho < +\infty \). So, \(\rho = +\infty \), and the solution of uncertain delay integral equation with V-jump (7) can be extended uniquely to \([0, +\infty )\). So we complete the proof of Theorem 2. □

Remark 2

When the functions h, p, and q in the uncertain delay differential equation with V-jump (3) are independent with the present state \(Z_{k}\), \(then\) (3) is written as

$$\begin{aligned} \textstyle\begin{cases} dZ_{k}=h(k,Z_{k-\tau })\,dk+p(k,Z_{k-\tau })\,dC_{k} \\ \hphantom{dZ_{k}=}{}+q(k,Z_{k-\tau })\,dV_{k},&k\in [0,+\infty ), \\ Z_{k}(\gamma )=\varphi (k),&k\in [-\tau ,0]. \end{cases}\displaystyle \end{aligned}$$
(15)

For the uncertain delay differential equation with V-jump (15), it is not difficult to find that

$$\begin{aligned} &Z_{k}=Z_{0}+ \int _{0}^{k}h(r,Z_{r-\tau })\,d r+ \int _{0}^{k}p(r,Z_{r- \tau }) \,dC_{r}+ \int _{0}^{k}q(r,Z_{r-\tau }) \,dV_{r} \end{aligned}$$

for any \(0 \leq k \leq \tau \).

Then, for \(\tau \leq k \leq 2\tau \), we have

$$\begin{aligned} &Z_{k}=Z_{\tau }+ \int _{\tau }^{k}h(r,Z_{r-\tau })\,d r+ \int _{\tau }^{k}p(r,Z_{r- \tau }) \,dC_{r}+ \int _{\tau }^{k}q(r,Z_{r-\tau }) \,dV_{r}. \end{aligned}$$

Repeat this procedure over the intervals \([2\tau ,3\tau ]\), \([3\tau ,4\tau ]\), etc. Finally, we can obtain the explicit solution of uncertain delay differential equation with V-jump (15).

2.3 Stability of the solution

Definition 5

The uncertain delay differential equation with V-jump (8) is said to be stable in measure if, for any two solutions \(Z_{k}\) and \(\hat{Z}_{k}\) with different initial states,respectively, we have

$$\begin{aligned} \lim_{\sup _{r\in [-\tau ,0]} \vert Z_{r}-\hat{Z}_{r} \vert \rightarrow 0}\mathcal{M} \bigl\{ \bigl\vert Z_{k}(\gamma )-\hat{Z}_{k}(\gamma ) \bigr\vert > \epsilon \bigr\} =0,\quad \forall k>0 \end{aligned}$$
(16)

for any given number \(\epsilon > 0\), where \(\mathcal{M}\) is uncertain measure.

To illustrate the concept of stability, we first give an example. Consider the following uncertain delay differential equation with V-jump:

$$\begin{aligned} dZ_{k}=aZ_{k-\tau }\,dk+b \,dC_{k}+c \,dV_{k},\quad k\in [0, +\infty ). \end{aligned}$$
(17)

Obviously, the coefficients \(h(k, z, \hat{z}) = a\hat{z}\), \(p(k, z, \hat{z}) = b\), and \(q(k, z, \hat{z}) = c\) are one-sided local Lipschitz continuous.

$$\begin{aligned} & \bigl\vert h(k, z, \hat{z}) \bigr\vert \vee \bigl\vert p(k, z, \hat{z}) \bigr\vert \vee \bigl\vert q(k, z, \hat{z}) \bigr\vert = \vert a \hat{z} \vert \vee \vert b \vert \vee \vert c \vert \\ & \quad = \max \bigl( \vert a \vert , \vert b \vert , \vert c \vert \bigr) \bigl(1 + \vert z \vert + \vert \hat{z} \vert \bigr), \quad \forall z, \hat{z} \in \mathbb{R}, k\in [0, T]. \end{aligned}$$

By using Theorem 2, it has a unique continuous solution. We can get that \(Z_{k}\) and \(\hat{Z}_{k}\) are two solutions of (17) with different initial states \(\varphi (k)\) and \(\psi (k) (k \in [-\tau , 0])\), respectively.

$$\begin{aligned} Z_{k}= \textstyle\begin{cases} \varphi (k),& k\in [-\tau ,0], \\ \varphi (0)+a\int _{0}^{k}\varphi (r-\tau )\,dr+bC_{k}+cV_{k},& k\in (0, \tau ], \\ Z_{\tau }+a\int _{\tau }^{t}Z_{r-\tau }\,dr+b(C_{k}-C_{\tau })+c(V_{k}-V_{ \tau }),& k\in (\tau ,2\tau ], \\ \cdots \cdots \end{cases}\displaystyle \end{aligned}$$
(18)

and

$$\begin{aligned} \hat{Z}_{k}= \textstyle\begin{cases} \psi (k),& k\in [-\tau ,0], \\ \psi (0)+a\int _{0}^{k}\psi (r-\tau )\,dr+bC_{k}+cV_{k},& k\in (0, \tau ], \\ \hat{Z}_{\tau }+a\int _{\tau }^{k}\hat{Z}_{r-\tau }\,dr+b(C_{k}-C_{\tau })+c(V_{k}-V_{ \tau }),& k\in (\tau ,2\tau ], \\ \cdots \cdots \end{cases}\displaystyle \end{aligned}$$
(19)

respectively.

Then

$$\begin{aligned} \vert Z_{k}-\hat{Z}_{k} \vert = \textstyle\begin{cases} \vert \varphi (k)-\psi (k) \vert ,& k\in [-\tau ,0], \\ \vert \varphi (0)-\psi (0) \vert +a\int _{0}^{k} \vert \psi (r-\tau )-\psi (r-\tau ) \vert \,dr,& k\in (0,\tau ], \\ \vert Z_{\tau }-\hat{Z}_{\tau } \vert +a\int _{\tau }^{k} \vert Z_{r-\tau }-\hat{Z}_{r- \tau } \vert \,dr,& k\in (\tau ,2\tau ], \\ \cdots \cdots \end{cases}\displaystyle \end{aligned}$$
(20)

Therefore,

$$\begin{aligned} \lim_{\sup _{r\in [-\tau ,0]} \vert Z_{r}-\hat{Z}_{r} \vert \rightarrow 0}\mathcal{M} \bigl\{ \bigl\vert Z_{k}(\gamma )-\hat{Z}_{k}(\gamma ) \bigr\vert > \epsilon \bigr\} =0,\quad \forall k>0 \end{aligned}$$
(21)

for any given number \(\epsilon > 0\), and the uncertain delay differential equation with V-jump (17) is stable in measure by Definition 5.

Theorem 3

Assume that the uncertain delay differential equation with V-jump (3) has a unique solution for each given initial state. Then it is stable in measure if the coefficients \(h(k,z,\hat{z})\), \(p(k,z, \hat{z})\), and \(q(k,z,\hat{z})\)satisfy

$$ \begin{aligned}[b] & \bigl\vert h(k, z_{1}, \hat{z})-h(k, z_{2}, \hat{z}) \bigr\vert \vee \bigl\vert p(k, z_{1}, \hat{z})-p(k, z_{2}, \hat{z}) \bigr\vert \vee \bigl\vert q(k, z_{1}, \hat{z})-q(k, z_{2}, \hat{z}) \bigr\vert \\ &\quad \leq N_{k} \vert z_{1}-z_{2} \vert ,\quad \forall z_{1},z_{2},\hat{z} \in \mathbb{R},k \geq 0, \end{aligned} $$
(22)

where \(N_{k}\)is a bounded function satisfying

$$ \int _{0}^{+\infty }N_{k}\,dk< +\infty . $$

Proof

We suppose that \(Z_{k}\) and \(\hat{Z}_{k}\) are two solutions of (3) with different initial states \(\varphi (k)\) and \(\psi (k) (k \in [-\tau , 0])\), respectively. That is,

$$ \textstyle\begin{cases} dZ_{k}=h(k,Z_{k},Z_{k-\tau })\,dk+p(k,Z_{k},Z_{k-\tau })\,dC_{k}\\ \hphantom{dZ_{k}=}{}+q(k,Z_{k},Z_{k- \tau })\,dV_{k},&k\in [0,+\infty ), \\ Z_{k}(\gamma )=\varphi (k),&k\in [-\tau ,0], \end{cases} $$
(23)

and

$$ \textstyle\begin{cases} d\hat{Z}_{k}=h(k,\hat{Z}_{k},\hat{Z}_{k-\tau })\,dk+p(k,\hat{Z}_{k}, \hat{Z}_{k-\tau })\,dC_{k}\\ \hphantom{d\hat{Z}_{k}=}{}+q(k,\hat{Z}_{k},\hat{Z}_{k-\tau })\,dV_{k},&k \in [0,+\infty ), \\ \hat{Z}_{k}(\gamma )=\varphi (k),&k\in [-\tau ,0]. \end{cases} $$
(24)

Then, for a Lipschitz continuous sample \(C_{k}(\gamma )\) and \(V_{k}(\gamma )\), it holds that

$$ \textstyle\begin{cases} Z_{k}(\gamma )=Z_{0}+\int _{0}^{k}h(r,Z_{r}(\gamma ),Z_{r-\tau }( \gamma ))\,dr\\ \hphantom{Z_{k}(\gamma )=}{}+\int _{0}^{k}p(r,Z_{r}(\gamma ),Z_{r-\tau }(\gamma ))\,dC_{r}( \gamma ) \\ \hphantom{Z_{k}(\gamma )=}{}+\int _{0}^{k}q(r,Z_{r}(\gamma ),Z_{r-\tau }(\gamma ))\,dV_{r}(\gamma ),&k \in [0,+\infty ), \\ Z_{k}(\gamma )=\varphi (k),&k\in [-\tau ,0], \end{cases} $$
(25)

and

$$ \textstyle\begin{cases} \hat{Z}_{k}(\gamma )=\hat{Z}_{0}+\int _{0}^{k}h(r,\hat{Z}_{r}( \gamma ),\hat{Z}_{r-\tau }(\gamma ))\,dr\\ \hphantom{\hat{Z}_{k}(\gamma )=}{} +\int _{0}^{k}p(r,\hat{Z}_{r}( \gamma ),\hat{Z}_{r-\tau }(\gamma ))\,dC_{r}(\gamma ) \\ \hphantom{\hat{Z}_{k}(\gamma )=}{} +\int _{0}^{k}q(r,\hat{Z}_{r}(\gamma ),\hat{Z}_{r-\tau }(\gamma ))\,dV_{r}( \gamma ),&k\in [0,+\infty ), \\ \hat{Z}_{k}(\gamma )=\varphi (k),&k\in [-\tau ,0]. \end{cases} $$
(26)

By condition (22), Lemma 4.1 in [9], and Theorem 3.2 in [27], we have

$$\begin{aligned} & \bigl\vert Z_{k}(\gamma ) -\hat{Z}_{k}(\gamma ) \bigr\vert \\ & \quad \leq \biggl\vert Z_{0}-\hat{Z}_{0}+ \int _{0}^{k}h\bigl(r,Z_{r}(\gamma ),Z_{r- \tau }(\gamma )\bigr)-h\bigl(r,\hat{Z}_{r}(\gamma ), \hat{Z}_{r-\tau }(\gamma )\bigr)\,dr \\ &\qquad {}+ \int _{0}^{k}p\bigl(r,Z_{r}(\gamma ),Z_{r-\tau }(\gamma )\bigr)-p\bigl(r,\hat{Z}_{r}( \gamma ), \hat{Z}_{r-\tau }(\gamma )\bigr)\,dC_{r}(\gamma ) \\ &\qquad {}+ \int _{0}^{k}q\bigl(r,Z_{r}(\gamma ),Z_{r-\tau }(\gamma )\bigr)-q\bigl(r, \hat{Z}_{r}(\gamma ), \hat{Z}_{r-\tau }(\gamma )\bigr)\,dV_{r}(\gamma )\biggr\vert \\ &\quad \leq \vert Z_{0}-\hat{Z}_{0} \vert + \biggl\vert \int _{0}^{k}h\bigl(r,Z_{r}(\gamma ),Z_{r- \tau }(\gamma )\bigr)-h\bigl(r,\hat{Z}_{r}(\gamma ), \hat{Z}_{r-\tau }(\gamma )\bigr)\,dr \biggr\vert \\ &\qquad {}+ \biggl\vert \int _{0}^{k}p\bigl(r,Z_{r}(\gamma ),Z_{r-\tau }(\gamma )\bigr)-p\bigl(r, \hat{Z}_{r}(\gamma ), \hat{Z}_{r-\tau }(\gamma )\bigr)\,dC_{r}(\gamma ) \biggr\vert \\ &\qquad {}+ \biggl\vert \int _{0}^{k}q\bigl(r,Z_{r}(\gamma ),Z_{r-\tau }(\gamma )\bigr)-q\bigl(r, \hat{Z}_{r}(\gamma ), \hat{Z}_{r-\tau }(\gamma )\bigr)\,dV_{r}(\gamma ) \biggr\vert \\ &\quad \leq \vert Z_{0}-\hat{Z}_{0} \vert + \int _{0}^{k}N_{r} \bigl\vert Z_{r}(\gamma )-\hat{Z}_{r}( \gamma ) \bigr\vert \,dr \\ &\qquad {}+K(\gamma ) \int _{0}^{k}N_{r} \bigl\vert Z_{r}(\gamma )-\hat{Z}_{r}(\gamma ) \bigr\vert \,dr+ \int _{0}^{k}N_{r} \bigl\vert Z_{r}(\gamma )-\hat{Z}_{r}(\gamma ) \bigr\vert \,dr \\ &\quad = \vert Z_{0}-\hat{Z}_{0} \vert + \int _{0}^{k}\bigl(2+K(\gamma ) \bigr)N_{r} \bigl\vert Z_{r}( \gamma )- \hat{Z}_{r}(\gamma ) \bigr\vert \,dr, \end{aligned}$$

where \(K(\gamma )\) is the Lipschitz constant of \(C_{k}(\gamma )\).

According to Gronwall’s inequality, we have

$$\begin{aligned} \bigl\vert Z_{k}(\gamma ) -\hat{Z}_{k}(\gamma ) \bigr\vert \leq & \vert Z_{0}-\hat{Z}_{0} \vert \exp ( \biggl(2+K(\gamma ) \int _{0}^{k}N_{r}\,dr \biggr) \\ \leq & \vert Z_{0}-\hat{Z}_{0} \vert \exp \biggl( \bigl(2+K(\gamma )\bigr) \int _{0}^{+ \infty }N_{r}\,dr \biggr) \\ \leq & \sup_{r\in [-\tau ,0]} \vert Z_{r}- \hat{Z}_{r} \vert \exp \biggl(\bigl(2+K( \gamma )\bigr) \int _{0}^{+\infty }N_{r}\,dr \biggr),\quad \forall k>0. \end{aligned}$$

Thus we have

$$ \bigl\vert Z_{k}(\gamma ) -\hat{Z}_{k}(\gamma ) \bigr\vert \leq \sup_{r\in [- \tau ,0]} \vert Z_{r}- \hat{Z}_{r} \vert \exp \biggl(\bigl(2+K(\gamma )\bigr) \int _{0}^{+ \infty }N_{r}\,dr \biggr),\quad \forall k>0. $$

Thus, by Theorem 2 in [10], we have

$$\begin{aligned} \lim_{x\rightarrow +\infty }\mathcal{M} \bigl\{ \gamma \in \varGamma |K(\gamma ) \leq x \bigr\} =1. \end{aligned}$$

Then there exists a positive number H such that

$$ \mathcal{M}\bigl\{ \gamma \in \varGamma |K(\gamma )\leq H\bigr\} \geq 1-\varepsilon $$

for any given \(\epsilon > 0\). Because

$$ \int _{0}^{+\infty }N_{s}\,ds< +\infty , $$

take

$$ \delta =\exp \biggl(-\bigl(2+K(\gamma )\bigr) \int _{0}^{+\infty }N_{r}\,dr \biggr) \epsilon . $$

Then \(|Z_{k}(\gamma ) -\hat{Z}_{k}(\gamma )|\leq \epsilon \) provided that

$$ \sup_{r\in [-\tau ,0]} \vert Z_{r}-\hat{Z}_{r} \vert \leq \delta $$

and \(K(\gamma )\leq H\).

Hence,we have \(|Z_{k}-\hat{Z}_{k}|\rightarrow 0\) as long as \(\sup_{r\in [-\tau ,0]}|Z_{r}-\hat{Z}_{r}|\rightarrow 0\), which implies that

$$ \mathcal{M} \bigl\{ \bigl\vert Z_{k}(\gamma )- \hat{Z}_{k}(\gamma ) \bigr\vert \leq \epsilon \bigr\} =1-\varepsilon ,\quad \forall k>0. $$

In other words,

$$ \lim_{\sup \limits _{r\in [-\tau ,0]} \vert Z_{r}-\hat{Z}_{r} \vert \rightarrow 0}\mathcal{M} \bigl\{ \bigl\vert Z_{k}(\gamma )-\hat{Z}_{k}(\gamma ) \bigr\vert > \epsilon \bigr\} =0,\quad \forall k>0. $$

So the uncertain delay differential equation with V-jump (3) is stable in measure according to Definition 5. This completes the proof. □

Corollary 1

Supposing that \(u_{ik}\), \(v_{ik}\), and \(\eta _{ik}\) (\(i = 1,2,3\)) are real-valued functions, the linear uncertain delay differential equations with V-jump

$$ \begin{aligned}[b] d Z_{k}={}&(u_{1k}Z_{k}+v_{1k}Z_{k-\tau }+ \eta _{1k})\,dk+(u_{2k}Z_{k}+v_{2k}Z_{k- \tau }+ \eta _{2k})\,dC_{k} \\ &{}+(u_{3k}Z_{k}+v_{3k}Z_{k-\tau }+\eta _{3k})\,dV_{k} \end{aligned} $$
(27)

is stable in measure if \(u_{ik}\), \(v_{ik}\), and \(\eta _{ik}\) (\(i = 1, 2, 3\)) are bounded and satisfy

$$\begin{aligned} \int _{0}^{+\infty }u_{1k}\,dk< +\infty \end{aligned}$$

and

$$\begin{aligned} \int _{0}^{+\infty }u_{2k}\,dk< +\infty , \end{aligned}$$

and

$$\begin{aligned} \int _{0}^{+\infty }u_{3k}\,dk< +\infty . \end{aligned}$$

Proof

Take \(h(k,z,\hat{z})=u_{1k}z+v_{1k}\hat{z}+\eta _{1k}\), \(p(k,z,\hat{z})=u_{2k}z+v_{2k}\hat{z}+\eta _{2k}\), and \(q(k,z,\hat{z})=u_{3k}z+v_{3k}\hat{z}+\eta _{3k}\). Let Q denote a common upper bound of \(|u_{ik}|\), \(|v_{ik}|\), and \(|\eta _{ik}|\) (\(i= 1, 2, 3\)). The inequalities

$$\begin{aligned} \bigl\vert h(k, z, \hat{z}) \bigr\vert \vee \bigl\vert p(k, z, \hat{z}) \bigr\vert \vee \bigl\vert q(k, z, \hat{z}) \bigr\vert \leq Q\bigl(1+ \vert z \vert + \vert \hat{z} \vert \bigr) \end{aligned}$$

and

$$\begin{aligned} & \bigl\vert h(k, z_{1}, \hat{z})-h(k, z_{2}, \hat{z}) \bigr\vert \vee \bigl\vert p(k, z_{1}, \hat{z})-p(k, z_{2}, \hat{z}) \bigr\vert \vee \bigl\vert q(k, z_{1}, \hat{z})-q(k, z_{2}, \hat{z}) \bigr\vert \\ &\quad \leq (u_{1k}\vee u_{2k}\vee u_{3k}) \vert z_{1}-z_{2} \vert \leq Q \vert z_{1}-z_{2} \vert \end{aligned}$$

hold.

According to Theorem 2, we have that the linear uncertain delay differential equation with V-jump (27) with initial states has a unique solution. Since

$$\begin{aligned} & \bigl\vert h(k, z_{1}, \hat{z})-h(k, z_{2}, \hat{z}) \bigr\vert \vee \bigl\vert p(k, z_{1}, \hat{z})-p(k, z_{2}, \hat{z}) \bigr\vert \vee \bigl\vert q(k, z_{1}, \hat{z})-q(k, z_{2}, \hat{z}) \bigr\vert \\ &\quad \leq (u_{1k}\vee u_{2k}\vee u_{3k}) \vert z_{1}-z_{2} \vert , \end{aligned}$$

we take \(N_{k}=u_{1k}\vee u_{2k}\), which is integrable on \([0, +\infty )\), since we have

$$\begin{aligned} \int _{0}^{+\infty }u_{1k}\,dk< +\infty \end{aligned}$$

and

$$\begin{aligned} \int _{0}^{+\infty }u_{2k}\,dk< +\infty , \end{aligned}$$

and

$$\begin{aligned} \int _{0}^{+\infty }u_{3k}\,dk< +\infty . \end{aligned}$$

By using Theorem 3, the linear uncertain delay differential equation with V-jump (27) is stable in measure. □

2.4 Some examples

Example 1

Consider an uncertain delay differential equation with V-jump

$$ dZ_{k}=adk+bZ_{k-\tau }\,dC_{k}+c \,dV_{k}. $$

Obviously, the coefficients \(h(k, z, \hat{z}) = a\), \(p(k, z, \hat{z}) = b\hat{z}\), and \(q(k, z, \hat{z}) = c\) are one-sided local Lipschitz continuous.

In addition,

$$\begin{aligned} \begin{aligned} &\bigl\vert h(k, z, \hat{z}) \bigr\vert \vee \bigl\vert p(k, z, \hat{z}) \bigr\vert \vee \bigl\vert q(k, z, \hat{z}) \bigr\vert \\ &\quad = \vert a \vert \vee \vert b\hat{z} \vert \vee \vert c \vert \\ &\quad = \max \bigl( \vert a \vert , \vert b \vert , \vert c \vert \bigr) \bigl(1 + \vert z \vert + \vert \hat{z} \vert \bigr), \quad \forall z, \hat{z} \in \mathbb{R}, k\in [0, T]. \end{aligned} \end{aligned}$$

By using Theorem 2, it has a unique continuous solution.

In fact, the analytical solution of \(dZ_{k}=adk+bZ_{k-\tau }\,dC_{k}+c\,dV_{k}\) with the initial states \(\phi (k)(k\in [-\tau ,0])\) is

$$\begin{aligned} Z_{k}= \textstyle\begin{cases} \phi (k),& k\in [-\tau ,0], \\ \phi (0)+ak+b\int _{0}^{k}\phi (r-\tau )\,dC_{r}+cV_{k},& k\in (0, \tau ], \\ Z_{\tau }+a(k-\tau )+b\int _{\tau }^{k}Z_{r-\tau }\,dC_{r}+c(V_{k}-V_{ \tau }),& k\in (\tau ,2\tau ], \\ \cdots \cdots \end{cases}\displaystyle \end{aligned}$$
(28)

Example 2

Consider an uncertain delay differential equation with V-jump

$$ dZ_{k}=adk+bdC_{k}+cZ_{k-\tau } \,dV_{k}. $$

Obviously, the coefficients \(h(k, z, \hat{z}) = a\), \(p(k, z, \hat{z}) = b\), and \(q(k, z, \hat{z}) = c\hat{z}\) are one-sided local Lipschitz continuous.

$$\begin{aligned} & \bigl\vert h(k, z, \hat{z}) \bigr\vert \vee \bigl\vert p(k, z, \hat{z}) \bigr\vert \vee \bigl\vert q(k, z, \hat{z}) \bigr\vert = \vert a \vert \vee \vert b \vert \vee \vert c\hat{z} \vert \\ &\quad = \max \bigl( \vert a \vert , \vert b \vert , \vert c \vert \bigr) \bigl(1 + \vert z \vert + \vert \hat{z} \vert \bigr),\quad \forall z, \hat{z}\in \mathbb{R}, k\in [0, T]. \end{aligned}$$

By using Theorem 2, it has a unique continuous solution.

In fact, the analytical solution of \(dZ_{k}=adk+bZ_{k-\tau }\,dC_{k}+c\,dV_{k}\) with the initial states \(\phi (k)(k\in [-\tau ,0])\) is

$$\begin{aligned} Z_{k}= \textstyle\begin{cases} \phi (k),& k\in [-\tau ,0], \\ \phi (0)+ak+bC_{k}+c\int _{0}^{k}\phi (r-\tau )\,dV_{r},& k\in (0, \tau ], \\ Z_{\tau }+a(k-\tau )++b(C_{k}-C_{\tau })+c\int _{\tau }^{k}Z_{r-\tau }\,dV_{r},& k\in (\tau ,2\tau ], \\ \cdots \cdots \end{cases}\displaystyle \end{aligned}$$
(29)

Example 3

Consider an uncertain delay differential equation with V-jump

$$ dZ_{k}=aZ_{k-\tau }\,dk+bZ_{k-\tau } \,dC_{k}+cZ_{k-\tau }\,dV_{k}. $$

Obviously, the coefficients \(h(k, z, \hat{z}) = a\hat{z}\), \(p(k, z, \hat{z}) = b\hat{z}\), and \(q(k, z, \hat{z}) = c\hat{z}\) are one-sided local Lipschitz continuous.

$$\begin{aligned} & \bigl\vert h(k, z, \hat{z}) \bigr\vert \vee \bigl\vert p(k, z, \hat{z}) \bigr\vert \vee \bigl\vert q(k, z, \hat{z}) \bigr\vert = \vert az \vert \vee \vert b\hat{z} \vert \vee \vert c\hat{z} \vert \\ &\quad = \max \bigl( \vert a \vert , \vert b \vert , \vert c \vert \bigr) \bigl(1 + \vert z \vert + \vert \hat{z} \vert \bigr), \forall z, \hat{z}\in \mathbb{R}, k\in [0, T]. \end{aligned}$$

By using Theorem 2, it has a unique continuous solution.

In fact, the analytical solution of \(dZ_{k}=aZ_{k-\tau }\,dk+bZ_{k-\tau }\,dC_{k}+cZ_{k-\tau }\,dV_{k}\) with the initial states \(\phi (k)(k\in [-\tau ,0])\) is

$$\begin{aligned} Z_{k}= \textstyle\begin{cases} \phi (k),& k\in [-\tau ,0], \\ \phi (0)+a\int _{0}^{k}\phi (r-\tau )\,dr+b\int _{0}^{k}\phi (r-\tau )\,dC_{r} \\ \quad {}+c\int _{0}^{k}\phi (r-\tau )\,dV_{r},& k\in (0,\tau ], \\ Z_{\tau }+a\int _{\tau }^{k}Z_{r-\tau }\,dr\\ \quad {}+b\int _{\tau }^{k}Z_{r-\tau }\,dC_{r}+c \int _{\tau }^{t}Z_{r-\tau }\,dV_{r},\quad k\in (\tau ,2\tau ], \\ \cdots \cdots \end{cases}\displaystyle \end{aligned}$$
(30)

Example 4

Consider an uncertain delay differential equation with V-jump

$$\begin{aligned} dZ_{k}=\bigl(\exp (-k)Z_{k-\tau }+\mu \bigr) \,dk+\sigma \,dC_{k}+\nu \,dC_{k},\quad k\in [0, + \infty ). \end{aligned}$$
(31)

It follows from conditions that real-valued functions \(\exp (-k)\), \(|\mu |\), \(|\sigma |\), and \(|\nu |\) are bounded on the interval \([0,+\infty )\). Since

$$\begin{aligned} \int _{0}^{+\infty }\exp (-k)\,dk=1< +\infty , \end{aligned}$$

according to Corollary 1, the linear uncertain delay differential equation with V-jump (31) is stable in measure.

3 Conclusions

In this paper, we propose uncertain delay differential equations with V-jump and establish the existence, uniqueness, and stability theorem of solution for the uncertain differential equations with V-jump. One source of weakness in our study of uncertain delay differential equations with V-jump is the lack of numerical methods and applications; these will be the focus of our future research.