THE PROBABILITY OF RUIN WITH FINITE HORIZON IN A DISCRETE-TIME MULTI-RISK MODEL


扩展功能
	加入收藏夹

	复制引文信息

	加入引用管理器

	Email Alert

	RSS
本文作者相关文章
	HUA Zhi-qiang

	YANG Shao-hua

HUA Zhi-qiang¹, YANG Shao-hua²

1. College of Mathematics, Inner Mongolia University for the Nationalities, Tongliao 028043, China;
2. School of Mathematics and Computational Science, Fuyang Normal College, Fuyang 236037, China

Received date: 2013-03-04; Accepted date: 2013-10-19

Foundation item: Supported by the Natural Science Fund of Inner Mongolia University for the Nationalities (NMD1227), the Natural Science Foundation of the Inner Mongolia Autonomous Region (2013MS0101), the Anhui Natural Science Fund for Institutions of Higher Education (KJ2010B431), the Construction Fund for National Feature Specialty(TS11496)

Biography: Hua Zhiqiang(1981-), male, born in Nanjing, Jiangsu, lecturer, major in probability and mathematical statistics

Abstract: This paper investigates the probability of ruin for the discrete-time multi-risk model. By using the classical method of large deviation, we obtain the ruin probability within finite horizon, which extends the corresponding results of the discrete-time unit-risk model.

Key words: ruin probability large deviation discrete-time multi-risk model

离散时多元风险模型的破产概率

华志强¹, 杨少华²

1. 内蒙古民族大学数学学院, 内蒙古通辽 028043;
2. 阜阳师范学院数学与计算科学学院, 安徽阜阳 236037

摘要：本文研究了离散时多元风险模型的破产概率问题.利用经典大偏差的方法, 获得了有限水平的破产概率, 推广了离散时一元风险模型的相应结论.

关键词：破产概率大偏差离散时多元风险模型

1 Introduction

Recently, a lot of papers were published on the issue of the ruin probability, we refer the reader to [1-6] for more details. We say that a random variable $\xi$ (or its distribution function $F$) is heavy-tailed if it has no finite exponential moments. In ruin probability theory, heavy-tailed distributions are often used to model large claims. They play a key role in some fields such as insurance, financial mathematics and queueing theory. In this paper, we use an important subclass of heavy-tailed distribution, which is called $\mathcal{C}$. A distribution function $F$ belongs to $\mathcal{C}$ if

$\begin{equation} \lim\limits_{y\downarrow 1}\liminf\limits_{x\rightarrow\infty}\frac{\bar{F}(xy)}{\bar{F}(x)}=1 \mbox{or, equivalently,}\lim\limits_{y\uparrow 1}\limsup\limits_{x\rightarrow\infty}\frac{\bar{F}(xy)}{\bar{F}(x)}=1. \end{equation}$

Set

$\begin{equation} \gamma(y):=\liminf\limits_{x\rightarrow\infty}\frac{\bar{F}(xy)}{\bar{F}(x)} \mbox{and}{\gamma}_F:=\inf\big\{-\frac{\log\gamma(y)}{\log y}:y>1\big\}. \end{equation}$

In [7], $\gamma_F$ is called the upper Matuszewska index of the nonnegative and nondecreasing function $f(x)=(\bar{F}(x))^{-1}$, $x>0.$ Without any danger of confusion, we simply call $\gamma_F$ the upper Matuszewska index of the distribution $F$. See Chapter 2.1 of [7] and [8] for more details of the Matuszewska index.

The ruin probability in a discrete-time unit-risk model was investigated in [9-11] among other. In these papers, they always assumed that the company provides only one kind of insurance contract. In reality this assumption is not correct, for example, an unexpected claim even might induce more than one type of claim in an umbrella insurance policy. A typical example is motor insurance where an accident could cause claims for vehicle damages and the third party injuries. So the ruin probability of multi-risk models is more valuable. In present paper, we consider a discrete-time multi-risk model with a random interest rate and assume that the insurance company has $k$ classes of insurance contract. Other basic assumptions of this model are as follows:

A1 For $s=1,2,\cdots,k$, the $s$th type related net incomes $\xi_{si},i=1,2,\cdots ,n$, constitute a sequence of dependent random variables with common distribution $F_{s}$ concentrated on $(-\infty,+\infty)$, where the net incomes $\xi_{si}$, called the insurance risk, is understood as the total incoming premium minus the total claim amount within year $n$. And $\{\xi_{si},i=1,2,\cdots ,n\}$ satisfy the assumption condition: $\exists x_{0}>0$ and $c>0$ such that

$\begin{equation} P(|\xi_{si}|>x_{i}|\xi_{sj}=x_{j} {\rm with} j\in J)\leq c P(\xi_{si}>x_{i}) \end{equation}$

for all $1\leq i\leq n$, $\emptyset \neq J \subset \{1,2,\cdots ,n\}\backslash \{i\}$, $x_{i}>x_{0}$, and $x_{j}>x_{0}$ with $j\in J$. Remark that this condition is assumption $B$ of [1], we denote this assumption condition by assumption $A$ which will be used in Proposition 2.1.

A2 For $j=1,2,\cdots,n$, $\eta_{j}$, called the financial risk, is the discount factor from year $j$ to year $j-1$. They constitute a sequence of independent identical distributed random variables, satisfy that there exist some constants $a<a\leq b<\infty$ such that $P(a\leq \eta_i\leq b)=1$ for all $1\leq i \leq n$.

A3 $\{\xi_{si},i=1,2,\cdots ,n\}^{k}_{s=1}$ and $\{\eta_{j},j=1,2,\cdots ,n\}$ are mutually independent.

Let the initial capital of the insurance company be $x\geq 0$. We tacitly assume that the $s$th type related net incomes $\xi_{si}$ is calculated at the beginning of year $i$, and the discounted value of the surplus of the company accumulated till the beginning of year $m$ can be characterized by $S_{sm}$, $m=1,2,\cdots $, which satisfy the recurrence equation below:

$S_{s0}=x,S_{sm}=x-\sum\limits^{m}_{i=1}\xi _{si}\prod\limits ^{i-1}_{j=1}Y_{j}. $

Hence the ruin probability in the considered multi-risk model with initial capital $x\geq 0$ is defined by $\varphi^{k}(x,n)=P\Big(\max\limits_{1\leq m\leq n}\sum^{k}\limits_{s=1}\sum^{m}\limits_{i=1}\xi_{si}\prod^{i-1}_{j=1}\eta_{j}\Big).$

2 Main Result

In this section, several propositions used in Section 3 are provided, and our main result is presented.

Proposition 2.1 Suppose that $\{\xi_{i}, 1\leq i \leq n\}$ are $n$ real-valued random variables with $F_{i}\in \mathcal{C}$ for all $1\leq i\leq n$, and $F_{i}\ast F_{j}\in \mathcal{C}$ for all $1\leq i\neq j \leq n$, and satisfy that $\exists x_{0}>0$ and $c>0$ such that

$\begin{equation} P(|\xi_{i}|>x_{i}|\xi_{j}=x_{j} {\rm with}\ \ j\in J)\leq c P(\xi_{i}>x_{i}) \end{equation}$

for all $1\leq i\leq n$, $\emptyset \neq J \subset \{1,2,\cdots ,n\}\backslash \{i\}$, $x_{i}>x_{0}$, and $x_{j}>x_{0}$ with $j\in J$. If there exist some constants $0<a\leq b<\infty$ such that $P(a\leq \eta_{i} \leq b)=1$ for all $1\leq i\leq n$, then the following relation

$\begin{eqnarray*} P\Big(\max_{1\leq m\leq n}\sum\limits_{k=1}^m \xi_{k}\prod_{j=1}^k \eta_{j}>x\Big)\sim P\Big(\sum\limits_{k=1}^n \xi_{k}\prod_{j=1}^k \eta_{j}>x\Big) \sim\sum\limits_{k=1}^nP\Big(\xi_{k}\prod_{j=1}^k \eta_{j}>x\Big), \end{eqnarray*}$

as $x\rightarrow \infty$. Here $F_{i}\ast F_{j}\in \mathcal{C}$ denotes the convolution of distribution $F_{i}$ and $F_{j}$.

This proposition is the conclusion of Theorem 2 of [1] when distribution function belongs to $\mathcal{C}$, and plays a key role in the proof of our result. Repeated using Corollary 2.5 of [8], we can get the following proposition.

Proposition 2.2 If $\xi \in \mathcal{C}$, there exist some constants $0<a\leq b<\infty$ such that $P(a\leq \eta_{i} \leq b)=1$ for all $1\leq i\leq k$, then $\xi \prod^{k}_{i=1}\eta_{k}\in \mathcal{C}$.

From Theorem 3.3 of [8], we can obtain Proposition 2.3, that is

Proposition 2.3 If $\xi\in \mathcal{C}$, $E\eta^{p}<\infty$ for some $p>{\gamma}_F$, and $\xi$ and $\eta$ are mutually independent, then $P(\xi \eta >x)\asymp P(\xi >x)$.

The following exhibits one such situation in a discrete-time multi-risk model and is the main result of this paper.

Theorem 2.1 Suppose that assumptions A1-A3 hold, and $F_{s} \in \mathcal{C}$ and $\gamma_{F_{s}}>0$ for $1\leq s\leq k$. If there exists some positive constant $p>\max\limits_{1\leq s\leq k}\gamma_{F_{s}}$ such that $E\eta_{i}^{p}<\infty$ for all $1\leq i\leq n$, then

$\begin{equation} \varphi^{k}(x,n)\sim \sum\limits_{s=1}^k\sum\limits_{i=1}^nP\Big(\xi_{si}\prod_{j=1}^{i-1} \eta_{j}>x\Big) {\rm as} x\rightarrow \infty \end{equation}$

(2.1)

holds for any $n\geq 1$.

3 Proof

For notational convenience, throughout this section, all limit relations are for $x\rightarrow \infty$ unless stated otherwise. In order to prove Theorem 2.1, we need to divide the proof into the following two theorems.

Theorem 3.1 Under the conditions of Theorem 2.1, we have

$\begin{equation} \varphi^{k}(x,n)\lesssim \sum\limits_{s=1}^k\sum\limits_{i=1}^nP\Big(\xi_{si}\prod_{j=1}^{i-1} \eta_{j}>x\Big). \end{equation}$

(3.1)

Proof We give the proof of Theorem 3.1 by induction approach. It is trivial that relation $(3.1)$ holds for $k=1$ from Proposition 2.1. When $k=2$, for any fixed $0<\varepsilon<\frac{1}{2}$, we have

$\begin{eqnarray} \varphi^{2}(x,n)&=&P\Big(\max\limits_{1\leq m\leq n}\sum\limits_{s=1}^2\sum\limits_{i=1}^m \xi_{si}\prod\limits_{j=1}^{i-1} \eta_j>x\Big)\nonumber\\ &\leq&P\Big(\max\limits_{1\leq m\leq n}\sum\limits_{i=1}^m \xi_{1i}\prod\limits_{j=1}^{i-1} \eta_j+\max\limits_{1\leq m\leq n}\sum\limits_{i=1}^m \xi_{2i}\prod\limits_{j=1}^{i-1} \eta_j>x\Big)\nonumber\\ &\leq&P\Big(\Big\{\max\limits_{1\leq m\leq n}\sum\limits_{i=1}^m \xi_{1i}\prod\limits_{j=1}^{i-1} \eta_j>(1-\varepsilon)x\Big\} \bigcup \Big\{ \max\limits_{1\leq m\leq n}\sum\limits_{i=1}^m \xi_{2i}\prod\limits_{j=1}^{i-1} \eta_j>(1-\varepsilon)x\Big\}\nonumber\\ &&\quad\quad \bigcup\Big\{\max\limits_{1\leq m\leq n}\sum\limits_{i=1}^m \xi_{1i}\prod\limits_{j=1}^{i-1} \eta_j>\varepsilon x,\max\limits_{1\leq m\leq n}\sum\limits_{i=1}^m \xi_{2i}\prod\limits_{j=1}^{i-1} \eta_j>\varepsilon x\Big\}\Big)\nonumber\\ &\leq&P\Big(\max\limits_{1\leq m\leq n}\sum\limits_{i=1}^m \xi_{1i}\prod\limits_{j=1}^{i-1} \eta_j>(1-\varepsilon)x \Big)+P\Big(\max\limits_{1\leq m\leq n}\sum\limits_{i=1}^m \xi_{2i}\prod\limits_{j=1}^{i-1} \eta_j>(1-\varepsilon)x \Big)\nonumber\\ &&+P\Big(\max\limits_{1\leq m\leq n}\sum\limits_{i=1}^m \xi_{1i}\prod\limits_{j=1}^{i-1} \eta_j>\varepsilon x,\max\limits_{1\leq m\leq n}\sum\limits_{i=1}^m \xi_{2i}\prod\limits_{j=1}^{i-1} \eta_j>\varepsilon x\Big)\nonumber\\ &=&P_{1}+P_{2}-P_{3}. \end{eqnarray}$

(3.2)

First, we deal with $P_{1}$. By Proposition 2.1 and Proposition 2.2, for any $0<\delta<1$, we have

$\begin{eqnarray} P_{1}&\leq& (1+\delta)\sum\limits_{i=1}^n P\Big( \xi_{1i}\prod\limits_{j=1}^{i-1} \eta_j>(1-\varepsilon)x \Big) \leq (1+\delta)^{2}\sum\limits_{i=1}^n P\Big( \xi_{1i}\prod\limits_{j=1}^{i-1} \eta_j>x \Big). \end{eqnarray}$

(3.3)

Similarly to the proof of relation $(3.3)$, we have

$\begin{eqnarray} P_{2}\leq (1+\delta)^{2}\sum\limits_{i=1}^n P\Big( \xi_{2i}\prod\limits_{j=1}^{i-1} \eta_j>x \Big). \end{eqnarray}$

(3.4)

Now we deal with $P_{3}$. For any $0<\delta<1$ and any fixed $0<\varepsilon<\frac{1}{2}$,

$\begin{eqnarray} &&P\Big( \max\limits_{1\leq m\leq n}\sum\limits_{i=1}^m \xi_{1i}\prod\limits_{j=1}^{i-1} \eta_j>\varepsilon x\mid \eta_{j},1\leq j\leq n\Big)\nonumber\\ &\leq&P\Big( \sum\limits_{i=1}^n \xi_{1i}^{+}\prod\limits_{j=1}^{i-1} \eta_j>\varepsilon x\mid \eta_{j},1\leq j\leq n\Big) \leq P\Big( \sum\limits_{i=1}^n \xi_{1i}^{+} b^{i-1}>\varepsilon x\Big)\nonumber\\ &\leq& \sum\limits_{i=1}^n P\Big(\xi_{1i}^{+} b^{i-1}>\frac{\varepsilon x}{n}\Big) = \sum\limits_{i=1}^n P\Big(\xi_{1i} b^{i-1}>\frac{\varepsilon x}{n}\Big) \leq n\delta, \end{eqnarray}$

(3.5)

where the last step is obtained by $\lim\limits_{x\rightarrow\infty}P\Big(\xi_{1i} b^{i-1}>\frac{\varepsilon x}{n}\Big)=0$ for $1\leq i\leq n $. Since $\xi_{2i}\prod\limits_{j=1}^{i-1}\in \mathcal{C}$ for $1\leq i\leq n $, there exists some $M_{1}>0$, for any fixed $0<\varepsilon<\frac{1}{2}$ such that

$\begin{eqnarray} P\Big(\xi_{2i}\prod\limits_{j=1}^{i-1}>\varepsilon x\Big)\leq M_{1}P\Big(\xi_{2i}\prod\limits_{j=1}^{i-1}> x\Big). \end{eqnarray}$

(3.6)

So, from relation $(3.5)$, Proposition 2.1 and relation $(3.6)$, we get

$\begin{eqnarray} &&\frac{P_{3}}{\sum\limits_{s=1}^2\sum\limits_{i=1}^nP\Big(\xi_{si}\prod_{j=1}^{i-1} \eta_{j}>x\Big)}\nonumber\\ &=&\frac{E\Big[\prod\limits^{2}_{s=1}P\Big(\max\limits_{1\leq m\leq n}\sum\limits_{i=1}^m \xi_{si}\prod\limits_{j=1}^{i-1} \eta_j>\varepsilon x\mid \eta_{j},1\leq j\leq n\Big)\Big]}{\sum\limits_{s=1}^2\sum\limits_{i=1}^nP\Big(\xi_{si}\prod_{j=1}^{i-1} \eta_{j}>x\Big)}\nonumber\\ &=&\frac{E\Big\{P\Big(\max\limits_{1\leq m\leq n}\sum\limits_{i=1}^m \xi_{1i}\prod\limits_{j=1}^{i-1} \eta_j>\varepsilon x\mid \eta_{j},1\leq j\leq n\Big)E\Big[P\Big(\max\limits_{1\leq m\leq n}\sum\limits_{i=1}^m \xi_{2i}\prod\limits_{j=1}^{i-1} \eta_j>\varepsilon x\mid \eta_{j},1\leq j\leq n\Big)\Big]\Big\}} {\sum\limits_{s=1}^2\sum\limits_{i=1}^nP\Big(\xi_{si}\prod_{j=1}^{i-1} \eta_{j}>x\Big)} \nonumber\\ &\leq& n\delta \cdot \frac{P\Big(\max\limits_{1\leq m\leq n}\sum\limits_{i=1}^m \xi_{2i}\prod\limits_{j=1}^{i-1} \eta_j>\varepsilon x \Big)}{\sum\limits_{i=1}^nP\Big(\xi_{2i}\prod_{j=1}^{i-1} \eta_{j}>x\Big)}\nonumber\\ &\leq& n\delta(1+\delta)M_{1}. \end{eqnarray}$

(3.7)

Combining relation $(3.3)$, $(3.4)$ and $(3.7)$ to relation $(3.2)$, by the arbitrariness of $0<\delta<1$, relation $(3.1)$ holds for $k=2$.

Next suppose that relation $(3.1)$ holds for $k-1$, we want to prove it right for $k$. By the similar method from relation $(3.2)$ to $(3.7)$, for any fixed $0<\varepsilon<\frac{1}{2}$ and any $0<\delta<1$,

$\begin{eqnarray*} \varphi^{k}(x,n)&=&P\Big(\max\limits_{1\leq m\leq n}\sum\limits_{s=1}^k \sum\limits_{i=1}^m \xi_{si}\prod\limits_{j=1}^{i-1} \eta_j>x\Big)\nonumber\\ &\leq&P\Big(\Big\{\max\limits_{1\leq m\leq n}\sum\limits_{s=1}^{k-1} \sum\limits_{i=1}^m \xi_{si}\prod\limits_{j=1}^{i-1} \eta_j>(1-\varepsilon)x\Big\} \bigcup \Big\{ \max\limits_{1\leq m\leq n}\sum\limits_{i=1}^m \xi_{ki}\prod\limits_{j=1}^{i-1} \eta_j>(1-\varepsilon)x\Big\}\nonumber\\ &&\quad\quad \bigcup\Big\{\max\limits_{1\leq m\leq n}\sum\limits_{s=1}^{k-1} \sum\limits_{i=1}^m \xi_{1i}\prod\limits_{j=1}^{i-1} \eta_j>\varepsilon x,\max\limits_{1\leq m\leq n}\sum\limits_{i=1}^m \xi_{ki}\prod\limits_{j=1}^{i-1} \eta_j>\varepsilon x\Big\}\Big)\nonumber\\ &\leq&P\Big(\max\limits_{1\leq m\leq n}\sum\limits_{s=1}^{k-1} \sum\limits_{i=1}^m \xi_{si}\prod\limits_{j=1}^{i-1} \eta_j>(1-\varepsilon)x \Big)+P\Big(\max\limits_{1\leq m\leq n}\sum\limits_{i=1}^m \xi_{ki}\prod\limits_{j=1}^{i-1} \eta_j>(1-\varepsilon)x \Big)\nonumber\\ &&+P\Big(\max\limits_{1\leq m\leq n}\sum\limits_{s=1}^{k-1}\sum\limits_{i=1}^m \xi_{si}\prod\limits_{j=1}^{i-1} \eta_j>\varepsilon x,\max\limits_{1\leq m\leq n}\sum\limits_{i=1}^m \xi_{ki}\prod\limits_{j=1}^{i-1} \eta_j>\varepsilon x\Big)\nonumber\\ &\leq& (1+\delta)^{2}\sum\limits_{s=1}^{k-1} \sum\limits_{i=1}^n P\Big(\xi_{si}\prod\limits_{j=1}^{i-1} \eta_j>x\Big)+(1+\delta)^{2} \sum\limits_{i=1}^n P\Big(\xi_{ki}\prod\limits_{j=1}^{i-1} \eta_j>x\Big)\\ &&+n\delta(1+\delta)M_{1}\sum\limits_{s=1}^k \sum\limits_{i=1}^n P\Big(\xi_{si}\prod\limits_{j=1}^{i-1} \eta_j>x\Big). \end{eqnarray*}$

The arbitrariness of $0<\delta<1$ gives result $(3.1)$. This ends the proof of Theorem 3.1.

Theorem 3.2 Under the conditions of Theorem 2.1, we have

$\begin{equation} \varphi^{k}(x,n)\gtrsim \sum\limits_{s=1}^k\sum\limits_{i=1}^nP\Big(\xi_{si}\prod\limits_{j=1}^{i-1} \eta_{j}>x\Big). \end{equation}$

(3.8)

Proof We prove relation $(3.8)$ by induction in $k$. For the case of $k=1$, relation $(3.8)$ holds from Proposition 2.1. From Theorem 3.1, it suffices to prove that relation $(3.8)$ holds for $k=2$.

When $k=2$, for any fixed $0<\varepsilon<1$ and $x>0$, we have

$\begin{eqnarray} \varphi^{2}(x,n)&=&P\Big(\max\limits_{1\leq m\leq n}\sum\limits_{s=1}^2\sum\limits_{i=1}^m \xi_{si}\prod\limits_{j=1}^{i-1} \eta_j>x\Big)\nonumber\\ &\geq &P\Big(\sum\limits_{s=1}^2\sum\limits_{i=1}^n \xi_{si}\prod\limits_{j=1}^{i-1} \eta_j>x\Big)\nonumber\\ &\geq&P\Big(\Big\{\sum\limits_{i=1}^n \xi_{1i}\prod\limits_{j=1}^{i-1} \eta_j>(1+\varepsilon)x, \sum\limits_{i=1}^n \xi_{2i}\prod\limits_{j=1}^{i-1} \eta_j>-\varepsilon x\Big\}\nonumber\\ &&\bigcup\Big\{ \sum\limits_{i=1}^n \xi_{1i}\prod\limits_{j=1}^{i-1} \eta_j>-\varepsilon x,\sum\limits_{i=1}^n \xi_{2i}\prod\limits_{j=1}^{i-1} \eta_j>(1+\varepsilon)x\Big\}\Big)\nonumber\\ &=&P\Big(\sum\limits_{i=1}^n \xi_{1i}\prod\limits_{j=1}^{i-1} \eta_j>(1+\varepsilon)x, \sum\limits_{i=1}^n \xi_{2i}\prod\limits_{j=1}^{i-1} \eta_j>-\varepsilon x\Big)\nonumber\\ &&+P\Big(\sum\limits_{i=1}^n \xi_{1i}\prod\limits_{j=1}^{i-1} \eta_j>-\varepsilon x,\sum\limits_{i=1}^n \xi_{2i}\prod\limits_{j=1}^{i-1} \eta_j>(1+\varepsilon)x\Big)\nonumber\\ &&-P\Big(\sum\limits_{i=1}^n \xi_{1i}\prod\limits_{j=1}^{i-1} \eta_j>(1+\varepsilon)x,\sum\limits_{i=1}^n \xi_{2i}\prod\limits_{j=1}^{i-1} \eta_j>(1+\varepsilon)x\Big)\nonumber\\ &=&Q_{1}+Q_{2}-Q_{3}. \end{eqnarray}$

(3.9)

For $Q_{1}$, we have

$\begin{eqnarray*} Q_{1}&\geq& P\Big(\sum\limits_{i=1}^n \xi_{1i}\prod\limits_{j=1}^{i-1} \eta_j>(1+\varepsilon)x, \bigcap^{n}_{i=1}\Big\{\xi_{2i}\prod\limits_{j=1}^{i-1} \eta_j>\frac{-\varepsilon x}{n}\Big\}\Big)\\ &=&E\Big[P\Big(\sum\limits_{i=1}^n \xi_{1i}\prod\limits_{j=1}^{i-1} \eta_j>(1+\varepsilon)x, \bigcap^{n}_{i=1}\Big\{\xi_{2i}\prod\limits_{j=1}^{i-1} \eta_j>\frac{-\varepsilon x}{n}\Big\}\mid \eta_j, 1\leq j\leq n\Big)\Big]\\ &=&E\Big[P\Big(\sum\limits_{i=1}^n \xi_{1i}\prod\limits_{j=1}^{i-1} \eta_j>(1+\varepsilon)x\mid \eta_j, 1\leq j\leq n\Big) \prod^{n}_{i=1}P\Big(\xi_{2i}\prod\limits_{j=1}^{i-1} \eta_j>\frac{-\varepsilon x}{n}\mid \eta_j, 1\leq j\leq n\Big)\Big].\\ \end{eqnarray*}$

For $1\leq j\leq n$, in view of $\eta_j\in [a,b]$, for any fixed $0<\varepsilon<1$, we have

$\begin{eqnarray} &&P\Big(\xi_{2i}\prod\limits_{j=1}^{i-1} \eta_j>\frac{-\varepsilon x}{n}\mid \eta_j, 1\leq j\leq n\Big)\nonumber\\ &=&P\Big(\xi_{2i}\prod\limits_{j=1}^{i-1} \eta_j>\frac{-\varepsilon x}{n},\xi_{2i}\geq 0\mid \eta_j, 1\leq j\leq n\Big)+P\Big(\xi_{2i}\prod\limits_{j=1}^{i-1} \eta_j>\frac{-\varepsilon x}{n},\xi_{2i}< 0\mid \eta_j, 1\leq j\leq n\Big)\nonumber\\ &\geq&P\Big(\xi_{2i}a^{i-1}>\frac{-\varepsilon x}{n},\xi_{2i}\geq 0\Big)+P\Big(\xi_{2i}b^{i-1} >\frac{-\varepsilon x}{n},\xi_{2i}< 0\Big)\nonumber\\ &=& P\Big(\xi_{2i}>\frac{-\varepsilon x}{nb^{i-1}}\Big). \end{eqnarray}$

(3.10)

Since $\lim\limits_{x\rightarrow\infty}P\Big(\xi_{2i}>\frac{-\varepsilon x}{n}\Big)=1$ for $1\leq i\leq n$, then for any small $0<\delta<1$ and any fixed $0<\varepsilon<1$, we have

$\begin{eqnarray} P\Big(\xi_{2i}>\frac{-\varepsilon x}{nb^{i-1}}\Big)>1-\delta. \end{eqnarray}$

(3.11)

Thus, combing relation $(3.10)$, relation $(3.11)$, Proposition 2.1 and Proposition 2.2, for any small $0<\delta<1$ and any fixed $0<\varepsilon<1$,

$\begin{eqnarray} Q_{1}&\geq&(1-\delta)^{n}P\Big(\sum\limits_{i=1}^n \xi_{1i}\prod\limits_{j=1}^{i-1} \eta_j>(1+\varepsilon)x\Big)\nonumber\\ &\geq& (1-\delta)^{n+1}\sum\limits_{i=1}^n P\Big( \xi_{1i}\prod\limits_{j=1}^{i-1} \eta_j>(1+\varepsilon)x\Big)\nonumber\\ &\geq& (1-\delta)^{n+2}\sum\limits_{i=1}^n P\Big( \xi_{1i}\prod\limits_{j=1}^{i-1} \eta_j>x\Big). \end{eqnarray}$

(3.12)

Symmetrically,

$\begin{eqnarray} Q_{2}\geq (1-\delta)^{n+2}\sum\limits_{i=1}^n P\Big( \xi_{2i}\prod\limits_{j=1}^{i-1} \eta_j>x\Big). \end{eqnarray}$

(3.13)

Next we turn to $Q_{3}$. In view of $\xi_{1i}\in \mathcal{C}$, and $\eta_j$ is bounded for $1\leq i \leq n$, by Proposition 2.3, there is some $M_{2}>0$ such that

$P\Big( \xi_{2i}\prod\limits_{j=1}^{i-1} \eta_j>x\Big)\geq M_{2}P( \xi_{2i}>x).$

Thus, we have

$\begin{eqnarray} \sum\limits_{i=1}^n P\Big( \xi_{2i}\prod\limits_{j=1}^{i-1} \eta_j>x\Big)\geq n M_{2}P( \xi_{21}>x). \end{eqnarray}$

(3.14)

Because of $\xi_{2i}\in \mathcal{C}$ for $1\leq i\leq n$, there exists some $M_{3}>0$ such that

$\begin{eqnarray} P( \xi_{2i}b >\frac{(1+\varepsilon)x}{n})\leq M_{3}P( \xi_{2i}b >x) . \end{eqnarray}$

(3.15)

So, by relation $(3.14)$ and $(3.15)$, we have

$\begin{eqnarray} &&\frac{P\Big(\sum\limits_{i=1}^n \xi_{2i}\prod\limits_{j=1}^{i-1} \eta_j>(1+\varepsilon)x\mid \eta_j, 1\leq j\leq n\Big)}{\sum\limits_{i=1}^n P\Big( \xi_{2i}\prod\limits_{j=1}^{i-1} \eta_j>x\Big)}\nonumber\\ &\leq& \frac{P\Big(\sum\limits_{i=1}^n \xi_{2i}\prod\limits_{j=1}^{i-1} \eta_j>(1+\varepsilon)x\mid \eta_j, 1\leq j\leq n \Big)}{nM_{2} P(\xi_{21}>x)}\nonumber\\ &\leq& \frac{P\Big(\sum\limits_{i=1}^n \xi_{2i}^{+}\prod\limits_{j=1}^{i-1} \eta_j>(1+\varepsilon)x\mid \eta_j, 1\leq j\leq n \Big)}{nM_{2} P(\xi_{21}>x)}\nonumber\\ &\leq& \frac{ P\Big( \sum\limits_{i=1}^n \xi_{2i}^{+}b^{i-1} >(1+\varepsilon)x \Big)}{nM_{2} P(\xi_{21}>x)}\nonumber\\ &\leq& \sum\limits_{i=1}^n \frac{P\Big( \xi_{2i}b^{i-1} >\frac{(1+\varepsilon)x}{n} \Big)}{nM_{2} P(\xi_{21}>x)}\nonumber\\ &\leq& \frac{M_{3}}{M_{2}} \end{eqnarray}$

(3.16)

Then, using Fatou's lemma, and relation $(3.16)$, we obtain

$\begin{eqnarray} &&\limsup\limits_{x\rightarrow\infty}\frac{Q_{3}}{\sum\limits_{s=1}^2 \sum\limits_{i=1}^nP\Big(\xi_{si}\prod_{j=1}^{i-1} \eta_{j}>x\Big)}\nonumber\\ &\leq& \limsup\limits_{x\rightarrow\infty}\frac{E\Big\{\prod\limits ^{2}_{s=1} P\Big(\sum\limits_{i=1}^n \xi_{si}\prod\limits_{j=1}^{i-1} \eta_j>(1+\varepsilon)x\mid \eta_j, 1\leq j\leq n\Big)\Big\}}{\sum\limits_{i=1}^n P\Big(\xi_{2i}\prod_{j=1}^{i-1} \eta_{j}>x\Big)}\nonumber\\ &\leq& E\Big\{\limsup\limits_{x\rightarrow\infty}\frac{\prod\limits ^{2}_{s=1}P\Big(\sum\limits_{i=1}^n \xi_{si}\prod\limits_{j=1}^{i-1} \eta_j>(1+\varepsilon)x\mid \eta_j, 1\leq j\leq n\Big)}{\sum\limits_{i=1}^n P\Big(\xi_{2i}\prod_{j=1}^{i-1} \eta_{j}>x\Big)}\Big\}\nonumber\\ &\leq& (1+\delta)\frac{M_{3}}{M_{2}}E\Big\{\limsup\limits_{x\rightarrow\infty}P\Big( \sum\limits_{i=1}^n\xi_{1i}\prod\limits_{j=1}^{i-1} \eta_j>(1+\varepsilon)x\mid \eta_j, 1\leq j\leq n\Big)\Big\}\nonumber\\ &=& 0, \end{eqnarray}$

(3.17)

where in the fourth equality, we use the following true

$ \limsup\limits_{x\rightarrow\infty}P\Big( \xi_{1i}\prod\limits_{j=1}^{i-1} \eta_j>(1+\varepsilon)x\mid \eta_j, 1\leq j\leq n\Big)\leq \limsup\limits_{x\rightarrow\infty}P\Big( \xi_{1i} b^{i-1}>(1+\varepsilon)x\Big)=0.$

Combing relation $(3.12)$, relation $(3.13)$ and relation $(3.17)$, the arbitrariness of $0<\delta<1$ gives result $(3.8)$ for $k=2$. So Theorem 3.2 holds. From Theorem 3.1 and Theorem 3.2, we know that Theorem 2.1 holds.

References

[1]	Wang Kaiyong. Randomly weighted sums of dependent subexponential random variables[J]. Lithuanian Mathematical Journal, 2011, 51(4): 573–586. DOI:10.1007/s10986-011-9149-x

[2]	Tang Qihe, Tsitsiashvili G. Precise estimates for the ruin probabilities in finite horizon in a discrete-time model with heavy-tailed insurance and financial risks[J]. Stochastic Processes Appl., 2003b, 108: 299–325. DOI:10.1016/j.spa.2003.07.001

[3]	Liu Juan, Cao Wenfang. Ruin probability for a generalized model with negative risk sums[J]. Journal of Math. (PRC), 2011, 31(2): 271–274.

[4]	Luo Kui, Hu Yijun. The negative risk model with the compound binomial process[J]. Journal of Math. (PRC), 2009, 29(10): 409–412.

[5]	Chen Hongyan, Liu Wei, Hu Yijun. The ruin probability of a kind of promoted two-type-risk compound poisson risk model[J]. Journal of Math. (PRC), 2009, 29(2): 201–205.

[6]	Yang Shaohua, Hua Zhiqiang. The ruin probabilities for risk model with phase-type claims[J]. Journal of Math. (PRC), 2013, 33(4): 646–652.

[7]	Bingham N H, Goldie C M, Teugels J L. Regular variation[M]. Cambridge University Press, 1987.

[8]	Cline D B H, Samorodnitsky G. Subexponentiality of the product of independent random variables[J]. Stoch. Process. Appl., 1994, 49: 75–98. DOI:10.1016/0304-4149(94)90113-9

[9]	Tang Qihe, Tsitsiashvili G. Randomly weighted sums of subexponential random variables with application to ruin theory[J]. Extremes., 2003a, 6(3): 171–188. DOI:10.1023/B:EXTR.0000031178.19509.57

[10]	Tang Qihe, Tsitsiashvili G. Finite and infinite time ruin probabilityies in the presence of stochastic returns on investments[J]. Advances Appl. Prob., 2004, 36: 1278–1299. DOI:10.1017/S0001867800013409

[11]	Yang Yang, Leipus R, Siaulys J. On the ruin probability in a dependent discrete time risk model with insurance and financial risks[J]. J. Comp. Appl. Math., 2012, 236: 3286–3295. DOI:10.1016/j.cam.2012.02.030