In the usual model of the collective risk theory, we are interested in the severity of ruin, as well as its probability. As a quantitative measure, we propose G(u, y), the probability that for given initial surplus u ruin will occur and that the deficit at the time of ruin will be less than y, and the corresponding density g(u, y). First a general answer in terms of the transform is obtained. Then, assuming that the claim amount distribution is a combination of exponential distributions, we determine g; here the roots of the equation that defines the adjustment coefficient play a central role. An explicit answer is also given in the case in which all claims are of constant size
Our thesis includes 2 sections. In section 1, we mainly discuss the distribution function and the em...
In a recent paper, Willmot (2015) derived an expression for the joint distribution function of the t...
The sensitivity of the ruin probability depending on the claim size distribution has been the topic ...
In the usual model of the collective risk theory, we are interested in the severity of ruin, as well...
In the classical compound Poisson model of the collective theory of risk let ?(u, y) denote the prob...
In the classical compound Poisson model of the collective risk theory we consider X, the surplus bef...
© 2014 Dr. Jingchao LIIn recent years, there have been many studies on ruin related quantities. In p...
The first method, essentmlly due to GOOVAERTS and DE VYLDER, uses the connection between the probabi...
This paper presents essential elements of the theory of risk. Collective risk models over an extende...
ABSTRACT In the classical risk model, we use probabilistic arguments to write down expressions in t...
We provide upper bounds to the probability of ruin into a modified model of the collective risk the...
An explicit formula for the finite-time ruin probability in a discrete-time collective ruin model wi...
In the present note we consider the classical continuous time model of the collective theory of risk...
AbstractIn this paper we propose a highly accurate approximation procedure for ruin probabilities in...
The first method, essentially due to GOOVAERTS and DE VYLDER, uses the connection between the probab...
Our thesis includes 2 sections. In section 1, we mainly discuss the distribution function and the em...
In a recent paper, Willmot (2015) derived an expression for the joint distribution function of the t...
The sensitivity of the ruin probability depending on the claim size distribution has been the topic ...
In the usual model of the collective risk theory, we are interested in the severity of ruin, as well...
In the classical compound Poisson model of the collective theory of risk let ?(u, y) denote the prob...
In the classical compound Poisson model of the collective risk theory we consider X, the surplus bef...
© 2014 Dr. Jingchao LIIn recent years, there have been many studies on ruin related quantities. In p...
The first method, essentmlly due to GOOVAERTS and DE VYLDER, uses the connection between the probabi...
This paper presents essential elements of the theory of risk. Collective risk models over an extende...
ABSTRACT In the classical risk model, we use probabilistic arguments to write down expressions in t...
We provide upper bounds to the probability of ruin into a modified model of the collective risk the...
An explicit formula for the finite-time ruin probability in a discrete-time collective ruin model wi...
In the present note we consider the classical continuous time model of the collective theory of risk...
AbstractIn this paper we propose a highly accurate approximation procedure for ruin probabilities in...
The first method, essentially due to GOOVAERTS and DE VYLDER, uses the connection between the probab...
Our thesis includes 2 sections. In section 1, we mainly discuss the distribution function and the em...
In a recent paper, Willmot (2015) derived an expression for the joint distribution function of the t...
The sensitivity of the ruin probability depending on the claim size distribution has been the topic ...