In this paper we consider a compound Poisson risk model where the insurer earns credit interest at a constant rate if the surplus is positive and pays out debit interest at another constant rate if the surplus is negative. Absolute ruin occurs at the moment when the surplus first drops below a critical value (a negative constant). We study the asymptotic properties of the absolute ruin probability of this model. First we investigate the asymptotic behavior of the absolute ruin probability when the claim size distribution is light tailed. Then we study the case where the common distribution of claim sizes are heavy tailed. © Applied Probability Trust 2003.link_to_subscribed_fulltex
Abstract. In this paper we consider the probabilities of finite-and infinite-time absolute ruin in t...
The aggregate claims are modeled as a compound binomial process, and the individual claim amounts ar...
The classical model of collective risk theory is extended in that a diffusion process is added to th...
We consider a compound Poisson surplus process perturbed by diffusion with debit interest. When the ...
This article considers the compound Poisson insurance risk model perturbed by diffusion with investm...
In this paper, we consider the dividend payments in a compound Poisson risk model with credit and de...
In contrast with the classical Cramer-Lundberg model where the premium process is a linear function ...
In the classical compound Poisson model of the collective risk theory we consider X, the surplus bef...
Consider a classical compound Poisson model. The safety loading can be positive, negative or zero. E...
We consider the compound Poisson risk model with debit interest and dividend payments. The model ass...
In this paper, we consider the problem of the severity of ruin for a compound Poisson model with a c...
In the classical compound Poisson model of the collective theory of risk let ?(u, y) denote the prob...
Abstract In this paper, we consider a perturbed compound Poisson risk model with stochastic premiums...
In this article, we consider the perturbed compound Poisson risk process with investment incomes. Th...
In this paper, we study ruin in a perturbed compound Poisson risk process under stochastic interest ...
Abstract. In this paper we consider the probabilities of finite-and infinite-time absolute ruin in t...
The aggregate claims are modeled as a compound binomial process, and the individual claim amounts ar...
The classical model of collective risk theory is extended in that a diffusion process is added to th...
We consider a compound Poisson surplus process perturbed by diffusion with debit interest. When the ...
This article considers the compound Poisson insurance risk model perturbed by diffusion with investm...
In this paper, we consider the dividend payments in a compound Poisson risk model with credit and de...
In contrast with the classical Cramer-Lundberg model where the premium process is a linear function ...
In the classical compound Poisson model of the collective risk theory we consider X, the surplus bef...
Consider a classical compound Poisson model. The safety loading can be positive, negative or zero. E...
We consider the compound Poisson risk model with debit interest and dividend payments. The model ass...
In this paper, we consider the problem of the severity of ruin for a compound Poisson model with a c...
In the classical compound Poisson model of the collective theory of risk let ?(u, y) denote the prob...
Abstract In this paper, we consider a perturbed compound Poisson risk model with stochastic premiums...
In this article, we consider the perturbed compound Poisson risk process with investment incomes. Th...
In this paper, we study ruin in a perturbed compound Poisson risk process under stochastic interest ...
Abstract. In this paper we consider the probabilities of finite-and infinite-time absolute ruin in t...
The aggregate claims are modeled as a compound binomial process, and the individual claim amounts ar...
The classical model of collective risk theory is extended in that a diffusion process is added to th...