Consider a classical compound Poisson model. The safety loading can be positive, negative or zero. Explicit expressions for the distributions of the surplus prior and at ruin are given in terms of the ruin probability. Moreover, the asymptotic behaviour of these distributions as the initial capital tends to infinity are obtained. In particular, for positive safety loading the Cram6r case, the case of subexponential distributions and some intermediate cases are discussed
We consider a risk reserve process whose premium rate reduces from cd to cu when the reserve comes a...
In classical risk theory, the infinite-time ruin probability of a surplus process Ct is calculated a...
We consider a compound Poisson surplus process perturbed by diffusion with debit interest. When the ...
In the classical compound Poisson model of the collective risk theory we consider X, the surplus bef...
In this paper, we consider a compound Poisson model with a constant interest force for an insurance ...
In this paper, we consider a compound Poisson model with a constant interest force for an insurance ...
In this paper, we consider the problem of the severity of ruin for a compound Poisson model with a c...
In this paper we consider a compound Poisson risk model where the insurer earns credit interest at a...
We consider a general compound Poisson risk model in which the premium rate is surplus dependent. We...
The aggregate claims are modeled as a compound binomial process, and the individual claim amounts ar...
In the classical compound Poisson model of the collective theory of risk let ?(u, y) denote the prob...
In this paper, we study a risk measure derived from ruin theory defined as the amount of capital nee...
In contrast with the classical Cramer-Lundberg model where the premium process is a linear function ...
In this article, we consider the perturbed compound Poisson risk process with investment incomes. Th...
The compound binomial model is a discrete time analogue (or approximation) of the compound Poisson m...
We consider a risk reserve process whose premium rate reduces from cd to cu when the reserve comes a...
In classical risk theory, the infinite-time ruin probability of a surplus process Ct is calculated a...
We consider a compound Poisson surplus process perturbed by diffusion with debit interest. When the ...
In the classical compound Poisson model of the collective risk theory we consider X, the surplus bef...
In this paper, we consider a compound Poisson model with a constant interest force for an insurance ...
In this paper, we consider a compound Poisson model with a constant interest force for an insurance ...
In this paper, we consider the problem of the severity of ruin for a compound Poisson model with a c...
In this paper we consider a compound Poisson risk model where the insurer earns credit interest at a...
We consider a general compound Poisson risk model in which the premium rate is surplus dependent. We...
The aggregate claims are modeled as a compound binomial process, and the individual claim amounts ar...
In the classical compound Poisson model of the collective theory of risk let ?(u, y) denote the prob...
In this paper, we study a risk measure derived from ruin theory defined as the amount of capital nee...
In contrast with the classical Cramer-Lundberg model where the premium process is a linear function ...
In this article, we consider the perturbed compound Poisson risk process with investment incomes. Th...
The compound binomial model is a discrete time analogue (or approximation) of the compound Poisson m...
We consider a risk reserve process whose premium rate reduces from cd to cu when the reserve comes a...
In classical risk theory, the infinite-time ruin probability of a surplus process Ct is calculated a...
We consider a compound Poisson surplus process perturbed by diffusion with debit interest. When the ...