Recent models of the insurance risk process use a Lévy process to generalise the traditional Cramér-Lundberg compound Poisson model. This paper is concerned with the behaviour of the distributions of the overshoot and undershoots of a high level, for
Consider a classical compound Poisson model. The safety loading can be positive, negative or zero. E...
In contrast with the classical Cramer-Lundberg model where the premium process is a linear function ...
The aim of this paper is to provide a comparison of the error in several approximation methods for t...
Recent models of the insurance risk process use a Lévy process to generalise the traditional Cramé...
Recent models of the insurance risk process use a Levy process to generalise the traditional Cramer-...
We obtain a new fluctuation identity for a general Lévy process giving a quintuple law describing th...
We obtain a new fluctuation identity for a general Lévy process giving a quintuple law describing t...
We obtain a new fluctuation identity for a general Lévy process giv-ing a quintuple law describing ...
We formulate the insurance risk process in a general Levy process setting, and give general theorem...
We consider risk processes with reinsurance. A general family of reinsurance contracts is allowed, i...
This paper is concerned with the finiteness and large-time behaviour of moments of the overshoot and...
In this paper, we construct a new insurance risk model based on the entrance process and consider th...
We consider the risk process (Xx(t)) defined by Xx(t) = x+ pt − S(t) where x> 0 is the initial c...
Lévy processes (LP) are gaining popularity in actuarial and financial modeling. The Lévy measure i...
We consider the classical model for an insurance business where the claims occur according to a Pois...
Consider a classical compound Poisson model. The safety loading can be positive, negative or zero. E...
In contrast with the classical Cramer-Lundberg model where the premium process is a linear function ...
The aim of this paper is to provide a comparison of the error in several approximation methods for t...
Recent models of the insurance risk process use a Lévy process to generalise the traditional Cramé...
Recent models of the insurance risk process use a Levy process to generalise the traditional Cramer-...
We obtain a new fluctuation identity for a general Lévy process giving a quintuple law describing th...
We obtain a new fluctuation identity for a general Lévy process giving a quintuple law describing t...
We obtain a new fluctuation identity for a general Lévy process giv-ing a quintuple law describing ...
We formulate the insurance risk process in a general Levy process setting, and give general theorem...
We consider risk processes with reinsurance. A general family of reinsurance contracts is allowed, i...
This paper is concerned with the finiteness and large-time behaviour of moments of the overshoot and...
In this paper, we construct a new insurance risk model based on the entrance process and consider th...
We consider the risk process (Xx(t)) defined by Xx(t) = x+ pt − S(t) where x> 0 is the initial c...
Lévy processes (LP) are gaining popularity in actuarial and financial modeling. The Lévy measure i...
We consider the classical model for an insurance business where the claims occur according to a Pois...
Consider a classical compound Poisson model. The safety loading can be positive, negative or zero. E...
In contrast with the classical Cramer-Lundberg model where the premium process is a linear function ...
The aim of this paper is to provide a comparison of the error in several approximation methods for t...