In thi s article, we consider an Erlang(2) risk process perturbed by diffusion. From the extreme value distribution of Brownian motion with drift and the renewal theory, we show that the survival probability satisfies an integral equation. We then give the bounds for the ultimate ruin probability and the ruin probability caused by claim. By introducing a random walk associated with the proposed risk process, we define an adjustment-coefficient. The relation between the adjustment-coefficient and the bound is given and the Lundberg-type inequality for the bound is obtained. Also, a formula of Pollaczek-Khinchin type for the bound is derived. Using these results, the bound can be calculated when claim sizes are exponentially distributed. Copy...
In this paper, we extend the Cramér-Lundberg insurance risk model perturbed by diffusion to incorpor...
We study the exceedance probability of a high threshold (ruin probability) for a random walk with a ...
We study the ruin problem for insurance models that involve investments. Our risk reserve process is...
In this paper we first consider a risk process in which claim inter-arrival times and the time until...
This paper examines an integro-differential equation of the survival probability d(u) for a class of...
This paper examines an integro-differential equation of the survival probability 4 u) for a class o...
HolaIn this paper the process of aggregated claims in a non-life insurance portfolio as defined in ...
. For a random walk with negative drift we study the exceedance probability (ruin probability) of a ...
For a random walk with negative drift we study the exceedance probability (ruin probability) of a hi...
In this paper the process of aggregated claims in a non-life insurance portfolio as defined in the c...
We consider the Erlang(2) risk model and derive expressions for the density of the time to ruin and ...
In this paper, we consider a risk process with stochastic return on investments. The basic risk proc...
In this paper we consider a risk model having two disjoint classes of insurance business. Correlatio...
We study a family of diffusion models for risk reserves which account for the in-vestment income ear...
We consider a generalisation of a risk process under experience rating when the aggregation of claim...
In this paper, we extend the Cramér-Lundberg insurance risk model perturbed by diffusion to incorpor...
We study the exceedance probability of a high threshold (ruin probability) for a random walk with a ...
We study the ruin problem for insurance models that involve investments. Our risk reserve process is...
In this paper we first consider a risk process in which claim inter-arrival times and the time until...
This paper examines an integro-differential equation of the survival probability d(u) for a class of...
This paper examines an integro-differential equation of the survival probability 4 u) for a class o...
HolaIn this paper the process of aggregated claims in a non-life insurance portfolio as defined in ...
. For a random walk with negative drift we study the exceedance probability (ruin probability) of a ...
For a random walk with negative drift we study the exceedance probability (ruin probability) of a hi...
In this paper the process of aggregated claims in a non-life insurance portfolio as defined in the c...
We consider the Erlang(2) risk model and derive expressions for the density of the time to ruin and ...
In this paper, we consider a risk process with stochastic return on investments. The basic risk proc...
In this paper we consider a risk model having two disjoint classes of insurance business. Correlatio...
We study a family of diffusion models for risk reserves which account for the in-vestment income ear...
We consider a generalisation of a risk process under experience rating when the aggregation of claim...
In this paper, we extend the Cramér-Lundberg insurance risk model perturbed by diffusion to incorpor...
We study the exceedance probability of a high threshold (ruin probability) for a random walk with a ...
We study the ruin problem for insurance models that involve investments. Our risk reserve process is...