A finite horizon insurance model is studied where the risk/reserve process can be controlled by reinsurance and investment in the financial market. Obtaining explicit optimal solutions for the minimizing ruin probability problem is a difficult task. Therefore, we consider an alternative method commonly used in ruin theory, which consists in deriving inequalities that can be used to obtain upper bounds for the ruin probabilities and then choose the control to minimize the bound. We finally specialize our results to the particular, but relevant, case of exponentially distributed claims and compare for this case our bounds with the classical Lundberg bound
Optimal investment and reinsurance strategies for an insurer with state-dependent constraints are co...
In this paper, we consider an insurance company whose surplus (reserve) is modeled by a jump diffusi...
The classical measure for an insurance risk is the ruin probability. This is the probability that t...
A finite horizon insurance model is studied where the risk/reserve process can be controlled by rei...
Ruin probabilities in a controlled discrete-time risk process with a Markov chain interest are stud...
Two upper bounds for ruin probability under the discrete time risk model for insurance controlled by...
This paper deals with the problem of ruin probability minimization under various investment control ...
In actuarial science ruin theory uses mathematical models to describe an insurer’s vulnerability to ...
The present paper studies the probability of ruin of an insurer, if excess of loss reinsurance with ...
We consider a discrete risk process modelled by a Markov Decision Process. The surplus could be inve...
The paper presents an extension of the classical Cramér-Lundberg ruin theory: the famous upper bound...
A Dissertation Submitted in Partial Fulfillment of the Requirements for the Degree of Doctor of Phi...
In the work reported here we present theoretical and numerical results about a Risk Model with Inte...
In this thesis, ruin probabilities of insurance companies are studied. Ruin proba- bility in finite ...
In the electronic version of the thesis the published version of paper I has been replaced with the ...
Optimal investment and reinsurance strategies for an insurer with state-dependent constraints are co...
In this paper, we consider an insurance company whose surplus (reserve) is modeled by a jump diffusi...
The classical measure for an insurance risk is the ruin probability. This is the probability that t...
A finite horizon insurance model is studied where the risk/reserve process can be controlled by rei...
Ruin probabilities in a controlled discrete-time risk process with a Markov chain interest are stud...
Two upper bounds for ruin probability under the discrete time risk model for insurance controlled by...
This paper deals with the problem of ruin probability minimization under various investment control ...
In actuarial science ruin theory uses mathematical models to describe an insurer’s vulnerability to ...
The present paper studies the probability of ruin of an insurer, if excess of loss reinsurance with ...
We consider a discrete risk process modelled by a Markov Decision Process. The surplus could be inve...
The paper presents an extension of the classical Cramér-Lundberg ruin theory: the famous upper bound...
A Dissertation Submitted in Partial Fulfillment of the Requirements for the Degree of Doctor of Phi...
In the work reported here we present theoretical and numerical results about a Risk Model with Inte...
In this thesis, ruin probabilities of insurance companies are studied. Ruin proba- bility in finite ...
In the electronic version of the thesis the published version of paper I has been replaced with the ...
Optimal investment and reinsurance strategies for an insurer with state-dependent constraints are co...
In this paper, we consider an insurance company whose surplus (reserve) is modeled by a jump diffusi...
The classical measure for an insurance risk is the ruin probability. This is the probability that t...