Inspired by works of Landriault et al. [11, 12], we study the Gerber{Shiu distribution at Parisian ruin with exponential implementation delays for a spectrally negative Levy insurance risk process. To be more specific, we study the so-called Gerber{Shiu distribution for a ruin model where at each time the surplus process goes negative, an independent exponential clock is started. If the clock rings before the surplus becomes positive again then the insurance company is ruined. Our methodology uses excursion theory for spectrally negative Levy processes and relies on the theory of so-called scale functions. In particular, we extend recent results of Landriault et al. [11, 12]
Abstract:This paper considers the risk model perturbed by a diffusion process with a time delay in t...
In this paper we derive the exact asymptotics of the probability of Parisian ruin for self-similar G...
We formulate the insurance risk process in a general Levy process setting, and give general theorem...
Inspired by works of Landriault et al. [11, 12], we study the Gerber{Shiu distribution at Parisian r...
Inspired by works of Landriault et al. [10, 11], we study the Gerber-Shiu distribution at Parisian r...
In this short paper, we investigate a definition of Parisian ruin introduced in [3], namely Parisian...
We examine discounted penalties at ruin for surplus dynamics driven by a general spectrally negative...
We consider a Cramér-Lundberg insurance risk process with the added feature of reinsurance. If an ar...
We consider a Cramér-Lundberg insurance risk process with the added feature of reinsurance. If an ar...
This paper studies the Parisian ruin problem first proposed by Dassios and Wu (2008a,b), where the P...
The idea of taxation in risk process was first introduced by Albrecher and Hipp (2007), who suggeste...
Inspired by Parisian barrier options in finance (see e.g. Chesney et al. (1997)), a new definition o...
In this paper, we extend the concept of ruin in risk theory to the Parisian type of ruin. For this t...
In this note we give, for a spectrally negative Levy process, a compact formula for the Parisian rui...
In this thesis, we consider a generalization of the classical Gerber-Shiu function in various risk m...
Abstract:This paper considers the risk model perturbed by a diffusion process with a time delay in t...
In this paper we derive the exact asymptotics of the probability of Parisian ruin for self-similar G...
We formulate the insurance risk process in a general Levy process setting, and give general theorem...
Inspired by works of Landriault et al. [11, 12], we study the Gerber{Shiu distribution at Parisian r...
Inspired by works of Landriault et al. [10, 11], we study the Gerber-Shiu distribution at Parisian r...
In this short paper, we investigate a definition of Parisian ruin introduced in [3], namely Parisian...
We examine discounted penalties at ruin for surplus dynamics driven by a general spectrally negative...
We consider a Cramér-Lundberg insurance risk process with the added feature of reinsurance. If an ar...
We consider a Cramér-Lundberg insurance risk process with the added feature of reinsurance. If an ar...
This paper studies the Parisian ruin problem first proposed by Dassios and Wu (2008a,b), where the P...
The idea of taxation in risk process was first introduced by Albrecher and Hipp (2007), who suggeste...
Inspired by Parisian barrier options in finance (see e.g. Chesney et al. (1997)), a new definition o...
In this paper, we extend the concept of ruin in risk theory to the Parisian type of ruin. For this t...
In this note we give, for a spectrally negative Levy process, a compact formula for the Parisian rui...
In this thesis, we consider a generalization of the classical Gerber-Shiu function in various risk m...
Abstract:This paper considers the risk model perturbed by a diffusion process with a time delay in t...
In this paper we derive the exact asymptotics of the probability of Parisian ruin for self-similar G...
We formulate the insurance risk process in a general Levy process setting, and give general theorem...