6 research outputs found
Compound Compound Poisson Risk Model
Get PDF2000 Mathematics Subject Classification: 60K10, 62P05.The compound Poisson risk models are widely used in practice. In this paper the counting process in the insurance risk model is a compound Poisson process. The model is called Compound Compound Poisson Risk Model. Some basic properties and ruin probability are given. We analyze the model under the proportional reinsurance. The optimal retention level and the corresponding adjustment coefficient are obtained. The particular case of the P贸lya-Aeppli risk model is discussed.This paper is partially supported by Sofia University grant 221/2008
A Modified Model of Risk Business
Get PDF2000 Mathematics Subject Classification: 60K10, 62P05We consider the risk model in which the claim counting process {N(t)} is a modified stationary renewal process. {N(t)} is governed by a sequence of independent and identically distributed inter-occurrence times with a common exponential distribution function with mass at zero equal to 蟻>0. The model is called a Polya-Aeppli risk model. The Cramer-Lundberg
approximation and the martingale approach of the model are given.This paper is partially supported by Bulgarian NFSI grant MM-1103/2001
The P贸lya-Aeppli process and ruin problems
No full textThe P贸lya-Aeppli process as a generalization of the homogeneous Poisson process is defined. We consider the risk model in which the counting process is the P贸lya-Aeppli process. It is called a P贸lya-Aeppli risk model. The problem of finding the ruin probability and the Cram茅r-Lundberg approximation is studied. The Cram茅r condition and the Lundberg exponent are defined. Finally, the comparison between the P茅lya-Aeppli risk model and the corresponding classical risk model is given
A new Markov Binomial distribution
No full textIn this paper, we introduce a two state homogeneous Markov chain and define a geometric distribution related to this Markov chain. We define also the negative binomial distribution similar to the classical case and call it NB related to interrupted Markov chain. The new binomial distribution is related to the interrupted Markov chain. Some characterization properties of the Geometric distributions are given. Recursion formulas and probability mass functions for the NB distribution and the new binomial distribution are derived.Homogeneous Markov chain; Interrupted Markov chain; Geometric distribution related to Markov chain; In
ated negative binomial distribution; New binomial distribution
