On a Class of Semi-Markov Risk Models Obtained as Classical Risk Models in a Markovian Environment

Abstract We consider a risk model in which the claim inter-arrivals and amounts depend on a markovian environment process. Semi-Markov risk models are so introduced in a quite natural way. We derive some quantities of interest for the risk process and obtain a necessary and sufficient condition for the fairness of the risk (positive asymptotic non-ruin probabilities). These probabilities are explicitly calculated in a particular case (two possible states for the environment, exponential claim amounts distributions).

[1]  A classification of a random walk defined on a finite Markov chain , 1973 .

[2]  Identités du type Baxter-Spitzer pour une classe de promenades aléatoires semi-markoviennes , 1982 .

[3]  Marcel F. Neuts,et al.  The Infinite-Server Queue with Poisson Arrivals and Semi-Markovian Services , 1972, Oper. Res..

[4]  Peter Purdue,et al.  The M/M/1 Queue in a Markovian Environment , 1974, Oper. Res..

[5]  Feller William,et al.  An Introduction To Probability Theory And Its Applications , 1950 .

[6]  Jac J. Janssen Sur une généralisation du concept de promenade aléatoire sur la droite réelle , 1970 .

[7]  William Feller,et al.  An Introduction to Probability Theory and Its Applications , 1967 .

[8]  The numerical calculation of U(w, t), the probability of non-ruin in an interval (0, t) , 1974 .

[9]  Some Transient Results on the M/SM/1 Special Semi-Markov Model in Risk and Queueing Theories , 1980, ASTIN Bulletin.

[10]  Some duality results for a class of multivariate semi-markov processes , 1982 .

[11]  E. Çinlar Time dependence of queues with semi-Markovian services , 1967, Journal of Applied Probability.

[12]  H. D. Miller A Matrix Factorization Problem in the Theory of Random Variables Defined on a Finite Markov Chain , 1962, Mathematical Proceedings of the Cambridge Philosophical Society.

[13]  A semi-markovian game of economic survival , 1981 .

[14]  Marcel F. Neuts The single server queue with Poisson input and semi-Markov service times , 1966 .

[15]  R. Pyke Markov renewal processes: Definitions and preliminary properties , 1961 .

[16]  R. Pyke Markov Renewal Processes with Finitely Many States , 1961 .