previous :: next
Hitting probabilities in a Markov additive process with linear movements and upward jumps: Applications to risk and queueing processes
Masakiyo Miyazawa
Source: Ann. Appl. Probab. Volume 14, Number 2
(2004), 1029-1054.
Abstract
Motivated by a risk process with positive and negative premium rates, we consider a real-valued Markov additive process with finitely many background states. This additive process linearly increases or decreases while the background state is unchanged, and may have upward jumps at the transition instants of the background state. It is known that the hitting probabilities of this additive process at lower levels have a matrix exponential form. We here study the hitting probabilities at upper levels, which do not have a matrix exponential form in general. These probabilities give the ruin probabilities in the terminology of the risk process. Our major interests are in their analytic expressions and their asymptotic behavior when the hitting level goes to infinity under light tail conditions on the jump sizes. To derive those results, we use a certain duality on the hitting probabilities, which may have an independent interest because it does not need any Markovian assumption.
First Page:
Show
Hide
Keywords: Risk process; Markov additive process; hitting probability; decay rate; Markov renewal theorem; stationary marked point process; duality
Full-text: Open access
Links and Identifiers
Permanent link to this document: http://projecteuclid.org/euclid.aoap/1082737121
Digital Object Identifier: doi:10.1214/105051604000000206
Mathematical Reviews number (MathSciNet): MR2052912
Zentralblatt MATH identifier: 02100764
References
Arjas, E. and Speed, T. P. (1973). Symmetric Wiener--Hopf factorizations in Markov additive processes. Z. Wahrsch. Verw. Gebiete 26 105--118.
Mathematical Reviews (MathSciNet): MR331515
Digital Object Identifier: doi:10.1007/BF00533480
Asmussen, S. (1987). Applied Probability and Queues. Wiley, Chichester.
Mathematical Reviews (MathSciNet): MR889893
Zentralblatt MATH: 0624.60098
Asmussen, S. (1991). Ladder heights and the Markov-modulated $M/G/1$ queue. Stochastic Process. Appl. 37 313--326.
Mathematical Reviews (MathSciNet): MR1102877
Digital Object Identifier: doi:10.1016/0304-4149(91)90050-M
Zentralblatt MATH: 0734.60091
Asmussen, S. (1994). Busy period analysis, rare events and transient behavior in fluid flow models. J. Appl. Math. Stochastic Anal. 7 269--299.
Mathematical Reviews (MathSciNet): MR1301702
Asmussen, S. (1995). Stationary distributions for fluid flow models with or without Brownian noise. Stoch. Models 11 21--49.
Mathematical Reviews (MathSciNet): MR1316767
Asmussen, S. (2000). Ruin Probabilities. World Scientific, Singapore.
Mathematical Reviews (MathSciNet): MR1794582
Asmussen, S. and Højgaard, B. (1996). Finite horizon ruin probabilities for Markov-modulated risk processes with heavy tails. Theory of Stochastic Processes 2 96--107.
Asmussen, S. and Klüppelberg, C. (1996). Large deviations results for subexponential tails, with applications to insurance risk. Stochastic Process. Appl. 64 103--125.
Mathematical Reviews (MathSciNet): MR1419495
Digital Object Identifier: doi:10.1016/S0304-4149(96)00087-7
Zentralblatt MATH: 0879.60020
Baccelli, F. and Brémaud, P. (2002). Elements of Queueing Theory: Palm Martingale Calculus and Stochastic Recurrences, 2nd ed. Springer, New York.
Mathematical Reviews (MathSciNet): MR1957884
Zentralblatt MATH: 1021.60001
Çinlar, E. (1975). Introduction to Stochastic Processes. Prentice-Hall, Englewood Cliffs, NJ.
Mathematical Reviews (MathSciNet): MR380912
Kingman, J. F. C. (1961). A convexity property of positive matrices. Quart. J. Math. Oxford Ser. (2) 12 283--284.
Mathematical Reviews (MathSciNet): MR138632
Loynes, R. M. (1962). The stability of a queue with nonindependent inter-arrival and service times. Proc. Cambridge Philosophical Society 58 497--520.
Mathematical Reviews (MathSciNet): MR141170
Digital Object Identifier: doi:10.1017/S0305004100036781
Miyazawa, M. (2002). A Markov renewal approach to the asymptotic decay of the tail probabilities in risk and queueing processes. Probab. Eng. Inform. Sci. 16 139--150.
Mathematical Reviews (MathSciNet): MR1891469
Digital Object Identifier: doi:10.1017/S0269964802162012
Miyazawa, M. and Takada, H. (2002). A matrix exponential form for hitting probabilities and its application to a Markov modulated fluid queue with downward jumps. J. Appl. Probab. 39 604--618.
Mathematical Reviews (MathSciNet): MR1928894
Digital Object Identifier: doi:10.1239/jap/1034082131
Zentralblatt MATH: 1037.60084
Neuts, M. F. (1989). Structured Stochastic Matrices of $M/G/1$ Type and Their Applications. Dekker, New York.
Mathematical Reviews (MathSciNet): MR1010040
Zentralblatt MATH: 0695.60088
Rogers, L. C. G. (1994). Fluid models in queueing theory and Wiener--Hopf factorization of Markov chains. Ann. Appl. Probab. 4 390--413.
Mathematical Reviews (MathSciNet): MR1272732
JSTOR: links.jstor.org
Rolski, T., Schmidli, H., Schmidt, V. and Teugels, J. (1999). Stochastic Processes for Insurance and Finance. Wiley, Chichester.
Mathematical Reviews (MathSciNet): MR1680267
Zentralblatt MATH: 0940.60005
Schmidli, H. (1995). Cramér--Lundberg approximations for ruin probabilities of risk processes perturbed by a diffusion. Insurance Math. Econom. 16 135--149.
Mathematical Reviews (MathSciNet): MR1347857
Seneta, E. (1980). Nonnegative Matrices and Markov Chains, 2nd ed. Springer, New York.
Mathematical Reviews (MathSciNet): MR719544
Sengupta, B. (1989). Markov processes whose steady state distribution is matrix-exponential with an application to the $GI/PH/1$ queue. Adv. in Appl. Probab. 21 159--180.
Mathematical Reviews (MathSciNet): MR980741
Takada, H. (2001). Markov modulated fluid queues with batch fluid arrivals. J. Oper. Res. Soc. Japan 44 344--365.
Mathematical Reviews (MathSciNet): MR1878676
Takine, T. (2001). A recent progress in algorithmic analysis of FIFO queues with Markovian arrival streams. J. Korean Math. Soc. 38 807--842.
Mathematical Reviews (MathSciNet): MR1838099
previous :: next
The Annals of Applied Probability
