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A sample-path approach to Palm probabilities

Published online by Cambridge University Press:  14 July 2016

Shaler Stidham Jr.*
Affiliation:
University of North Carolina
*
Postal address: Department of Operations Research, CB 3180, Smith Building, University of North Carolina, Chapel Hill, NC 27599-3180, USA.

Abstract

Previous papers have established sample-path versions of relations between marginal time-stationary and event-stationary (Palm) state probabilities for a process with an imbedded point process. This paper extends the use of sample-path analysis to provide relations between frequencies for arbitrary (measurable) sets in function space, rather than just marginal (one-dimensional) frequencies. We define sample-path analogues of the time-stationary and event-stationary (Palm) probability measures for a process with an imbedded point process, and then derive sample-path versions of the Palm transformation and inversion formulas.

MSC classification

Type
Research Papers
Copyright
Copyright © Applied Probability Trust 1994 

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Footnotes

Research partially supported by a grant from Centre International des Étudiants et Stagiares (C.I.E.S.) while the author was on leave at INRIA, Sophia-Antipolis, Valbonne, France (1991–92).

References

[1] Baccelli, F. and Brémaud, P. (1987) Palm Probabilities and Stationary Queues. Lecture Notes in Statistics 41, Springer-Verlag, New York.Google Scholar
[2] Brémaud, P. (1989) Characteristics of queueing systems observed at events and the connection between stochastic intensity and Palm probability. QUESTA 5, 99112.Google Scholar
[3] Brémaud, P. (1993) A Swiss army formula of Palm calculus. J. Appl. Prob. 30, 4051.Google Scholar
[4] Brémaud, P., Kannurpatti, R. and Mazumdar, R. (1992) Event and time averages: a review, Adv. Appl. Prob. 25, 377411.Google Scholar
[5] Chung, K. L. (1974) A Course in Probability Theory, 2nd edn. Academic Press, New York.Google Scholar
[6] El-Taha, M. and Stidham, S. Jr. (1991) Sample-path analysis of stochastic discrete-event systems. Proc. 30th IEEE CDC Meeting.Google Scholar
[7] El-Taha, M. and Stidham, S. Jr. (1993) Sample-path analysis of stochastic discrete-event systems. Discrete Event Dynamic Systems: Theory and Applications 3, 325346.Google Scholar
[8] Ethier, S. and Kurtz, T. (1986) Markov Processes: Characterization and Convergence. Wiley, New York.Google Scholar
[9] Franken, P., König, D., Arndt, U. and Schmidt, V. (1981) Queues and Point Processes. Akademie-Verlag, Berlin.Google Scholar
[10] Heyman, D. P. and Stidham, S. Jr. (1980) The relation between customer and time averages in queues. Operat. Res. 28, 983994.Google Scholar
[11] König, D. and Schmidt, V. (1989) EPSTA: The coincidence of time-stationary and customer-stationary distributions. QUESTA 5, 247264.Google Scholar
[12] Krickeberg, K. (1977) Processus ponctuels en statistique. In Ecole d'été de probabilités de Saint Flour X-1980 , ed. Hennequin, P. L. pp. 206313. Lecture Notes in Mathematics 929, Springer-Verlag, Heidelberg.Google Scholar
[13] Melamed, B. and Whitt, W. (1990) On arrivals that see time averages. Operat. Res. 38, 156172.Google Scholar
[14] Melamed, B. and Whitt, W. (1990) On arrivals that see time averages: a martingale approach. J. Appl. Prob. 27, 376384.Google Scholar
[15] Neveu, J. (1977) Processus ponctuels. In Ecole d'été de probabilités de Saint Flour VI-1976, ed. Hennequin, P. L. pp. 249447, Lecture Notes in Mathematics 598, Springer-Verlag, Heidelberg.Google Scholar
[16] Rolski, T. (1981) Stationary Random Processes Associated with Point Processes. Lecture Notes in Statistics. Springer-Verlag, New York.Google Scholar
[17] Sigman, K. (1991) A note on a sample-path conservation law and its relation with H = ?G. Adv. Appl. Prob. 23, 662665.Google Scholar
[18] Stidham, S. Jr. (1982) Sample-path analysis of queues. In Applied Probability and Computer Science: The Interface , ed. Disney, R. and Ott., T. pp. 4170, Birkhauser, Boston.CrossRefGoogle Scholar
[19] Stidham, S. Jr. and El-Taha, M. (1989) Sample-path analysis of processes with imbedded point processes. QUESTA 5, 131165.Google Scholar
[20] Whitt, W. (1991) A review of L = ?W and extensions. QUESTA 9, 235268.Google Scholar
[21] Whitt, W. (1992) H = ?G and the Palm transformation. Adv. Appl. Prob. 24, 755758.Google Scholar
[22] Zazanis, M. (1991) Sample-path analysis of level crossings for the workload process. QUESTA 11, 419428.Google Scholar