Hostname: page-component-78c5997874-xbtfd Total loading time: 0 Render date: 2024-11-17T00:19:11.394Z Has data issue: false hasContentIssue false
  • English
  • Français

ON PROBABILITIES ASSOCIATED WITH THE MINIMUM DISTANCE BETWEEN EVENTS OF A POISSON PROCESS IN A FINITE INTERVAL

Published online by Cambridge University Press:  23 April 2010

Shai Covo
Shai Covo
Affiliation:
Department of Mathematics, Bar Ilan University, 52900 Ramat-Gan, IsraelE-mail: [email protected]
Get access Rights & Permissions [Opens in a new window]

Abstract

We revisit the probability that any two consecutive events in a Poisson process N on [0, t] are separated by a time interval that is greater than s (<t) (a particular scan statistic probability) and the closely related probability (recently introduced by Todinov [8], who denotes it as pMFFOP) that before any event of N in [0, t], there exists an event-free interval greater than s. Both probabilities admit simple explicit expressions, which, however, become intractable for very large values of t/s. Our main objective is to demonstrate that these probabilities can be approximated extremely well for large values of t/s by some very tractable and attractive expressions (actually, already for t larger than a few multiples of s).

Type
Research Article
Information
Probability in the Engineering and Informational Sciences , Volume 24 , Issue 3 , July 2010 , pp. 423 - 439
Copyright
Copyright © Cambridge University Press 2010

Access options

Get access to the full version of this content by using one of the access options below. (Log in options will check for institutional or personal access. Content may require purchase if you do not have access.)

References

1.Bingham, N.H., Goldie, C.M. & Teugels, J.L. (1987). Regular variation. Cambridge: Cambridge University Press.CrossRefGoogle Scholar
2.Comtet, L. (1974). Advanced combinatorics. Dordrecht: Reidel.Google Scholar
3.Gates, D.J. & Westcott, M. (1985). Accurate and asymptotic results for distributions of scan statistics. Journal of Applied Probability 22: 531542.Google Scholar
4.Korevaar, J. (2002). A century of complex Tauberian theory. Bulletin of the American Mathematical Society 39: 475531.CrossRefGoogle Scholar
5.Naus, J.I. (1982). Approximations for distributions of scan statistics. Journal of the American Statistical Association 77: 177183.Google Scholar
6.Penrose, O. & Elvey, J.S.N. (1968). The Yang–Lee distribution of zeros for a classical one-dimensional fluid. Journal of Physics A 1: 661674.Google Scholar
7.Todinov, M.T. (2002). Statistics of defects in one-dimensional components. Computational Materials Science 24: 430442.Google Scholar
8.Todinov, M.T. (2003). Minimum failure-free operating intervals associated with random failures of non-repairable components. Computers & Industrial Engineering 45: 475491.Google Scholar
9.Todinov, M.T. (2004). A new reliability measure based on specified minimum distances before the locations of random variables in a finite interval. Reliability Engineering & System Safety 86: 95103.Google Scholar
10.Todinov, M.T. (2005). Reliability and risk models: Setting reliability requirements. West Sussex, UK: Wiley.Google Scholar