On finite exponential moments for branching processes and busy periods for queues

Authors

Marvin K. Nakayama, Department of Computer Science
Perwez Shahabuddin, The Fu Foundation School of Engineering and Applied Science
Karl Sigman, The Fu Foundation School of Engineering and Applied Science

Document Type

Article

Publication Date

1-1-2004

Abstract

Using a known fact that a Galton-Watson branching process can be represented as an embedded random walk, together with a result of Heyde (1964), we first derive finite exponential moment results for the total number of descendants of an individual. We use this basic and simple result to prove analogous results for the population size at time t and the total number of descendants by time t in an age-dependent branching process. This has applications in justifying the interchange of expectation and derivative operators in simulation-based derivative estimation for generalized semi-Markov processes. Next, using the result of Heyde (1964), we show that, in a stable GI/GI/1 queue, the length of a busy period and the number of customers served in a busy period have finite exponential moments if and only if the service time does. © 2004 Applied Probability Trust.

Identifier

33845729388 (Scopus)

Publication Title

Journal of Applied Probability

External Full Text Location

https://doi.org/10.1239/jap/1082552204

ISSN

00219002

First Page

273

Last Page

280

Volume

41A

Recommended Citation

Nakayama, Marvin K.; Shahabuddin, Perwez; and Sigman, Karl, "On finite exponential moments for branching processes and busy periods for queues" (2004). Faculty Publications. 20627.
https://digitalcommons.njit.edu/fac_pubs/20627