Vyacheslav M. Abramov
Published 2005-05-27Version 1
This paper provides the asymptotic analysis of the loss probability in the $GI/M/1/n$ queueing system as $n$ increases to infinity. The approach of this paper is alternative to that of the recent papers of Choi and Kim [2000] and Choi et al [2000] and based on application of modern Tauberian theorems with remainder. This enables us to simplify the proofs of the results on asymptotic behavior of the loss probability of the abovementioned paper of Choi and Kim [2000] as well as to obtain some new results.
Comments: 8 pages
Journal: Annals of Operations Research 112 (2002) 35-41
Asymptotic Analysis of Losses in the $GI/M/m/n$ Queueing System as $n$ Increases to Infinity
Asymptotic analysis of a fluid model modulated by an $M/M/1$ queue
Asymptotic Behavior of Random Heaps
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