Open Queueing Systems in Light Traffic

Reiman, Martin I.; Simon, Burton

doi:10.1287/moor.14.1.26

Cited by 109 publications

(69 citation statements)

References 10 publications

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“…However due to the fact that the number of sample paths is uncountable and thus the probability of every individual path is zero, making this rigorous is non-trivial. For series expansions revolving around a Poisson process with a small rate, to which the examples in this work essentially belong, this was made rigorous by Reiman and Simon [32]. Important work extending this to a Palm calculus context was presented in [7].…”

Section: Related Workmentioning

confidence: 99%

Opinion propagation in bounded medium-sized populations

Cuypere

Turck

Wittevrongel

et al. 2016

Performance Evaluation

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Section: Related Workmentioning

confidence: 99%

Opinion propagation in bounded medium-sized populations

Cuypere

Turck

Wittevrongel

et al. 2016

Performance Evaluation

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show abstract

“…The right-hand derivatives at ρ = 0 of the various metrics of interest are evaluated using the Reiman-Simon technique [12]. For the system to be in the domain of applicability of the Reiman-Simon results, an assumption on finiteness of the exponential moment of σ is needed.…”

Section: Heavy and Light Trafficmentioning

confidence: 99%

“…Such approximations become exact in the limit as the traffic intensity goes to zero and one respectively. In light traffic we take advantage of the fact that the M|G|∞ arrival process is obviously "Poisson driven", so that the Reiman-Simon theory [12] applies, under a bounded exponential moment assumption. The resulting light traffic limits of the queue with M|G|∞ arrivals differ from those of a classical GI|GI|1 queue.…”

Section: Introductionmentioning

confidence: 99%

Interpolation Approximations for M/G/infinity Arrival Processes

Tsoukatos¹,

Makowski²

1999

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Public reporting burden for the collection of information is estimated to average 1 hour per response, including the time for reviewing instructions, searching existing data sources, gathering and maintaining the data needed, and completing and reviewing the collection of information. AbstractWe present an approximate analysis of a discrete-time queue with correlated arrival processes of the so-called M |G|∞ type. The proposed heuristic approximations are developed around asymptotic results in the heavy and light traffic regimes. Investigation of the system behavior in light traffic quantifies the differences between the gradual M |G|∞ inputs and the point arrivals of a classical GI|GI|1 queue. In heavy traffic, salient features are effectively captured by the exponential distribution and the Mittag-Leffler special function, under short-and long-range dependence respectively. By interpolating between the heavy and light traffic extremes we derive approximations to the queue size distribution, applicable to all traffic intensities. We examine the accuracy of these expressions and discuss possible extensions of our results in several numerical examples.

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“…These derivatives are called the light tra c derivatives and have been previously discussed in 9,8,12]. The light tra c derivatives can be used jointly with the heavy tra c limits for approximating the curve of the delay against the arrival rate.…”

Section: The Light Tra C Derivativesmentioning

confidence: 99%

The MacLaurin series for the GI/G/1 queue

Gong

1992

Journal of Applied Probability

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We derive the MacLaurin series for the moments of the system time and the delay with respect to the parameters in the service time or interarrival time distributions in the GI/G/1 queue. The coe cients in these series are expressed in terms of the derivatives of the interarrival time density function evaluated at zero and the moments of the service time distribution, which can be easily calculated through a simple recursive procedure. The light tra c derivatives can be obtained from these series. For the M/G/1 queue, we are able to recover the formulas for the moments of the system time and the delay, including the Pollaczek-Khinchin mean-value formula.

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Open Queueing Systems in Light Traffic

Cited by 109 publications

References 10 publications

Opinion propagation in bounded medium-sized populations

Opinion propagation in bounded medium-sized populations

Interpolation Approximations for M/G/infinity Arrival Processes

The MacLaurin series for the GI/G/1 queue

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