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WSC
2001
2001
Using quantile estimates in simulating internet queues with Pareto service times
It is readily apparent how important the Internet is to modern life. The exponential growth in its use requires good tools for analyzing congestion. Much has been written recently asserting that classical queueing models assuming Poisson arrivals or exponential service cannot be used for the accurate study of congestion in major portions of the Internet. Internet traffic data indicate that heavytailed distributions (e.g., Pareto) serve as better models in many situations for packet service lengths. But these distributions may not possess closed-form analytic Laplace transforms; hence, much of standard queueing theory cannot be used. Simulating such queues becomes essential; however, previous research pointed out difficulties in obtaining the usual moment performance measures such as mean wait in queue. In this paper, we investigate using quantile estimates of waiting times (e.g., median instead of mean), which appear to be considerably more efficient when service times are Pareto.
Real-time TrafficAnalytic Laplace Transforms | Classical Queueing Models | Modeling And Simulation | Standard Queueing Theory | WSC 2001 |
| Added | 31 Oct 2010 |
| Updated | 31 Oct 2010 |
| Type | Conference |
| Year | 2001 |
| Where | WSC |
| Authors | Martin J. Fischer, Denise M. Bevilacqua Masi, Donald Gross, John Shortle, Percy H. Brill |
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