TY - GEN
T1 - An approximate analysis of waiting time in multi-class M/G/1/./EDF queues
AU - Chen, Ken
AU - Decreusefond, Laurent
N1 - Publisher Copyright:
© 1996 ACM.
PY - 1996/5/15
Y1 - 1996/5/15
N2 - The Earliest-Deadline-First (EDF) queueing discipline is being more and more widely used for handling time-sensitive applications in computer systems and networks. In this paper, we consider an arbitrary number of traffic classes with class-specific soft-deadline. A soft-deadline is a target waiting-time limit that can be missed. EDF queueing has been proved to minimize the maximum delay overflow related to this limit. We propose a quantitative analysis, through the metric of mean waiting time, on the behavior of EDF queueing. This analysis gives also insight on the correlation between traffic classes with different time-constraints. Technically speaking, we have proven that the mean waiting times for an arbitrary set of N classes of traffic streams with soft deadlines are the unique solution of a system of non-linear equations under the constraint of the Kleinrock's conservation law. We then provide an O (N2) algorithm to get the solution. Simulation suggests that the theoretical approximation we made is quite acceptable.
AB - The Earliest-Deadline-First (EDF) queueing discipline is being more and more widely used for handling time-sensitive applications in computer systems and networks. In this paper, we consider an arbitrary number of traffic classes with class-specific soft-deadline. A soft-deadline is a target waiting-time limit that can be missed. EDF queueing has been proved to minimize the maximum delay overflow related to this limit. We propose a quantitative analysis, through the metric of mean waiting time, on the behavior of EDF queueing. This analysis gives also insight on the correlation between traffic classes with different time-constraints. Technically speaking, we have proven that the mean waiting times for an arbitrary set of N classes of traffic streams with soft deadlines are the unique solution of a system of non-linear equations under the constraint of the Kleinrock's conservation law. We then provide an O (N2) algorithm to get the solution. Simulation suggests that the theoretical approximation we made is quite acceptable.
KW - Communication networks
KW - Computer architecture
KW - Multimedia systems
KW - Real-time systems
KW - Stochastic modeling
U2 - 10.1145/233013.233043
DO - 10.1145/233013.233043
M3 - Conference contribution
AN - SCOPUS:85135068652
T3 - SIGMETRICS 1996 - Proceedings of the 1996 ACM SIGMETRICS International Conference on Measurement and Modeling of Computer Systems
SP - 190
EP - 199
BT - SIGMETRICS 1996 - Proceedings of the 1996 ACM SIGMETRICS International Conference on Measurement and Modeling of Computer Systems
PB - Association for Computing Machinery, Inc
T2 - 1996 ACM SIGMETRICS International Conference on Measurement and Modeling of Computer Systems, SIGMETRICS 1996
Y2 - 23 May 1996 through 26 May 1996
ER -