Title :
Exact queueing asymptotics for multiple heavy-tailed on-off flows
Author :
Zwart, Bert ; Borst, Sem ; Mandjes, Michel
Author_Institution :
Dept. of Math. & Comput. Sci., Eindhoven Univ. of Technol., Netherlands
Abstract :
We consider a fluid queue fed by multiple on-off flows with heavy-tailed (regularly varying) on-periods. Under fairly mild assumptions, we prove that the workload distribution is asymptotically equivalent to that in a reduced system. The reduced system consists of a dominant subset of the flows, with the original service rate subtracted by the mean rate of the other flows. We describe how a dominant set may be determined from a simple knapsack formulation. We exploit a powerful intuitive argument to obtain the exact asymptotics for the reduced system. Combined with the reduced-load equivalence, the results for the reduced system provide an asymptotic characterization of the buffer behavior
Keywords :
knapsack problems; queueing theory; telecommunication traffic; asymptotic characterization; buffer behavior; exact queueing asymptotics; fluid queue; heavy-tailed on-off flows; knapsack formulation; multiple on-off flows; reduced-load equivalence; workload distribution; Communication system traffic control; Layout; Mathematics; Performance analysis; Probability distribution; Queueing analysis; Size control; Telecommunication traffic; Time measurement; Traffic control;
Conference_Titel :
INFOCOM 2001. Twentieth Annual Joint Conference of the IEEE Computer and Communications Societies. Proceedings. IEEE
Conference_Location :
Anchorage, AK
Print_ISBN :
0-7803-7016-3
DOI :
10.1109/INFCOM.2001.916710
