Queue length asymptotics for generalized max-weight scheduling in the presence of heavy-tailed traffic

Author(s)

Jagannathan, Krishna Prasanna; Markakis, Michail; Modiano, Eytan H.; Tsitsiklis, John N.

Abstract

We investigate the asymptotic behavior of the steady-state queue length distribution under generalized max-weight scheduling in the presence of heavy-tailed traffic. We consider a system consisting of two parallel queues, served by a single server. One of the queues receives heavy-tailed traffic, and the other receives light-tailed traffic. We study the class of throughput optimal max-weight-α scheduling policies, and derive an exact asymptotic characterization of the steady-state queue length distributions. In particular, we show that the tail of the light queue distribution is heavier than a power-law curve, whose tail coefficient we obtain explicitly. Our asymptotic characterization also shows that the celebrated max-weight scheduling policy leads to the worst possible tail of the light queue distribution, among all non-idling policies. Motivated by the above `negative' result regarding the max-weight-α policy, we analyze a log-max-weight (LMW) scheduling policy. We show that the LMW policy guarantees an exponentially decaying light queue tail, while still being throughput optimal.

Date issued

2011-06

URI

http://hdl.handle.net/1721.1/66953

Department

Massachusetts Institute of Technology. Department of Aeronautics and Astronautics
Massachusetts Institute of Technology. Department of Electrical Engineering and Computer Science

Journal

2011 Proceedings IEEE INFOCOM

Publisher

Institute of Electrical and Electronics Engineers

Citation

Jagannathan, Krishna et al. “Queue Length Asymptotics for Generalized Max-weight Scheduling in the Presence of Heavy-tailed Traffic.” 2011 Proceedings IEEE INFOCOM. Shanghai, China, 2011. 2318-2326.

Version: Author's final manuscript

Other identifiers

INSPEC Accession Number: 12085842

ISBN

978-1-4244-9919-9

ISSN

0743-166X