H. Christian Gromoll, Łukasz Kruk, Amber L. Puha
Published 2010-05-06, updated 2010-11-17Version 2
We present a heavy traffic analysis for a single server queue with renewal arrivals and generally distributed i.i.d. service times, in which the server employs the Shortest Remaining Processing Time (SRPT) policy. Under typical heavy traffic assumptions, we prove a diffusion limit theorem for a measure-valued state descriptor, from which we conclude a similar theorem for the queue length process. These results allow us to make some observations on the queue length optimality of SRPT. In particular, they provide the sharpest illustration of the well-known tension between queue length optimality and quality of service for this policy.
Comments: 19 pages; revised, fixed typos. To appear in Stochastic Systems
Journal: Stochastic Systems, 1:1-16, 2011
Heavy Traffic Scaling Limits for shortest remaining processing time queues with heavy tailed processing time distributions
Diffusion limits for shortest remaining processing time queues under nonstandard spatial scaling
The $G/GI/N$ queue in the Halfin--Whitt regime
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