Title :
Logarithmic Delay for N ×N Packet Switches Under the Crossbar Constraint
Author :
Neely, Michael J. ; Modiano, Eytan ; Cheng, Yuan-Sheng
Author_Institution :
Southern California Univ., Los Angeles
fDate :
6/1/2007 12:00:00 AM
Abstract :
We consider the fundamental delay bounds for scheduling packets In an N times N packet switch operating under the crossbar constraint. Algorithms that make scheduling decisions without considering queue backlog are shown to incur an average delay of at least O(N). We then prove that O(log(N)) delay is achievable with a simple frame based algorithm that uses queue backlog information. This is the best known delay bound for packet switches, and is the first analytical proof that sublinear delay is achievable in a packet switch with random inputs.
Keywords :
log normal distribution; packet switching; scheduling; stochastic processes; crossbar constraint; delay bound; logarithmic delay; optimal control; packet switches; queue backlog information; stochastoc queueing analysis; Combinatorial mathematics; Constraint theory; Delay; Fabrics; Packet switching; Processor scheduling; Queueing analysis; Scheduling algorithm; Stochastic processes; Switches; Optimal control; scheduling; stochastic queueing analysis;
Journal_Title :
Networking, IEEE/ACM Transactions on
DOI :
10.1109/TNET.2007.893876
