On Queue-Size Scaling for Input-Queued Switches

Abstract

We study the optimal scaling of the expected total queue size in an n× n input-queued switch, as a function of the number of ports n and the load factor , which has been conjectured to be (n/(1-)). In a recent work, the validity of this conjecture has been established for the regime where 1- = O(1/n2). In this paper, we make further progress in the direction of this conjecture. We provide a new class of scheduling policies under which the expected total queue size scales as O(n1.5(1-)-1(1/(1-))) when 1- = O(1/n). This is an improvement over the state of the art; for example, for = 1 - 1/n the best known bound was O(n3), while ours is O(n2.5 n).