Improved queue-size scaling for input-queued switches via graph factorization

Abstract

This paper studies the scaling of the expected total queue size in an n× n input-queued switch, as a function of both the load and the system scale n. We provide a new class of scheduling policies under which the expected total queue size scales as O( n(1-)-4/3 (\11-, n\)), over all n and <1, when the arrival rates are uniform. This improves over the previously best-known scalings in two regimes: O(n1.5(1-)-1 11-) when (n-1.5) 1- O(n-1) and O(n n(1-)2) when 1- ≥ (n-1). A key ingredient in our method is a tight characterization of the largest k-factor of a random bipartite multigraph, which may be of independent interest.