A Note on Load Balancing in Many-Server Heavy-Traffic Regime

Abstract

In this note, we apply Stein's method to analyze the performance of general load balancing schemes in the many-server heavy-traffic regime. In particular, consider a load balancing system of N servers and the distance of arrival rate to the capacity region is given by N1-α with α > 1. We are interested in the performance as N goes to infinity under a large class of policies. We establish different asymptotics under different scalings and conditions. Specifically, (i) If the second moments linearly increase with N with coefficients σa2 and s2, then for any α > 4, the distribution of the sum queue length scaled by N-α converges to an exponential random variable with mean σa2 + s22. (3) If the second moments quadratically increase with N with coefficients σa2 and s2, then for any α > 3, the distribution of the sum queue length scaled by N-α-1 converges to an exponential random variable with mean σa2 + s22. Both results are simple applications of our previously developed framework of Stein's method for heavy-traffic analysis in zhou2020note.