New Bounds for the Last Iterate of the Stochastic subGradient Method

Abstract

We study the last iterate of the stochastic subgradient method for one-dimensional convex Lipschitz objectives. For a fixed horizon n, we consider the standard fixed stepsizes η=Θ(1/ n). We prove that, for such stepsize policies, under additive i.i.d. subgradient noise with uniformly bounded variance, the last iterate features an optimization error of order 1/ n, thereby removing the extra ( n) factor present in existing generic bounds. On the other hand, we show that without the i.i.d. assumption, the optimization error can be of order ( n)/ n. Thus, under the uniformly bounded variance assumption alone, the last iterate of SsGM is suboptimal even in dimension one, resolving negatively an open problem posed in Koren and Segal, COLT, 2020.