A threshold for online balancing of sparse i.i.d. vectors

Abstract

Consider the task of online vector balancing for stochastic arrivals (Xi)i ∈ [T], where the time horizon satisfies T = (n), and the Xi are i.i.d uniform d--sparse n--dimensional binary vectors, with 2≤ d ( n)2/ n. We show that for this range of parameters, every online algorithm incurs discrepancy at least ( n), and there is an efficient algorithm which achieves a matching discrepancy bound of O( n) w.h.p. This establishes an asymptotic gap, both existential and algorithmic, between the online and offline versions of the average--case Beck--Fiala problem. Strikingly, the optimal online discrepancy in the considered setting is order n, independent of d and the norms of the vectors (Xi)i. Our assumptions on d are nearly optimal, as this independence ceases when d=ω(( n)2).