Improved Algorithmic Bounds for Discrepancy of Sparse Set Systems

Abstract

We consider the problem of finding a low discrepancy coloring for sparse set systems where each element lies in at most t sets. We give an algorithm that finds a coloring with discrepancy O((t n s)1/2) where s is the maximum cardinality of a set. This improves upon the previous constructive bound of O(t1/2 n) based on algorithmic variants of the partial coloring method, and for small s (e.g.s=poly(t)) comes close to the non-constructive O((t n)1/2) bound due to Banaszczyk. Previously, no algorithmic results better than O(t1/2 n) were known even for s = O(t2). Our method is quite robust and we give several refinements and extensions. For example, the coloring we obtain satisfies the stronger size-sensitive property that each set S in the set system incurs an O((t n |S|)1/2) discrepancy. Another variant can be used to essentially match Banaszczyk's bound for a wide class of instances even where s is arbitrarily large. Finally, these results also extend directly to the more general Koml\'os setting.