A Size-Sensitive Discrepancy Bound for Set Systems of Bounded Primal Shatter Dimension

Abstract

Let (X,) be a set system on an n-point set X. The discrepancy of is defined as the minimum of the largest deviation from an even split, over all subsets of S ∈ and two-colorings on X. We consider the scenario where, for any subset X' ⊂eq X of size m n and for any parameter 1 k m, the number of restrictions of the sets of to X' of size at most k is only O(md1 kd-d1), for fixed integers d > 0 and 1 d1 d (this generalizes the standard notion of bounded primal shatter dimension when d1 = d). In this case we show that there exists a coloring with discrepancy bound O*(|S|1/2 - d1/(2d) n(d1 - 1)/(2d)), for each S ∈ , where O*(·) hides a polylogarithmic factor in n. This bound is tight up to a polylogarithmic factor Mat-95, Mat-99 and the corresponding coloring can be computed in expected polynomial time using the very recent machinery of Lovett and Meka for constructive discrepancy minimization LM-12. Our bound improves and generalizes the bounds obtained from the machinery of Har-Peled and Sharir HS-11 (and the follow-up work in SZ-12) for points and halfspaces in d-space for d 3.