An Improved Bound for the Beck-Fiala Conjecture

Abstract

In 1981, Beck and Fiala [Discrete Appl. Math, 1981] conjectured that given a set system A ∈ \0,1\m × n with degree at most k (i.e., each column of A has at most k non-zeros), its combinatorial discrepancy disc(A) := x ∈ \ 1\n \|Ax\|∞ is at most O(k). Previously, the best-known bounds for this conjecture were either O(k), first established by Beck and Fiala [Discrete Appl. Math, 1981], or O(k n), first proved by Banaszczyk [Random Struct. Algor., 1998]. We give an algorithmic proof of an improved bound of O(k n) whenever k ≥ 5 n, thus matching the Beck-Fiala conjecture up to O( n) for almost the full regime of k.