Discrepancy Beyond Additive Functions with Applications to Fair Division

Abstract

We consider a setting where we have a ground set M together with real-valued set functions f1, …, fn, and the goal is to partition M into two sets S1,S2 such that |fi(S1) - fi(S2)| is small for every i. Many results in discrepancy theory can be stated in this form with the functions fi being additive. In this work, we initiate the study of the unstructured case where fi is not assumed to be additive. We show that even without the additivity assumption, the upper bound remains at most O(n n). Our result has implications on the fair allocation of indivisible goods. In particular, we show that a consensus halving up to O(n n) goods always exists for n agents with monotone utilities. Previously, only an O(n) bound was known for this setting.