Non-Additive Discrepancy: Coverage Functions in a Beck-Fiala Setting
Abstract
Recent concurrent work by Dupr\'{e} la Tour and Fujii and by Hollender, Manurangsi, Meka, and Suksompong [ITCS'26] introduced a generalization of classical discrepancy theory to non-additive functions, motivated by applications in fair division. As many classical techniques from discrepancy theory seem to fail in this setting, including linear algebraic methods like the Beck-Fiala Theorem [Discrete Appl. Math '81], it remains widely open whether comparable non-additive bounds can be achieved. Towards a better understanding of non-additive discrepancy, we study coverage functions in a sparse setting comparable to the classical Beck-Fiala Theorem. Our setting generalizes the additive Beck-Fiala setting, rank functions of partition matroids, and edge coverage in graphs. More precisely, assuming each of the items covers only elements across all functions, we prove a constructive discrepancy bound that is polynomial in , the number of colors , and .
Cite
@article{arxiv.2602.09948,
title = {Non-Additive Discrepancy: Coverage Functions in a Beck-Fiala Setting},
author = {Tatiana Rocha Avila and Lars Rohwedder and Leo Wennmann},
journal= {arXiv preprint arXiv:2602.09948},
year = {2026}
}