English

Counterexamples to EFX for Submodular and Subadditive Valuations

Computer Science and Game Theory 2026-05-08 v1 Theoretical Economics

Abstract

The existence of EFX allocations is a fundamental question in fair division. In this paper, we construct a three-agent, eight-good instance with monotone subadditive valuations such that no allocation satisfies α\alpha-EFX for any α>1260.89\alpha > \frac{1}{\sqrt[6]{2}} \approx 0.89. We also provide a closely related three-agent, eight-good instance with submodular (in fact weighted coverage) valuations for which no EFX allocation exists. A key feature of our construction is its symmetry: the agents' valuations are identical up to a relabeling of the goods. Thus, EFX can fail even when agents differ only in how the goods are labeled. This symmetry makes the counterexamples compact and human-verifiable, yielding simple combinatorial obstructions to the existence of EFX.

Cite

@article{arxiv.2605.06451,
  title  = {Counterexamples to EFX for Submodular and Subadditive Valuations},
  author = {Simon Mackenzie and Mashbat Suzuki},
  journal= {arXiv preprint arXiv:2605.06451},
  year   = {2026}
}
R2 v1 2026-07-01T12:55:23.073Z