A Note on EFX Inapproximability for Chores

Abstract

We study the approximability of EFX allocations for indivisible chores under complement-free cost functions. The non-existence of exact EFX allocations for general monotone functions for chores is known from CS24, and a result of akrami2026 transfers such comparison-based non-existence results to monotone submodular, and hence subadditive, functions. We strengthen this picture by giving explicit constant-factor inapproximability results for submodular and subadditive functions. Our main construction is a three-agent, six-chore instance with monotone subadditive cost functions for which no α-EFX allocation exists for any 1 α<21/3≈ 1.26, thus narrowing the gap with the known upper bound of 2. The construction is obtained by refining the original counterexample of CS24 and using the approach of mackenzie2026. We also give a weighted-coverage realization of the ordinal profile, yielding an instance in which no α-EFX allocation exists for any 1 α<20/19 under submodular costs. Thus, even within well-studied complement-free classes, EFX for chores admits nontrivial constant lower bounds on approximability.