Compatible k-Relaxations of Fairness and Non-Wastefulness Under Hereditary Constraints

Abstract

We study two-sided matching markets under hereditary constraints, which extend beyond simple capacity limits and arise in applications such as diversity requirements and refugee resettlement. In these settings, fairness and non-wastefulness are often incompatible, and existing approaches typically address this tension by prioritizing one property at the expense of the other. We take a different approach by relaxing both properties simultaneously in a controlled and symmetric manner. We introduce two notions indexed by an integer k: envy-received up to k peers (ER-k) and non-wastefulness up to k objections (NW-k). Our main theoretical result shows that ER-k and NW-k are always compatible under hereditary constraints for any fixed k. We provide two equivalent polynomial-time algorithms to compute such matchings: a k-admissible cutoff algorithm and a k-admissible college-proposing deferred acceptance mechanism. Finally, experimental results demonstrate that even small relaxations achieve a favorable balance between fairness and non-wastefulness.