Affiliation:
1. Technion - Israel Institute of Technology, Israel
2. University of Bath, UK, and Technion - Israel Institute of Technology, Israel
Abstract
We consider fair allocation of indivisible items in a model with goods, chores, and copies, as a unified framework for studying: (1) the existence of EFX and other solution concepts for goods with copies; (2) the existence of EFX and other solution concepts for chores. We establish a tight relation between these issues via two conceptual contributions: First, a refinement of envy-based fairness notions that we term envy
without commons
(denoted EFX
WC
when applied to EFX). Second, a formal
duality theorem
relating the existence of a host of (refined) fair allocation concepts for copies to their existence for chores. We demonstrate the usefulness of our duality result by using it to characterize the existence of EFX for chores through the dual environment, as well as to prove EFX existence in the special case of leveled preferences over the chores. We further study the hierarchy among envy-freeness notions without commons and their α-MMS guarantees, showing, for example, that any EFX
WC
allocation guarantees at least
\(\frac{4}{11}\)
-MMS for goods with copies.
Funder
ISF-NSFC joint research program
Israel Science Foundation
Publisher
Association for Computing Machinery (ACM)
Subject
Computational Mathematics,Marketing,Economics and Econometrics,Statistics and Probability,Computer Science (miscellaneous)
Reference42 articles.
1. Two Algorithms for Additive and Fair Division of Mixed Manna
2. Comparing Approximate Relaxations of Envy-Freeness
3. Fair allocation of indivisible goods and chores;Aziz Haris;Autonomous Agents and Multi-Agent Systems,2021
4. Approximate and strategyproof maximin share allocation of chores with ordinal preferences;Aziz Haris;Mathematical Programming,2022
5. Algorithms for max-min share fair allocation of indivisible chores;Aziz Haris;Proceedings of the AAAI Conference on Artificial Intelligence,2017