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Envy-free Relaxations for Goods, Chores, and Mixed Items

Author

Listed:
  • Krist'of B'erczi
  • Erika R. B'erczi-Kov'acs
  • Endre Boros
  • Fekadu Tolessa Gedefa
  • Naoyuki Kamiyama
  • Telikepalli Kavitha
  • Yusuke Kobayashi
  • Kazuhisa Makino

Abstract

In fair division problems, we are given a set $S$ of $m$ items and a set $N$ of $n$ agents with individual preferences, and the goal is to find an allocation of items among agents so that each agent finds the allocation fair. There are several established fairness concepts and envy-freeness is one of the most extensively studied ones. However envy-free allocations do not always exist when items are indivisible and this has motivated relaxations of envy-freeness: envy-freeness up to one item (EF1) and envy-freeness up to any item (EFX) are two well-studied relaxations. We consider the problem of finding EF1 and EFX allocations for utility functions that are not necessarily monotone, and propose four possible extensions of different strength to this setting. In particular, we present a polynomial-time algorithm for finding an EF1 allocation for two agents with arbitrary utility functions. An example is given showing that EFX allocations need not exist for two agents with non-monotone, non-additive, identical utility functions. However, when all agents have monotone (not necessarily additive) identical utility functions, we prove that an EFX allocation of chores always exists. As a step toward understanding the general case, we discuss two subclasses of utility functions: Boolean utilities that are $\{0,+1\}$-valued functions, and negative Boolean utilities that are $\{0,-1\}$-valued functions. For the latter, we give a polynomial time algorithm that finds an EFX allocation when the utility functions are identical.

Suggested Citation

  • Krist'of B'erczi & Erika R. B'erczi-Kov'acs & Endre Boros & Fekadu Tolessa Gedefa & Naoyuki Kamiyama & Telikepalli Kavitha & Yusuke Kobayashi & Kazuhisa Makino, 2020. "Envy-free Relaxations for Goods, Chores, and Mixed Items," Papers 2006.04428, arXiv.org.
    • Handle: RePEc:arx:papers:2006.04428
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    References listed on IDEAS

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    1. Steven J. Brams & D. Marc Kilgour & Christian Klamler, 2017. "Maximin Envy-Free Division of Indivisible Items," Group Decision and Negotiation, Springer, vol. 26(1), pages 115-131, January.
    2. Berliant, Marcus & Thomson, William & Dunz, Karl, 1992. "On the fair division of a heterogeneous commodity," Journal of Mathematical Economics, Elsevier, vol. 21(3), pages 201-216.
    3. Anna Bogomolnaia & Hervé Moulin & Fedor Sandomirskiy & Elena Yanovskaia, 2019. "Dividing bads under additive utilities," Social Choice and Welfare, Springer;The Society for Social Choice and Welfare, vol. 52(3), pages 395-417, March.
    4. Eric Budish, 2011. "The Combinatorial Assignment Problem: Approximate Competitive Equilibrium from Equal Incomes," Journal of Political Economy, University of Chicago Press, vol. 119(6), pages 1061-1103.
    5. Ioannis Caragiannis & David Kurokawa & Herve Moulin & Ariel D. Procaccia & Nisarg Shah & Junxing Wang, 2016. "The Unreasonable Fairness of Maximum Nash Welfare," Working Papers 2016_08, Business School - Economics, University of Glasgow.
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    Cited by:

    1. Hadi Hosseini & Sujoy Sikdar & Rohit Vaish & Lirong Xia, 2022. "Fairly Dividing Mixtures of Goods and Chores under Lexicographic Preferences," Papers 2203.07279, arXiv.org.

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