Groupwise Maximin Fair Allocation of Indivisible Goods

Authors

  • Siddharth Barman Indian Institute of Science
  • Arpita Biswas Indian Institute of Science
  • Sanath Krishnamurthy Chennai Mathematical Institute
  • Yadati Narahari Indian Institute of Science

DOI:

https://doi.org/10.1609/aaai.v32i1.11463

Keywords:

Fair division, Maximin shares, Envy free allocations

Abstract

We study the problem of allocating indivisible goods among n agents in a fair manner. For this problem, maximin share (MMS) is a well-studied solution concept which provides a fairness threshold. Specifically, maximin share is defined as the minimum utility that an agent can guarantee for herself when asked to partition the set of goods into n bundles such that the remaining (n-1) agents pick their bundles adversarially. An allocation is deemed to be fair if every agent gets a bundle whose valuation is at least her maximin share. Even though maximin shares provide a natural benchmark for fairness, it has its own drawbacks and, in particular, it is not sufficient to rule out unsatisfactory allocations. Motivated by these considerations, in this work we define a stronger notion of fairness, called groupwise maximin share guarantee (GMMS). In GMMS, we require that the maximin share guarantee is achieved not just with respect to the grand bundle, but also among all the subgroups of agents. Hence, this solution concept strengthens MMS and provides an ex-post fairness guarantee. We show that in specific settings, GMMS allocations always exist. We also establish the existence of approximate GMMS allocations under additive valuations, and develop a polynomial-time algorithm to find such allocations. Moreover, we establish a scale of fairness wherein we show that GMMS implies approximate envy freeness. Finally, we empirically demonstrate the existence of GMMS allocations in a large set of randomly generated instances. For the same set of instances, we additionally show that our algorithm achieves an approximation factor better than the established, worst-case bound.

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Published

2018-04-25

How to Cite

Barman, S., Biswas, A., Krishnamurthy, S., & Narahari, Y. (2018). Groupwise Maximin Fair Allocation of Indivisible Goods. Proceedings of the AAAI Conference on Artificial Intelligence, 32(1). https://doi.org/10.1609/aaai.v32i1.11463

Issue

Section

AAAI Technical Track: Game Theory and Economic Paradigms