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Title: Ordinal Maximin Share Approximation for Goods (Extended Abstract)
In fair division of indivisible goods, l-out-of-d maximin share (MMS) is the value that an agent can guarantee by partitioning the goods into d bundles and choosing the l least preferred bundles. Most existing works aim to guarantee to all agents a constant fraction of their 1-out-of-n MMS. But this guarantee is sensitive to small perturbation in agents' cardinal valuations. We consider a more robust approximation notion, which depends only on the agents' ordinal rankings of bundles. We prove the existence of l-out-of-floor((l+1/2)n) MMS allocations of goods for any integer l greater than or equal to 1, and present a polynomial-time algorithm that finds a 1-out-of-ceiling(3n/2) MMS allocation when l = 1. We further develop an algorithm that provides a weaker ordinal approximation to MMS for any l > 1.  more » « less
Award ID(s):
2144413 2052488 2107173 1850076
PAR ID:
10443107
Author(s) / Creator(s):
; ;
Date Published:
Journal Name:
Proceedings of the Thirty-Second International Joint Conference on Artificial Intelligence
Page Range / eLocation ID:
6894 to 6899
Format(s):
Medium: X
Sponsoring Org:
National Science Foundation
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