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arxiv: 2308.14545 · v2 · pith:FLRBVF2Rnew · submitted 2023-08-28 · 💻 cs.GT

Randomized and Deterministic Maximin-share Approximations for Fractionally Subadditive Valuations

classification 💻 cs.GT
keywords valuationsallocationdeterministicmaximin-sharerandomizedfractionallyguaranteesubadditive
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We consider the problem of guaranteeing maximin-share (MMS) when allocating a set of indivisible items to a set of agents with fractionally subadditive (XOS) valuations. For XOS valuations, it has been previously shown that for some instances no allocation can guarantee a fraction better than $1/2$ of maximin-share to all the agents. Also, a deterministic allocation exists that guarantees $0.219225$ of the maximin-share of each agent. Our results involve both deterministic and randomized allocations. On the deterministic side, we improve the best approximation guarantee for fractionally subadditive valuations to $3/13 = 0.230769$. We develop new ideas on allocating large items in our allocation algorithm which might be of independent interest. Furthermore, we investigate randomized algorithms and the Best-of-both-worlds fairness guarantees. We propose a randomized allocation that is $1/4$-MMS ex-ante and $1/8$-MMS ex-post for XOS valuations. Moreover, we prove an upper bound of $3/4$ on the ex-ante guarantee for this class of valuations.

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Cited by 1 Pith paper

Reviewed papers in the Pith corpus that reference this work. Sorted by Pith novelty score.

  1. Exact and approximate maximin share allocations in multi-graphs

    cs.GT 2025-06 unverdicted novelty 5.0

    Presents positive and negative results on exact and approximate MMS and PMMS allocations for additive, XOS, and subadditive valuations in the graphical multi-graph model.