2019
DOI: 10.1613/jair.1.11291
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Fair Allocation of Indivisible Goods to Asymmetric Agents

Abstract: We study fair allocation of indivisible goods to agents with unequal entitlements. Fair allocation has been the subject of many studies in both divisible and indivisible settings. Our emphasis is on the case where the goods are indivisible and agents have unequal entitlements. This problem is a generalization of the work by Procaccia and Wang [20] wherein the agents are assumed to be symmetric with respect to their entitlements. Although Procaccia and Wang show an almost fair (constant approximation) allocatio… Show more

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Cited by 73 publications
(67 citation statements)
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“…Different to the case of symmetric agents, we first prove that even with only two agents, no algorithm can simultaneously guarantee each agent's value to be higher than 4 3 of her weighted maxmin share. Moreover, we show that many greedy algorithms widely used in the literature, including [Farhadi et al, 2017] and [Aziz et al, 2017], may have arbitrarily bad performance. Then we design a polynomial-time algorithm which provides a 4-approximation to the minimal relaxation of WMMS value (OWMMS) under which a WMMS allocation exists.…”
Section: Contributionsmentioning
confidence: 85%
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“…Different to the case of symmetric agents, we first prove that even with only two agents, no algorithm can simultaneously guarantee each agent's value to be higher than 4 3 of her weighted maxmin share. Moreover, we show that many greedy algorithms widely used in the literature, including [Farhadi et al, 2017] and [Aziz et al, 2017], may have arbitrarily bad performance. Then we design a polynomial-time algorithm which provides a 4-approximation to the minimal relaxation of WMMS value (OWMMS) under which a WMMS allocation exists.…”
Section: Contributionsmentioning
confidence: 85%
“…When the instance I is clear from the context, we may use WMMS i for short. The definition above for WMMS fairness is exactly the same as that of WMMS as formalized by [Farhadi et al, 2017] for the case of goods except that the entitlement e i of an agent i is replaced by her share s i . As mentioned in the introduction, whereas a higher entitlement for goods is desirable for an agent, a higher share for chores is undesirable for the agent.…”
Section: Wmms Fairnessmentioning
confidence: 99%
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“…The idea is that every agent i ∈ N must get a bundle B i ⊆ V of goods for which she gets an utility that is not worse than the utility she could guarantee to herself if asked to divide the set of goods in |N | bundles and then to keep the worst one. In fact, there are experimental and theoretical evidences showing that maximin share allocations can be singled out in many relevant settings (Kurokawa, Procaccia, and Wang 2016;Bouveret and Lemaître 2016); moreover, while their existence cannot be guaranteed in general (Procaccia and Wang 2014), allocations that "nearly satisfy" the maximin share criterion always exist and can be computed efficiently (Procaccia and Wang 2014;Amanatidis et al 2017; Barman and Krishna Murthy 2017;Ghodsi et al 2018;Nguyen, Nguyen, and Rothe 2017;Farhadi et al 2019).…”
Section: Introductionmentioning
confidence: 99%
“…The situation of agents with different entitlements has been studied also for allocation of indivisible items[1,9,17].…”
mentioning
confidence: 99%