Guaranteeing MMS for All but One Agent When Allocating Indivisible Chores

Abstract

We study the problem of allocating m indivisible chores to n agents with additive cost functions under the fairness notion of maximin share (MMS). In this work, we propose a notion called α-approximate all-but-one maximin share (α-AMMS) which is a stronger version of α-approximate MMS. An allocation is called α-AMMS if n-1 agents are guaranteed their MMS values and the remaining agent is guaranteed α-approximation of her MMS value. We show that there exist α-AMMS allocations, with α = 9/8 for three agents; α = 4/3 for four agents; and α = (n+1)2/4n for n≥ 5 agents.

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