Improved Approximation Guarantees for Groupwise Maximin Share Fairness

Abstract

We study the problem of fairly allocating a set of indivisible goods to a set of n agents with additive valuation functions. We focus on the very demanding notion of groupwise maximin share fairness (GMMS), which requires that each agent i receives value comparable to their maximin share, where the latter is computed with respect to any subset of agents that contains i. We show that it is possible to compute (ϕ-1)-approximate GMMS allocations in polynomial time, where ϕ≈ 1.618 is the golden ratio). This improves on the previously known guarantee of 4/7 of Chaudhury et al. [SICOMP; 2021] and Amanatidis et al. [TCS; 2020]. We propose a simple algorithm that maintains the same main properties as the Draft-and-Eliminate algorithm of Amanatidis et al. [TCS, 2020] and we improve on the approximation guarantee analysis by carefully bounding the relevant value within any subinstance induced by the restriction of our allocation to a subset of agents. Our analysis is asymptotically tight for algorithms that share these properties and has the additional benefit of giving improved guarantees for restricted settings; in particular, when the agents agree on the top n goods or when the number of agents is small. To illustrate the challenges of going beyond the guarantees of our algorithm, we also present a variant with an improved approximation of (10-1)/3 ≈ 0.72 for the case of three agents. To achieve this improvement we partially characterize the maximin share guarantees of short picking sequences for a small number of goods.