Two's Company, Three's a Crowd: Consensus-Halving for a Constant Number of Agents

Deligkas, Argyrios; Filos-Ratsikas, Aris; Hollender, Alexandros

doi:10.1145/3465456.3467625

Cited by 7 publications

(7 citation statements)

References 46 publications

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“…We begin by showing PPA-hardness. By combining the PPA-hardness result of (Filos-Ratsikas et al 2020) with Lemma 7 we get the following.…”

Section: Hardness Of Approximate Sc-pizza-sharingmentioning

confidence: 89%

“…Since mass partitions lie in the intersection of topology, discrete geometry, and computer science there are several surveys on the topic; (Blagojević et al 2018;De Loera et al 2019;Matoušek 2008;Živaljević 2017) focus on the topological point of view, while (Agarwal, Erickson et al 1999;Edelsbrunner 2012;Kaneko and Kano 2003;Kano and Urrutia 2020;Matousek 2013) focus on computational aspects. Consensus halving (Simmons and Su 2003) is the mass partition problem that received the majority of attention in Economics and Computation so far (Deligkas, Filos-Ratsikas, and Hollender 2020;Filos-Ratsikas and Goldberg 2019;Filos-Ratsikas et al 2020, 2021.…”

Section: Computational Complexity Of Fair Division Problemsmentioning

confidence: 99%

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Pizza Sharing Is PPA-Hard

Deligkas

Fearnley

Melissourgos

2022

AAAI

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We study the computational complexity of computing solutions for the straight-cut and square-cut pizza sharing problems. We show that finding an approximate solution is PPA-hard for the straight-cut problem, and PPA-complete for the square-cut problem, while finding an exact solution for the square-cut problem is FIXP-hard and in BU. Our PPA-hardness results apply even when all mass distributions are unions of non-overlapping squares, and our FIXP-hardness result applies even when all mass distributions are unions of weighted squares and right-angled triangles. We also prove that decision variants of the square-cut problem are hard: the approximate problem is NP-complete, and the exact problem is ETR-complete.

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“…We begin by showing PPA-hardness. By combining the PPA-hardness result of (Filos-Ratsikas et al 2020) with Lemma 7 we get the following.…”

Section: Hardness Of Approximate Sc-pizza-sharingmentioning

confidence: 89%

Section: Computational Complexity Of Fair Division Problemsmentioning

confidence: 99%

Pizza Sharing Is PPA-Hard

Deligkas

Fearnley

Melissourgos

2022

AAAI

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“…But what is the complexity of the problem if we are not given the whole valuations upfront, but instead can only efficiently evaluate them? In [Deligkas et al, 2021b] it was proven that in this setting the problem is PPA-complete for 3 agents with non-additive valuations. It seems that proving hardness for the more standard additive valuation model would require radically new ideas.…”

Section: Discussionmentioning

confidence: 99%

“…In a recent work by Deligkas et al [2021b] the main question was "How does the complexity of consensus halving depend on the number of agents?". This paper's main result is a dichotomy between 2 and 3 agents when the valuations are monotone (but possibly non-additive).…”

Section: Further Related Workmentioning

confidence: 99%

Constant Inapproximability for PPA

Deligkas¹,

Fearnley²,

Hollender³

et al. 2022

Preprint

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In the ε-Consensus-Halving problem, we are given n probability measures v 1 , . . . , v n on the interval R = [0, 1], and the goal is to partition R into two parts R + and R − using at most n cuts, so thatThis fundamental fair division problem was the first natural problem shown to be complete for the class PPA, and all subsequent PPA-completeness results for other natural problems have been obtained by reducing from it.We show that ε-Consensus-Halving is PPA-complete even when the parameter ε is a constant. In fact, we prove that this holds for any constant ε < 1/5. As a result, we obtain constant inapproximability results for all known natural PPA-complete problems, including Necklace-Splitting, the Discrete-Ham-Sandwich problem, two variants of the pizza sharing problem, and for finding fair independent sets in cycles and paths.

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“…Like fair division in general, consensus 1/k-division and consensus halving have been studied by mathematicians and economists for several decades [Hobby and Rice, 1965;Alon, 1987;Simmons and Su, 2003], and attracted recent interest from computer scientists in light of new computational complexity results , 2020Deligkas et al, 2020Deligkas et al, , 2021Goldberg et al, 2020].…”

Section: Further Related Workmentioning

confidence: 99%

Almost Envy-Freeness for Groups: Improved Bounds via Discrepancy Theory

Manurangsi¹,

Suksompong²

2021

Preprint

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We study the allocation of indivisible goods among groups of agents using well-known fairness notions such as envy-freeness and proportionality. While these notions cannot always be satisfied, we provide several bounds on the optimal relaxations that can be guaranteed. For instance, our bounds imply that when the number of groups is constant and the n agents are divided into groups arbitrarily, there exists an allocation that is envy-free up to Θ( √ n) goods, and this bound is tight. Moreover, we show that while such an allocation can be found efficiently, it is NP-hard to compute an allocation that is envy-free up to o( √ n) goods even when a fully envy-free allocation exists. Our proofs make extensive use of tools from discrepancy theory.

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Two's Company, Three's a Crowd: Consensus-Halving for a Constant Number of Agents

Cited by 7 publications

References 46 publications

Pizza Sharing Is PPA-Hard

Pizza Sharing Is PPA-Hard

Constant Inapproximability for PPA

Almost Envy-Freeness for Groups: Improved Bounds via Discrepancy Theory

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