Contiguous Cake Cutting: Hardness Results and Approximation Algorithms

Goldberg, Paul W.; Hollender, Alexandros; Suksompong, Warut

doi:10.1613/jair.1.12222

Cited by 13 publications

(11 citation statements)

References 45 publications

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“…In order to ensure that no agent receives a collection of tiny pieces, it is often assumed that each agent must be allocated a connected piece of the cake [2,4,11,22,23,30,37,[53][54][55]. Indeed, when we divide resources such as time or space, nonconnected pieces (e.g., disconnected time intervals or land plots) may be hard to utilize, or even entirely useless.…”

Section: Related Workmentioning

confidence: 99%

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Mind the gap: Cake cutting with separation

Elkind

Segal-Halevi

Suksompong

2022

Artificial Intelligence

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Section: Related Workmentioning

confidence: 99%

“…In light of Corollary 5.8 and Theorem 5.9, it would be interesting to develop approximation algorithms that compute allocations with low envy-this direction has been recently pursued in cake cutting without separation [2,37].…”

Section: Computationmentioning

confidence: 99%

Mind the gap: Cake cutting with separation

Elkind

Segal-Halevi

Suksompong

2022

Artificial Intelligence

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“…These problems remain NP-hard if we replace envyfreeness by ε-envy-freeness for any sufficiently small constant ε. This list is not exhaustive: additional results of the same flavor can be found in the full proof (Goldberg, Hollender, and Suksompong 2019). 6 The following proof sketch conveys the main ideas behind these results.…”

Section: Hardness For Cake-cutting Variantsmentioning

confidence: 99%

“…We leave the proof of the Claim to the full version of this paper (Goldberg, Hollender, and Suksompong 2019).…”

Section: Hardness For Indivisible Itemsmentioning

confidence: 99%

“…We show that this is the case for proportionality, provided that we drop the requirement that all agents value the same number of items. Note that if each agent values a contiguous block of items and all agents value the same number of items, deciding whether a proportional allocation exists can in fact be done in polynomial time; see the details in the full version of this paper (Goldberg, Hollender, and Suksompong 2019). Theorem 5.2.…”

Section: Hardness For Indivisible Itemsmentioning

confidence: 99%

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Contiguous Cake Cutting: Hardness Results and Approximation Algorithms

Goldberg

Hollender

Suksompong

2020

AAAI

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We study the fair allocation of a cake, which serves as a metaphor for a divisible resource, under the requirement that each agent should receive a contiguous piece of the cake. While it is known that no finite envy-free algorithm exists in this setting, we exhibit efficient algorithms that produce allocations with low envy among the agents. We then establish NP-hardness results for various decision problems on the existence of envy-free allocations, such as when we fix the ordering of the agents or constrain the positions of certain cuts. In addition, we consider a discretized setting where indivisible items lie on a line and show a number of hardness results strengthening those from prior work.

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Fair cake-cutting algorithms with real land-value data

Shtechman

Gonen

Segal-Halevi

2021

Auton Agent Multi-Agent Syst

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Fair division of land is an important practical problem that is commonly handled either by hiring assessors or by selling and dividing the proceeds. A third way to divide land fairly is via algorithms for fair cake-cutting. Such un-intermediated methods are not only cheaper than an assessor but also theoretically fairer since they guarantee each agent a fair share according to his/her value function. However, the current theory of fair cake-cutting is not yet ready to optimally share a plot of land, and such algorithms are seldom used in practical land division. We attempt to narrow the gap between theory and practice by presenting several heuristic adaptations of famous algorithms for one-dimensional cake-cutting to two-dimensional land-division. The heuristics are evaluated using extensive simulations on real land-value data maps from three different data sets and a fourth (control) map of random values. The simulations compare the performance of cake-cutting algorithms to sale and assessor division in various performance metrics, such as utilitarian welfare, egalitarian welfare, Nash social welfare, envy, and geometric shape. The cake-cutting algorithms perform better in most metrics. However, their performance is greatly influenced by technical implementation details and heuristics that are often overlooked by theorists. We also propose a new protocol for practical cake-cutting using a dynamic programming approach and discuss its run-time complexity versus performance trade-off. Our new protocol performs better than the examined classic cake-cutting algorithms on most metrics. Experiments to assess the amount that a strategic agent can gain from reporting false preferences are also presented. The results show that the problem of strategic manipulation is much less severe than the worst-case predicted by theory.

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Contiguous Cake Cutting: Hardness Results and Approximation Algorithms

Cited by 13 publications

References 45 publications

Mind the gap: Cake cutting with separation

Mind the gap: Cake cutting with separation

Contiguous Cake Cutting: Hardness Results and Approximation Algorithms

Fair cake-cutting algorithms with real land-value data

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