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Fair Multi-Cake Cutting
[article]
2020
arXiv
pre-print
In the classic problem of fair cake-cutting, a single interval ("cake") has to be divided among n agents with different value measures, giving each agent a single sub-interval with a value of at least 1/n of the total. This paper studies a generalization in which the cake is made of m disjoint intervals, and each agent should get at most k sub-intervals. The paper presents a polynomial-time algorithm that guarantees to each agent at least min(1/n, k/(m+n-1)) of the total value, and shows that
arXiv:1812.08150v6
fatcat:h4ppbh6d7zetlia3bo4cpx357i