Popularity on the 3D-Euclidean Stable Roommates

Abstract

We study the 3D-Euclidean Multidimensional Stable Roommates problem, which asks whether a given set V of s· n agents with a location in 3-dimensional Euclidean space can be partitioned into n disjoint subsets π = \R1 ,… , Rn\ with |Ri| = s for each Ri ∈ π such that π is (strictly) popular, where s is the room size. A partitioning is popular if there does not exist another partitioning in which more agents are better off than worse off. Computing a popular partition in a stable roommates game is NP-hard, even if the preferences are strict. The preference of an agent solely depends on the distance to its roommates. An agent prefers to be in a room where the sum of the distances to its roommates is small. We show that determining the existence of a strictly popular outcome in a 3D-Euclidean Multidimensional Stable Roommates game with room size 3 is co-NP-hard.

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