Multi-Dimensional Stable Roommates in 2-Dimensional Euclidean Space

Abstract

We investigate the Euclidean d-Dimensional Stable Roommates problem, which asks whether a given set~V of d · n points from the 2-dimensional Euclidean space can be partitioned into n disjoint (unordered) subsets =\V1,…,Vn\ with |Vi|=d for each Vi∈ such that is stable. Here, stability means that no point subset W⊂eq V is blocking and W is said to be blocking if |W|= d such that Σw'∈ Wδ(w,w') < Σv∈ (w)δ(w,v) holds for each point w∈ W, where (w) denotes the subset Vi∈ which contains w and δ(a,b) denotes the Euclidean distance between points a and b. Complementing the existing known polynomial-time result for d=2, we show that such polynomial-time algorithms cannot exist for any fixed number d 3 unless P=NP. Our result for d=3 answers a decade-long open question in the theory of Stable Matching and Hedonic Games [17, 1, 9, 25, 20].