Euclidean preferences in the plane under 1, 2 and ∞ norms

Abstract

We present various results about Euclidean preferences in the plane under 1, 2 and ∞ norms. When there are four candidates, we show that the maximal size (in terms of the number of pairwise distinct preferences) of Euclidean preference profiles in the plane under norm 1 or ∞ is 19. Whatever the number of candidates, we prove that at most four distinct candidates can be ranked in last position of a two-dimensional Euclidean preference profile under norm 1 or ∞, which generalizes the case of one-dimensional Euclidean preferences (for which it is well known that at most two candidates can be ranked last). We generalize this result to 2d (resp. 2d) for 1 (resp. ∞) for d-dimensional Euclidean preferences. We also establish that the maximal size of a two-dimensional Euclidean preference profile on m candidates under norm 1 is in (m4), i.e., the same order of magnitude as under norm 2. Finally, we provide a new proof that two-dimensional Euclidean preference profiles under norm 2 for four candidates can be characterized by three voter-maximal two-dimensional Euclidean profiles. This proof is a simpler alternative to that proposed by Kamiya et al. in Ranking patterns of unfolding models of codimension one, Advances in Applied Mathematics 47(2):379-400.