Metric Dimension and Resolvability of Jaccard Spaces
Abstract
A subset of points in a metric space is said to resolve it if each point in the space is uniquely characterized by its distance to each point in the subset. In particular, resolving sets can be used to represent points in abstract metric spaces as Euclidean vectors. Importantly, due to the triangle inequality, points close by in the space are represented as vectors with similar coordinates, which may find applications in classification problems of symbolic objects under suitably chosen metrics. In this manuscript, we address the resolvability of Jaccard spaces, i.e., metric spaces of the form (2X,Jac), where 2X is the power set of a finite set X, and Jac is the Jaccard distance between subsets of X. Specifically, for different a,b∈ 2X, Jac(a,b)=|a b|/|a b|, where |·| denotes size (i.e., cardinality) and denotes the symmetric difference of sets. We combine probabilistic and linear algebra arguments to construct highly likely but nearly optimal (i.e., of minimal size) resolving sets of (2X,Jac). In particular, we show that the metric dimension of (2X,Jac), i.e., the minimum size of a resolving set of this space, is (|X|/|X|). In addition, we show that a much smaller subset of 2X suffices to resolve, with high probability, all different pairs of subsets of X of cardinality at most |X|/|X|, up to a factor.
Turn this paper into a full lesson
ArcXiv compiles a staged curriculum from this paper: 8-12 lessons across beginner → advanced, synthesised section guides, visuals, flashcards, a quiz, exercises, and on-demand deep dives per section. Grounded in the abstract, never invented.