Homology groups of the curvature sets of S1

Abstract

For n ≥ 2, the n-th curvature set of a metric space X is the set consisting of all n-by-n distance matrices of n points sampled from X. Curvature sets can be regarded as a geometric analogue of configuration spaces. In this paper we carry out a geometric and topological study of the curvature sets of the unit circle S1 equipped with the geodesic metric. Via an inductive argument we compute the homology groups of all curvature sets of S1. We also construct an abstract simplicial complex, called the n-th State Complex, whose geometric realization is homeomorphic to the n-th Curvature Set of S1.