Ultrametric spaces and clouds

Abstract

In ``Characterization, stability and convergence of hierarchical clustering methods'' by G. E. Carlsson, F. Memoli, the natural way to construct an ultrametric space from a given metric space was presented. It was shown that the corresponding map U is 1-Lipschitz for every pair of bounded metric spaces, with respect to the Gromov-Hausdorff distance. We make a simple observation that U is 1-Lipschitz for pairs of all, not necessarily bounded, metric spaces. We then study the properties of the mapping U. We show that, for a given dotted connected metric space A, the mapping X X× A from the proper class of all bounded ultrametric spaces (X× A is endowed with the Manhattan metric) preserves the Gromov-Hausdorff distance. Moreover, the mapping U is inverse to . By a dotted connected metric space, we mean a metric space in which for an arbitrary > 0 and every two points p,\,q, there exist points x0 = p,\,x1,\,…,\,xn = q such that 0 j n-1|xjxj+1| . At the end of the paper, we prove that each class (proper or not) consisting of unbounded metric spaces on finite Gromov-Hausdorff distances from each other cannot contain an ultrametric space and a dotted connected space simultaneously.