Metric Geometry of Spaces of Persistence Diagrams

Abstract

Persistence diagrams are objects that play a central role in topological data analysis. In the present article, we investigate the local and global geometric properties of spaces of persistence diagrams. In order to do this, we construct a family of functors Dp, 1≤ p ≤∞, that assign, to each metric pair (X,A), a pointed metric space Dp(X,A). Moreover, we show that D∞ is sequentially continuous with respect to the Gromov-Hausdorff convergence of metric pairs, and we prove that Dp preserves several useful metric properties, such as completeness and separability, for p ∈ [1,∞), and geodesicity and non-negative curvature in the sense of Alexandrov, for p=2. For the latter case, we describe the metric of the space of directions at the empty diagram. We also show that the Fr\'echet mean set of a Borel probability measure on Dp(X,A), 1≤ p ≤∞, with finite second moment and compact support is non-empty. As an application of our geometric framework, we prove that the space of Euclidean persistence diagrams, Dp(R2n,n), 1≤ n and 1≤ p<∞, has infinite covering, Hausdorff, asymptotic, Assouad, and Assouad-Nagata dimensions.