Vietorisx2013Rips Complexes of Metric Spaces Near a Metric Graph

Abstract

For a sufficiently small scale β>0, the Vietorisx2013Rips complex Rβ(S) of a metric space S with a small Gromovx2013Hausdorff distance to a closed Riemannian manifold M has been already known to recover M up to homotopy type. While the qualitative result is remarkable and generalizes naturally to the recovery of spaces beyond Riemannian manifoldsx2014such as geodesic metric spaces with a positive convexity radiusx2014the generality comes at a cost. Although the scale parameter β is known to depend only on the geometric properties of the geodesic space, how to quantitatively choose such a β for a given geodesic space is still elusive. In this work, we focus on the topological recovery of a special type of geodesic space, called a metric graph. For an abstract metric graph G and a (sample) metric space S with a small Gromovx2013Hausdorff distance to it, we provide a description of β based on the convexity radius of G in order for Rβ(S) to be homotopy equivalent to G. Our investigation also extends to the study of the Vietorisx2013Rips complexes of a Euclidean subset S⊂Rd with a small Hausdorff distance to an embedded metric graph G⊂Rd. From the pairwise Euclidean distances of points of S, we introduce a family (parametrized by ) of path-based Vietorisx2013Rips complexes Rβ(S) for a scale β>0. Based on the convexity radius and distortion of the embedding of G, we show how to choose a suitable parameter and a scale β such that Rβ(S) is homotopy equivalent to G.