Homotopy Reconstruction via the Cech Complex and the Vietoris-Rips Complex

Abstract

We derive conditions under which the reconstruction of a target space is topologically correct via the Cech complex or the Vietoris-Rips complex obtained from possibly noisy point cloud data. We provide two novel theoretical results. First, we describe sufficient conditions under which any non-empty intersection of finitely many Euclidean balls intersected with a positive reach set is contractible, so that the Nerve theorem applies for the restricted Cech complex. Second, we demonstrate the homotopy equivalence of a positive μ-reach set and its offsets. Applying these results to the restricted Cech complex and using the interleaving relations with the Cech complex (or the Vietoris-Rips complex), we formulate conditions guaranteeing that the target space is homotopy equivalent to the Cech complex (or the Vietoris-Rips complex), in terms of the μ-reach. Our results sharpen existing results.