The connectivity of Vietoris-Rips complexes of spheres
Abstract
We survey what is known and unknown about Vietoris-Rips complexes and thickenings of spheres. Afterwards, we show how to control the homotopy connectivity of Vietoris-Rips complexes of spheres in terms of coverings of spheres and projective spaces. Let Sn be the n-sphere with the geodesic metric, and of diameter π, and let δ > 0. Suppose that the first nontrivial homotopy group of the Vietoris-Rips complex VR(Sn;π-δ) of the n-sphere at scale π-δ occurs in dimension k, i.e., suppose that the connectivity is k-1. Then covSn(2k+2) δ < 2· covRPn(k). In other words, there exist 2k+2 balls of radius δ that cover Sn, and no set of k balls of radius δ2 cover the projective space RPn. As a corollary, the homotopy type of VR(Sn;r) changes infinitely many times as the scale r increases.
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