On Vietoris-Rips complexes of ellipses

Abstract

For X a metric space and r>0 a scale parameter, the Vietoris-Rips complex VR<(X;r) (resp. VR≤(X;r)) has X as its vertex set, and a finite subset σ⊂eq X as a simplex whenever the diameter of σ is less than r (resp. at most r). Though Vietoris-Rips complexes have been studied at small choices of scale by Hausmann and Latschev, they are not well-understood at larger scale parameters. In this paper we investigate the homotopy types of Vietoris-Rips complexes of ellipses Y=\(x,y)∈ R2~|~(x/a)2+y2=1\ of small eccentricity, meaning 1<a2. Indeed, we show there are constants r1 < r2 such that for all r1 < r< r2, we have VR<(X;r) S2 and VR≤(X;r) 5 S2, though only one of the two-spheres in VR≤(X;r) is persistent. Furthermore, we show that for any scale parameter r1 < r < r2, there are arbitrarily dense subsets of the ellipse such that the Vietoris-Rips complex of the subset is not homotopy equivalent to the Vietoris-Rips complex of the entire ellipse. As our main tool we link these homotopy types to the structure of infinite cyclic graphs.