Anti-Vietoris--Rips metric thickenings and Borsuk graphs

Abstract

For X a metric space and r 0, the anti-Vietoris-Rips metric thickening AVRm(X;r) is the space of all finitely supported probability measures on X whose support has spread at least r, equipped with an optimal transport topology. We study the anti-Vietoris-Rips metric thickenings of spheres. We have a homeomorphism AVRm(Sn;r) Sn for r > π, a homotopy equivalence AVRm(Sn;r) RPn for 2π3 < r π, and contractibility AVRm(Sn;r) * for r=0. For an n-dimensional compact Riemannian manifold M, we show that the covering dimension of AVRm(M;r) is at most (n+1)p-1, where p is the packing number of M at scale r. Hence the k-dimensional Cech cohomology of AVRm(M;r) vanishes in all dimensions k≥ (n+1)p. We prove more about the topology of AVRm(Sn;2π3), which has vanishing cohomology in dimensions 2n+2 and higher. We explore connections to chromatic numbers of Borsuk graphs, and in particular we prove that for k>n, no graph homomorphism Bor(Sk;r) Bor(Sn;α) exists when α > 2π3.

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