Homotopy connectivity of Cech complexes of spheres

Abstract

Let Sn be the n-sphere with the geodesic metric and of diameter π. The intrinsic Cech complex of Sn at scale r is the nerve of all open balls of radius r in Sn. In this paper, we show how to control the homotopy connectivity of Cech complexes of spheres at each scale between 0 and π in terms of coverings of spheres. Our upper bound on the connectivity, which is sharp in the case n=1, comes from the chromatic numbers of Borsuk graphs of spheres. Our lower bound is obtained using the conicity (in the sense of Barmak) of Cech complexes of the sufficiently dense, finite subsets of Sn. Our bounds imply the new result that for n 1, the homotopy type of the Cech complex of Sn at scale r changes infinitely many times as r varies over (0,π); we conjecture only countably many times. Additionally, we lower bound the homological dimension of Cech complexes of finite subsets of Sn in terms of their packings.