Maximally Persistent Cycles in Random Geometric Complexes

Abstract

We initiate the study of persistent homology of random geometric simplicial complexes. Our main interest is in maximally persistent cycles of degree-k in persistent homology, for a either the or the Vietoris--Rips filtration built on a uniform Poisson process of intensity n in the unit cube [0,1]d. This is a natural way of measuring the largest "k-dimensional hole" in a random point set. This problem is in the intersection of geometric probability and algebraic topology, and is naturally motivated by a probabilistic view of topological inference. We show that for all d 2 and 1 k d-1 the maximally persistent cycle has (multiplicative) persistence of order (( n n )1/k ), with high probability, characterizing its rate of growth as n ∞. The implied constants depend on k, d, and on whether we consider the Vietoris--Rips or filtration.