Fractal Dimension and the Persistent Homology of Random Geometric Complexes

Abstract

We prove that the fractal dimension of a metric space equipped with an Ahlfors regular measure can be recovered from the persistent homology of random samples. Our main result is that if x1,…, xn are i.i.d. samples from a d-Ahlfors regular measure on a metric space, and E0α(x1,…,xn) denotes the α-weight of the minimum spanning tree on x1,…,xn: \[Eα0(x1,…,xn)=Σe∈ T(x1,…,xn) |e|α\,,\] then there exist constants 0<C1≤ C2 so that \[C1≤ n-d-αd E0α(x1,…,xn)≤ C2\,\] with high probability as n→ ∞. In particular, \[(E0α(x1,…,xn))/(n) (d-α)/d\,.\] This is a generalization of a result of Steele (1988) from the non-singular case to the fractal setting. Our result is best possible, in the sense that there exist Ahlfors regular measures for which the limit n→∞ n-d-αd E0α(x1,…,xn) does not exist with high probability. We also prove analogous results for weighted sums defined in terms of higher dimensional persistent homology.