Convergence of persistence diagram in the sparse regime

Abstract

The objective of this paper is to examine the asymptotic behavior of persistence diagrams associated with Cech filtration. A persistence diagram is a graphical descriptor of a topological and algebraic structure of geometric objects. We consider Cech filtration over a scaled random sample rn-1 Xn = \ rn-1X1,…, rn-1Xn \, such that rn 0 as n∞. We treat persistence diagrams as a point process and establish their limit theorems in the sparse regime: nrnd0, n∞. In this setting, we show that the asymptotics of the kth persistence diagram depends on the limit value of the sequence nk+2rnd(k+1). If nk+2rnd(k+1) ∞, the scaled persistence diagram converges to a deterministic Radon measure almost surely in the vague metric. If rn decays faster so that nk+2rnd(k+1) c∈ (0,∞), the persistence diagram weakly converges to a limiting point process without normalization. Finally, if nk+2rnd(k+1) 0, the sequence of probability distributions of a persistence diagram should be normalized, and the resulting convergence will be treated in terms of the M0-topology.