On the estimation of persistence intensity functions and linear representations of persistence diagrams

11 May 2023 (modified: 12 Dec 2023)Submitted to NeurIPS 2023EveryoneRevisionsBibTeX
Keywords: topological data analysis, persistence diagram, betti numbers, non-parametric density estimation, persistence surface
Abstract: Persistence diagrams are one of the most popular types of data summaries used in Topological Data Analysis. The prevailing statistical approach to analyzing persistence diagrams is concerned with filtering out topological noise. In this paper, we adopt a different viewpoint and aim at estimating the actual distribution of a random persistence diagram, which captures both topological signal and noise. To that effect, [CD19] has shown that, under general conditions, the expected value of a random persistence diagram is a measure admitting a Lebesgue density, called the persistence intensity function. In this paper, we are concerned with estimating the persistence intensity function and a novel, normalized version of it -- called the persistence density function. We present a class of kernel-based estimators based on an i.i.d. sample of persistence diagrams and derive estimation rates in the supremum norm. As a direct corollary, we obtain uniform consistency rates for estimating linear representations of persistence diagrams, including Betti numbers and persistence images. Interestingly, the persistence density function delivers stronger statistical guarantees.
Supplementary Material: pdf
Submission Number: 13827
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