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arxiv: 2406.05553 · v3 · pith:F47SECXYnew · submitted 2024-06-08 · 🧮 math.PR · math.AT

Universality in Random Persistent Homology and Scale-Invariant Functionals

classification 🧮 math.PR math.AT
keywords distributionpointrandomuniversalityfunctionalsgeometricindependentlimiting
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In this paper, we prove a universality result for the limiting distribution of persistence diagrams arising from geometric filtrations over random point processes. Specifically, we consider the distribution of the ratio of persistence values (death/birth), and show that for fixed dimension, homological degree and filtration type (Cech or Vietoris-Rips), the limiting distribution is independent of the underlying point process distribution, i.e., universal. In proving this result, we present a novel general framework for universality in scale-invariant functionals on point processes. Finally, we also provide a number of new results related to Morse theory in random geometric complexes, which may be of an independent interest.

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Cited by 2 Pith papers

Reviewed papers in the Pith corpus that reference this work. Sorted by Pith novelty score.

  1. Persistence diagrams of random triangular matrices over finite fields

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    Explicit distribution for persistence diagrams of row spans in random lower triangular matrices over finite fields, plus LLN for lifetimes and Betti fluctuations.

  2. An Algebraic Introduction to Persistence

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    The paper surveys algebraic properties of poset representations and their stability under the interleaving distance in persistence theory.