A concentration inequality for inhomogeneous Neyman–Scott point processes

Jean-François Coeurjolly; Patricia Reynaud-Bouret

doi:10.1016/j.spl.2018.12.003

Article Dans Une Revue Statistics and Probability Letters Année : 2019

A concentration inequality for inhomogeneous Neyman–Scott point processes

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Jean-François Coeurjolly

Fonction : Auteur
PersonId : 748479
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ORCID : 0000-0002-1861-8269
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Statistique pour le Vivant et l’Homme

Patricia Reynaud-Bouret

Fonction : Auteur

Laboratoire Jean Alexandre Dieudonné

Résumé

In this note, we prove some non-asymptotic concentration inequalities for functionals, called innovations, of inhomogeneous Neyman–Scott point processes, a particular class of spatial point process models. Innovation is a functional built from the counting measure minus its integral compensator. The result is then applied to obtain almost sure rate of convergence for such functionals.

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Statistiques [stat] Mathématiques [math]

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https://hal.science/hal-04367354

Soumis le : samedi 30 décembre 2023-07:59:37

Dernière modification le : samedi 27 avril 2024-03:10:35

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hal-04367354 , version 1 (30-12-2023)

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HAL Id : hal-04367354 , version 1
DOI : 10.1016/j.spl.2018.12.003

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Jean-François Coeurjolly, Patricia Reynaud-Bouret. A concentration inequality for inhomogeneous Neyman–Scott point processes. Statistics and Probability Letters, 2019, 148, pp.30-34. ⟨10.1016/j.spl.2018.12.003⟩. ⟨hal-04367354⟩

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A concentration inequality for inhomogeneous Neyman–Scott point processes

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