Diffusive limits of Lipschitz functionals of Poisson measures

Continuous Time Markov Chains, Hawkes processes and many other interesting processes can be described as solution of stochastic differential equations driven by Poisson measures. Previous works, using the Stein's method, give the convergence rate of a sequence of renormalized Poisson measures towards the Brownian motion in several distances, constructed on the model of the Kantorovitch-Rubinstein (or Wasserstein-1) distance. We show that many operations (like time change, convolution) on continuous functions are Lipschitz continuous to extend these quantified convergences to diffuse limits of Markov processes and long-time behavior of Hawkes processes.

Keywords

Stein Approximation diffusion Hawkes processes Stein’s method CTMC

Domains

Probability [math.PR]

Fichier principal

stability_hal.pdf (300.02 Ko)

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Laurent Decreusefond : Connect in order to contact the contributor

https://telecom-paris.hal.science/hal-03283778

Submitted on : Thursday, December 15, 2022-8:20:58 AM

Last modification on : Thursday, May 2, 2024-1:23:57 PM

Dates and versions

hal-03283778 , version 1 (12-07-2021)

hal-03283778 , version 2 (15-12-2022)

Identifiers

HAL Id : hal-03283778 , version 2
ARXIV : 2107.05339
DOI : 10.1214/23-AAP1972

Cite

Eustache Besançon, Laure Coutin, Laurent Decreusefond, Pascal Moyal. Diffusive limits of Lipschitz functionals of Poisson measures. The Annals of Applied Probability, 2024, 34 (1A), pp.555-584. ⟨10.1214/23-AAP1972⟩. ⟨hal-03283778v2⟩

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