Mean field limits for interacting Hawkes processes in a diffusive regime

Abstract : We consider a sequence of systems of Hawkes processes having mean field interactions in a diffusive regime. The stochastic intensity of each process is a solution of a stochastic differential equation driven by N independent Poisson random measures. We show that, as the number of interacting components N tends to infinity, this intensity converges in distribution in Skorohod space to a CIR-type diffusion. Moreover, we prove the convergence in distribution of the Hawkes processes to the limit point process having the limit diffusion as intensity. To prove the convergence results, we use analytical technics based on the convergence of the associated infinitesimal generators and Markovian semigroups.
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https://hal.archives-ouvertes.fr/hal-02096662
Contributor : Xavier Erny <>
Submitted on : Friday, April 12, 2019 - 9:59:47 AM
Last modification on : Friday, April 19, 2019 - 1:23:57 AM

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  • HAL Id : hal-02096662, version 1

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Xavier Erny, Eva Löcherbach, Dasha Loukianova. Mean field limits for interacting Hawkes processes in a diffusive regime. 2019. ⟨hal-02096662⟩

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