Diffusion approximation of multi-class Hawkes processes: Theoretical and numerical analysis

Pub Date : 2021-09-01 DOI:10.1017/apr.2020.73
Julien Chevallier, A. Melnykova, I. Tubikanec
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引用次数: 5

Abstract

Abstract Oscillatory systems of interacting Hawkes processes with Erlang memory kernels were introduced by Ditlevsen and Löcherbach (Stoch. Process. Appl., 2017). They are piecewise deterministic Markov processes (PDMP) and can be approximated by a stochastic diffusion. In this paper, first, a strong error bound between the PDMP and the diffusion is proved. Second, moment bounds for the resulting diffusion are derived. Third, approximation schemes for the diffusion, based on the numerical splitting approach, are proposed. These schemes are proved to converge with mean-square order 1 and to preserve the properties of the diffusion, in particular the hypoellipticity, the ergodicity, and the moment bounds. Finally, the PDMP and the diffusion are compared through numerical experiments, where the PDMP is simulated with an adapted thinning procedure.
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多类Hawkes过程的扩散近似:理论与数值分析
Ditlevsen和Löcherbach介绍了具有Erlang记忆核的Hawkes过程的相互作用振荡系统(Stoch.Process.Appl.,2017)。它们是分段确定性马尔可夫过程(PDMP),可以通过随机扩散来近似。本文首先证明了PDMP与扩散之间存在一个强误差界。其次,导出了所得扩散的矩界。第三,基于数值分裂方法,提出了扩散的近似方案。这些方案被证明收敛于均方阶1,并保持了扩散的性质,特别是亚椭圆性、遍历性和矩界。最后,通过数值实验对PDMP和扩散进行了比较,并采用适当的细化程序对PDMP进行了模拟。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
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