Self-Exciting Multifractional Processes
Abstract
We propose a new multifractional stochastic process which allows for self-exciting behavior, similar to what can be seen for example in earthquakes and other self-organizing phenomena. The process can be seen as an extension of a multifractional Brownian motion, where the Hurst function is dependent on the past of the process. We define this through a stochastic Volterra equation, and we prove existence and uniqueness of this equation, as well as give bounds on the p-order moments, for all p>=1. We show convergence of an Euler-Maruyama scheme for the process, and also give the rate of convergence, which is depending on the self-exciting dynamics of the process. Moreover, we discuss different applications of this process, and give examples of different functions to model self-exciting behavior.
Cite
@article{arxiv.1908.05523,
title = {Self-Exciting Multifractional Processes},
author = {Fabian A. Harang and Marc Lagunas-Merino and Salvador Ortiz-Latorre},
journal= {arXiv preprint arXiv:1908.05523},
year = {2019}
}
Comments
24 pages, 8 figures