 Self-Exciting Random Evolutions (SEREs) and their ApplicationsAnatoliy Swishchuk Abstract: This paper is devoted to the study of a new so-called self-exciting random evolutions (SEREs) and their applications. We introduce a new random process $x(t)$ such that it is based on a superposition of a Markov chain $x_n$ and a Hawkes process $N(t)$; i.e., $x(t) := x_{N(t)}$. We call this process self-walking imbedded semi-Hawkes process (Swish Process or SwishP). Then the self-exciting REs (SEREs) can be constructed in similar way as, e.g., semi-Markov REs, but instead of semi-Markov process $x(t)$ we have SwishP. We give classifications and examples of self-exciting REs (SEREs). Then we consider limit theorems for SEREs such as averaging, diffusion approximation, normal deviations and rates of convergence of SEREs. Applications of SEREs are devoted to the so-called self-exciting traffic/transport process and self-exciting summation on a Markov chain, which are examples of continuous and discrete SERE, respectively. From these processes we can construct many other self-exciting processes, e.g., such as impulse traffic/transport process, self-exciting risk process, etc. We present averaged, diffusion and normal deviated self-exciting processes. Rates of convergence in these cases are presented as well. The originality and novelty of the paper associated with new features of REs and their many applications, namely, self-exciting and clustering effects. Date: 2024-12 Downloads: (external link) Related works: Export reference: BibTeX RIS (EndNote, ProCite, RefMan) HTML/Text Persistent link: https://EconPapers.repec.org/RePEc:arx:papers:2412.10592 Access Statistics for this paper More papers in Papers from arXiv.org |
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