Superdiffusive limits for Bessel-driven stochastic kinetics
Abstract
We prove anomalous-diffusion scaling for a one-dimensional stochastic kinetic dynamics, in which the stochastic drift is driven by an exogenous Bessel noise, and also includes endogenous volatility which is permitted to have arbitrary dependence with the exogenous noise. We identify the superdiffusive scaling exponent for the model, and prove a weak convergence result on the corresponding scale. We show how our result extends to admit, as exogenous noise processes, not only Bessel processes but more general processes satisfying certain asymptotic conditions.
Cite
@article{arxiv.2401.11863,
title = {Superdiffusive limits for Bessel-driven stochastic kinetics},
author = {Miha Brešar and Conrado da Costa and Aleksandar Mijatović and Andrew Wade},
journal= {arXiv preprint arXiv:2401.11863},
year = {2025}
}
Comments
Integrability assumption in Theorem 1.1 has been removed; Subsection 2.2, discussing the proof of the main results, has been added; 17 pages, 1 figure; for a short YouTube video describing the results, see https://youtu.be/O20plic5Ko8?si=-cg5XGdZlkO9WvYr