English

First-Exit Time Analysis for Truncated Heavy-Tailed Dynamical Systems

Probability 2026-02-10 v1

Abstract

In this paper, we study the first-exit time of stochastic difference equation Xj+1η(x)=Xjη(x)+ηa(Xjη(x))+ησ(Xjη(x))Zj+1X^\eta_{j+1}(x) = X^\eta_{j}(x) + \eta a\big( X^\eta_{j}(x)\big) + \eta \sigma\big( X^\eta_{j}(x)\big)Z_{j+1} and its truncated variant Xj+1ηb(x)=Xjηb(x)+φb(ηa(Xjηb(x))+ησ(Xjηb(x))Zj+1)X^{\eta|b}_{j+1}(x) = X^{\eta|b}_{j}( x) + \varphi_b\big(\eta a\big( X^{\eta|b}_{j}( x)\big) + \eta \sigma\big( X^{\eta|b}_{j}( x)\big) Z_{j+1}\big), where φb(x)=(x/x)min{x,b}\varphi_b(x) = (x/|x|)\min\{|x|, b\} and the law of the noise ZtZ_t is multivariate regularly varying. The truncation operator φb()\varphi_b(\cdot) is often introduced as a modulation mechanism in heavy-tailed systems, such as stochastic gradient descent algorithms in deep learning. By developing a framework that connects large deviations with metastability, we leverage the locally uniform sample-path large deviations for both processes in Wang and Rhee (2024) to obtain precise characterizations of the joint distributions of the first exit times and exit locations. The resulting limit theorem unveils a discrete hierarchy of phase transitions (i.e., exit times) as the truncation threshold bb varies, and manifests the catastrophe principle, whereby key events or metastable behaviors in heavy-tailed systems are driven by catastrophic behavior in a few components while the rest of the system behaves nominally. These developments lead to a comprehensive heavy-tailed counterpart of the classical Freidlin-Wentzell theory.

Cite

@article{arxiv.2602.07968,
  title  = {First-Exit Time Analysis for Truncated Heavy-Tailed Dynamical Systems},
  author = {Xingyu Wang and Chang-Han Rhee},
  journal= {arXiv preprint arXiv:2602.07968},
  year   = {2026}
}

Comments

42 pages, 1 figure

R2 v1 2026-07-01T10:26:45.049Z