Non-Poisson dichotomous noise: higher-order correlation functions and aging
arXiv:cond-mat/0402494 · doi:10.1103/PhysRevE.70.046118
Abstract
We study a two-state symmetric noise, with a given waiting time distribution $Ï(Ï)$, and focus our attention on the connection between the four-time and the two-time correlation functions. The transition of $Ï(Ï)$ from the exponential to the non-exponential condition yields the breakdown of the usual factorization condition of high-order correlation functions, as well as the birth of aging effects. We discuss the subtle connections between these two properties, and establish the condition that the Liouville-like approach has to satisfy in order to produce a correct description of the resulting diffusion process.