Cut-off phenomenon for the maximum of a sampling of Ornstein-Uhlenbeck processes

Abstract

In this article we study the so-called cut-off phenomenon in the total variation distance when n ∞ for the family of continuous-time stochastic processes indexed by n∈ N, \[ ( Z(n)t= j∈ \1,…,n\X(j)t:t≥ 0), \] where X(1),…,X(n) is a sampling of n ergodic Ornstein-Uhlenbeck processes driven by stable processes of index α. It is not hard to see that for each n∈ N, Z(n)t converges in the total variation distance to a limiting distribution Z(n)∞ as t goes by. Using the asymptotic theory of extremes; in the Gaussian case we prove that the total variation distance between the distribution of Z(n)t and its limiting distribution Z(n)∞ converges to a universal function in a constant time window around the cut-off time, a fact known as profile cut-off in the context of stochastic processes. On the other hand, in the heavy-tailed case we prove that there is not cut-off.