Asymptotics of Yule's nonsense correlation for Ornstein-Uhlenbeck paths: a Wiener chaos approach

Abstract

In this paper, we study the distribution of the so-called "Yule's nonsense correlation statistic" on a time interval [0,T] for a time horizon T>0 , when T is large, for a pair (X1,X2) of independent Ornstein-Uhlenbeck processes. This statistic is by definition equal to : equation* (T):=Y12(T)Y11(T)Y22(T), equation* where the random variables Yij(T), i,j=1,2 are defined as equation* Yij(T):=∫0TXi(u)Xj(u)du-TXiXj, Xi:=1T∫0TXi(u)du. equation* We assume X1 and X2 have the same drift parameter θ >0. We also study the asymptotic law of a discrete-type version of (T), where Yij(T) above are replaced by their Riemann-sum discretizations. In this case, conditions are provided for how the discretization (in-fill) step relates to the long horizon T. We establish identical normal asymptotics for standardized (T) and its discrete-data version. The asymptotic variance of (T)T1/2 is θ -1. We also establish speeds of convergence in the Kolmogorov distance, which are of Berry-Ess\'een-type (constant*T-1/2) except for a T factor. Our method is to use the properties of Wiener-chaos variables, since (T) and its discrete version are comprised of ratios involving three such variables in the 2nd Wiener chaos. This methodology accesses the Kolmogorov distance thanks to a relation which stems from the connection between the Malliavin calculus and Stein's method on Wiener space.