Optimal Berry-Ess\'een bound for Maximum likelihood estimation of the drift parameter in α -Brownian bridge

Abstract

Let T>0,α>12. In the present paper we consider the α-Brownian bridge defined as dXt=-αXtT-tdt+dWt,~ 0≤ t< T, where W is a standard Brownian motion. We investigate the optimal rate of convergence to normality of the maximum likelihood estimator (MLE) for the parameter α based on the continuous observation \Xs,0≤ s≤ t\ as t T. We prove that an optimal rate of Kolmogorov distance for central limit theorem on the MLE is given by 1|(T-t)|, as t T. First we compute an upper bound and then find a lower bound with the same speed using Corollary 1 and Corollary 2 of kp-JVA, respectively.