Rate of Estimation for the Stationary Distribution of Stochastic Damping Hamiltonian Systems with Continuous Observations

Abstract

We study the problem of the non-parametric estimation for the density π of the stationary distribution of a stochastic two-dimensional damping Hamiltonian system (Zt)t∈[0,T]=(Xt,Yt)t ∈ [0,T]. From the continuous observation of the sampling path on [0,T], we study the rate of estimation for π(x0,y0) as T ∞. We show that kernel based estimators can achieve the rate T-v for some explicit exponent v ∈ (0,1/2). One finding is that the rate of estimation depends on the smoothness of π and is completely different with the rate appearing in the standard i.i.d.\ setting or in the case of two-dimensional non degenerate diffusion processes. Especially, this rate depends also on y0. Moreover, we obtain a minimax lower bound on the L2-risk for pointwise estimation, with the same rate T-v, up to (T) terms.