Estimation in autoregressive model with measurement error

Abstract

Consider an autoregressive model with measurement error: we observe Zi=Xi+εi, where Xi is a stationary solution of the equation Xi=fθ0(Xi-1)+i. The regression function fθ0 is known up to a finite dimensional parameter θ0. The distributions of X0 and 1 are unknown whereas the distribution of ε1 is completely known. We want to estimate the parameter θ0 by using the observations Z0,..,Zn. We propose an estimation procedure based on a modified least square criterion involving a weight function w, to be suitably chosen. We give upper bounds for the risk of the estimator, which depend on the smoothness of the errors density fε and on the smoothness properties of w fθ.