a National Taras Shevchenko, University of Kiev, Vladimirskaya st. 64, 01033, Kiev, Ukraine;b Ludwig-Maximilian-University, Akademiestr. 1, 80799, Munich, Germany
Abstract:
A linear functional errors-in-variables model with unknown slope parameter and Gaussian errors is considered. The measurement error variance is supposed to be known, while the variance of errors in the equation is unknown. In this model a risk bound of asymptotic minimax type for arbitrary estimators is established. The bound lies above that one which was found previously in the case of both variances known. The bound is attained by an adjusted least-squares estimators.