Asymptotic normality of total least squares estimator in a multivariate errors-in-variables model AX=B

Abstract

We consider a multivariate functional measurement error model AX≈ B. The errors in [A,B] are uncorrelated, row-wise independent, and have equal (unknown) variances. We study the total least squares estimator of X, which, in the case of normal errors, coincides with the maximum likelihood one. We give conditions for asymptotic normality of the estimator when the number of rows in A is increasing. Under mild assumptions, the covariance structure of the limit Gaussian random matrix is nonsingular. For normal errors, the results can be used to construct an asymptotic confidence interval for a linear functional of X.