On the computation of the multivariate structured total least squares estimator

## Abstract In this paper, an extension of the structured total least‐squares (STLS) approach for __non‐linearly structured__ matrices is presented in the so‐called ‘Riemannian singular value decomposition’ (RiSVD) framework. It is shown that this type of STLS problem can be solved by solving a set

Abstroct~Every linear parameter estimation problem gives rise to an overdetermined set of linear equations AX ~ B which is usually solved with the ordinary least squares (LS) method. Often, both A and B are inaccurate. For these cases, a more general fitting technique, called total least squares (TL

We consider the problem of estimating the sum of squared error loss \(L=|\beta-\hat{\beta}|^{2}\) of the least-squares esitmator \(\hat{\beta}\) for \(\beta\), the regression coefficient. The standard estimator \(\ell_{0}\) is the expected value of \(L\). Here the error variance is assumed to be kno