We study the total least squares (TLS) problem that generalizes least squares regression by allowing measurement errors in both dependent and independent variables. TLS is widely used in applied fields including computer vision, system identification and econometrics. The special case when all dependent and independent variables have the same level of uncorrelated Gaussian noise, known as ordinary TLS, can be solved by singular value decomposition (SVD). However, SVD cannot solve many important practical TLS problems with realistic noise structure, such as having varying measurement noise, known structure on the errors, or large outliers requiring robust error-norms. To solve such problems, we develop convex relaxation approaches for a gene...
In this contribution we extend the result of (Markovsky et. al, SIAM J. of Matrix Anal. and Appl., 2...
Non-smooth regularized convex optimization procedures have emerged as a powerful tool to recover str...
The Total Least Squares solution of an overdetermined, approximate linear equation Ax approx b minim...
We study the total least squares (TLS) prob-lem that generalizes least squares regression by allowin...
Recent advances in total least squares approaches for solving various errors-in-variables modeling p...
AbstractThe total least squares (TLS) method is a successful approach for linear problems when not o...
AbstractIt is shown how structured and weighted total least squares and L2 approximation problems le...
AbstractWe investigate the total least square problem (TLS) with Chebyshev norm instead of the tradi...
This paper deals with a homoskedastic errors-in-variables linear regression model and properties of ...
AbstractIt is shown here how – similarly to the unconstrained case – the Constrained Total Least Squ...
AbstractIn a total least squares (TLS) problem, we estimate an optimal set of model parameters X, so...
A class of structured total least squares problems is considered, in which the extended data matrix ...
The total least squares (TLS) method is a successful approach for linear problems if both the matrix...
We review the development and extensions of the classical total least squares method and describe al...
The maximum likelihood PCA (MLPCA) method has been devised in chemometrics as a generalization of th...
In this contribution we extend the result of (Markovsky et. al, SIAM J. of Matrix Anal. and Appl., 2...
Non-smooth regularized convex optimization procedures have emerged as a powerful tool to recover str...
The Total Least Squares solution of an overdetermined, approximate linear equation Ax approx b minim...
We study the total least squares (TLS) prob-lem that generalizes least squares regression by allowin...
Recent advances in total least squares approaches for solving various errors-in-variables modeling p...
AbstractThe total least squares (TLS) method is a successful approach for linear problems when not o...
AbstractIt is shown how structured and weighted total least squares and L2 approximation problems le...
AbstractWe investigate the total least square problem (TLS) with Chebyshev norm instead of the tradi...
This paper deals with a homoskedastic errors-in-variables linear regression model and properties of ...
AbstractIt is shown here how – similarly to the unconstrained case – the Constrained Total Least Squ...
AbstractIn a total least squares (TLS) problem, we estimate an optimal set of model parameters X, so...
A class of structured total least squares problems is considered, in which the extended data matrix ...
The total least squares (TLS) method is a successful approach for linear problems if both the matrix...
We review the development and extensions of the classical total least squares method and describe al...
The maximum likelihood PCA (MLPCA) method has been devised in chemometrics as a generalization of th...
In this contribution we extend the result of (Markovsky et. al, SIAM J. of Matrix Anal. and Appl., 2...
Non-smooth regularized convex optimization procedures have emerged as a powerful tool to recover str...
The Total Least Squares solution of an overdetermined, approximate linear equation Ax approx b minim...