summary:The total least squares (TLS) and truncated TLS (T-TLS) methods are widely known linear data fitting approaches, often used also in the context of very ill-conditioned, rank-deficient, or ill-posed problems. Regularization properties of T-TLS applied to linear approximation problems $Ax\approx b$ were analyzed by Fierro, Golub, Hansen, and O'Leary (1997) through the so-called filter factors allowing to represent the solution in terms of a filtered pseudoinverse of $A$ applied to $b$. This paper focuses on the situation when multiple observations $b_1,\ldots ,b_d$ are available, i.e., the T-TLS method is applied to the problem $AX\approx B$, where $B=[b_1,\ldots ,b_d]$ is a matrix. It is proved that the filtering representation of th...
This paper deals with a homoskedastic errors-in-variables linear regression model and properties of ...
The total least squares (TLS) method is a successful approach for linear problems if both the matrix...
Let A be a real m by n matrix, and b a real m-vector. Consider estimating x from an orthogonally inv...
summary:The total least squares (TLS) and truncated TLS (T-TLS) methods are widely known linear data...
Discretizations of inverse problems lead to systems of linear equations with a highly ill-conditione...
AbstractThe total least squares (TLS) method is a successful approach for linear problems when not o...
The total least squares (TLS) method is a successful approach for linear problems if both the right-...
Many real-world applications are addressed through a linear least-squares problem formulation, whose...
Discretizations of inverse problems lead to systems of linear equations with a highly ill-condition...
Linear approximation problems arise in various applications and can be solved by a large variety of ...
Totla least squares (TLS) is a method of fitting that is appropriate when there are errors in both ...
A typical way to compute a meaningful solution of a linear least squares problem involves the introd...
Given a linear system Ax ≈ b over the real or complex field where both A and b are subject to noise,...
Recent advances in total least squares approaches for solving various errors-in-variables modeling p...
. Discretizations of inverse problems lead to systems of linear equations with a highly ill-conditio...
This paper deals with a homoskedastic errors-in-variables linear regression model and properties of ...
The total least squares (TLS) method is a successful approach for linear problems if both the matrix...
Let A be a real m by n matrix, and b a real m-vector. Consider estimating x from an orthogonally inv...
summary:The total least squares (TLS) and truncated TLS (T-TLS) methods are widely known linear data...
Discretizations of inverse problems lead to systems of linear equations with a highly ill-conditione...
AbstractThe total least squares (TLS) method is a successful approach for linear problems when not o...
The total least squares (TLS) method is a successful approach for linear problems if both the right-...
Many real-world applications are addressed through a linear least-squares problem formulation, whose...
Discretizations of inverse problems lead to systems of linear equations with a highly ill-condition...
Linear approximation problems arise in various applications and can be solved by a large variety of ...
Totla least squares (TLS) is a method of fitting that is appropriate when there are errors in both ...
A typical way to compute a meaningful solution of a linear least squares problem involves the introd...
Given a linear system Ax ≈ b over the real or complex field where both A and b are subject to noise,...
Recent advances in total least squares approaches for solving various errors-in-variables modeling p...
. Discretizations of inverse problems lead to systems of linear equations with a highly ill-conditio...
This paper deals with a homoskedastic errors-in-variables linear regression model and properties of ...
The total least squares (TLS) method is a successful approach for linear problems if both the matrix...
Let A be a real m by n matrix, and b a real m-vector. Consider estimating x from an orthogonally inv...