We discuss weighted least squares estimates of ill-conditioned linear inverse problems where weights are chosen to be inverse error covariance matrices. Least squares estimators are the maximum likelihood estimate for normally distributed data and parameters, but here we do not assume particular probability distributions. Weights for the estimator are found by ensuring its minimum follows a χ2 distribution. Previous work with this approach has shown that it is competitive with regularization methods such as the L-curve and Generalized Cross Validation (GCV) [20]. In this work we extend the method to find diagonal weighting matrices, rather than a scalar regularization parameter. Diagonal weighting matrices are advantageous because they give...
In this thesis, we study the problem of recovering signals, in particular images, that approximately...
We study the problem of estimating an unknown deterministic signal that is observed through an unkno...
We consider statistical linear inverse problems in Hilbert spaces of the type ˆ Y = Kx + U where we ...
We discuss weighted least squares estimates of ill-conditioned linear inverse problems where weights...
We address discrete nonlinear inverse problems with weighted least squares and Tikhonov regularizati...
We discuss the solution of numerically ill-posed overdetermined systems of equations using Tikhonov ...
Inverse problems arise in many applications in science and engineering. They are characterized by th...
Abstract. We address discrete nonlinear inverse problems with weighted least squares and Tikhonov re...
We propose a new approach to weighting initial parameter misfits in a least squares optimization pro...
Most linear inverse problems require regularization to ensure that robust and meaningful solutions c...
Mead Communicated by Abstract. We propose a new approach to weighting initial parameter misfits in a...
A novel approach is proposed to provide robust and accurate estimates for linear regression problems...
none4noMany real-world applications are addressed through a linear least-squares problem formulatio...
The a posteriori estimate of the errors in the numerical solution of ill-conditioned linear systems ...
This paper addresses the problem of selecting the regularization parameter for linear least-squares ...
In this thesis, we study the problem of recovering signals, in particular images, that approximately...
We study the problem of estimating an unknown deterministic signal that is observed through an unkno...
We consider statistical linear inverse problems in Hilbert spaces of the type ˆ Y = Kx + U where we ...
We discuss weighted least squares estimates of ill-conditioned linear inverse problems where weights...
We address discrete nonlinear inverse problems with weighted least squares and Tikhonov regularizati...
We discuss the solution of numerically ill-posed overdetermined systems of equations using Tikhonov ...
Inverse problems arise in many applications in science and engineering. They are characterized by th...
Abstract. We address discrete nonlinear inverse problems with weighted least squares and Tikhonov re...
We propose a new approach to weighting initial parameter misfits in a least squares optimization pro...
Most linear inverse problems require regularization to ensure that robust and meaningful solutions c...
Mead Communicated by Abstract. We propose a new approach to weighting initial parameter misfits in a...
A novel approach is proposed to provide robust and accurate estimates for linear regression problems...
none4noMany real-world applications are addressed through a linear least-squares problem formulatio...
The a posteriori estimate of the errors in the numerical solution of ill-conditioned linear systems ...
This paper addresses the problem of selecting the regularization parameter for linear least-squares ...
In this thesis, we study the problem of recovering signals, in particular images, that approximately...
We study the problem of estimating an unknown deterministic signal that is observed through an unkno...
We consider statistical linear inverse problems in Hilbert spaces of the type ˆ Y = Kx + U where we ...