In this paper we present three theorems which give insight into the regularizing properties of MINRES. While our theory does not completely characterize the regularizing behavior of the algorithm, it provides a partial explanation of the observed behavior of the method. Unlike traditional attempts to explain the regularizing properties of Krylov subspace methods, our approach focuses on convergence properties of the residual rather than on convergence analysis of the harmonic Ritz values. The import of our analysis is illustrated by two examples. In particular, our theoretical and numerical results support the following important observation: in some circumstances the dimension of the optimal Krylov subspace can be much smaller than the num...
Eigenvalues with the eigenvector condition number, the field of values, and pseudospectra have all b...
In this thesis we consider a linear inverse problem Ax ≈ b with a smoothing operator A and a right-h...
Abstract. Several numerical methods for the solution of large linear ill-posed problems combine Tikh...
In this paper we present three theorems which give insight into the regularizing properties of {\min...
Krylov subspace iterative methods have recently received considerable attention as regularizing tech...
Krylov subspace iterative methods have recently received considerable attention as regularizing tec...
The aim of this thesis is to study and describe regularizing properties of iterative Krylov subspace...
Numerical solution of ill-posed problems is often accomplished by discretization (projection onto a...
AbstractWe provide an overview of existing strategies which compensate for the deterioration of conv...
In this paper, a strategy is proposed for alternative computations of the residual vectors in Krylov...
In this paper, a strategy is proposed for alternative computations of the residual vectors in Kryl...
The GMRES method is a popular iterative method for the solution of large linear systems of equations...
The aim of this thesis is to study hybrid methods for solving ill-posed linear inverse problems corr...
Abstract. Recent results on residual smoothing are reviewed, and it is observed that certain of thes...
Regularization of certain linear discrete ill-posed problems, as well as of certain regression probl...
Eigenvalues with the eigenvector condition number, the field of values, and pseudospectra have all b...
In this thesis we consider a linear inverse problem Ax ≈ b with a smoothing operator A and a right-h...
Abstract. Several numerical methods for the solution of large linear ill-posed problems combine Tikh...
In this paper we present three theorems which give insight into the regularizing properties of {\min...
Krylov subspace iterative methods have recently received considerable attention as regularizing tech...
Krylov subspace iterative methods have recently received considerable attention as regularizing tec...
The aim of this thesis is to study and describe regularizing properties of iterative Krylov subspace...
Numerical solution of ill-posed problems is often accomplished by discretization (projection onto a...
AbstractWe provide an overview of existing strategies which compensate for the deterioration of conv...
In this paper, a strategy is proposed for alternative computations of the residual vectors in Krylov...
In this paper, a strategy is proposed for alternative computations of the residual vectors in Kryl...
The GMRES method is a popular iterative method for the solution of large linear systems of equations...
The aim of this thesis is to study hybrid methods for solving ill-posed linear inverse problems corr...
Abstract. Recent results on residual smoothing are reviewed, and it is observed that certain of thes...
Regularization of certain linear discrete ill-posed problems, as well as of certain regression probl...
Eigenvalues with the eigenvector condition number, the field of values, and pseudospectra have all b...
In this thesis we consider a linear inverse problem Ax ≈ b with a smoothing operator A and a right-h...
Abstract. Several numerical methods for the solution of large linear ill-posed problems combine Tikh...