This work considers some theoretical and computational aspects of the recent paper (Buccini et al., 2021), whose aim was to relax the convergence conditions in a previous work by Donatelli and Hanke, and thereby make the iterative method discussed in the latter work applicable to a larger class of problems. This aim was achieved in the sense that the iterative method presented convergences for a larger class of problems. However, while the analysis presented is correct, it does not establish the superior behavior of the iterative method described. The present note describes a slight modification of the analysis that establishes the superiority of the iterative method. The new analysis allows to discuss the behavior of the algorithm when var...
Linear systems of equations with a matrix whose singular values decay to zero with increasing index ...
A convergence rate is established for nonstationary iterated Tikhonov regularization, applied to ill...
Linear discrete ill-posed problems arise in many areas of science and engineering. Their solutions ...
This work considers some theoretical and computational aspects of the recent paper (Buccini et al., ...
Discrete ill-posed inverse problems arise in many areas of science and engineering. Their solutions ...
Discrete ill-posed inverse problems arise in many areas of science and engineering. Their solutions ...
Many problems in science and engineering give rise to linear systems of equations that are commonly ...
The nonstationary preconditioned iteration proposed in a recent work by Donatelli and Hanke appeared...
AbstractThis paper is concerned with iterative solution methods for large linear systems of equation...
We introduce a new iterative scheme for solving linear ill-posed problems, similar to nonstationary ...
AbstractIn this paper we revisit the solution of ill-posed problems by preconditioned iterative meth...
We present a discrepancy-like stopping criterium for iterative regularization methods for the soluti...
Numerical solution of ill-posed problems is often accomplished by discretization (projection onto a...
The iterative solution of large linear discrete ill-posed problems with an error contaminated data v...
The solution of discrete ill-posed problems has been a subject of research for many years. Among the...
Linear systems of equations with a matrix whose singular values decay to zero with increasing index ...
A convergence rate is established for nonstationary iterated Tikhonov regularization, applied to ill...
Linear discrete ill-posed problems arise in many areas of science and engineering. Their solutions ...
This work considers some theoretical and computational aspects of the recent paper (Buccini et al., ...
Discrete ill-posed inverse problems arise in many areas of science and engineering. Their solutions ...
Discrete ill-posed inverse problems arise in many areas of science and engineering. Their solutions ...
Many problems in science and engineering give rise to linear systems of equations that are commonly ...
The nonstationary preconditioned iteration proposed in a recent work by Donatelli and Hanke appeared...
AbstractThis paper is concerned with iterative solution methods for large linear systems of equation...
We introduce a new iterative scheme for solving linear ill-posed problems, similar to nonstationary ...
AbstractIn this paper we revisit the solution of ill-posed problems by preconditioned iterative meth...
We present a discrepancy-like stopping criterium for iterative regularization methods for the soluti...
Numerical solution of ill-posed problems is often accomplished by discretization (projection onto a...
The iterative solution of large linear discrete ill-posed problems with an error contaminated data v...
The solution of discrete ill-posed problems has been a subject of research for many years. Among the...
Linear systems of equations with a matrix whose singular values decay to zero with increasing index ...
A convergence rate is established for nonstationary iterated Tikhonov regularization, applied to ill...
Linear discrete ill-posed problems arise in many areas of science and engineering. Their solutions ...