Iterative regularization with minimum-residual methods

The convergence behaviour of a number of algorithms based on minimizing residual norms over Krylov subspaces is not well understood. Residual or error bounds currently available are either too loose or depend on unknown constants that can be very large. In this paper we take another look at traditio

## Abstract The superlinear convergence of minimum residual‐type methods for solving systems of linear equations with diagonalizable non‐singular unsymmetric matrix is estimated using a special conditioning measure. For the construction of the latter, the distance from the spectrum of the matrix to

Most scale-space concepts have been expressed as parabolic or hyperbolic partial differential equations (PDEs). In this paper we extend our work on scale-space properties of elliptic PDEs arising from regularization methods: we study linear and nonlinear regularization methods that are applied itera

Nonlinear inverse problems appear in many applications, and typically they lead to mathematical models that are ill-posed, i.e., they are unstable under data perturbations. Those problems require a regularization, i.e., a special  numerical treatment. This book presents regularization schemes which