Implicit iteration methods in Hilbert scales

Semi-iterative Regularization in Hilbert Scales

In this paper we investigate the regularization properties of semiiterative regularization methods in Hilbert scales for linear ill-posed problems and perturbed data. It is well known that Landweber iteration can be remarkably accelerated by polynomial acceleration methods leading to the notion of optimal speed of convergence, which can be obtained by several efficient two-step methods, e.g., t...

Error estimates of some Newton-type methods for solving nonlinear inverse problems in Hilbert scales

In this paper we consider some Newton-type methods in Hilbert scales to solve nonlinear inverse problems. Under certain conditions we obtain the error estimates when the iteration is terminated in an a posteriori manner. Finally we present the numerical examples to verify the theoretical results.

Preconditioning Landweber iteration in Hilbert scales

In this paper we investigate convergence of Landweber iteration in Hilbert scales for linear and nonlinear inverse problems. As opposed to the usual application of Hilbert scales in the framework of regularization methods, we focus here on the case s ≤ 0, which (for Tikhonov regularization) corresponds to regularization in a weaker norm. In this case, the Hilbert scale operator L−2s appearing i...

Convergence theorems of an implicit iteration process for asymptotically pseudocontractive mappings

The purpose of this paper is to study the strong convergence of an implicit iteration process with errors to a common fixed point for a finite family of asymptotically pseudocontractive mappings and nonexpansive mappings in normed linear spaces. The results in this paper improve and extend the corresponding results of Xu and Ori, Zhou and Chang, Sun, Yang and Yu in some aspects.

Convergence of an Implicit Iteration for Affine Mappings in Normed and Banach Spaces