Tikhonov regularization with oversmoothing penalties

Gerth, Daniel

21 December 2016

In the last decade l1-regularization became a powerful and popular tool for the regularization of Inverse Problems. While in the early years sparse solution were in the focus of research, recently also the case that the coefficients of the exact solution decay sufficiently fast was under consideration. In this paper we seek to show that l1-regularization is applicable and leads to optimal convergence rates even when the exact solution does not belong to l1 but only to l2. This is a particular example of over-smoothing regularization, i.e., the penalty implies smoothness properties the exact solution does not fulfill. We will make some statements on convergence also in this general context.

Tikhonov Regularisierung

l1 Regularisierung

Überglätten

Konvergenzraten

Tikhonov regularization

convergence rates

l1-regularization

oversmoothing

ddc:510

Mathematik

Tikhonov regularization with oversmoothing penalties

Gerth, Daniel

21 December 2016

In the last decade l1-regularization became a powerful and popular tool for the regularization of Inverse Problems. While in the early years sparse solution were in the focus of research, recently also the case that the coefficients of the exact solution decay sufficiently fast was under consideration. In this paper we seek to show that l1-regularization is applicable and leads to optimal convergence rates even when the exact solution does not belong to l1 but only to l2. This is a particular example of over-smoothing regularization, i.e., the penalty implies smoothness properties the exact solution does not fulfill. We will make some statements on convergence also in this general context.

info:eu-repo/classification/ddc/510

ddc:510

Mathematik