Convergence rates for inverse Problems in Hilbert spaces: A Comparative Study
Abstract
In this paper, we apply a new kind of smoothness concept, i.e. H\"older stability estimates for the determination of convergence rates of Tikhonov regularization for linear and non-linear inverse problems in Hilbert spaces. For linear inverse problems, we obtain the convergence rates without incorporating the classical concept of spectral theory and for non-linear inverse problems, we obtain the convergence rates without incorporating any additional non-linearity estimate. Further, we employ the smoothness concept of inhomogeneous variational inequalities to deduce the convergence rates for non-linear inverse problems. In addition to Tikhonov regularization, we also consider Lavrentiev's regularization method for non-linear inverse problems and determine its convergence rates by incorporating the H\"older stability estimates as well as inhomogeneous variational inequalities. And finally, we discuss the co-action between the variational inequalities and the H\"older stability estimates.
Keywords
Cite
@article{arxiv.1812.11327,
title = {Convergence rates for inverse Problems in Hilbert spaces: A Comparative Study},
author = {Gaurav Mittal and Ankik Kumar Giri},
journal= {arXiv preprint arXiv:1812.11327},
year = {2020}
}
Comments
The model considered in this paper in Section 3 is not appropriate for Ill posed inverse problems