Variational Regularization Theory Based on Image Space Approximation Rates
Numerical Analysis
2021-07-07 v3 Numerical Analysis
Functional Analysis
Abstract
We present a new approach to convergence rate results for variational regularization. Avoiding Bregman distances and using image space approximation rates as source conditions we prove a nearly minimax theorem showing that the modulus of continuity is an upper bound on the reconstruction error up to a constant. Applied to Besov space regularization we obtain convergence rate results for - and -penalties without restrictions on Finally we prove equivalence of H\"older-type variational source conditions, bounds on the defect of the Tikhonov functional, and image space approximation rates.
Cite
@article{arxiv.2009.00490,
title = {Variational Regularization Theory Based on Image Space Approximation Rates},
author = {Philip Miller},
journal= {arXiv preprint arXiv:2009.00490},
year = {2021}
}