Graph approximation and generalized Tikhonov regularization for signal deblurring
Abstract
Given a compact linear operator , the (pseudo) inverse is usually substituted by a family of regularizing operators which depends on itself. Naturally, in the actual computation we are forced to approximate the true continuous operator with a discrete operator characterized by a finesses discretization parameter , and obtaining then a discretized family of regularizing operators . In general, the numerical scheme applied to discretize does not preserve, asymptotically, the full spectrum of . In the context of a generalized Tikhonov-type regularization, we show that a graph-based approximation scheme that guarantees, asymptotically, a zero maximum relative spectral error can significantly improve the approximated solutions given by . This approach is combined with a graph based regularization technique with respect to the penalty term.
Cite
@article{arxiv.2106.10453,
title = {Graph approximation and generalized Tikhonov regularization for signal deblurring},
author = {Davide Bianchi and Marco Donatelli},
journal= {arXiv preprint arXiv:2106.10453},
year = {2021}
}