English

A data-dependent regularization method based on the graph Laplacian

Numerical Analysis 2024-10-22 v2 Numerical Analysis

Abstract

We investigate a variational method for ill-posed problems, named graphLa+Ψ\texttt{graphLa+}\Psi, which embeds a graph Laplacian operator in the regularization term. The novelty of this method lies in constructing the graph Laplacian based on a preliminary approximation of the solution, which is obtained using any existing reconstruction method Ψ\Psi from the literature. As a result, the regularization term is both dependent on and adaptive to the observed data and noise. We demonstrate that graphLa+Ψ\texttt{graphLa+}\Psi is a regularization method and rigorously establish both its convergence and stability properties. We present selected numerical experiments in 2D computerized tomography, wherein we integrate the graphLa+Ψ\texttt{graphLa+}\Psi method with various reconstruction techniques Ψ\Psi, including Filter Back Projection (graphLa+FBP\texttt{graphLa+FBP}), standard Tikhonov (graphLa+Tik\texttt{graphLa+Tik}), Total Variation (graphLa+TV\texttt{graphLa+TV}), and a trained deep neural network (graphLa+Net\texttt{graphLa+Net}). The graphLa+Ψ\texttt{graphLa+}\Psi approach significantly enhances the quality of the approximated solutions for each method Ψ\Psi. Notably, graphLa+Net\texttt{graphLa+Net} is outperforming, offering a robust and stable application of deep neural networks in solving inverse problems.

Keywords

Cite

@article{arxiv.2312.16936,
  title  = {A data-dependent regularization method based on the graph Laplacian},
  author = {Davide Bianchi and Davide Evangelista and Stefano Aleotti and Marco Donatelli and Elena Loli Piccolomini and Wenbin Li},
  journal= {arXiv preprint arXiv:2312.16936},
  year   = {2024}
}
R2 v1 2026-06-28T14:03:35.584Z