We investigate a variational method for ill-posed problems, named 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 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+Psi is a regularization method and rigorously establish both its convergence and stability properties. We present selected numerical experiments in two-dimensional computed tomography, wherein we integrate the GraphLa+Psi method with various reconstruction techniques Psi, including filtered back projection (graphLa+FBP), standard Tikhonov (graphLa+Tik), total variation (graphLa+TV), and a trained deep neural network (graphLa+Net). The GraphLa+Psi approach significantly enhances the quality of the approximated solutions for each method Psi. Notably, graphLa+Net outperforms, offering a robust and stable application of deep neural networks in solving inverse problems.
Bianchi, D., Evangelista, D., Aleotti, S., Donatelli, M., Piccolomini, E.L., Li, W. (2025). A Data-Dependent Regularization Method Based on the Graph Laplacian. SIAM JOURNAL ON SCIENTIFIC COMPUTING, 47(2), 369-398 [10.1137/23m162750x].
A Data-Dependent Regularization Method Based on the Graph Laplacian
Evangelista, Davide;Piccolomini, Elena Loli;
2025
Abstract
We investigate a variational method for ill-posed problems, named 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 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+Psi is a regularization method and rigorously establish both its convergence and stability properties. We present selected numerical experiments in two-dimensional computed tomography, wherein we integrate the GraphLa+Psi method with various reconstruction techniques Psi, including filtered back projection (graphLa+FBP), standard Tikhonov (graphLa+Tik), total variation (graphLa+TV), and a trained deep neural network (graphLa+Net). The GraphLa+Psi approach significantly enhances the quality of the approximated solutions for each method Psi. Notably, graphLa+Net outperforms, offering a robust and stable application of deep neural networks in solving inverse problems.| File | Dimensione | Formato | |
|---|---|---|---|
|
graphlaplus-main.zip
accesso aperto
Tipo:
File Supplementare
Licenza:
Licenza per accesso libero gratuito
Dimensione
5.25 MB
Formato
Zip File
|
5.25 MB | Zip File | Visualizza/Apri |
|
graphLa (1).pdf
accesso aperto
Tipo:
Postprint / Author's Accepted Manuscript (AAM) - versione accettata per la pubblicazione dopo la peer-review
Licenza:
Licenza per Accesso Aperto. Creative Commons Attribuzione (CCBY)
Dimensione
2.3 MB
Formato
Adobe PDF
|
2.3 MB | Adobe PDF | Visualizza/Apri |
I documenti in IRIS sono protetti da copyright e tutti i diritti sono riservati, salvo diversa indicazione.
