Learning sparsity-promoting regularizers for linear inverse problems
Abstract
This paper introduces a novel approach to learning sparsity-promoting regularizers for solving linear inverse problems. We develop a bilevel optimization framework to select an optimal synthesis operator, denoted as , which regularizes the inverse problem while promoting sparsity in the solution. The method leverages statistical properties of the underlying data and incorporates prior knowledge through the choice of . We establish the well-posedness of the optimization problem, provide theoretical guarantees for the learning process, and present sample complexity bounds. The approach is demonstrated through theoretical infinite-dimensional examples, including compact perturbations of a known operator and the problem of learning the mother wavelet, and through extensive numerical simulations. This work extends previous efforts in Tikhonov regularization by addressing non-differentiable norms and proposing a data-driven approach for sparse regularization in infinite dimensions.
Keywords
Cite
@article{arxiv.2412.16031,
title = {Learning sparsity-promoting regularizers for linear inverse problems},
author = {Giovanni S. Alberti and Ernesto De Vito and Tapio Helin and Matti Lassas and Luca Ratti and Matteo Santacesaria},
journal= {arXiv preprint arXiv:2412.16031},
year = {2026}
}
Comments
28 pages, 4 figures