Homotopy based algorithms for $\ell_0$-regularized least-squares
Abstract
Sparse signal restoration is usually formulated as the minimization of a quadratic cost function , where A is a dictionary and x is an unknown sparse vector. It is well-known that imposing an constraint leads to an NP-hard minimization problem. The convex relaxation approach has received considerable attention, where the -norm is replaced by the -norm. Among the many efficient solvers, the homotopy algorithm minimizes with respect to x for a continuum of 's. It is inspired by the piecewise regularity of the -regularization path, also referred to as the homotopy path. In this paper, we address the minimization problem for a continuum of 's and propose two heuristic search algorithms for -homotopy. Continuation Single Best Replacement is a forward-backward greedy strategy extending the Single Best Replacement algorithm, previously proposed for -minimization at a given . The adaptive search of the -values is inspired by -homotopy. Regularization Path Descent is a more complex algorithm exploiting the structural properties of the -regularization path, which is piecewise constant with respect to . Both algorithms are empirically evaluated for difficult inverse problems involving ill-conditioned dictionaries. Finally, we show that they can be easily coupled with usual methods of model order selection.
Cite
@article{arxiv.1406.4802,
title = {Homotopy based algorithms for $\ell_0$-regularized least-squares},
author = {Charles Soussen and Jérôme Idier and Junbo Duan and David Brie},
journal= {arXiv preprint arXiv:1406.4802},
year = {2015}
}
Comments
38 pages