par Loris, Ignace 
;Verhoeven, Caroline
Référence Inverse problems, 27, 12, page (125007)
Publication Publié, 2011
;Verhoeven, Caroline Référence Inverse problems, 27, 12, page (125007)
Publication Publié, 2011
Article révisé par les pairs
| Résumé : | An explicit algorithm for the minimization of an $\ell_1$ penalized least squares functional, with non-separable $\ell_1$ term, is proposed. Each step in the iterative algorithm requires four matrix vector multiplications and a single simple projection on a convex set (or equivalently thresholding). Convergence is proven and a $1/N$ convergence rate is derived for the functional. In the special case where the matrix in the $\ell_1$ term is the identity (or orthogonal), the algorithm reduces to the traditional iterative soft-thresholding algorithm. In the special case where the matrix in the quadratic term is the identity (or orthogonal), the algorithm reduces to a gradient projection algorithm for the dual problem. By replacing the projection with a simple proximity operator, other convex non-separable penalties than those based on an $\ell_1$-norm can be handled as well. |
