Contemporary Mathematics
An iteratively reweighted least squares algorithm for sparse regularization
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, Chapter
Voronin, S; Daubechies, I
January 1, 2017
We present a new algorithm and the corresponding convergence analysis for the regularization of linear inverse problems with sparsity constraints, applied to a new generalized sparsity promoting functional. The algorithm is based on the idea of iteratively reweighted least squares, reducing the minimization at every iteration step to that of a functional including only ℓ2 -norms. This amounts to smoothing of the absolute value function that appears in the generalized sparsity promoting penalty we consider, with the smoothing becoming iteratively less pronounced. We demonstrate that the sequence of iterates of our algorithm converges to a limit that minimizes the original functional.
Duke Scholars
DOI
Publication Date
January 1, 2017
Volume
693
Start / End Page
391 / 411
Related Subject Headings
- 4904 Pure mathematics
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Voronin, S., & Daubechies, I. (2017). An iteratively reweighted least squares algorithm for sparse regularization. In Contemporary Mathematics (Vol. 693, pp. 391–411). https://doi.org/10.1090/conm/693/13941
Voronin, S., and I. Daubechies. “An iteratively reweighted least squares algorithm for sparse regularization.” In Contemporary Mathematics, 693:391–411, 2017. https://doi.org/10.1090/conm/693/13941.
Voronin S, Daubechies I. An iteratively reweighted least squares algorithm for sparse regularization. In: Contemporary Mathematics. 2017. p. 391–411.
Voronin, S., and I. Daubechies. “An iteratively reweighted least squares algorithm for sparse regularization.” Contemporary Mathematics, vol. 693, 2017, pp. 391–411. Scopus, doi:10.1090/conm/693/13941.
Voronin S, Daubechies I. An iteratively reweighted least squares algorithm for sparse regularization. Contemporary Mathematics. 2017. p. 391–411.
DOI
Publication Date
January 1, 2017
Volume
693
Start / End Page
391 / 411
Related Subject Headings
- 4904 Pure mathematics