The sliding Frank–Wolfe algorithm and its application to super-resolution microscopy. (3rd December 2019)
- Record Type:
- Journal Article
- Title:
- The sliding Frank–Wolfe algorithm and its application to super-resolution microscopy. (3rd December 2019)
- Main Title:
- The sliding Frank–Wolfe algorithm and its application to super-resolution microscopy
- Authors:
- Denoyelle, Quentin
Duval, Vincent
Peyré, Gabriel
Soubies, Emmanuel - Abstract:
- Abstract: This paper showcases the theoretical and numerical performance of the Sliding Frank–Wolfe, which is a novel optimization algorithm to solve the BLASSO sparse spikes super-resolution problem. The BLASSO is a continuous (i.e. off-the-grid or grid-less) counterpart to the well-known sparse regularisation method (also known as LASSO or basis pursuit). Our algorithm is a variation on the classical Frank–Wolfe (also known as conditional gradient) which follows a recent trend of interleaving convex optimization updates (corresponding to adding new spikes) with non-convex optimization steps (corresponding to moving the spikes). Our main theoretical result is that this algorithm terminates in a finite number of steps under a mild non-degeneracy hypothesis. We then target applications of this method to several instances of single molecule fluorescence imaging modalities, among which certain approaches rely heavily on the inversion of a Laplace transform. Our second theoretical contribution is the proof of the exact support recovery property of the BLASSO to invert the 1D Laplace transform in the case of positive spikes. On the numerical side, we conclude this paper with an extensive study of the practical performance of the Sliding Frank–Wolfe on different instantiations of single molecule fluorescence imaging, including convolutive and non-convolutive (Laplace-like) operators. This shows the versatility and superiority of this method with respect to alternative sparseAbstract: This paper showcases the theoretical and numerical performance of the Sliding Frank–Wolfe, which is a novel optimization algorithm to solve the BLASSO sparse spikes super-resolution problem. The BLASSO is a continuous (i.e. off-the-grid or grid-less) counterpart to the well-known sparse regularisation method (also known as LASSO or basis pursuit). Our algorithm is a variation on the classical Frank–Wolfe (also known as conditional gradient) which follows a recent trend of interleaving convex optimization updates (corresponding to adding new spikes) with non-convex optimization steps (corresponding to moving the spikes). Our main theoretical result is that this algorithm terminates in a finite number of steps under a mild non-degeneracy hypothesis. We then target applications of this method to several instances of single molecule fluorescence imaging modalities, among which certain approaches rely heavily on the inversion of a Laplace transform. Our second theoretical contribution is the proof of the exact support recovery property of the BLASSO to invert the 1D Laplace transform in the case of positive spikes. On the numerical side, we conclude this paper with an extensive study of the practical performance of the Sliding Frank–Wolfe on different instantiations of single molecule fluorescence imaging, including convolutive and non-convolutive (Laplace-like) operators. This shows the versatility and superiority of this method with respect to alternative sparse recovery technics. … (more)
- Is Part Of:
- Inverse problems. Volume 36:Number 1(2020)
- Journal:
- Inverse problems
- Issue:
- Volume 36:Number 1(2020)
- Issue Display:
- Volume 36, Issue 1 (2020)
- Year:
- 2020
- Volume:
- 36
- Issue:
- 1
- Issue Sort Value:
- 2020-0036-0001-0000
- Page Start:
- Page End:
- Publication Date:
- 2019-12-03
- Subjects:
- super-resolution -- convex optimization -- Frank–Wolfe -- microscopy -- sparsity -- BLASSO -- Laplace transform
Inverse problems (Differential equations) -- Periodicals
515.357 - Journal URLs:
- http://iopscience.iop.org/0266-5611 ↗
http://ioppublishing.org/ ↗ - DOI:
- 10.1088/1361-6420/ab2a29 ↗
- Languages:
- English
- ISSNs:
- 0266-5611
- Deposit Type:
- Legaldeposit
- View Content:
- Available online (eLD content is only available in our Reading Rooms) ↗
- Physical Locations:
- British Library DSC - BLDSS-3PM
British Library STI - ELD Digital store - Ingest File:
- 14189.xml