English

The Sliding Frank-Wolfe Algorithm and its Application to Super-Resolution Microscopy

Numerical Analysis 2018-11-16 v1 Optimization and Control

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 1 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 1-D 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.

Keywords

Cite

@article{arxiv.1811.06416,
  title  = {The Sliding Frank-Wolfe Algorithm and its Application to Super-Resolution Microscopy},
  author = {Quentin Denoyelle and Vincent Duval and Gabriel Peyré and Emmanuel Soubies},
  journal= {arXiv preprint arXiv:1811.06416},
  year   = {2018}
}
R2 v1 2026-06-23T05:17:08.160Z