Robustifying FISTA via the infinity norm of its smooth component's gradient

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3 Scopus citations

Abstract

The FISTA is a well-known and fast procedure for solving optimization problems composed by the sum of two convex functions, i.e. F = f + g, such that ?f is L-Lipschitz continuous and g is possibly nonsmooth.FISTA's well-studied theoretical RoC (rate of convergence) is \mathcal{O}\left( {{k^{ - 2}}} \right); however, in the praxis, it depends on both, the extragradient rule and the step-size (SS) that estimates L. An ill-chosen SS (i.e. a large pre-defined constant), at worst, can force the objective to diverge; furthermore, some adaptive SS methods (i.e. line search, Cauchy, etc.) can slow down or force the objective to present an oscillatory behavior.In this work we present a simple add-on feature to robustify FISTA against an ill-chosen SS when F is the l1 regularized problem. It is based on modifying some entries of ?fk so as to \left\{ {{{\left\| {\nabla {f_k}} \right\|}_\infty }} \right\} is turned into a non-increasing sequence. Furthermore, tracking and limiting \left\{ {{{\left\| {\nabla {f_k}} \right\|}_\infty }} \right\} can be used (i) as an early warning method to avoid divergence k } and (ii) to allow larger or even consistently increasing SS sequences.Our computational results particularly target Convolutional Sparse Representations (CSR), where our method indeed boots FISTA's practical performance.

Original languageEnglish
Title of host publicationConference Record of the 54th Asilomar Conference on Signals, Systems and Computers, ACSSC 2020
EditorsMichael B. Matthews
PublisherIEEE Computer Society
Pages341-342
Number of pages2
ISBN (Electronic)9780738131269
DOIs
StatePublished - 1 Nov 2020
Event54th Asilomar Conference on Signals, Systems and Computers, ACSSC 2020 - Pacific Grove, United States
Duration: 1 Nov 20205 Nov 2020

Publication series

NameConference Record - Asilomar Conference on Signals, Systems and Computers
Volume2020-November
ISSN (Print)1058-6393

Conference

Conference54th Asilomar Conference on Signals, Systems and Computers, ACSSC 2020
Country/TerritoryUnited States
CityPacific Grove
Period1/11/205/11/20

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