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Sparse Approximations with Interior Point Methods

Valentina De Simone, Daniela di Serafino, Jacek Gondzio, Spyridon Pougkakiotis, Marco Viola

2022SIAM Review17 citationsDOIOpen Access PDF

Abstract

Large-scale optimization problems that seek sparse solutions have become ubiquitous. They are routinely solved with various specialized first-order methods. Although such methods are often fast, they usually struggle with not-so-well-conditioned problems. In this paper, specialized variants of an interior point-proximal method of multipliers are proposed and analyzed for problems of this class. Computational experience on a variety of problems, namely, multiperiod portfolio optimization, classification of data coming from functional magnetic resonance imaging, restoration of images corrupted by Poisson noise, and classification via regularized logistic regression, provides substantial evidence that interior point methods, equipped with suitable linear algebra, can offer a noticeable advantage over first-order approaches.

Topics & Concepts

Interior point methodClass (philosophy)Computer sciencePoint (geometry)Mathematical optimizationOptimization problemVariety (cybernetics)Poisson distributionMathematicsAlgorithmApplied mathematicsArtificial intelligenceStatisticsGeometrySparse and Compressive Sensing TechniquesAdvanced Optimization Algorithms ResearchMathematical Approximation and Integration
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