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An Alternating Manifold Proximal Gradient Method for Sparse Principal Component Analysis and Sparse Canonical Correlation Analysis

Shixiang Chen, Shiqian Ma, Lingzhou Xue, Hui Zou

2020INFORMS Journal on Optimization28 citationsDOIOpen Access PDF

Abstract

Sparse principal component analysis and sparse canonical correlation analysis are two essential techniques from high-dimensional statistics and machine learning for analyzing large-scale data. Both problems can be formulated as an optimization problem with nonsmooth objective and nonconvex constraints. Because nonsmoothness and nonconvexity bring numerical difficulties, most algorithms suggested in the literature either solve some relaxations of them or are heuristic and lack convergence guarantees. In this paper, we propose a new alternating manifold proximal gradient method to solve these two high-dimensional problems and provide a unified convergence analysis. Numerical experimental results are reported to demonstrate the advantages of our algorithm.

Topics & Concepts

Canonical correlationPrincipal component analysisConvergence (economics)Sparse approximationManifold (fluid mechanics)Proximal Gradient MethodsComputer scienceMathematical optimizationComponent analysisMathematicsHeuristicSparse PCASparse matrixAlgorithmApplied mathematicsGradient descentArtificial intelligenceEconomic growthArtificial neural networkEconomicsQuantum mechanicsPhysicsEngineeringGaussianMechanical engineeringSparse and Compressive Sensing TechniquesFace and Expression RecognitionBlind Source Separation Techniques