Poster
Optimal Sparse Linear Encoders and Sparse PCA
Malik Magdon-Ismail · Christos Boutsidis
Area 5+6+7+8 #131
Keywords: [ (Other) Unsupervised Learning Methods ] [ Sparsity and Feature Selection ] [ Component Analysis (ICA,PCA,CCA, FLDA) ]
Principal components analysis~(PCA) is the optimal linear encoder of data. Sparse linear encoders (e.g., sparse PCA) produce more interpretable features that can promote better generalization. (\rn{1}) Given a level of sparsity, what is the best approximation to PCA? (\rn{2}) Are there efficient algorithms which can achieve this optimal combinatorial tradeoff? We answer both questions by providing the first polynomial-time algorithms to construct \emph{optimal} sparse linear auto-encoders; additionally, we demonstrate the performance of our algorithms on real data.
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