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Paper detail

Sparse Principal Component of a Rank-deficient Matrix

We consider the problem of identifying the sparse principal component of a rank-deficient matrix. We introduce auxiliary spherical variables and prove that there exists a set of candidate index-sets (that is, sets of indices to the nonzero elements of the vector argument) whose size is polynomially bounded, in terms of rank, and contains the optimal index-set, i.e. the index-set of the nonzero elements of the optimal solution. Finally, we develop an algorithm that computes the optimal sparse principal component in polynomial time for any sparsity degree.

preprint2011arXivOpen access
Megasthenis AsterisDimitris S. PapailiopoulosGeorge N. Karystinos
Systems and Controlmath.ITInformation Theorymath.OCMachine Learning
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Megasthenis AsterisDimitris S. PapailiopoulosGeorge N. Karystinos

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