Phase Transitions in Sparse PCA

March 01, 2015 Β· Declared Dead Β· πŸ› International Symposium on Information Theory

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Authors Thibault Lesieur, Florent Krzakala, Lenka Zdeborova arXiv ID 1503.00338 Category cs.IT: Information Theory Cross-listed cond-mat.stat-mech, stat.ML Citations 84 Venue International Symposium on Information Theory Last Checked 4 months ago
Abstract
We study optimal estimation for sparse principal component analysis when the number of non-zero elements is small but on the same order as the dimension of the data. We employ approximate message passing (AMP) algorithm and its state evolution to analyze what is the information theoretically minimal mean-squared error and the one achieved by AMP in the limit of large sizes. For a special case of rank one and large enough density of non-zeros Deshpande and Montanari [1] proved that AMP is asymptotically optimal. We show that both for low density and for large rank the problem undergoes a series of phase transitions suggesting existence of a region of parameters where estimation is information theoretically possible, but AMP (and presumably every other polynomial algorithm) fails. The analysis of the large rank limit is particularly instructive.
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