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arxiv: 1805.06834 · v3 · pith:IRHT2WPHnew · submitted 2018-05-17 · 💻 cs.LG · cond-mat.dis-nn· cs.IT· math.IT· stat.ML

Subspace Estimation from Incomplete Observations: A High-Dimensional Analysis

classification 💻 cs.LG cond-mat.dis-nncs.ITmath.ITstat.ML
keywords algorithmsanalysishigh-dimensionalsubspaceestimationgivengrouseincomplete
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We present a high-dimensional analysis of three popular algorithms, namely, Oja's method, GROUSE and PETRELS, for subspace estimation from streaming and highly incomplete observations. We show that, with proper time scaling, the time-varying principal angles between the true subspace and its estimates given by the algorithms converge weakly to deterministic processes when the ambient dimension $n$ tends to infinity. Moreover, the limiting processes can be exactly characterized as the unique solutions of certain ordinary differential equations (ODEs). A finite sample bound is also given, showing that the rate of convergence towards such limits is $\mathcal{O}(1/\sqrt{n})$. In addition to providing asymptotically exact predictions of the dynamic performance of the algorithms, our high-dimensional analysis yields several insights, including an asymptotic equivalence between Oja's method and GROUSE, and a precise scaling relationship linking the amount of missing data to the signal-to-noise ratio. By analyzing the solutions of the limiting ODEs, we also establish phase transition phenomena associated with the steady-state performance of these techniques.

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