• DocumentCode
    1340113
  • Title

    Sharp Oracle Inequalities for High-Dimensional Matrix Prediction

  • Author

    Gaïffas, Stéphane ; Lecué, Guillaume

  • Author_Institution
    Lab. de Stat. Theor. et Appl., Univ. Pierre et Marie Curie - Paris 6, Paris, France
  • Volume
    57
  • Issue
    10
  • fYear
    2011
  • Firstpage
    6942
  • Lastpage
    6957
  • Abstract
    We observe (Xi,Yi)i=1n where the Yi´s are real valued outputs and the Xi´s are m × T matrices. We observe a new entry X and we want to predict the output Y associated with it. We focus on the high-dimensional setting, where mT ≫ n. This includes the matrix completion problem with noise, as well as other problems. We consider linear prediction procedures based on different penalizations, involving a mixture of several norms: the nuclear norm, the Frobenius norm and the 1-norm. For these procedures, we prove sharp oracle inequalities, using a statistical learning theory point of view. A surprising fact in our results is that the rates of convergence do not depend on m and T directly. The analysis is conducted without the usually considered incoherency condition on the unknown matrix or restricted isometry condition on the sampling operator. Moreover, our results are the first to give for this problem an analysis of penalization (such as nuclear norm penalization) as a regularization algorithm: our oracle inequalities prove that these procedures have a prediction accuracy close to the deterministic oracle one, given that the reguralization parameters are well-chosen.
  • Keywords
    matrix algebra; statistical analysis; Frobenius norm; high-dimensional matrix prediction; linear prediction procedures; matrix completion problem; regularization algorithm; sharp oracle inequality; statistical learning theory; Covariance matrix; Linear matrix inequalities; Matrix decomposition; Noise; Noise measurement; Risk management; Upper bound; Empirical process theory; Schatten norms; empirical risk minimization; high-dimensional matrix; matrix completion; nuclear norm; oracle inequalities; sparsity;
  • fLanguage
    English
  • Journal_Title
    Information Theory, IEEE Transactions on
  • Publisher
    ieee
  • ISSN
    0018-9448
  • Type

    jour

  • DOI
    10.1109/TIT.2011.2136318
  • Filename
    6034724