• DocumentCode
    1341699
  • Title

    Covariance Estimation in Decomposable Gaussian Graphical Models

  • Author

    Wiesel, Ami ; Eldar, Yonina C. ; Hero, Alfred O., III

  • Author_Institution
    Dept. of Electr. Eng. & Comput. Sci., Univ. of Michigan, Ann Arbor, MI, USA
  • Volume
    58
  • Issue
    3
  • fYear
    2010
  • fDate
    3/1/2010 12:00:00 AM
  • Firstpage
    1482
  • Lastpage
    1492
  • Abstract
    Graphical models are a framework for representing and exploiting prior conditional independence structures within distributions using graphs. In the Gaussian case, these models are directly related to the sparsity of the inverse covariance (concentration) matrix and allow for improved covariance estimation with lower computational complexity. We consider concentration estimation with the mean-squared error (MSE) as the objective, in a special type of model known as decomposable. This model includes, for example, the well known banded structure and other cases encountered in practice. Our first contribution is the derivation and analysis of the minimum variance unbiased estimator (MVUE) in decomposable graphical models. We provide a simple closed form solution to the MVUE and compare it with the classical maximum likelihood estimator (MLE) in terms of performance and complexity. Next, we extend the celebrated Stein´s unbiased risk estimate (SURE) to graphical models. Using SURE, we prove that the MSE of the MVUE is always smaller or equal to that of the biased MLE, and that the MVUE itself is dominated by other approaches. In addition, we propose the use of SURE as a constructive mechanism for deriving new covariance estimators. Similarly to the classical MLE, all of our proposed estimators have simple closed form solutions but result in a significant reduction in MSE.
  • Keywords
    Gaussian distribution; computational complexity; covariance analysis; maximum likelihood estimation; mean square error methods; signal processing; MLE; MSE; MVUE; SURE; Stein´s unbiased risk estimate; computational complexity; covariance estimation; decomposable Gaussian graphical models; inverse covariance matrix sparsity; maximum likelihood estimator; mean-squared error; minimum variance unbiased estimation; prior conditional independence structures; statistical signal processing; Covariance estimation; graphical models; minimum variance unbiased estimation;
  • fLanguage
    English
  • Journal_Title
    Signal Processing, IEEE Transactions on
  • Publisher
    ieee
  • ISSN
    1053-587X
  • Type

    jour

  • DOI
    10.1109/TSP.2009.2037350
  • Filename
    5340697