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  • 标题:Computing the degrees of freedom of rank-regularized estimators and cousins
  • 本地全文:下载
  • 作者:Rahul Mazumder ; Haolei Weng
  • 期刊名称:Electronic Journal of Statistics
  • 印刷版ISSN:1935-7524
  • 出版年度:2020
  • 卷号:14
  • 期号:1
  • 页码:1348-1385
  • DOI:10.1214/20-EJS1681
  • 语种:English
  • 出版社:Institute of Mathematical Statistics
  • 摘要:Estimating a low rank matrix from its linear measurements is a problem of central importance in contemporary statistical analysis. The choice of tuning parameters for estimators remains an important challenge from a theoretical and practical perspective. To this end, Stein’s Unbiased Risk Estimate (SURE) framework provides a well-grounded statistical framework for degrees of freedom estimation. In this paper, we use the SURE framework to obtain degrees of freedom estimates for a general class of spectral regularized matrix estimators—our results generalize beyond the class of estimators that have been studied thus far. To this end, we use a result due to Shapiro (2002) pertaining to the differentiability of symmetric matrix valued functions, developed in the context of semidefinite optimization algorithms. We rigorously verify the applicability of Stein’s Lemma towards the derivation of degrees of freedom estimates; and also present new techniques based on Gaussian convolution to estimate the degrees of freedom of a class of spectral estimators, for which Stein’s Lemma does not directly apply.
  • 关键词:Degrees of freedom; divergence; low rank; matrix valued function; regularization; spectral function; SURE
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