• DocumentCode
    1017277
  • Title

    Gradient Projection for Sparse Reconstruction: Application to Compressed Sensing and Other Inverse Problems

  • Author

    Figueiredo, Mário A T ; Nowak, Robert D. ; Wright, Stephen J.

  • Author_Institution
    Inst. de Telecommun., Inst. Superior Tecnico, Lisbon, Portugal
  • Volume
    1
  • Issue
    4
  • fYear
    2007
  • Firstpage
    586
  • Lastpage
    597
  • Abstract
    Many problems in signal processing and statistical inference involve finding sparse solutions to under-determined, or ill-conditioned, linear systems of equations. A standard approach consists in minimizing an objective function which includes a quadratic (squared ) error term combined with a sparseness-inducing regularization term. Basis pursuit, the least absolute shrinkage and selection operator (LASSO), wavelet-based deconvolution, and compressed sensing are a few well-known examples of this approach. This paper proposes gradient projection (GP) algorithms for the bound-constrained quadratic programming (BCQP) formulation of these problems. We test variants of this approach that select the line search parameters in different ways, including techniques based on the Barzilai-Borwein method. Computational experiments show that these GP approaches perform well in a wide range of applications, often being significantly faster (in terms of computation time) than competing methods. Although the performance of GP methods tends to degrade as the regularization term is de-emphasized, we show how they can be embedded in a continuation scheme to recover their efficient practical performance.
  • Keywords
    deconvolution; inverse problems; optimisation; signal reconstruction; statistical analysis; Barzilai-Borwein method; bound-constrained quadratic programming; compressed sensing; convex optimization; gradient projection; inverse problems; least absolute shrinkage selection operator; line search parameters; quadratic error; regularization; signal processing; sparse reconstruction; sparseness-inducing regularization; statistical inference; wavelet-based deconvolution; Compressed sensing; Deconvolution; Degradation; Equations; Inverse problems; Linear systems; Quadratic programming; Signal processing; Signal processing algorithms; Testing; Compressed sensing; convex optimization; deconvolution; gradient projection; quadratic programming; sparse reconstruction; sparseness;
  • fLanguage
    English
  • Journal_Title
    Selected Topics in Signal Processing, IEEE Journal of
  • Publisher
    ieee
  • ISSN
    1932-4553
  • Type

    jour

  • DOI
    10.1109/JSTSP.2007.910281
  • Filename
    4407762