• DocumentCode
    997951
  • Title

    On sparse representations in arbitrary redundant bases

  • Author

    Fuchs, Jean-Jacques

  • Author_Institution
    IRISA/Univ. de Rennes, France
  • Volume
    50
  • Issue
    6
  • fYear
    2004
  • fDate
    6/1/2004 12:00:00 AM
  • Firstpage
    1341
  • Lastpage
    1344
  • Abstract
    The purpose of this contribution is to generalize some recent results on sparse representations of signals in redundant bases. The question that is considered is the following: given a matrix A of dimension (n,m) with m>n and a vector b=Ax, find a sufficient condition for b to have a unique sparsest representation x as a linear combination of columns of A. Answers to this question are known when A is the concatenation of two unitary matrices and either an extensive combinatorial search is performed or a linear program is solved. We consider arbitrary A matrices and give a sufficient condition for the unique sparsest solution to be the unique solution to both a linear program or a parametrized quadratic program. The proof is elementary and the possibility of using a quadratic program opens perspectives to the case where b=Ax+e with e a vector of noise or modeling errors.
  • Keywords
    combinatorial mathematics; linear programming; matrix algebra; quadratic programming; signal representation; combinatorial search; global matched filter; linear program; modeling error; noise; parametrized quadratic program; redundant dictionaries; sparse signal representation; unitary matrix; Dictionaries; Matched filters; Parameter estimation; Quadratic programming; Sparse matrices; Sufficient conditions; System testing; Vectors; Basis pursuit; global matched filter; linear program; quadratic program; redundant dictionaries; sparse representations;
  • fLanguage
    English
  • Journal_Title
    Information Theory, IEEE Transactions on
  • Publisher
    ieee
  • ISSN
    0018-9448
  • Type

    jour

  • DOI
    10.1109/TIT.2004.828141
  • Filename
    1302316