• DocumentCode
    1681596
  • Title

    Simultaneous polynomial approximation and total variation denoising

  • Author

    Selesnick, I.W.

  • Author_Institution
    Polytech. Inst. of New York Univ., Brooklyn, NY, USA
  • fYear
    2013
  • Firstpage
    5944
  • Lastpage
    5948
  • Abstract
    This paper addresses the problem of smoothing data with additive step discontinuities. The problem formulation is based on least square polynomial approximation and total variation denoising. In earlier work, an ADMM algorithm was proposed to minimize a suitably defined sparsity-promoting cost function. In this paper, an algorithm is derived using the majorization-minimization optimization procedure. The new algorithm converges faster and, unlike the ADMM algorithm, has no parameters that need to be set. The proposed algorithm is formulated so as to utilize fast solvers for banded systems for high computational efficiency. This paper also gives optimality conditions so that the optimality of a result produced by the numerical algorithm can be readily validated.
  • Keywords
    least squares approximations; minimisation; polynomial approximation; signal denoising; smoothing methods; ADMM algorithm; additive step discontinuity; alternating direction method of multiplier algorithm; banded systems; least square polynomial approximation; majorization-minimization optimization procedure; numerical algorithm; signal denoising; simultaneous polynomial approximation; smoothing data; sparsity-promoting cost function; total variation denoising; Approximation algorithms; Approximation methods; Convergence; Cost function; Noise reduction; Polynomials; Signal processing algorithms;
  • fLanguage
    English
  • Publisher
    ieee
  • Conference_Titel
    Acoustics, Speech and Signal Processing (ICASSP), 2013 IEEE International Conference on
  • Conference_Location
    Vancouver, BC
  • ISSN
    1520-6149
  • Type

    conf

  • DOI
    10.1109/ICASSP.2013.6638805
  • Filename
    6638805