• DocumentCode
    1410322
  • Title

    Minimal vectors in linear codes

  • Author

    Ashikhmin, A. ; Barg, A.

  • Author_Institution
    Los Alamos Nat. Lab., NM, USA
  • Volume
    44
  • Issue
    5
  • fYear
    1998
  • fDate
    9/1/1998 12:00:00 AM
  • Firstpage
    2010
  • Lastpage
    2017
  • Abstract
    Minimal vectors in linear codes arise in numerous applications, particularly, in constructing decoding algorithms and studying linear secret sharing schemes. However, properties and structure of minimal vectors have been largely unknown. We prove basic properties of minimal vectors in general linear codes. Then we characterize minimal vectors of a given weight and compute their number in several classes of codes, including the Hamming codes and second-order Reed-Muller codes. Further, we extend the concept of minimal vectors to codes over rings and compute them for several examples. Turning to applications, we introduce a general gradient-like decoding algorithm of which minimal-vectors decoding is an example. The complexity of minimal-vectors decoding for long codes is determined by the size of the set of minimal vectors. Therefore, we compute this size for long randomly chosen codes. Another example of algorithms in this class is given by zero-neighbors decoding. We discuss relations between the two decoding methods. In particular, we show that for even codes the set of zero neighbors is strictly optimal in this class of algorithms. This also implies that general asymptotic improvements of the zero-neighbors algorithm in the frame of gradient-like approach are impossible. We also discuss a link to secret-sharing schemes
  • Keywords
    Hamming codes; Reed-Muller codes; decoding; linear codes; vectors; Hamming codes; codes over rings; complexity; gradient-like decoding algorithm; linear codes; linear secret sharing schemes; long randomly chosen codes; minimal vectors; minimal-vectors decoding; second-order Reed-Muller codes; zero-neighbors decoding; Combinatorial mathematics; Cryptography; Decoding; Laboratories; Linear code; Postal services; Space technology; Turning; Vectors;
  • fLanguage
    English
  • Journal_Title
    Information Theory, IEEE Transactions on
  • Publisher
    ieee
  • ISSN
    0018-9448
  • Type

    jour

  • DOI
    10.1109/18.705584
  • Filename
    705584