• DocumentCode
    805234
  • Title

    Tailbiting codes obtained via convolutional codes with large active distance-slopes

  • Author

    Bocharova, Irina E. ; Handlery, Marc ; Johannesson, Rolf ; Kudryashov, Boris D.

  • Author_Institution
    Dept. of Inf. Syst., St. Petersburg Univ. on Aerosp. Instrum., Russia
  • Volume
    48
  • Issue
    9
  • fYear
    2002
  • fDate
    9/1/2002 12:00:00 AM
  • Firstpage
    2577
  • Lastpage
    2587
  • Abstract
    The slope of the active distances is an important parameter when investigating the error-correcting capability of convolutional codes and the distance behavior of concatenated convolutional codes. The slope of the active distances is equal to the minimum average weight cycle in the state-transition diagram of the encoder. A general upper bound on the slope depending on the free distance of the convolutional code and new upper bounds on the slope of special classes of binary convolutional codes are derived. Moreover, a search technique, resulting in new tables of rate R=1/2 and rate R=1/3 convolutional encoders with high memories and large active distance-slopes is presented. Furthermore, we show that convolutional codes with large slopes can be used to obtain new tailbiting block codes with large minimum distances. Tables of rate R=1/2 and rate R=1/3 tailbiting codes with larger minimum distances than the best previously known quasi-cyclic codes are given. Two new tailbiting codes also have larger minimum distances than the best previously known binary linear block codes with same size and length. One of them is also superior in terms of minimum distance to any previously known binary nonlinear block code with the same set of parameters.
  • Keywords
    concatenated codes; convolutional codes; error correction codes; search problems; active distance-slopes; binary convolutional codes; concatenated convolutional codes; convolutional codes; distance behavior; error-correcting capability; minimum average weight cycle; minimum distances; search technique; state-transition diagram; tailbiting codes; upper bound; Block codes; Concatenated codes; Convolutional codes; Error correction codes; Error probability; Hamming distance; Information theory; Mathematics; Parity check codes; Upper bound;
  • fLanguage
    English
  • Journal_Title
    Information Theory, IEEE Transactions on
  • Publisher
    ieee
  • ISSN
    0018-9448
  • Type

    jour

  • DOI
    10.1109/TIT.2002.801475
  • Filename
    1027787