• DocumentCode
    771773
  • Title

    Generalized Hermitian Codes Over \\hbox {GF}(2^{r})

  • Author

    Bulygin, S.V.

  • Author_Institution
    Dept. of Math., Tech. Univ. of Kaiserslautern
  • Volume
    52
  • Issue
    10
  • fYear
    2006
  • Firstpage
    4664
  • Lastpage
    4669
  • Abstract
    In this correspondence, a generalization of Hermitian function field proposed by Garcia and Stichtenoth is studied. A Weierstrass semigroup of the point at infinity for the case q = 2, r ges 3 is calculated. It turns out that unlike for the Hermitian case, there are already three generators for the semigroup. This result then is applied to codes, constructed on generalized Hermitian (GH) function fields. Further, results of Kirfel and Pellikaan are applied to estimating a Feng-Rao designed distance for GH codes, which improve on the Goppa designed minimum distance. Next, the question of codes dual to GH codes is studied. It is shown that the duals are also GH codes and an explicit formula is given. In particular, this formula enables one to calculate the parameters of a dual code. A new record-giving [32,16, ges 12]-code over GF(8) is presented as one of the examples
  • Keywords
    Galois fields; Goppa codes; dual codes; Feng-Rao designed distance; GF; GH code; Goppa designed minimum distance; dual code; generalized Hermitian code; Codes; Equations; Focusing; H infinity control; Mathematics; Parameter estimation; Polynomials; Algebraic-geometry (AG) code; Hermitian code; Weierstrass semigroup; dual code; telescopic semigroup;
  • fLanguage
    English
  • Journal_Title
    Information Theory, IEEE Transactions on
  • Publisher
    ieee
  • ISSN
    0018-9448
  • Type

    jour

  • DOI
    10.1109/TIT.2006.881831
  • Filename
    1705026