• DocumentCode
    1015761
  • Title

    Self-Orthogonality of q -Ary Images of qm -Ary Codes and Quantum Code Construction

  • Author

    B, Sundeep ; Thangaraj, Andrew

  • Author_Institution
    Univ. of Chicago, Chicago
  • Volume
    53
  • Issue
    7
  • fYear
    2007
  • fDate
    7/1/2007 12:00:00 AM
  • Firstpage
    2480
  • Lastpage
    2489
  • Abstract
    A code over GF can be imaged or expanded into a code over GF using a basis for the extension field over the base field. The properties of such an image depend on the original code and the basis chosen for imaging. Problems relating the properties of a code and its image with respect to a basis have been of great interest in the field of coding theory. In this work, a generalized version of the problem of self-orthogonality of the q-ary image of a qm-ary code has been considered. Given an inner product (more generally, a bi-additive form), necessary and sufficient conditions have been derived for a code over a field extension and an expansion basis so that an image of that code is self-orthogonal. The conditions require that the original code be self-orthogonal with respect to several related bi-additive forms whenever certain power sums of the dual basis elements do not vanish. Numerous interesting corollaries have been derived by specializing the general conditions. An interesting result for the canonical or regular inner product in fields of characteristic two is that only self-orthogonal codes result in self-orthogonal images. Another result is that image of a code is self-orthogonal for all bases if and only if trace of the code is self-orthogonal, except for the case of binary images of 4-ary codes. The conditions are particularly simple to state and apply for cyclic codes. To illustrate a possible application, new quantum error-correcting codes have been constructed with larger minimum distance than previously known.
  • Keywords
    cyclic codes; error correction codes; image coding; orthogonal codes; coding theory; cyclic codes; q-Ary images; qm-Ary codes; quantum code construction; quantum error-correcting codes; self-orthogonality problem; Codes; Decoding; Drives; Galois fields; Hard disks; Image analysis; Image coding; Protection; Sufficient conditions; Images of codes; quantum codes; self-orthogonality; trace of codes;
  • fLanguage
    English
  • Journal_Title
    Information Theory, IEEE Transactions on
  • Publisher
    ieee
  • ISSN
    0018-9448
  • Type

    jour

  • DOI
    10.1109/TIT.2007.899539
  • Filename
    4252318