• DocumentCode
    1451857
  • Title

    Trace Representation and Linear Complexity of Binary e th Power Residue Sequences of Period p

  • Author

    Dai, Zongduo ; Gong, Guang ; Song, Hong-Yeop ; Ye, Dingfeng

  • Author_Institution
    State Key Lab. of Inf. Security, Chinese Acad. of Sci., Beijing, China
  • Volume
    57
  • Issue
    3
  • fYear
    2011
  • fDate
    3/1/2011 12:00:00 AM
  • Firstpage
    1530
  • Lastpage
    1547
  • Abstract
    Let p = ef + 1 be an odd prime for some e and e and let f, be the finite field with Fp elements. In this paper, we explicitly describe the trace representations of the binary characteristic sequences (of period p) of all the cyclic difference sets D which are some union of cosets of eth powers He in Fp* (=Δ Fp{0}) for e ≤ 12. For this, we define eth power residue sequences of period p, which include all the binary characteristic sequences mentioned above as special cases, and reduce the problem of determining their trace representations to that of determining the values of the generating polynomials of cosets of He in Fρ* at some primitive pth root of unity, and some properties of these values are investigated. Based on these properties, the trace representation and linear complexity not only of the characteristic sequences of all the known eth residue difference sets, but of all the sixth power residue sequences are determined. Furthermore, we have determined the linear complexity of a nonconstant eth power residue sequence for any e to be either p - 1 or p whenever (e, (p-1)/n) = 1, where n is the order of 2 mod p.
  • Keywords
    binary sequences; polynomial approximation; residue codes; binary characteristic sequences; linear complexity; power residue sequences; trace representation; Binary sequences; Complexity theory; Correlation; Generators; Hamming weight; Indexes; Polynomials; $e$th residue cyclic difference sets; Binary sequences with two-level autocorrelation; cyclic difference sets; linear complexity; minimal polynomials; trace representations;
  • fLanguage
    English
  • Journal_Title
    Information Theory, IEEE Transactions on
  • Publisher
    ieee
  • ISSN
    0018-9448
  • Type

    jour

  • DOI
    10.1109/TIT.2010.2103757
  • Filename
    5714271