• DocumentCode
    745803
  • Title

    Decomposing bent functions

  • Author

    Canteaut, Anne ; Charpin, Pascale

  • Author_Institution
    INRIA, France
  • Volume
    49
  • Issue
    8
  • fYear
    2003
  • Firstpage
    2004
  • Lastpage
    2019
  • Abstract
    In a recent paper , it was shown that the restrictions of bent functions to subspaces of codimension 1 and 2 are highly nonlinear. Here, we present an extensive study of the restrictions of bent functions to affine subspaces. We propose several methods which are mainly based on properties of the derivatives and of the dual of a given bent function. We solve an open problem due to Hou . We especially describe the connection, for a bent function, between the Fourier spectra of its restrictions and the decompositions of its dual. Most notably, we show that the Fourier spectra of the restrictions of a bent function to the subspaces of codimension 2 can be explicitly derived from the Hamming weights of the second derivatives of the dual function. The last part of the paper is devoted to some infinite classes of bent functions which cannot be decomposed into four bent functions.
  • Keywords
    Boolean functions; Hamming codes; Reed-Muller codes; Fourier spectra; Hamming weights; affine subspaces; bent functions; codimension; decompositions; dual function; subspaces; Boolean functions; Cryptography; Hamming weight; Information theory; Upper bound;
  • fLanguage
    English
  • Journal_Title
    Information Theory, IEEE Transactions on
  • Publisher
    ieee
  • ISSN
    0018-9448
  • Type

    jour

  • DOI
    10.1109/TIT.2003.814476
  • Filename
    1214078