The twisted squaring construction, trellis complexity, and generalized weights of BCH and QR codes

نویسندگان

  • Yuval Berger
  • Yair Be'ery
چکیده

The structure of the twisted squaring construction, a generalization of the squaring construction, is studied with respect to trellis diagrams and complexity. We show that binary affine-invariant codes, which include the extended primitive BCH codes, and the extended binary quadratic-residue codes, are equivalent to twisted squaring construction codes. In particular, a recursive symmetric reversible design of the BCH codes is derived. Using these constructions, the parameters of the minimal trellis diagram of the BCH codes are determined, including the componentwise state-space profile and trellis complexity. New designs and permutations that yield low trellis complexity for the quadratic-residue codes are presented. Generalized Hamming weights are derived from these constructions. As an example, the (48,24,12) quadratic-residue code is analyzed, a strictly componentwise optimal permutation is derived, and the corresponding state-space profile and complete generalized Hamming weight hierarchy are obtained.

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عنوان ژورنال:
  • IEEE Trans. Information Theory

دوره 42  شماره 

صفحات  -

تاریخ انتشار 1996