English

Partial permutation decoding for binary linear and Z4-linear Hadamard codes

Information Theory 2016-05-03 v2 Discrete Mathematics math.IT

Abstract

Permutation decoding is a technique which involves finding a subset SS, called PD-set, of the permutation automorphism group of a code CC in order to assist in decoding. An explicit construction of 2mm11+m\left \lfloor{\frac{2^m-m-1}{1+m}} \right \rfloor-PD-sets of minimum size 2mm11+m+1\left \lfloor{\frac{2^m-m-1}{1+m}} \right \rfloor + 1 for partial permutation decoding for binary linear Hadamard codes HmH_m of length 2m2^m, for all m4m\geq 4, is described. Moreover, a recursive construction to obtain ss-PD-sets of size ll for Hm+1H_{m+1} of length 2m+12^{m+1}, from a given ss-PD-set of the same size for HmH_m, is also established. These results are generalized to find ss-PD-sets for (nonlinear) binary Hadamard codes of length 2m2^m, called Z4\mathbb{Z}_4-linear Hadamard codes, which are obtained as the Gray map image of quaternary linear codes of length 2m12^{m-1}.

Keywords

Cite

@article{arxiv.1512.01839,
  title  = {Partial permutation decoding for binary linear and Z4-linear Hadamard codes},
  author = {Roland D. Barrolleta and Mercè Villanueva},
  journal= {arXiv preprint arXiv:1512.01839},
  year   = {2016}
}
R2 v1 2026-06-22T12:02:40.453Z