English

On Decoding High-Order Interleaved Sum-Rank-Metric Codes

Information Theory 2023-03-31 v1 math.IT

Abstract

We consider decoding of vertically homogeneous interleaved sum-rank-metric codes with high interleaving order ss, that are constructed by stacking ss codewords of a single constituent code. We propose a Metzner--Kapturowski-like decoding algorithm that can correct errors of sum-rank weight t<=d2t <= d-2, where dd is the minimum distance of the code, if the interleaving order s>ts > t and the error matrix fulfills a certain rank condition. The proposed decoding algorithm generalizes the Metzner--Kapturowski(-like) decoders in the Hamming metric and the rank metric and has a computational complexity of O~(max(n3,n2s))\tilde{O}(\max(n^3, n^2 s)) operations in Fqm\mathbb{F}_{q^m}, where nn is the length of the code. The scheme performs linear-algebraic operations only and thus works for any interleaved linear sum-rank-metric code. We show how the decoder can be used to decode high-order interleaved codes in the skew metric. Apart from error control, the proposed decoder allows to determine the security level of code-based cryptosystems based on interleaved sum-rank metric codes.

Keywords

Cite

@article{arxiv.2303.17454,
  title  = {On Decoding High-Order Interleaved Sum-Rank-Metric Codes},
  author = {Thomas Jerkovits and Felicitas Hörmann and Hannes Bartz},
  journal= {arXiv preprint arXiv:2303.17454},
  year   = {2023}
}
R2 v1 2026-06-28T09:41:28.260Z