English

Explicit List-Decodable Linearized Reed-Solomon and Folded Linearized Reed-Solomon Subcodes

Information Theory 2026-02-10 v2 math.IT

Abstract

The sum-rank metric is the mixture of the Hamming and rank metrics. The sum-rank metric found its application in network coding, locally repairable codes, space-time coding, and quantum-resistant cryptography. Linearized Reed-Solomon (LRS) codes are the sum-rank analogue of Reed-Solomon codes and strictly generalize both Reed-Solomon and Gabidulin codes. In this work, we construct an explicit family of Fh\mathbb{F}_h-linear sum-rank metric codes over arbitrary fields Fh\mathbb{F}_h. Our construction enables efficient list decoding up to a fraction ρ\rho of errors in the sum-rank metric with rate 1ρε1-\rho-\varepsilon, for any desired ρ(0,1)\rho \in (0,1) and ε>0\varepsilon>0. Our codes are subcodes of LRS codes, obtained by restricting message polynomials to an Fh\mathbb{F}_h-subspace derived from subspace designs, and the decoding list size is bounded by hpoly(1/ε)h^{\mathrm{poly}(1/\varepsilon)}. Beyond the standard LRS setting, we further extend our linear-algebraic decoding framework to folded Linearized Reed-Solomon (FLRS) codes. We show that folded evaluations satisfy appropriate interpolation conditions and that the corresponding solution space forms a low-dimensional, structured affine subspace. This structure enables effective control of the list size and yields the first explicit positive-rate FLRS subcodes that are efficiently list decodable beyond the unique-decoding radius. To the best of our knowledge, this also constitutes the first explicit construction of positive-rate sum-rank metric codes that admit efficient list decoding beyond the unique decoding radius, thereby providing a new general framework for constructing efficiently decodable codes under the sum-rank metric.

Keywords

Cite

@article{arxiv.2602.05462,
  title  = {Explicit List-Decodable Linearized Reed-Solomon and Folded Linearized Reed-Solomon Subcodes},
  author = {Kuo Shang and Chen Yuan and Ruiqi Zhu},
  journal= {arXiv preprint arXiv:2602.05462},
  year   = {2026}
}

Comments

28 pages

R2 v1 2026-07-01T09:37:31.787Z