English

New constructions of cyclic subspace codes

Discrete Mathematics 2023-05-26 v1 Combinatorics

Abstract

A subspace of a finite field is called a Sidon space if the product of any two of its nonzero elements is unique up to a scalar multiplier from the base field. Sidon spaces, introduced by Roth et al. (IEEE Trans Inf Theory 64(6): 4412-4422, 2018), have a close connection with optimal full-length orbit codes. In this paper, we present two constructions of Sidon spaces. The union of Sidon spaces from the first construction yields cyclic subspace codes in Gq(n,k)\mathcal{G}_{q}(n,k) with minimum distance 2k22k-2 and size r(n2rk1)((qk1)r(qn1)+(qk1)r1(qn1)q1)r(\lceil \frac{n}{2rk} \rceil -1)((q^{k}-1)^{r}(q^{n}-1)+\frac{(q^{k}-1)^{r-1}(q^{n}-1)}{q-1}), where knk|n, r2r\geq 2 and n(2r+1)kn\geq (2r+1)k, Gq(n,k)\mathcal{G}_{q}(n,k) is the set of all kk-dimensional subspaces of Fqn\mathbb{F}_{q}^{n}. The union of Sidon spaces from the second construction gives cyclic subspace codes in Gq(n,k)\mathcal{G}_{q}(n,k) with minimum distance 2k22k-2 and size (r1)(qk2)(qk1)r1(qn1)2\lfloor \frac{(r-1)(q^{k}-2)(q^{k}-1)^{r-1}(q^{n}-1)}{2}\rfloor where n=2rkn= 2rk and r2r\geq 2. Our cyclic subspace codes have larger sizes than those in the literature, in particular, in the case of n=4kn=4k, the size of our resulting code is within a factor of 12+ok(1)\frac{1}{2}+o_{k}(1) of the sphere-packing bound as kk goes to infinity.

Keywords

Cite

@article{arxiv.2305.15627,
  title  = {New constructions of cyclic subspace codes},
  author = {Shuhui Yu and Lijun Ji},
  journal= {arXiv preprint arXiv:2305.15627},
  year   = {2023}
}
R2 v1 2026-06-28T10:45:22.350Z