New constructions of cyclic subspace codes

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) with minimum distance 2k-2 and size r( n2rk -1)((qk-1)r(qn-1)+(qk-1)r-1(qn-1)q-1), where k|n, r≥ 2 and n≥ (2r+1)k, Gq(n,k) is the set of all k-dimensional subspaces of Fqn. The union of Sidon spaces from the second construction gives cyclic subspace codes in Gq(n,k) with minimum distance 2k-2 and size (r-1)(qk-2)(qk-1)r-1(qn-1)2 where n= 2rk and r≥ 2. Our cyclic subspace codes have larger sizes than those in the literature, in particular, in the case of n=4k, the size of our resulting code is within a factor of 12+ok(1) of the sphere-packing bound as k goes to infinity.