The dimensions of Schur squares of HRS codes

Abstract

The Schur square of linear codes over a finite field has emerged as a fundamental operation in both classical and quantum coding theory. In this paper, we investigate the Schur square problem of Hyperderivative Reed-Solomon (HRS) codes. By solving certain special determinants, we first give a lower bound and an upper bound for the dimensions of Schur squares of HRS codes, and then prove that when p≥ t≥ 2s and t≤ r+2s-12, the dimension of the Schur square of the HRS code HRSt(\α1,…,αr\,s) (with length rs and dimension t) reaches the upper bound (2t-2s+1)s. In particular, when p t=2s and r≥ t+1, the dimension of the Schur square equals t(t+1)2 which is the dimension of the Schur squares of random codes with high probability. As an application in code-based cryptography, HRS codes with specific parameter settings might resist the attack of Schur square distinguisher.