On the Maximal Length of MDS Elliptic Codes

Abstract

The determination of the maximal length of maximum distance separable (MDS) codes arising from elliptic curves is a central problem in coding theory. For an elliptic curve E over Fq, let MEC(k,q) denote the maximal length of a q-ary MDS elliptic code of dimension k. It was recently shown that MEC(k,q)q+12+q for q289 and 3 k(q+1-2q)/10, with equality for odd k when q is an odd square. This paper investigates the remaining open cases, namely even dimension k, non-square q and fields of characteristic 2, and provides a complete resolution of the tightness question for the two natural parity regimes of q+1+ 2q. We prove that if the support of G (used to define the code) consists of Fq-rational points, the bound decreases to q+12+q-1 for even k. Without this restriction, we construct MDS codes attaining q+12+q for even k. More generally, we establish MEC(k,q)=q+1+2q2 when q+1+2q is even, and MEC(k,q)=q+2q2 when it is odd.