Two classes of p-ary linear codes and their duals

Abstract

Let Fpm be the finite field of order pm, where p is an odd prime and m is a positive integer. In this paper, we investigate a class of subfield codes of linear codes and obtain the weight distribution of equation* split Ck=\(( Tr1m(axpk+1+bx)+c)x ∈ Fpm, Tr1m(a)) : \, a,b ∈ Fpm, c ∈ Fp\, split equation* where k is a nonnegative integer. Our results generalize the results of the subfield codes of the conic codes in Hengar. Among other results, we study the punctured code of Ck, which is defined as Ck=\( Tr1m(a xpk+1+bx)+c)x ∈ Fpm : \, a,b ∈ Fpm, \,\,c ∈ Fp\. The parameters of these linear codes are new in some cases. Some of the presented codes are optimal or almost optimal. Moreover, let v2(·) denote the 2-adic order function and v2(0)=∞, the duals of Ck and Ck are optimal with respect to the Sphere Packing bound if p>3, and the dual of Ck is an optimal ternary linear code for the case v2(m)≤ v2(k) if p=3 and m>1.