The Gray image of constacyclic codes over the finite chain ring Fpm[u]/ uk

Abstract

Let Fpm be a finite field of cardinality pm, where p is a prime, and k, N be any positive integers. We denote Rk=Fpm[u]/ uk =Fpm+uFpm+…+uk-1Fpm (uk=0) and λ=a0+a1u+…+ak-1uk-1 where a0, a1,…, ak-1∈ Fpm satisfying a0≠ 0 and a1=1. Let r be a positive integer satisfying pr-1+1≤ k≤ pr. We defined a Gray map from Rk to Fpmpr first, then prove that the Gray image of any linear λ-constacyclic code over Rk of length N is a distance invariant linear a0pr-constacyclic code over Fpm of length prN. Furthermore, the generator polynomials for each linear λ-constacyclic code over Rk of length N and its Gray image are given respectively. Finally, some optimal constacyclic codes over F3 and F5 are constructed.