A Note on Hamming distance of constacyclic codes of length ps over Fpm + u Fpm

Abstract

For any prime p, λ-constacyclic codes of length ps over R=Fpm + uFpm are precisely the ideals of the local ring Rλ= R[x] xps-λ , where u2=0. In this paper, we first investigate the Hamming distances of cyclic codes of length ps over R. The minimum Hamming distances of all cyclic codes of length ps over R are determined. Moreover, an isometry between cyclic and α-constacyclic codes of length ps over R is established, where α is a nonzero element of Fpm, which carries over the results regarding cyclic codes corresponding to α-constacyclic codes of length ps over R.