Quadratic residue codes over the ring Fp[u]/ um-u and their Gray images

Abstract

Let m≥ 2 be any natural number and let R=Fp+uFp+u2Fp+·s+um-1Fp be a finite non-chain ring, where um=u and p is a prime congruent to 1 modulo (m-1). In this paper we study quadratic residue codes over the ring R and their extensions. A gray map from R to Fpm is defined which preserves self duality of linear codes. As a consequence self dual, formally self dual and self orthogonal codes are constructed. To illustrate this several examples of self-dual, self orthogonal and formally self-dual codes are given. Among others a [9,3,6] linear code over F7 is constructed which is self-orthogonal as well as nearly MDS. The best known linear code with these parameters (ref. Magma) is not self orthogonal.