TwoGeneralizationsforQuadraticResidueCodesoverFiniteFields

Abstract

It's well known that the quadratic residue code over finite fields is an interesting class of cyclic codes for its higher minimum distance. Let g be a positive integer and p,p1,…, pg be distinct odd primes, the present paper generalizes the constructions for the quadratic residue code with length p to be the length n=p1·s pg, and to be the case m-th residue codes with length p over finite fields, where m≥ 2 is a positive integer. Furthermore, a criterion for that these codes are self-orthogonal or complementary dual is obtained, and then the corresponding counting formula are given. In particular, the minimum distance of all 24 quaternary quadratic residue codes [15,8] are determined.