On self-duality and hulls of cyclic codes over F2m[u] uk with oddly even length

Abstract

Let F2m be a finite field of 2m elements, and R=F2m[u]/ uk=F2m+uF2m+…+uk-1F2m (uk=0) where k is an integer satisfying k≥ 2. For any odd positive integer n, an explicit representation for every self-dual cyclic code over R of length 2n and a mass formula to count the number of these codes are given first. Then a generator matrix is provided for the self-dual and 2-quasi-cyclic code of length 4n over F2m derived by every self-dual cyclic code of length 2n over F2m+uF2m and a Gray map from F2m+uF2m onto F2m2. Finally, the hull of each cyclic code with length 2n over F2m+uF2m is determined and all distinct self-orthogonal cyclic codes of length 2n over F2m+uF2m are listed.