An explicit representation and enumeration for self-dual cyclic codes over F2m+uF2m of length 2s

Abstract

Let F2m be a finite field of cardinality 2m and s a positive integer. Using properties for Kronecker product of matrices and calculation for linear equations over F2m, an efficient method for the construction of all distinct self-dual cyclic codes with length 2s over the finite chain ring F2m+uF2m (u2=0) is provided. On that basis, an explicit representation for every self-dual cyclic code of length 2s over F2m+uF2m and an exact formula to count the number of all these self-dual cyclic codes are given.