Construction of quasi-cyclic self-dual codes

Abstract

There is a one-to-one correspondence between -quasi-cyclic codes over a finite field Fq and linear codes over a ring R = Fq[Y]/(Ym-1). Using this correspondence, we prove that every -quasi-cyclic self-dual code of length m over a finite field Fq can be obtained by the building-up construction, provided that char ( Fq)=2 or q 1 4, m is a prime p, and q is a primitive element of Fp. We determine possible weight enumerators of a binary -quasi-cyclic self-dual code of length p (with p a prime) in terms of divisibility by p. We improve the result of [3] by constructing new binary cubic (i.e., -quasi-cyclic codes of length 3) optimal self-dual codes of lengths 30, 36, 42, 48 (Type I), 54 and 66. We also find quasi-cyclic optimal self-dual codes of lengths 40, 50, and 60. When m=5, we obtain a new 8-quasi-cyclic self-dual [40, 20, 12] code over F3 and a new 6-quasi-cyclic self-dual [30, 15, 10] code over F4. When m=7, we find a new 4-quasi-cyclic self-dual [28, 14, 9] code over F4 and a new 6-quasi-cyclic self-dual [42,21,12] code over F4.