BCH and LCD cyclic codes of length n=λ(qm+1) over finite fields

Abstract

BCH and LCD cyclic codes of length n=λ(qm+1) with λ q-1 are studied. A complete characterization of q-cyclotomic cosets modulo n is given: Theorem th4 provides a necessary and sufficient condition for any 0 γ<n to be a coset leader, and for odd m, the two largest coset leaders are explicitly determined (Theorem th9 and Theorem th14). Based on these results, the dimensions of several families of BCH codes are determined, and the lower bound on the minimal distance of C(q,n,2δ+1,n-δ+1) is raised to 2(δ+1) (Theorem th15--th5). Notably, several of these codes are optimal. When m is odd, the necessary and sufficient condition for the BCH code C(q,n,δ,0) to be dually-BCH is proved (Theorem th11). Finally, an exact enumeration of all LCD cyclic codes of this length is derived (Theorem th3). All of the above results extend previous results that were limited to λ=1.

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