On the Euclidean duals of the cyclic codes generated via cyclotomic polynomials

Abstract

For a natural number n2 which is co-prime to Char(Fq), let Cn and Cn,1 denote the cyclic codes of length n over Fq generated by the n-th cyclotomic polynomial Qn(x) and the polynomial Qn(x)Q1(x), respectively. In BHAGAT2025, the minimum distances of the codes Cn and Cn,1 were determined, and a conjecture regarding the minimum distances of their Euclidean duals was proposed. In this article, we completely describe the structure of these dual codes and as a consequence, we find their minimum distances explicitly as functions of n. In fact, we resolve the conjecture in BHAGAT2025 by proving that the minimum distance of the Euclidean dual of each of Cn and Cn,1 is equal to 2ω(n).