Improvement of the square-root low bounds on the minimum distances of BCH codes and Matrix-product codes
Abstract
The task of constructing infinite families of self-dual codes with unbounded lengths and minimum distances exhibiting square-root lower bounds is extremely challenging, especially when it comes to cyclic codes. Recently, the first infinite family of Euclidean self-dual binary and nonbinary cyclic codes, whose minimum distances have a square-root lower bound and have a lower bound better than square-root lower bounds are constructed in Chen23 for the lengths of these codes being unbounded. Let q be a power of a prime number and Q=q2. In this paper, we first improve the lower bounds on the minimum distances of Euclidean and Hermitian duals of BCH codes with length qm-1qs-1 over Fq and Qm-1Q-1 over FQ in Fan23,GDL21,Wang24 for the designed distances in some ranges, respectively, where ms≥ 3. Then based on matrix-product construction and some lower bounds on the minimum distances of BCH codes and their duals, we obtain several classes of Euclidean and Hermitian self-dual codes, whose minimum distances have square-root lower bounds or a square-root-like lower bounds. Our lower bounds on the minimum distances of Euclidean and Hermitian self-dual cyclic codes improved many results in Chen23. In addition, our lower bounds on the minimum distances of the duals of BCH codes are almost qs-1 or q times that of the existing lower bounds.
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