Multi-twisted codes over finite fields and their dual codes

Abstract

Let Fq denote the finite field of order q, let m1,m2,·s,m be positive integers satisfying (mi,q)=1 for 1 ≤ i ≤ , and let n=m1+m2+·s+m. Let =(λ1,λ2,·s,λ) be fixed, where λ1,λ2,·s,λ are non-zero elements of Fq. In this paper, we study the algebraic structure of -multi-twisted codes of length n over Fq and their dual codes with respect to the standard inner product on Fqn. We provide necessary and sufficient conditions for the existence of a self-dual -multi-twisted code of length n over Fq, and obtain enumeration formulae for all self-dual and self-orthogonal -multi-twisted codes of length n over Fq. We also derive some sufficient conditions under which a -multi-twisted code is LCD. We determine the parity-check polynomial of all -multi-twisted codes of length n over Fq and obtain a BCH type bound on their minimum Hamming distances. We also determine generating sets of dual codes of some -multi-twisted codes of length n over Fq from the generating sets of the codes. Besides this, we provide a trace description for all -multi-twisted codes of length n over Fq by viewing these codes as direct sums of certain concatenated codes, which leads to a method to construct these codes. We also obtain a lower bound on their minimum Hamming distances using their multilevel concatenated structure.