Additive Polycyclic Codes over F4 Induced by Binary Vectors and Some Optimal Codes

Abstract

In this paper we study the structure and properties of additive right and left polycyclic codes induced by a binary vector a in F2n. We find the generator polynomials and the cardinality of these codes. We also study different duals for these codes. In particular, we show that if C is a right polycyclic code induced by a vector a∈ F2n, then the Hermitian dual of C is a sequential code induced by a. As an application of these codes, we present examples of additive right polycyclic codes over F4 with more codewords than comparable optimal linear codes as well as optimal binary linear codes and optimal quantum codes obtained from additive right polycyclic codes over F4.