Polynomial representation of additive cyclic codes and new quantum codes

Abstract

We give a polynomial representation for additive cyclic codes over Fp2. This representation will be applied to uniquely present each additive cyclic code by at most two generator polynomials. We determine the generator polynomials of all different additive cyclic codes. A minimum distance lower bound for additive cyclic codes will also be provided using linear cyclic codes over Fp. We classify all the symplectic self-dual, self-orthogonal, and nearly self-orthogonal additive cyclic codes over Fp2. Finally, we present ten record-breaking binary quantum codes after applying a quantum construction to self-orthogonal and nearly self-orthogonal additive cyclic codes over F4.