Generalized Extended Codes with Applications in Entanglement-Assisted Qubit and Qutrit Codes
Abstract
We prove that any generalized extended code is monomially equivalent to the Hermitian dual of a code which is closely related to a second kind of extended code of H. Every [n+1,k+1]q2 linear code with d( H)>1 is monomially equivalent to the generalized extended code ( u,a) of an [n,k]q2 linear code for a fixed a∈q2* and some u∈q2n. We then characterize the Hermitian hull and Hermitian dual distance of ( u,a) in terms of the position of u relative to + H and the interaction between u and the minimum weight codewords of H, respectively. We obtain explicit criteria to independently control the expected Hermitian hull dimension and Hermitian dual distance of ( u,a). In particular, several conditions for simultaneously increasing the Hermitian hull dimension and the Hermitian dual distance of ( u,a) are derived. Applying these results to the Hermitian construction for EAQECCs gives us 267 new EA qubit codes of lengths n ≤ 40 and 14 new EA qutrit codes of lengths n ≤ 25 compared to the best-known codes in Grassl's code tables and the imporvements recorded in very recent works in the literature. Among the new parameter sets, we confirm improvements for 236 qubit and 8 qutrit codes.
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