Using the stabilizer formalism, we construct four new families of quantum MDS codes with parameters [N, N-2 K, K+1]_{q}. We give conditions on the length N and ...
Oct 2, 2021 · New Hermitian self-orthogonal codes are constructed from projective lines, elliptic curves, hyper-elliptic curves, Hermitian curves, and Artin-Schreier curves.
Missing: Four | Show results with:Four
Abstract—We construct codes from rational function fields and provide sufficient conditions for a rational algebraic geometry code to be Hermitian ...
Sep 4, 2023 · Using the stabilizer formalism, we construct four new families of quantum MDS codes with parameters [ N , N − 2 K , K + 1 ] q [N, N-2 K, K+1]_{q ...
Dec 12, 2021 · Hermitian self-orthogonal codes are constructed from projective lines, elliptic curves, hyper-elliptic curves, Hermitian curves, and Artin- ...
New families of quantum stabilizer codes from Hermitian self-orthogonal ... Application of Classical Hermitian Self-Orthogonal MDS Codes to Quantum MDS Codes.
Missing: Four | Show results with:Four
In this paper, we consider to use the quantum stabilizer codes as secret sharing schemes for classical secrets. We give necessary and sufficient conditions ...
Using the stabilizer formalism, we construct four new families of quantum MDS codes with parameters [ N , N − 2 K , K + 1 ] q . We give conditions on the length ...
Sep 11, 2024 · New Hermitian self-orthogonal codes are constructed from projective lines, hyper-elliptic curves and Hermitian curves. As an application, new ...
Dive into the research topics of 'Four New Families of Quantum Stabilizer Codes from Hermitian Self-Orthogonal MDS codes'. Together they form a unique ...