Convolutional Codes: An Algebraic Approach
Convolutional Codes: An Algebraic Approach
Quantum computation and quantum information
Quantum computation and quantum information
Fundamentals of Convolutional Coding
Fundamentals of Convolutional Coding
On Doubly-Cyclic Convolutional Codes: MSC (2000)
Applicable Algebra in Engineering, Communication and Computing
Efficient quantum stabilizer codes: LDPC and LDPC-convolutional constructions
IEEE Transactions on Information Theory
Quantum error correction via codes over GF(4)
IEEE Transactions on Information Theory
IEEE Transactions on Information Theory
Enlargement of Calderbank-Shor-Steane quantum codes
IEEE Transactions on Information Theory
On binary constructions of quantum codes
IEEE Transactions on Information Theory
On classes of convolutional codes that are not asymptotically catastrophic
IEEE Transactions on Information Theory
Constructions of MDS-convolutional codes
IEEE Transactions on Information Theory
Nonbinary quantum stabilizer codes
IEEE Transactions on Information Theory
Convolutional codes I: Algebraic structure
IEEE Transactions on Information Theory
Short unit-memory byte-oriented binary convolutional codes having maximal free distance (Corresp.)
IEEE Transactions on Information Theory
Quantum codes from concatenated algebraic-geometric codes
IEEE Transactions on Information Theory
Nonbinary Stabilizer Codes Over Finite Fields
IEEE Transactions on Information Theory
On Quantum and Classical BCH Codes
IEEE Transactions on Information Theory
Convolutional and Tail-Biting Quantum Error-Correcting Codes
IEEE Transactions on Information Theory
Concatenated Quantum Codes Constructible in Polynomial Time: Efficient Decoding and Error Correction
IEEE Transactions on Information Theory
IEEE Transactions on Information Theory
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Several new families of nonbinary quantum convolutional Bose-Chaudhuri-Hocquenghem (BCH) codes are constructed in this paper. These code constructions are performed algebraically and not by computation search. The quantum convolutional codes constructed here have parameters better than the ones available in the literature and they have noncatastrophic encoders and encoder inverses. These new families consist of unit-memory as well as multi-memory convolutional stabilizer codes.