Approximate Quantum Error Correction Revisited: Introducing the Alpha-bit
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Publication:6288411
DOI10.1007/S00220-020-03689-1arXiv1706.09434MaRDI QIDQ6288411
Patrick Hayden, Geoffrey R. Penington
Publication date: 28 June 2017
Abstract: We establish that, in an appropriate limit, qubits of communication should be regarded as composite resources, decomposing cleanly into independent correlation and transmission components. Because qubits of communication can establish ebits of entanglement, qubits are more powerful resources than ebits. We identify a new communications resource, the zero-bit, which is precisely half the gap between them, replacing classical bits by zero-bits makes teleportation asymptotically reversible. The decomposition of a qubit into an ebit and two zero-bits has wide-ranging consequences including applications to state merging, the quantum channel capacity, entanglement distillation, quantum identification and remote state preparation. The source of these results is the theory of approximate quantum error correction. The action of a quantum channel is reversible if and only if no information is leaked to the environment, a characterization that is useful even in approximate form. However, different notions of approximation lead to qualitatively different forms of quantum error correction in the limit of large dimension. We study the effect of a constraint on the dimension of the reference system when considering information leakage. While the resulting condition fails to ensure that the entire input can be corrected, it does ensure that all subspaces of dimension matching that of the reference are correctable. The size of the reference can be characterized by a parameter , we call the associated resource an -bit. Changing interpolates between standard quantum error correction and quantum identification, a form of equality testing for quantum states. We develop the theory of -bits, including the applications above, and determine the -bit capacity of general quantum channels, finding single-letter formulas for the entanglement-assisted and amortised variants.
Quantum information, communication, networks (quantum-theoretic aspects) (81P45) Computational stability and error-correcting codes for quantum computation and communication processing (81P73) LOCC, teleportation, dense coding, remote state operations, distillation (81P48) Quantum channels, fidelity (81P47)
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