On superactivation of zero-error capacities and reversibility of a quantum channel
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Publication:2339197
DOI10.1007/s00220-015-2345-5zbMath1310.81043arXiv1309.2610OpenAlexW3106104779MaRDI QIDQ2339197
M. E. Shirokov, Tatiana Shulman
Publication date: 31 March 2015
Published in: Communications in Mathematical Physics (Search for Journal in Brave)
Full work available at URL: https://arxiv.org/abs/1309.2610
Channel models (including quantum) in information and communication theory (94A40) Quantum information, communication, networks (quantum-theoretic aspects) (81P45) Quantum coding (general) (81P70)
Related Items (12)
Structure of the algebra generated by a noncommutative operator graph which demonstrates the superactivation phenomenon for zero-error capacity ⋮ Unnamed Item ⋮ Positive tensor products of maps andn-tensor-stable positive qubit maps ⋮ On errors generated by unitary dynamics of bipartite quantum systems ⋮ On channels with positive quantum zero-error capacity having vanishing \(n\)-shot capacity ⋮ On non-commutative operator graphs generated by reducible unitary representation of the Heisenberg-Weyl group ⋮ On the construction of a quantum channel corresponding to non-commutative graph for a qubit interacting with quantum oscillator ⋮ On superactivation of one-shot quantum zero-error capacity and the related property of quantum measurements ⋮ On general properties of non-commutative operator graphs ⋮ On noncommutative operator graphs generated by resolutions of identity ⋮ Maximum privacy without coherence, zero-error ⋮ On the counting of quantum errors
Uses Software
Cites Work
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- Quantum systems, channels, information. A mathematical introduction.
- Transitive spaces of operators
- Unextendible product bases, uncompletable product bases and bound entanglement
- Sufficiency in quantum statistical inference
- Zero-Error Communication via Quantum Channels, Noncommutative Graphs, and a Quantum Lovász Number
- Quantum Communication with Zero-Capacity Channels
- REVERSIBILITY CONDITIONS FOR QUANTUM OPERATIONS
- On the notion of entanglement in Hilbert spaces
- Minimal rank and reflexivity of operator spaces
- On finite rank operators and preannihilators
- QUANTUM ZERO-ERROR CAPACITY
- An Extreme Form of Superactivation for Quantum Zero-Error Capacities
- Superactivation of the Asymptotic Zero-Error Classical Capacity of a Quantum Channel
- Entanglement Breaking Channels
- Reversibility of a quantum channel: General conditions and their applications to Bosonic linear channels
- The structure of degradable quantum channels
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