Reliability function of quantum information decoupling via the sandwiched Rényi divergence
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Publication:6564160
DOI10.1007/s00220-024-05029-zMaRDI QIDQ6564160
Publication date: 28 June 2024
Published in: Communications in Mathematical Physics (Search for Journal in Brave)
Theory of error-correcting codes and error-detecting codes (94Bxx) Foundations, quantum information and its processing, quantum axioms, and philosophy (81Pxx) Communication, information (94Axx)
Cites Work
- Unnamed Item
- The quantum reverse Shannon theorem based on one-shot information theory
- Strong converse for the classical capacity of entanglement-breaking and Hadamard channels via a sandwiched Rényi relative entropy
- Decoupling with random quantum circuits
- Quantum state merging and negative information
- The transition probability in the state space of a \(^*\)-algebra
- On the reliability function for a quantum communication channel.
- Thermodynamic implementations of quantum processes
- One-shot randomized and nonrandomized partial decoupling
- Multiplicativity of completely bounded \(p\)-norms implies a strong converse for entanglement-assisted capacity
- Quantum hypothesis testing and the operational interpretation of the quantum Rényi relative entropies
- Universal coding for classical-quantum channel
- Strong converse exponent for classical-quantum channel coding
- One-shot decoupling
- Precise evaluation of leaked information with secure randomness extraction in the presence of quantum attacker
- Exponential decay of correlations implies area law
- Strong converse exponents for a quantum channel discrimination problem and quantum-feedback-assisted communication
- Conditional expectation in an operator algebra
- Reliability function of general classical-quantum channel
- Generalization of Gartner-Ellis theorem
- Correlation detection and an operational interpretation of the Rényi mutual information
- Security Analysis of <inline-formula> <tex-math notation="LaTeX">$\varepsilon $ </tex-math> </inline-formula>-Almost Dual Universal2Hash Functions: Smoothing of Min Entropy Versus Smoothing of Rényi Entropy of Order 2
- Two Approaches to Obtain the Strong Converse Exponent of Quantum Hypothesis Testing for General Sequences of Quantum States
- The Quantum Reverse Shannon Theorem and Resource Tradeoffs for Simulating Quantum Channels
- Smooth Max-Information as One-Shot Generalization for Mutual Information
- Equivocations, Exponents, and Second-Order Coding Rates Under Various Rényi Information Measures
- Quantum Information Cannot Be Completely Hidden in Correlations: Implications for the Black-Hole Information Paradox
- SECURITY OF QUANTUM KEY DISTRIBUTION
- The mother of all protocols: restructuring quantum information’s family tree
- Optimal sequence of quantum measurements in the sense of Stein s lemma in quantum hypothesis testing
- A Generalized Quantum Slepian–Wolf
- Constant Compositions in the Sphere Packing Bound for Classical-Quantum Channels
- Building Blocks for Communication Over Noisy Quantum Networks
- Entanglement-assisted capacity of a quantum channel and the reverse Shannon theorem
- Non-Asymptotic Classical Data Compression With Quantum Side Information
- Optimal Quantum Source Coding With Quantum Side Information at the Encoder and Decoder
- A Fully Quantum Asymptotic Equipartition Property
- Min- and Max-Relative Entropies and a New Entanglement Monotone
- Partially Smoothed Information Measures
- Decoupling with unitary approximate two-designs
- Convex-Split and Hypothesis Testing Approach to One-Shot Quantum Measurement Compression and Randomness Extraction
- A Correlation Measure Based on Vector-Valued $L_p$ -Norms
- Quantum Sphere-Packing Bounds With Polynomial Prefactors
- Quantum to Classical Randomness Extractors
- Lower Bounds on the Probability of Error for Classical and Classical-Quantum Channels
- Sandwiched Rényi divergence satisfies data processing inequality
- Monotonicity of a relative Rényi entropy
- On quantum Rényi entropies: A new generalization and some properties
- Positive Functions on C ∗ -Algebras
- Tight Exponential Analysis for Smoothing the Max-Relative Entropy and for Quantum Privacy Amplification
- Privacy amplification and decoupling without smoothing
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