On Uncertainty Relations and Entanglement Detection with Mutually Unbiased Measurements
From MaRDI portal
Publication:5247591
DOI10.1142/S1230161215500055zbMath1312.81026arXiv1407.7333WikidataQ62123135 ScholiaQ62123135MaRDI QIDQ5247591
Publication date: 24 April 2015
Published in: Open Systems & Information Dynamics (Search for Journal in Brave)
Full work available at URL: https://arxiv.org/abs/1407.7333
Quantum measurement theory, state operations, state preparations (81P15) Measures of information, entropy (94A17) Quantum coherence, entanglement, quantum correlations (81P40)
Related Items
Separability conditions based on local fine-grained uncertainty relations, Improved separability criteria via some classes of measurements, On Entropic Uncertainty Relations for Measurements of Energy and Its “Complement”, Control of Quantum‐Memory Induced by Generated Thermal XYZ‐Heisenberg Entanglement: y‐Component DM Interaction, Rényi and Tsallis formulations of separability conditions in finite dimensions, New separability criteria based on two classes of measurements, Entanglement detection via general SIC-povms, Every entangled state provides an advantage in classical communication, Rényi formulation of uncertainty relations for POVMs assigned to a quantum design, Rényi and Tsallis entropies related to eigenfunctions of quantum graphs
Cites Work
- Relations for certain symmetric norms and anti-norms before and after partial trace
- Possible generalization of Boltzmann-Gibbs statistics.
- Unified-entropy trade-off relations for a single quantum channel
- Inequalities detecting entanglement for arbitrary bipartite systems
- Entropic uncertainty relations—a survey
- Quantum entanglement
- Information theoretical properties of Tsallis entropies
- ON MUTUALLY UNBIASED BASES
- Rényi Extrapolation of Shannon Entropy
- Quantum Error Correction and Orthogonal Geometry
- A transform of complementary aspects with applications to entropic uncertainty relations
- Majorization entropic uncertainty relations
- Entanglement, Purity, and Information Entropies in Continuous Variable Systems
