Wehrl entropy, entropic uncertainty relations, and entanglement
Stefan Floerchinger, T. Haas, Henrik Müller-Groeling
Abstract
Wehrl entropy is an entropy associated with the Husimi quasiprobability distribution. We discuss how it can be used to formulate entropic uncertainty relations and for a quantification of entanglement in continuous variables. We show that the Wehrl-Lieb inequality is closer to equality than the usual Bia\l{}ynicki-Birula--Mycielski entropic uncertainty relation almost everywhere. Furthermore, we show how Wehrl mutual information can be used to obtain a measurable perfect witness for pure state bipartite entanglement, which additionally provides a lower bound on the entanglement entropy.
Topics & Concepts
Quantum entanglementMathematicsStatistical physicsEntropy (arrow of time)Bipartite graphEntropic uncertaintyMin entropyQuantum mechanicsJoint quantum entropyDiscrete mathematicsPhysicsUncertainty principlePrinciple of maximum entropyEntropy rateQuantumStatisticsGraphQuantum Information and CryptographyQuantum Mechanics and ApplicationsQuantum Computing Algorithms and Architecture