Wehrl-type coherent state entropy inequalities for \(\mathrm{SU}(1,1)\) and its \(AX+B\) subgroup
From MaRDI portal
Publication:2055119
DOI10.4171/ECR/18-1/18zbMath1480.81064arXiv1906.00223OpenAlexW3095972626MaRDI QIDQ2055119
Jan Philip Solovej, Elliott H. Lieb
Publication date: 3 December 2021
Full work available at URL: https://arxiv.org/abs/1906.00223
Semisimple Lie groups and their representations (22E46) Finite-dimensional groups and algebras motivated by physics and their representations (81R05) Coherent states (81R30) Geometry and quantization, symplectic methods (81S10) Coding theorems (Shannon theory) (94A24)
Related Items (7)
Functionals with extrema at reproducing kernels ⋮ The norm of time-frequency and wavelet localization operators ⋮ Contraction property of certain classes of log-\(\mathcal{M}\)-subharmonic functions in the unit ball ⋮ Contractive inequalities between Dirichlet and Hardy spaces ⋮ Sharp inequalities for coherent states and their optimizers ⋮ Hypercontractive inequalities for weighted Bergman spaces ⋮ Contractive inequalities for mixed norm spaces and the beta function
Cites Work
- Unnamed Item
- Unnamed Item
- The Wehrl entropy has Gaussian optimizers
- Proof of the Wehrl-type entropy conjecture for symmetric \({SU(N)}\) coherent states
- Optimal concentration for \(\mathrm{SU}(1,1)\) coherent state transforms and an analogue of the Lieb-Wehrl conjecture for \(\mathrm{SU}(1,1)\)
- Some integral identities and inequalities for entire functions and their application to the coherent state transform
- Quantum coherent operators: A generalization of coherent states
- Proof of an entropy conjecture of Wehrl
- Contractive inequalities for Hardy spaces
- A lower bound for the Wehrl entropy of quantum spin with sharp high-spin asymptotics
- Sharp inequalities for holomorphic functions
- On Lieb's conjecture for the Wehrl entropy of Bloch coherent states
- Proof of an entropy conjecture for Bloch coherent spin states and its generalizations
- Temperley-Lieb quantum channels
- Highly entangled, non-random subspaces of tensor products from quantum groups
- Generalized affine coherent states: A natural framework for the quantization of metric-like variables
- The extreme points of SU(2)-irreducibly covariant channels
- Contractive inequalities for Bergman spaces and multiplicative Hankel forms
- ADDITIVITY CONJECTURE AND COVARIANT CHANNELS
- Wiener measures for path integrals with affine kinematic variables
- A Paley-Wiener theorem for Bergman spaces with application to invariant subspaces
- Unitary Representations of the Affine Group
This page was built for publication: Wehrl-type coherent state entropy inequalities for \(\mathrm{SU}(1,1)\) and its \(AX+B\) subgroup
