Quantization commutes with singular reduction: Cotangent bundles of compact Lie groups
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Publication:5207965
DOI10.1142/S0129055X19500168zbMath1431.53097arXiv1508.06763OpenAlexW2963712428WikidataQ115246558 ScholiaQ115246558MaRDI QIDQ5207965
Walter D. van Suijlekom, Jord Boeijink, Nicolaas P. Landsman
Publication date: 14 January 2020
Published in: Reviews in Mathematical Physics (Search for Journal in Brave)
Full work available at URL: https://arxiv.org/abs/1508.06763
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- On the Vergne conjecture
- Formal geometric quantization. II
- The inverse Segal-Bargmann transform for compact Lie groups
- Homogeneous quantization and multiplicities of group representations
- A gauge model for quantum mechanics on a stratified space
- Hamiltonian reduction by stages
- Vanishing theorems on complete Kähler manifolds
- An analytic proof of the geometric quantization conjecture of Guillemin-Sternberg
- Geometric quantization and multiplicities of group representations
- Stratified symplectic spaces and reduction
- Smooth functions invariant under the action of a compact Lie group
- Reduction of symplectic manifolds with symmetry
- Symplectic surgery and the Spin\(^c\)-Dirac operator
- Singular reduction and quantization
- The Segal-Bargmann ``coherent state transform for compact Lie groups
- Phase space bounds for quantum mechanics on a compact Lie group
- Coherent state transforms and vector bundles on elliptic curves.
- Momentum maps and Hamiltonian reduction
- The quantization conjecture revisited
- Geometric quantization and the generalized Segal-Bargmann transform for Lie groups of compact type
- Quantising proper actions on \(\text{Spin}^c\)-manifolds
- Holomorphy and convexity in Lie theory
- The heat kernel Lefschetz fixed point formula for the spin-c dirac operator
- Geometric quantization for proper moment maps: the Vergne conjecture
- Holomorphic Morse inequalities and Bergman kernels
- Unitarity in ``Quantization commutes with reduction
- Geometric quantization and families of inner products
- Essential self-adjointness of powers of generators of hyperbolic equations
- Localization and the quantization conjecture
- Equivariant indices of \(\operatorname{Spin}^c\)-Dirac operators for proper moment maps
- Geometric quantization for proper actions
- Differential Geometry of Singular Spaces and Reduction of Symmetry
- Singular Poisson-K\"ahler geometry of stratified K\"ahler spaces and quantization
- Kähler quantization and reduction
- Distributions and Operators
- QUANTIZATION OF SINGULAR REDUCTION
- Kähler metrics on Gℂ
- HOLOMORPHIC QUANTIZATION FORMULA IN SINGULAR REDUCTION
- Symplectic reduction and Riemann-Roch formulas for multiplicities
- Quantum Theory for Mathematicians
- Symmetries in fundamental physics
- Lie groups beyond an introduction
- Lie groups
- Quantization of singular symplectic quotients. Based on a research-in-pairs workshop, Oberwolfach, Germany, August 2--6, 1999
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