Quantum geometry from phase space reduction

Quantum geometry from phase space reduction

In this work, we give an explicit isomorphism between the usual spin network basis and the direct quantization of the reduced phase space of tetrahedra. The main outcome is a formula that describes the space of SU(2) invariant states by an integral over coherent states satisfying the closure constra...

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Veröffentlicht in:Journal of mathematical physics 2009-12, Vol.50 (12), p.123510-123510-29
Hauptverfasser: Conrady, Florian, Freidel, Laurent
Format: Artikel
Sprache:eng
Schlagworte:
ANNIHILATION OPERATORS
Asymptotic methods
ASYMPTOTIC SOLUTIONS
Calculus
CLASSICAL AND QUANTUM MECHANICS, GENERAL PHYSICS
EIGENSTATES
Exact sciences and technology
GEOMETRY
INTEGRAL EQUATIONS
INTEGRALS
Mathematical methods in physics
Mathematics
PHASE SPACE
Physics
QUANTIZATION
QUANTUM GRAVITY
QUANTUM MECHANICS
Sciences and techniques of general use
SPIN
SU-2 GROUPS
Tetrahedra
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Zusammenfassung:In this work, we give an explicit isomorphism between the usual spin network basis and the direct quantization of the reduced phase space of tetrahedra. The main outcome is a formula that describes the space of SU(2) invariant states by an integral over coherent states satisfying the closure constraint exactly or, equivalently, as an integral over the space of classical tetrahedra. This provides an explicit realization of theorems by Guillemin–Sternberg and Hall that describe the commutation of quantization and reduction. In the final part of the paper, we use our result to express the Freidel–Krasnov spin foam model as an integral over classical tetrahedra, and the asymptotics of the vertex amplitude is determined.
ISSN:0022-2488
1089-7658
DOI:10.1063/1.3257109