(2+1)-dimensional Chern-Simons gravity as a Dirac square root
- 15 May 1992
- journal article
- research article
- Published by American Physical Society (APS) in Physical Review D
- Vol. 45 (10) , 3584-3590
- https://doi.org/10.1103/physrevd.45.3584
Abstract
For simple enough spatial topologies, at least four approaches to (2+1)-dimensional quantum gravity have been proposed: Wheeler-DeWitt quantization, canonical quantization in Arnowitt-Deser-Misner (ADM) variables on reduced phase space, Chern-Simons quantization, and quantization in terms of Ashtekar-Rovelli-Smolin loop variables. An important problem is to understand the relationships among these approaches. By explicitly constructing the transformation between the Chern-Simons and ADM Hilbert spaces, we show here that Chern-Simons quantization naturally gives rise to spinorial wave functions on superspace, whose time evolution is governed by a Dirac equation. Chern-Simons quantum gravity can therefore be interpreted as the Dirac square root of the Wheeler-DeWitt equation.Keywords
This publication has 16 references indexed in Scilit:
- Measuring the metric in (2+1)-dimensional quantum gravityClassical and Quantum Gravity, 1991
- Observables, gauge invariance, and time in (2+1)-dimensional quantum gravityPhysical Review D, 1990
- (2+1)-Dimensional Quantum Gravity: Case of Torus UniverseProgress of Theoretical Physics, 1990
- (2+1)-dimensional pure gravity for an arbitrary closed initial surfaceClassical and Quantum Gravity, 1990
- Reduction of the Einstein equations in 2+1 dimensions to a Hamiltonian system over Teichmüller spaceJournal of Mathematical Physics, 1989
- 2+1 quantum gravity as a toy model for the 3+1 theoryClassical and Quantum Gravity, 1989
- Exact quantum scattering in 2 + 1 dimensional gravityNuclear Physics B, 1989
- 2 + 1 dimensional gravity as an exactly soluble systemNuclear Physics B, 1988
- Soluble systems in quantum gravityPhysical Review D, 1984
- Quantization of a Friedmann universe filled with a scalar fieldPhysical Review D, 1975