Hamiltonian formulation of induced gravity in two dimensions
- 15 October 1989
- journal article
- research article
- Published by American Physical Society (APS) in Physical Review D
- Vol. 40 (8) , 2588-2597
- https://doi.org/10.1103/physrevd.40.2588
Abstract
A Hamiltonian formulation of the theory of induced gravity in two dimensions is constructed. This formulation differs from previous efforts in that the formalism is covariant under all relevant transformation groups. In particular, spatial diffeomorphism covariance and/or invariance is manifest throughout; the phase space carries a representation of the Lie algebra of the spacetime diffeomorphism group; the group of conformal isometries is projectively represented on the phase space as a symmetry group. The key ingredient that allows covariance with respect to the above groups is the enlargement of the gravitational phase space by the inclusion of the cotangent bundle over the space of embeddings of a Cauchy surface into the spacetime.Keywords
This publication has 12 references indexed in Scilit:
- World sheet diffeomorphisms and the canonical stringJournal of Mathematical Physics, 1989
- Dirac constraint quantization of a parametrized field theory by anomaly-free operator representations of spacetime diffeomorphismsPhysical Review D, 1989
- Parametrized scalar field on openR: Dynamical pictures, spacetime diffeomorphisms, and conformal isometriesPhysical Review D, 1989
- FRACTAL STRUCTURE OF 2d—QUANTUM GRAVITYModern Physics Letters A, 1988
- QUANTUM GRAVITY IN TWO DIMENSIONSModern Physics Letters A, 1987
- Representations of spacetime diffeomorphisms. I. Canonical parametrized field theoriesAnnals of Physics, 1985
- Canonical quantization of polyakov's string in arbitrary dimensionsNuclear Physics B, 1983
- Quantum geometry of bosonic stringsPhysics Letters B, 1981
- On equivalence of parabolic and hyperbolic super-HamiltoniansJournal of Mathematical Physics, 1978
- Dynamics of tensor fields in hyperspace. IIIJournal of Mathematical Physics, 1976