Partition functions and topology-changing amplitudes in the three-dimensional lattice gravity of Ponzano and Regge
- Creators
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Ooguri, Hirosi
Abstract
We define a physical Hilbert space for the three-dimensional lattice gravity of Ponzano and Regge and establish its isomorphism to the one in the ISO(3) Chern-Simons theory. It is shown that, for a handlebody of any genus, a Hartle-Hawking-type wave function of the lattice gravity transforms into the corresponding state in the Chern-Simons theory under this isomorphism. Using the Heegaard splitting of a three-dimensional manifold, the partition functions of each of these theories is expressed as an inner product of such wave functions. Since the isomorphism preserves the inner products, the partition functions of the two theories are the same for any closed orientable manifold. We also discuss a class of topology-changing amplitudes in the lattice gravity and their relation to the ones in the Chern-Simons theory.
Additional Information
© 1992 Elsevier. Received 27 December 1991, Accepted 15 April 1992. The author would like to thank N. Sakakura for discussions. He is also thankful to T. Maskawa for explaining him some group theoretical facts and to L. Kauffman for encouragements.Attached Files
Submitted - 9112072.pdf
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Additional details
- Alternative title
- Partition Functions and Topology-Changing Amplitudes in the 3D Lattice Gravity of Ponzano and Regge
- Eprint ID
- 73018
- Resolver ID
- CaltechAUTHORS:20161220-160213579
- Created
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2016-12-21Created from EPrint's datestamp field
- Updated
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2021-11-11Created from EPrint's last_modified field