Area Preserving Diffeomorphisms and Supermembrane Lorentz Invariance
Mar, 198927 pages
Published in:
- Commun.Math.Phys. 128 (1990) 39
DOI:
Report number:
- DESY-89-031,
- THU-89-5
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Abstract: (Springer)
The Lie algebra of area-preserving diffeomorphisms on closed membranes of arbitrary topology is investigated. On the basis of a harmonic decomposition we define the structure constants as well as two other tensors which appear in the supermembrane Lorentz generators. We derive certain identities between these tensors and analyze their validity when the areapreserving diffeomorphisms are approximated bySU(N). One of the additional tensors can then be identified with the invariant symmetric three-index tensor ofSU(N), while the second has no obvious analog. We prove that the Lorentz generators are classically conserved in the light-cone gauge for arbitrary membrane topology, as a consequence of these tensor identities. This formulation allows a systematic study of the violations of Lorentz invariance in theSU(N) approximation.- membrane model
- diffeomorphism
- topology
- light cone gauge
- invariance: reparametrization
- algebra: Lorentz
- group: SO(3)
- group theory: representation
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