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SIGMA 4 (2008), 023, 21 pages arXiv:0710.0216
https://doi.org/10.3842/SIGMA.2008.023
Contribution to the Proceedings of the Seventh International Conference Symmetry in Nonlinear Mathematical Physics
SUSY Quantum Hall Effect on Non-Anti-Commutative Geometry
Kazuki Hasebe
Department of General Education, Takuma National College of Technology,
Takuma-cho, Mitoyo-city, Kagawa 769-1192, Japan
Received October 01, 2007, in final form February 07, 2008; Published online February 22, 2008
Abstract
We review the recent developments of the SUSY quantum
Hall effect
[hep-th/0409230,
hep-th/0411137,
hep-th/0503162,
hep-th/0606007,
arXiv:0705.4527]. We
introduce a SUSY formulation of the quantum Hall effect on
supermanifolds.
On each of supersphere and superplane, we investigate SUSY Landau problem and explicitly construct
SUSY extensions of Laughlin wavefunction and topological excitations.
The non-anti-commutative geometry naturally emerges in the lowest
Landau level and brings particular physics to the SUSY quantum
Hall effect. It is shown that SUSY provides a unified
picture of the original Laughlin and Moore-Read states. Based on
the charge-flux duality, we also develop a Chern-Simons
effective field theory for the SUSY quantum Hall effect.
Key words:
quantum hall effect; non-anti-commutative geometry; supersymmetry; Hopf map; Landau problem; Chern-Simons theory; charge-flux duality.
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