Quantum Hall effect and noncommutative geometry

Date

2006

Authors

Carey, Alan
Hannabuss, Keith
Mathai, Varghese

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Bulgarian Academy of Sciences

Abstract

We study magnetic Schrodinger operators with random or almost periodic electric potentials on the hyperbolic plane, motivated by the quantum Hall effect (QHE) in which the hyperbolic geometry provides an effective Hamiltonian. In addition we add some refinements to earlier results. We derive an analogue of the Connes-Kubo formula for the Hall conductance via the quantum adiabatic theorem, identifying it as a geometric invariant associated to an algebra of observables that turns out to be a crossed product algebra. We modify the Fredholm modules defined in [4] in order to prove the integrality of the Hall conductance in this case.

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Source

Journal of Geometry and Symmetry in Physics

Type

Journal article

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