Uq(sl(2) as Dynamical Symmetry Algebra of the Quantum Hall Effect

Abstract

Quantum Hall effect wavefunctions corresponding to the filling factors 1/2p+1, 2/2p+1,..., 2p/2p+1, 1, are shown to form a basis of irreducible cyclic representation of the quantum algebra Uq(sl(2)) at q2p+1=1. Thus, the wavefunctions P/Q possessing filling factors P/Q<1 where Q is odd and P, Q are relatively prime integers are classified in terms of Uq(sl(2)). Adopted as dynamical symmetry this leads to non--existence of a ``universal microscopic theory" of the quantum Hall effect, defined as the eigenvalue problem of a differential operator O: O = . for =1,1/3,2/3,..., in the complex plane.

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