Generalized MICZ-Kepler Problems and Unitary Highest Weight Modules

Abstract

For each integer n 1, we demonstrate that a (2n+1)-dimensional generalized MICZ-Kepler problem has an Spin(2, 2n+2) dynamical symmetry which extends the manifest Spin(2n+1) symmetry. The Hilbert space of bound states is shown to form a unitary highest weight Spin(2, 2n+2)-module which occurs at the first reduction point in the Enright-Howe-Wallach classification diagram for the unitary highest weight modules. As a byproduct, we get a simple geometric realization for such a unitary highest weight Spin(2, 2n+2)-module.

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