The O(1)-Kepler Problems

Abstract

Let n 2 be an integer. To each irreducible representation σ of O(1), an O(1)-Kepler problem in dimension n is constructed and analyzed. This system is super integrable and when n=2 it is equivalent to a generalized MICZ-Kepler problem in dimension two. The dynamical symmetry group of this system is Sp2n( R) with the Hilbert space of bound states H(σ) being the unitary highest weight representation of Sp2n( R) with highest weight (-1/2, ..., -1/2n-1, -(1/2+|σ|)), which occurs at the right-most nontrivial reduction point in the Enright-Howe-Wallach classification diagram for the unitary highest weight modules. (Here |σ|=0 or 1 depending on whether σ is trivial or not.) Furthermore, it is shown that the correspondence σ H(σ) is the theta-correspondence for dual pair (O(1), Sp2n( R))⊂eq Sp2n( R).