Hyperspherical Harmonics, Separation of Variables and the Bethe Ansatz

Abstract

The relation between solutions to Helmholtz's equation on the sphere Sn-1 and the [ sl(2)]n Gaudin spin chain is clarified. The joint eigenfuctions of the Laplacian and a complete set of commuting second order operators suggested by the R--matrix approach to integrable systems, based on the loop algebra sl(2)R, are found in terms of homogeneous polynomials in the ambient space. The relation of this method of determining a basis of harmonic functions on Sn-1 to the Bethe ansatz approach to integrable systems is explained.

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