A class of Calogero type reductions of free motion on a simple Lie group

Abstract

The reductions of the free geodesic motion on a non-compact simple Lie group G based on the G+ × G+ symmetry given by left- and right multiplications for a maximal compact subgroup G+ ⊂ G are investigated. At generic values of the momentum map this leads to (new) spin Calogero type models. At some special values the `spin' degrees of freedom are absent and we obtain the standard BCn Sutherland model with three independent coupling constants from SU(n+1,n) and from SU(n,n). This generalization of the Olshanetsky-Perelomov derivation of the BCn model with two independent coupling constants from the geodesics on G/G+ with G=SU(n+1,n) relies on fixing the right-handed momentum to a non-zero character of G+. The reductions considered permit further generalizations and work at the quantized level, too, for non-compact as well as for compact G.

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