Overalgebras and separation of generic coadjoint orbits of SL(n, )
Abstract
For the semi simple and deployed Lie algebra g=sl(n, ), we give an explicit construction of an overalgebra g+= g V of g, where V is a finite dimensional vector space. In such a setup, we prove the existence of a map from the dual g of g into the dual ( g+) of g+ such that the coadjoint orbits of (), for generic in g, have a distinct closed convex hulls. Therefore, these closed convex hulls separate 'almost' the generic coadjoint orbits of G.
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