Orbites Nilpotentes Sph\'eriques et Repr\'esentations unipotentes associ\'ees : Le cas SLn
Abstract
Let G be a real simple Lie group, g its Lie algebra. Given a nilpotent adjoint G-orbit O, the question is to determine the irreducible unitary representations of G that we can associate to O, according to the orbit method. P.Torasso, in [22], gave a method to solve this problem if O is minimal. In this paper, we study the case where O is any spherical nilpotent orbit of sln( R), we construct, from O, a family of representations of the two-sheeted covering of SLn( R) with Torasso's method and, finally, we show that all these representations are associated to the corresponding orbit.
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