Projections of nilpotent orbits in a simple Lie algebra and shared orbits
Abstract
Let G be a simple algebraic group with g=Lie(G) and O⊂ g a nilpotent orbit. If H is a reductive subgroup of G with Lie(H)= h, then g= h m, where m= h. We consider the natural projections φ: O h and : O m, and two related properties of the pair (H, O): (P1): O m=0 and (P2): H has a dense orbit in O. We show that (P1) implies (P2) for all O and these properties are equivalent for O= Omin, the minimal nilpotent orbit. If (P1) holds, then φ is finite, and φ( O) is the closure of a nilpotent H-orbit O'. We prove that O is contained in the closure of the G-orbit G· O' and obtain the classification of pairs (H, O) with property (P1). The orbit O' is "shared" in the sense of Brylinski and Kostant. Using our classification, we detect an omission in the list of pairs (H,G) having a shared orbit that is given in "Nilpotent orbits, normality, and hamiltonian group actions", J.A.M.S., 7 (1994), 269--298. It is also proved that if (P1) holds for (H, Omin), then both varieties φ( Omin) and ( Omin) generate the same closed subvariety of g.
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