Nilpotent orbits and their secant varieties

Abstract

Let G be a simple algebraic group and O a nilpotent orbit in g. Let CS( O) denote the affine cone over the secant variety of P O⊂ P g. Using the theory of doubled actions of G, we describe CS( O) for all O. We compute CS( O) using the complexity and rank of the G-variety O and show that there is an abelian subalgebra t O⊂ g such that CS( O) is the closure of G· t O. Another observation is that CS( O) coincide with the closure of the image of the moment map associated with the cotangent bundle of O. We also compute the complexity and rank for all nilpotent orbits.

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