Projections of the minimal nilpotent orbit in a simple Lie algebra and secant varieties

Abstract

Let G be a simple algebraic group with g=Lie G and O min⊂ g the minimal nilpotent orbit. For a Z2-grading g= g0 g1, let G0 be a connected subgroup of G with Lie G0= g0. We study the G0-equivariant projections : O min g0 and : O min g1. It is shown that the properties of ( O min) and ( O min) essentially depend on whether the intersection O min g1 is empty or not. If O min g1, then both ( O min) and ( O min) contain a 1-parameter family of closed G0-orbits, while if O min g1=, then both are G0-prehomogeneous. We prove that G·( O min)=G·( O min). Moreover, if O min g1, then this common variety is the affine cone over the secant variety of P( O min)⊂ P( g). As a digression, we obtain some invariant-theoretic results on the affine cone over the secant variety of the minimal orbit in an arbitrary simple G-module. In conclusion, we discuss more general projections that are related to either arbitrary reductive subalgebras of g in place of g0 or spherical nilpotent G-orbits in place of O min.