On momentum images of representations and secant varieties

Abstract

Let K be a connected compact semisimple group and Vλ be an irreducible unitary representation with highest weight λ. We study the momentum map μ: P(Vλ) k*. The intersection μ( P(Vλ))+=μ( P(Vλ)) t+ of the momentum image with a fixed Weyl chamber is a convex polytope called the momentum polytope of Vλ. We construct an affine rational polyhedral convex cone λ with vertex λ, such that μ( P(Vλ))+⊂λ t+. We show that equality holds for a class of representations, including those with regular highest weight. For those cases, we obtain a complete combinatorial description of the momentum polytope, in terms of λ. We also present some results on the critical points of ||μ||2. Namely, we consider the existence problem for critical points in the preimages of Kirwan's candidates for critical values. Also, we consider the secant varieties to the unique complex orbit X⊂ P(Vλ), and prove a relation between the momentum images of the secant varieties and the degrees of K-invariant polynomials on Vλ.