Weights, Weyl-equivariant maps and a rank conjecture

Abstract

In this note, given a pair (g, λ), where g is a complex semisimple Lie algebra and λ ∈ h* is a dominant integral weight of g, where h ⊂ g is the real span of the coroots inside a fixed Cartan subalgebra, we associate an SU(2) and Weyl equivariant smooth map f: X (Pm(C))n, where X ⊂ h R3 is the configuration space of regular triples in h, and m, n depend on the initial data (g, λ). We conjecture that, for any x ∈ X, the rank of f(x) is at least the rank of a collinear configuration in X (collinear when viewed as an ordered r-tuple of points in R3, with r being the rank of g). A stronger conjecture is also made using the singular values of a matrix representing f(x). This work is a generalization of the Atiyah-Sutcliffe problem to a Lie-theoretic setting.