Hessenberg varieties and Poisson slices

Abstract

This work pursues a circle of Lie-theoretic ideas involving Hessenberg varieties, Poisson geometry, and wonderful compactifications. In more detail, one may associate a symplectic Hamiltonian G-variety μ:G×Sg to each complex semisimple Lie algebra g with adjoint group G and fixed Kostant section S⊂eqg. This variety is one of Bielawski's hyperk\"ahler slices, and it is central to Moore and Tachikawa's work on topological quantum field theories. It also bears a close relation to two log symplectic Hamiltonian G-varieties μS:G×Sg and :Hessg. The former is a Poisson transversal in the log cotangent bundle of the wonderful compactification G, while the latter is the standard family of Hessenberg varieties. Each of μ and is known to be a fibrewise compactification of μ. We exploit the theory of Poisson slices to relate the fibrewise compactifications mentioned above. Our main result is a canonical G-equivariant bimeromorphism HessG×S of varieties over g. This bimeromorphism is shown to be a Hamiltonian G-variety isomorphism in codimension one, and to be compatible with a Poisson isomorphism obtained by Balibanu. We also show our bimeromorphism to be a biholomorphism if g=sl2, and we conjecture that this is the case for arbitrary g. We conclude by discussing the implications of our conjecture for Hessenberg varieties.