English

Hessenberg varieties, Slodowy slices, and integrable systems

Algebraic Geometry 2018-07-23 v1 Representation Theory Symplectic Geometry

Abstract

This work is intended to contextualize and enhance certain well-studied relationships between Hessenberg varieties and the Toda lattice, thereby building on the results of Kostant, Peterson, and others. One such relationship is the fact that every Lagrangian leaf in the Toda lattice is compactified by a suitable choice of Hessenberg variety. It is then natural to imagine the Toda lattice as extending to an appropriate union of Hessenberg varieties. We fix a simply-connected complex semisimple linear algebraic group GG and restrict our attention to a particular family of Hessenberg varieties, a family that includes the Peterson variety and all Toda leaf compactifications. The total space of this family, X(H0)X(H_0), is shown to be a Poisson variety with a completely integrable system defined in terms of Mishchenko--Fomenko polynomials. This leads to a natural embedding of completely integrable systems from the Toda lattice to X(H0)X(H_0). We also show X(H0)X(H_0) to have an open dense symplectic leaf isomorphic to G/Z×SregG/Z \times S_{\text{reg}}, where ZZ is the centre of GG and SregS_{\text{reg}} is a regular Slodowy slice in the Lie algebra of GG. This allows us to invoke results about integrable systems on G×SregG\times S_{\text{reg}}, as developed by Rayan and the second author. Lastly, we witness some implications of our work for the geometry of regular Hessenberg varieties.

Keywords

Cite

@article{arxiv.1807.07792,
  title  = {Hessenberg varieties, Slodowy slices, and integrable systems},
  author = {Hiraku Abe and Peter Crooks},
  journal= {arXiv preprint arXiv:1807.07792},
  year   = {2018}
}

Comments

36 pages

R2 v1 2026-06-23T03:08:25.923Z