English

Whittaker modules and hyperbolic Toda lattices

Quantum Algebra 2024-01-02 v1

Abstract

Let \sg\sg be a complex finite-dimensional simple Lie algebra and let \sgl\sg_l be the corresponding generalized Takiff algebra. This paper studies the affine variety \ssf+\sbl\ssf+\sb_l where \ssf\ssf is similar to a principal nilpotent element of \sg\sg and \sbl\sb_l is a subalgebra corresponding to the Borel subalgebra \sb\sb of \sg\sg. Inspired by Kostant's work then we deal with two questions. One of them is to construct the Whittaker model for the GlG_l-invariants of symmetric algebra S(\sgl)S(\sg_l) where GlG_l is the adjoint group of \sgl\sg_l and GlG_l acts on S(\sgl)S(\sg_l) by coadjoint action, and then to classify all nonsingular Whittaker modules over \sgl\sg_l. Another one is to describe the symplectic structure of the manifold Z\ssf+\sblZ\subseteq\ssf+\sb_l of normalized Jacobi elements. Then the Hamiltonian corresponding to a fundamental invariant provides a class of hyperbolic Toda lattices. In particular, a simplest example describes the state of a dynamical system consisting of a positive mass particle and a negative mass particle.

Keywords

Cite

@article{arxiv.2401.00680,
  title  = {Whittaker modules and hyperbolic Toda lattices},
  author = {Limeng Xia},
  journal= {arXiv preprint arXiv:2401.00680},
  year   = {2024}
}

Comments

45 pages

R2 v1 2026-06-28T14:05:51.360Z