Regular Conjugacy Classes in the Weyl Group and Integrable Hierarchies

TL;DR

This paper explores the connection between regular conjugacy classes in Weyl groups and integrable hierarchies derived from Lie algebra structures, providing new methods to construct and analyze generalized KdV systems and related integrable models.

Contribution

It establishes a link between Weyl group conjugacy classes and integrable hierarchies, introducing new constructions of KdV systems and pseudo-differential Lax operators for classical Lie algebras.

Findings

Constructed integrable KdV systems from regular conjugacy classes.

Derived pseudo-differential Lax operators for classical Lie algebras.

Linked Weyl group conjugacy classes to integrable hierarchies.

Abstract

Generalized KdV hierarchies associated by Drinfeld-Sokolov reduction to grade one regular semisimple elements from non-equivalent Heisenberg subalgebras of a loop algebra $\G\otimes{\bf C}[\lambda,\lambda^{-1}]$ are studied. The graded Heisenberg subalgebras containing such elements are labelled by the regular conjugacy classes in the Weyl group ${\bf W}(\G)$ of the simple Lie algebra $\G$. A representative $w\in {\bf W}(\G)$ of a regular conjugacy class can be lifted to an inner automorphism of $\G$ given by $\hat w=\exp\left(2i\pi {\rm ad I_0}/m\right)$, where $I_0$ is the defining vector of an $sl_2$ subalgebra of $\G$.The grading is then defined by the operator $d_{m,I_0}=m\lambda {d\over d\lambda} + {\rm ad} I_0$ and any grade one regular element $\Lambda$ from the Heisenberg subalgebra associated to $[w]$ takes the form $\Lambda = (C_+ +\lambda C_-)$, where $[I_0, C_-]=-(m-1) C_-$ and $C_+$ is included in an $sl_2$ subalgebra containing $I_0$. The largest eigenvalue of ${\rm ad}I_0$ is $(m-1)$ except for some cases in $F_4$, $E_{6,7,8}$. We explain how these Lie algebraic results follow from known results and apply them to construct integrable systems.If the largest ${\rm ad} I_0$ eigenvalue is $(m-1)$, then using any grade one regular element from the Heisenberg subalgebra associated to $[w]$ we can construct a KdV system possessing the standard $\W$-algebra defined by $I_0$ as its second Poisson bracket algebra. For $\G$ a classical Lie algebra, we derive pseudo-differential Lax operators for those non-principal KdV systems that can be obtained as discrete reductions of KdV systems related to $gl_n$. Non-abelian Toda systems are also considered.