Derived subalgebras of centralisers and finite W-algebras

TL;DR

This paper provides explicit formulas for the structure of centralizers of nilpotent elements in classical Lie algebras, characterizes non-singular elements, and explores their properties in finite W-algebras, with implications for primitive ideals.

Contribution

It introduces a combinatorial formula for the codimension of [g_e, g_e] in g_e for classical Lie algebras and characterizes non-singular nilpotent elements via sheets and partitions.

Findings

Explicit combinatorial formula for codimension in classical Lie algebras

Characterization of non-singular nilpotent elements

Affine space structure of fixed points in the spectrum of U(g,e)^{ab}

Abstract

Let g = Lie(G) be the Lie algebra of a simple algebraic group G over an algebraically closed field of characteristic 0. Let e be a nilpotent element of g and let g_e = Lie(G_e) where G_e stands for the stabiliser of e in G. For g classical, we give an explicit combinatorial formula for the codimension of [g_e, g_e] in g_e and use it to determine those e in g for which the largest commutative quotient U(g,e)^{ab} of the finite W-algebra U(g,e) is isomorphic to a polynomial algebra. It turns out that this happens if and only if e lies in a unique sheet of g. The nilpotent elements with this property are called non-singular in the paper. Confirming a recent conjecture of Izosimov we prove that a nilpotent element e in g is non-singular if and only if the maximal dimension of the geometric quotients S/G, where S is a sheet of g containing e, coincides with the codimension of [g_e,g_e] in g_e and describe all non-singular nilpotent elements in terms of partitions. We also show that for any nilpotent element e in a classical Lie algebra g the closed subset of Specm U(g,e)^{ab} consisting of all points fixed by the natural action of the component group of G_e is isomorphic to an affine space. Analogues of these results for exceptional Lie algebras are also obtained and applications to the theory of primitive ideals are given.