The Brylinski filtration for affine Kac-Moody algebras and representations of $\mathcal{W}$-algebras

TL;DR

This paper explores the Brylinski filtration in affine Kac-Moody algebras, revealing its connection to $ ext{W}$-algebra representations, and provides explicit bases compatible with this filtration, advancing understanding of their structure.

Contribution

It establishes a natural interpretation of the Brylinski filtration via $ ext{W}$-algebra representations and explicitly constructs compatible bases for affine Kac-Moody modules.

Findings

Hilbert series of the associated graded space matches Lusztig's t-analogue

Brylinski filtration basis aligns with Feigin-Frenkel's basis for $ ext{W}$-algebras

Dominant weight spaces form an irreducible Verma module of $ ext{W}$

Abstract

We study the Brylinski filtration induced by a principal Heisenberg subalgebra of an affine Kac-Moody algebra $\mathfrak{g}$, a notion first introduced by Slofstra. The associated graded space of this filtration on dominant weight spaces of integrable highest weight modules of $\mathfrak{g}$ has Hilbert series coinciding with Lusztig's $t$-analogue of weight multiplicities. For the level 1 vacuum module $L(\Lambda_0)$ of affine Kac-Moody algebras of type $A$, we show that the Brylinski filtration may be most naturally understood in terms of (vertex algebra) representations of the corresponding $\mathcal{W}$-algebra. We show that the dominant weight spaces together form an irreducible Verma module of $\mathcal{W}$ and that the natural PBW basis of this module is compatible with the Brylinski filtration, thereby determining explicitly the subspaces of the filtration. Our basis is the analogue for the principal vertex operator realization of $L(\Lambda_0)$, of Feigin-Frenkel's basis of $\mathcal{W}$.