Universal filtered quantizations of nilpotent Slodowy slices

IF 0.7 2区 数学 Q2 MATHEMATICS
Filippo Ambrosio, Giovanna Carnovale, Francesco Esposito, Lewis Topley
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引用次数: 2

Abstract

Every conic symplectic singularity admits a universal Poisson deformation and a universal filtered quantization, thanks to the work of Losev and Namikawa. We begin this paper by showing that every such variety admits a universal equivariant Poisson deformation and a universal equivariant quantization with respect to a reductive group acting on it by $\C^\times$-equivariant Poisson automorphisms. We go on to study these definitions in the context of nilpotent Slodowy slices. First, we give a complete description of the cases in which the finite $W$-algebra is a universal filtered quantization of the slice, building on the work of Lehn–Namikawa–Sorger. This leads to a near-complete classification of the filtered quantizations of nilpotent Slodowy slices. The subregular slices in non-simply laced Lie algebras are especially interesting: with some minor restrictions on Dynkin type, we prove that the finite $W$-algebra is a universal equivariant quantization with respect to the Dynkin automorphisms coming from the unfolding of the Dynkin diagram. This can be seen as a non-commutative analogue of Slodowy's theorem. Finally, we apply this result to give a presentation of the subregular finite $W$-algebra of type $\mathsf{B}$ as a quotient of a shifted Yangian.
幂零slow切片的泛滤波量化
由于Losev和Namikawa的工作,每一个二次辛奇点都承认一个普适泊松变形和普适滤波量子化。在本文的开头,我们证明了每一个这样的变异体都有一个普遍等变泊松变形和一个普遍等变量子化,这些量子化是由$\C^\乘以$-等变泊松自同构作用于其上的约化群。我们继续在幂零慢片的背景下研究这些定义。首先,我们在Lehn-Namikawa-Sorger的工作基础上,给出了有限W -代数是片的全称滤波量子化的完整描述。这导致幂零慢片的滤波量化的近乎完全分类。非单列李代数中的次正则切片是特别有趣的:通过对Dynkin型的一些限制,我们证明了有限W -代数是由Dynkin图展开的Dynkin自同构的全称等变量子化。这可以看作是Slodowy定理的非交换类比。最后,我们应用这一结果给出了$\mathsf{B}$类型的次正则有限$W$-代数作为移位的Yangian的商的表示。
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来源期刊
CiteScore
1.60
自引率
11.10%
发文量
30
审稿时长
>12 weeks
期刊介绍: The Journal of Noncommutative Geometry covers the noncommutative world in all its aspects. It is devoted to publication of research articles which represent major advances in the area of noncommutative geometry and its applications to other fields of mathematics and theoretical physics. Topics covered include in particular: Hochschild and cyclic cohomology K-theory and index theory Measure theory and topology of noncommutative spaces, operator algebras Spectral geometry of noncommutative spaces Noncommutative algebraic geometry Hopf algebras and quantum groups Foliations, groupoids, stacks, gerbes Deformations and quantization Noncommutative spaces in number theory and arithmetic geometry Noncommutative geometry in physics: QFT, renormalization, gauge theory, string theory, gravity, mirror symmetry, solid state physics, statistical mechanics.
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