Automorphisms of Quantum Toroidal Algebras from an Action of the Extended Double Affine Braid Group

IF 0.5 4区数学 Q3 MATHEMATICS

Algebras and Representation Theory Pub Date : 2024-09-24 DOI:10.1007/s10468-024-10291-9

Duncan Laurie

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引用次数: 0

Abstract

We first construct an action of the extended double affine braid group \(\mathcal {\ddot{B}}\) on the quantum toroidal algebra \(U_{q}(\mathfrak {g}_{\textrm{tor}})\) in untwisted and twisted types. As a crucial step in the proof, we obtain a finite Drinfeld new style presentation for a broad class of quantum affinizations. In the simply laced cases, using our action and certain involutions of \(\mathcal {\ddot{B}}\) we produce automorphisms and anti-involutions of \(U_{q}(\mathfrak {g}_{\textrm{tor}})\) which exchange the horizontal and vertical subalgebras. Moreover, they switch the central elements C and \(k_{0}^{a_{0}}\dots k_{n}^{a_{n}}\) up to inverse. This can be viewed as the analogue, for these quantum toroidal algebras, of the duality for double affine braid groups used by Cherednik to realise the difference Fourier transform in his celebrated proof of the Macdonald evaluation conjectures. Our work generalises existing results in type A due to Miki which have been instrumental in the study of the structure and representation theory of \(U_{q}(\mathfrak {sl}_{n+1,\textrm{tor}})\).

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扩展双仿射编织群作用下量子环面代数的自同构

首先构造了扩展双仿射编织群\(\mathcal {\ddot{B}}\)对量子环面代数\(U_{q}(\mathfrak {g}_{\textrm{tor}})\)在非扭型和扭型上的作用。作为证明的关键一步，我们得到了广义量子亲和的有限德林菲尔德新形式表示。在简单排列的情况下，利用我们的作用和\(\mathcal {\ddot{B}}\)的某些对合，我们得到了交换水平子代数和垂直子代数的\(U_{q}(\mathfrak {g}_{\textrm{tor}})\)的自同构和反对合。此外，他们把中心元素C和\(k_{0}^{a_{0}}\dots k_{n}^{a_{n}}\)换成了逆。对于这些量子环面代数，这可以看作是Cherednik在其著名的麦克唐纳估计猜想证明中用来实现差分傅立叶变换的双仿射编织群对偶性的类比。我们的工作概括了Miki在A型中的现有结果，这些结果对\(U_{q}(\mathfrak {sl}_{n+1,\textrm{tor}})\)的结构和表征理论的研究很有帮助。

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来源期刊

Algebras and Representation Theory 数学-数学

CiteScore

1.30

自引率

0.00%

发文量

审稿时长

6-12 weeks

期刊介绍： Algebras and Representation Theory features carefully refereed papers relating, in its broadest sense, to the structure and representation theory of algebras, including Lie algebras and superalgebras, rings of differential operators, group rings and algebras, C*-algebras and Hopf algebras, with particular emphasis on quantum groups. The journal contains high level, significant and original research papers, as well as expository survey papers written by specialists who present the state-of-the-art of well-defined subjects or subdomains. Occasionally, special issues on specific subjects are published as well, the latter allowing specialists and non-specialists to quickly get acquainted with new developments and topics within the field of rings, algebras and their applications.