Weyl群中的中心子、复反射群和作用

Graham A. Niblo, Roger Plymen, Nick Wright
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摘要

紧致连通李群(E_6\)有两种形式:单连通型和伴随型。正如我们之前所建立的,Baum–Connes同构将两个Langlands对偶形式联系起来,给出了作用于相应极大环面的Weyl群的等变K-理论之间的对偶。我们对\(A_n\)情形的研究表明,这种对偶性存在于同伦性的水平上,而不仅仅是同调性。本文计算了两种形式的\(E_6)的极大复曲面的扩展商,证明了在\(A_n)情况下建立的扇区的同伦等价也存在,从而推测了Langlands对偶总是存在同伦等价。在计算这些扇区时,我们证明了\(E_6\)Weyl群中的中心化子分解为反射群的直积,推广了正则元素的Springer结果,并且我们推广了Reeder结果,在不动点的分量群之间建立了配对。作为进一步的应用,我们计算了p-adic群(E_6\)的约化Iwahori球面\(C^*\)-代数的K理论,它可以是伴随型的,也可以是单连通的。
本文章由计算机程序翻译,如有差异,请以英文原文为准。

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Centralisers, complex reflection groups and actions in the Weyl group \(E_6\)

The compact, connected Lie group \(E_6\) admits two forms: simply connected and adjoint type. As we previously established, the Baum–Connes isomorphism relates the two Langlands dual forms, giving a duality between the equivariant K-theory of the Weyl group acting on the corresponding maximal tori. Our study of the \(A_n\) case showed that this duality persists at the level of homotopy, not just homology. In this paper we compute the extended quotients of maximal tori for the two forms of \(E_6\), showing that the homotopy equivalences of sectors established in the \(A_n\) case also exist here, leading to a conjecture that the homotopy equivalences always exist for Langlands dual pairs. In computing these sectors we show that centralisers in the \(E_6\) Weyl group decompose as direct products of reflection groups, generalising Springer’s results for regular elements, and we develop a pairing between the component groups of fixed sets generalising Reeder’s results. As a further application we compute the K-theory of the reduced Iwahori-spherical \(C^*\)-algebra of the p-adic group \(E_6\), which may be of adjoint type or simply connected.

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来源期刊
Journal of Homotopy and Related Structures
Journal of Homotopy and Related Structures Mathematics-Geometry and Topology
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期刊介绍: Journal of Homotopy and Related Structures (JHRS) is a fully refereed international journal dealing with homotopy and related structures of mathematical and physical sciences. Journal of Homotopy and Related Structures is intended to publish papers on Homotopy in the broad sense and its related areas like Homological and homotopical algebra, K-theory, topology of manifolds, geometric and categorical structures, homology theories, topological groups and algebras, stable homotopy theory, group actions, algebraic varieties, category theory, cobordism theory, controlled topology, noncommutative geometry, motivic cohomology, differential topology, algebraic geometry.
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