MVW-extensions of real quaternionic classical groups

Yanan Lin; Binyong Sun; Shaobin Tan

arXiv:1111.2635·math.RT·November 14, 2011·1 cites

MVW-extensions of real quaternionic classical groups

Yanan Lin, Binyong Sun, Shaobin Tan

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TL;DR

This paper introduces a new extension of real quaternionic classical groups that includes an element inducing inversion conjugation, extending the structure similar to known non-quaternionic cases.

Contribution

It constructs and characterizes a specific extension of real quaternionic classical groups with properties analogous to Moeglin-Vigneras-Waldspurger extensions.

Findings

01

Extension contains the group as index-two subgroup

02

Existence of an element inducing inversion conjugation

03

Extension generalizes known non-quaternionic cases

Abstract

Let $G$ be a real quaternionic classical group $\GL_{n} (\bH)$ , $\Sp (p, q)$ or $\oO^{*} (2 n)$ . We define an extension $\overset{˘}{G}$ of $G$ with the following property: it contains $G$ as a subgroup of index two, and for every $x \in G$ , there is an element $\overset{g}{˘} \in \overset{˘}{G} ∖ G$ such that $\overset{g}{˘} x \overset{g}{˘}^{- 1} = x^{- 1}$ . This is similar to Moeglin-Vigneras-Waldspurger's extensions of non-quaternionic classical groups.

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Taxonomy

TopicsAdvanced Algebra and Geometry · Homotopy and Cohomology in Algebraic Topology · Advanced Topics in Algebra