Vinberg's $\theta$-groups and rigid connections

Tsao-Hsien Chen

arXiv:1409.3517·math.AG·September 29, 2017·2 cites

Vinberg's $\theta$-groups and rigid connections

Tsao-Hsien Chen

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TL;DR

This paper investigates the local monodromy and cohomological properties of flat connections associated with Vinberg's $ heta$-groups, revealing many are cohomologically rigid, thus advancing understanding of these geometric structures.

Contribution

It provides a detailed analysis of the monodromy and cohomology of flat $G$-connections from $ heta$-groups, extending previous constructions and identifying conditions for rigidity.

Findings

01

Many connections are cohomologically rigid

02

Computed de Rham cohomology for these connections

03

Analyzed local monodromy in the context of $ heta$-groups

Abstract

Let $G$ be a simple complex group of adjoint type. In his unpublished work, Z. Yun associated to each $θ$ -group $(G_{0}, g_{1})$ and a vector $X \in g_{1}$ a flat $G$ -connection $\nabla^{X}$ on $P^{1} - {0, \infty}$ , generalizing the construction of Frenkel and Gross in [FG]. In this paper we study the local monodromy of those flat $G$ -connections and compute the de Rham cohomology of $\nabla^{X}$ with values in the adjoint representations of $G$ . In particular, we show that in many cases the connection $\nabla^{X}$ is cohomologically rigid.

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Taxonomy

TopicsAdvanced Algebra and Geometry · Homotopy and Cohomology in Algebraic Topology · Algebraic Geometry and Number Theory