Equivariant geometry of low-dimensional quadrics

Brendan Hassett; Yuri Tschinkel

arXiv:2411.00226·math.AG·November 4, 2024

Equivariant geometry of low-dimensional quadrics

Brendan Hassett, Yuri Tschinkel

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TL;DR

This paper introduces new methods for constructing stable linearizations of finite group actions on low-dimensional quadrics, advancing understanding of symmetry and geometry in algebraic varieties.

Contribution

It presents novel stable linearizability constructions specifically for finite group actions on low-dimensional quadrics and homogeneous spaces.

Findings

01

New stable linearizability constructions for finite group actions

02

Enhanced understanding of symmetry in low-dimensional quadrics

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Applications to algebraic geometry and group actions

Abstract

We provide new stable linearizability constructions for regular actions of finite groups on homogeneous spaces and low-dimensional quadrics.

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Taxonomy

TopicsAdvanced Numerical Analysis Techniques · Algebraic and Geometric Analysis · Mathematics and Applications