Proper quasi-homogeneous domains of the Einstein universe

arXiv - MATH - Metric Geometry Pub Date : 2024-07-26 DOI:arxiv-2407.18577
Adam ChalumeauIRMA, Blandine GaliayIHES
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引用次数: 0

Abstract

The Einstein universe $\mathbf{Ein}^{p,q}$ of signature $(p,q)$ is a pseudo-Riemannian analogue of the conformal sphere; it is the conformal compactification of the pseudo-Riemannian Minkowski space. For $p,q \geq 1$, we show that, up to a conformal transformation, there is only one domain in $\mathbf{Ein}^{p,q}$ that is bounded in a suitable stereographic projection and whose action by its conformal group is cocompact. This domain, which we call a diamond, is a model for the symmetric space of $\operatorname{PO}(p,1) \times \operatorname{PO}(1,q)$. We deduce a classification of closed conformally flat manifolds with proper development.
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爱因斯坦宇宙的适当准均质域
签名为 $(p,q)$ 的爱因斯坦宇宙 $\mathbf{Ein}^{p,q}$ 是共形球的伪黎曼类似物;它是伪黎曼闵科夫斯基空间的共形紧凑化。对于 $p,q \geq 1$,我们证明,在保角变换之前,$mathbf{Ein}^{p,q}$ 中只有一个域在合适的立体投影中是有界的,并且其保角群的作用是共容的。我们称这个域为钻石域,它是 $\operatorname{PO}(p,1) \times\operatorname{PO}(1,q)$ 对称空间的模型。我们推导出一种具有适当发展的封闭保角平曲面的分类。
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arXiv - MATH - Metric Geometry
arXiv - MATH - Metric Geometry
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