On branched coverings of singular (G, X)-manifolds

Pub Date : 2024-02-17 DOI:10.1007/s10711-023-00873-0
Léo Brunswic
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Abstract

Branched coverings boast a rich history, ranging from the ramification of Riemann surfaces to the realization of 3-manifolds as coverings branched over knots and spanning both geometric topology and algebraic geometry. This work delves into branched coverings “à la Fox” of (GX)-manifolds, encompassing three main avenues: Firstly, we introduce a comprehensive class of singular (GX)-manifolds, elucidating elementary theory paired with illustrative examples to showcase its efficacy and universality. Secondly, building on Montesinos’ work, we revisit and augment the prevailing knowledge, formulating a Galois theory tailored for such branched coverings. This includes a detailed portrayal of the fiber above branching points. Lastly, we identify local attributes that guarantee the existence of developing maps for singular (GX)-manifolds within the branched coverings framework. Notably, we pinpoint conditions that ensure the existence of developing maps for these singular manifolds. This research proves especially pertinent for non-metric singular (GX)-manifolds like those of Lorentzian or projective nature, as discussed by Barbot, Bonsante, Suhyoung Choi, Danciger, Seppi, Schlenker, and the author, among others. While examples are sprinkled throughout, a standout application presented is a uniformization theorem “à la Mess” for singular locally Minkowski manifolds exhibiting BTZ-like singularities.

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论奇异(G,X)-manifolds 的分支覆盖
支化覆盖具有丰富的历史,从黎曼曲面的斜切到将 3-manifolds(3-manifolds)实现为在结上支化的覆盖,横跨几何拓扑学和代数几何学。这项研究深入探讨了(G, X)-manifolds的 "à la Fox "分支覆盖,主要包括三个方面:首先,我们介绍了一类全面的奇异(G,X)-manifolds,阐明了基本理论,并结合实例展示了其有效性和普遍性。其次,在蒙特西诺斯研究的基础上,我们重新审视并扩充了现有知识,为这类分支覆盖量身定制了伽罗瓦理论。这包括对分支点上方纤维的详细描述。最后,我们确定了保证奇异(G,X)-manifolds 在分支覆盖框架内存在发展映射的局部属性。值得注意的是,我们指出了确保这些奇异流形存在展开映射的条件。这项研究对于非度量奇异(G,X)流形(如洛伦兹或投影性质的流形)尤其重要,巴尔博特、邦桑特、崔秀英、丹西格、塞皮、施伦克和作者等人都讨论过这些问题。本书中不乏实例,其中最突出的应用是针对表现出类似 BTZ 奇点的奇异局部闵科夫斯基流形的 "à la Mess "均匀化定理。
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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