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

IF 0.5 4区数学 Q3 MATHEMATICS Geometriae Dedicata 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 (G, X)-manifolds, encompassing three main avenues: Firstly, we introduce a comprehensive class of singular (G, X)-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 (G, X)-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 (G, X)-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。

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来源期刊

Geometriae Dedicata 数学-数学

CiteScore

0.90

自引率

0.00%

发文量

审稿时长

4-8 weeks

期刊介绍： Geometriae Dedicata concentrates on geometry and its relationship to topology, group theory and the theory of dynamical systems. Geometriae Dedicata aims to be a vehicle for excellent publications in geometry and related areas. Features of the journal will include: A fast turn-around time for articles. Special issues centered on specific topics. All submitted papers should include some explanation of the context of the main results. Geometriae Dedicata was founded in 1972 on the initiative of Hans Freudenthal in Utrecht, the Netherlands, who viewed geometry as a method rather than as a field. The present Board of Editors tries to continue in this spirit. The steady growth of the journal since its foundation is witness to the validity of the founder''s vision and to the success of the Editors'' mission.

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