弗里德曼-勒梅特-罗伯逊-沃尔克度规

罗伯逊-沃克度规（英語：Robertson-Walker metric）是H.P.罗伯逊和沃尔克分别于1935年和1936年证明的。由于俄国数学家弗里德曼和比利时物理学家勒梅特也作出了重要的貢獻，因此也稱作弗里德曼-羅伯遜-沃克度規（英語：Friedmann-Robertson-Walker metric，缩写为FRW度規）或者弗里德曼-勒梅特-罗伯逊-沃克度规（英語：Friedmann-Lemaître-Robertson-Walker metric，缩写为FLRW度規）。

FLRW度规是基于广义相对论爱因斯坦场方程精确解的度量，描述了一个均匀、各向同性、膨胀（或收缩）的连通（不必是单连通）的宇宙。^[1]^[2]^[3]度规的一般形式源于均匀和各向同性的几何特性；爱因斯坦场方程只需推导出宇宙标度因子随时间的变化。这一模型也被称为现代宇宙学的“标准模型”，^[4]有时也指进一步发展的ΛCDM模型。

^ For an early reference, see Robertson (1935); Robertson assumes multiple connectedness in the positive curvature case and says that "we are still free to restore" simple connectedness.
^ M. Lachieze-Rey; J.-P. Luminet, Cosmic Topology, Physics Reports, 1995, 254 (3): 135–214, Bibcode:1995PhR...254..135L, S2CID 119500217, arXiv:gr-qc/9605010 , doi:10.1016/0370-1573(94)00085-H
^ G. F. R. Ellis; H. van Elst. Cosmological models (Cargèse lectures 1998). Marc Lachièze-Rey (编). Theoretical and Observational Cosmology. NATO Science Series C 541: 1–116. 1999. Bibcode:1999ASIC..541....1E. ISBN 978-0792359463. arXiv:gr-qc/9812046 .
^ L. Bergström, A. Goobar, Cosmology and Particle Astrophysics 2nd, Sprint: 61, 2006, ISBN 978-3-540-32924-4

[1] For an early reference, see Robertson (1935); Robertson assumes multiple connectedness in the positive curvature case and says that "we are still free to restore" simple connectedness.

[LaLu95-2] M. Lachieze-Rey; J.-P. Luminet, Cosmic Topology, Physics Reports, 1995, 254 (3): 135–214, Bibcode:1995PhR...254..135L, S2CID 119500217, arXiv:gr-qc/9605010 , doi:10.1016/0370-1573(94)00085-H

[Ellis98-3] G. F. R. Ellis; H. van Elst. Cosmological models (Cargèse lectures 1998). Marc Lachièze-Rey (编). Theoretical and Observational Cosmology. NATO Science Series C 541: 1–116. 1999. Bibcode:1999ASIC..541....1E. ISBN 978-0792359463. arXiv:gr-qc/9812046 .

[Goobar-4] L. Bergström, A. Goobar, Cosmology and Particle Astrophysics 2nd, Sprint: 61, 2006, ISBN 978-3-540-32924-4

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弗里德曼-勒梅特-罗伯逊-沃尔克度规 转为简体

弗里德曼-勒梅特-罗伯逊-沃尔克度规