On the discovery of Birkhoff's theorem

被引:47
|
作者
Johansen, NV
Ravndal, F [1 ]
机构
[1] Univ Oslo, Dept Phys, N-0316 Oslo, Norway
[2] Univ Oslo, Dept Math, N-0316 Oslo, Norway
来源
GENERAL RELATIVITY AND GRAVITATION | 2006年 / 38卷 / 03期
关键词
Jebsen; Birkhoff;
D O I
10.1007/s10714-006-0242-0
中图分类号
P1 [天文学];
学科分类号
0704 ;
摘要
Birkhoff showed in 1923 that the Schwarzschild solution for the metric from a point particle was also valid in the a priori non-static case as long as the spherical symmetry was maintained. This theorem was actually discovered and published two years earlier by an unknown Norwegian physicist, J.T. Jebsen. His life and scientific career is briefly chronicled.
引用
收藏
页码:537 / 540
页数:4
相关论文
共 50 条
  • [41] On a Theorem Due to Birkhoff
    Arnaud, Marie-Claude
    GEOMETRIC AND FUNCTIONAL ANALYSIS, 2010, 20 (06) : 1307 - 1316
  • [42] GENERALIZATION OF BIRKHOFF THEOREM
    CHATARD, J
    COMPTES RENDUS HEBDOMADAIRES DES SEANCES DE L ACADEMIE DES SCIENCES SERIE A, 1972, 275 (21): : 1135 - &
  • [43] On a Theorem Due to Birkhoff
    Marie-Claude Arnaud
    Geometric and Functional Analysis, 2010, 20 : 1307 - 1316
  • [44] A uniform Birkhoff theorem
    Friedrich Martin Schneider
    Algebra universalis, 2017, 78 : 337 - 354
  • [45] Birkhoff's Theorem from a geometric perspective: A simple example
    Lawvere, F. William
    CATEGORIES AND GENERAL ALGEBRAIC STRUCTURES WITH APPLICATIONS, 2016, 4 (01) : 1 - 7
  • [46] Is Birkhoff's theorem valid in Einstein-Aether theory?
    Chan, R.
    da Silva, M. F. A.
    Satheeshkumar, V. H.
    PHYSICS LETTERS B, 2024, 850
  • [47] Violation of Birkhoff's theorem for pure quadratic gravity action
    Kehm, D.
    Kirsch, J.
    Struckmeier, J.
    Vasak, D.
    Hanauske, M.
    ASTRONOMISCHE NACHRICHTEN, 2017, 338 (9-10) : 1015 - 1018
  • [48] Birkhoff's theorem with Λ-term and Bertotti-Kasner space
    Physics Department, University of Texas at Dallas, Richardson, TX 75083-0688, United States
    Phys Lett Sect A Gen At Solid State Phys, 5 (363-365):
  • [49] Birkhoff's individual ergodic theorem and maximal ergodic theorem for fuzzy dynamical systems
    Markechova, Dagmar
    Tirpakova, Anna
    ADVANCES IN DIFFERENCE EQUATIONS, 2016,
  • [50] Birkhoff’s individual ergodic theorem and maximal ergodic theorem for fuzzy dynamical systems
    Dagmar Markechová
    Anna Tirpáková
    Advances in Difference Equations, 2016
12345