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The Lie derivative of tetrad vectors in the general relativity theory and the rodichev conditions

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Literature cited

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    K. Jano and S. Bochner, Curvature and Betti Numbers [Russian translation], IL, Moscow (1957).

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    I. A. Schonten and D. D. Strujk, Introduction to New Methods of Differential Geometry [Russian translation], Vol. 1, GONTI, Moscow-Leningrad (1939).

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    V. I. Rodichev, Izv. VUZ. SSSR, Fizika, No. 1, 142 (1965).

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    M.-A. Tonnela, Principles of Electromagnetism and Relativity Theory [Russian translation], IL, Moscow (1962).

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    I. M. Dozmorov, Izv. VUZ. SSSR, Fizika, No. 10, 13, 17 (1968).

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Additional information

Translated from Izvestiya Vysshikh Uchebnykh Zavendenii, Fizika, No. 4, pp. 110–112, April, 1974.

The author would like to express his thanks to Professor Rodichev for discussing the problem with him.

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Razgovorov, N.N. The Lie derivative of tetrad vectors in the general relativity theory and the rodichev conditions. Soviet Physics Journal 16, 535–536 (1973). https://doi.org/10.1007/BF00890843

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Keywords

  • General Relativity
  • Tetrad Vector