- Autor(in)
- Referenz
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1 Kasper, U., u. D.-E. Liebscher, Feldgleichungen der Trederschen Gravitationstheorie, die aus einem Variationsprinzip ableitbar sind. I. Ann. Physik 30 (1973) 129.
2 Gupta, S. N., Proc. Phys. Soc. A 65 (1952) 161, 608;
3 Treder, H.-J., Gravitonen. Fortschr. Phys. 11 (1963) Heft 3.
4 Treder, H.-J., Monatsber. dtsch. Akad. Wiss. Berlin 10 (1968) 40.
5 Vogt, H., Außergalaktische Sternsysteme und die Struktur der Welt im Großen, Leipzig 1960.
Proc. Phys. Soc. 96 (1957) 1683.
- Seitenbereich
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0145 - 0146
- Zusammenfsg.
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In the frame work of non-linear generalizations of T<small>REDER</small>'s tetrad theory of gravitation considered in part I. a pure bimetric gravitation theory results for the L<small>AGRANG</small>ian Ω<sup>(1)</sup><sub>F</sub> with ω<sub>2</sub> = 1. The discussion of the post-N<small>EWTON</small>ian approximation given in I. has demonstrated that must be: ω<sub>2</sub> = -1 - 2ω<sub>1</sub>. - However, a L<small>AGRANG</small>ian with ω<sub>1</sub> = - ω<sub>2</sub> = -1 is identical with G<small>UPTA</small>'s post-N<small>EWTON</small>ian approximation for E<small>INSTEIN</small>'s general relativistic L<small>AGRANG</small>ian. Therefore, for ω<sub>1</sub> = - ω<sub>2</sub> = - 1 the E<small>INSTEIN</small> effects are resulting evidently and the question discussed in I. the tetrad formalism becomes non-important.
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- Forschungsartikel