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Coordinate system in general relativity

Published online by Cambridge University Press:  03 August 2017

Toshio Fukushima*
Affiliation:
Satellite Geodesy Office, Geodesy and Geophysics Division, Hydrographic Department, Maritime Safety Agency, 5-3-1, Tsukiji, Chuo-ku, Tokyo 104, JAPAN

Abstract

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The proper reference frame comoving with a system of mass-points is defined as a general relativistic extension of the relative coordinate system in the Newtonian mechanics. The coordinate transformation connecting this and the background coordinate systems is presented explicitly in the post-Newtonian formalism. The conversion formulas of some physical quantities caused by this coordinate transformation are discussed. The concept of the rotating coordinate system is reexamined within the relativistic framework. A modification of the introduced proper reference frame named the Natural Coordinate System (NCS) is proposed as the basic coordinate system in the astrometry. By means of the concept of the natural coordinate system, the relation between the solar system barycentric coordinate system and the terrestrial coordinate system is given explicitly. To illustrate the concept of NCS, we quote in the following the definition of the non-rotating NCS comoving with the Earth, i.e. the Terrestrial Coordinate System (TCS) (Fukushima et al., 1986a, 1986b):

1) Consider a fictitious spacetime with the metric obtained by subtracting the direct terms due to the Earth from the true metric in the solar system Barycentric Coordinate System (BCS).

2) The time coordinate axis of the TCS is defined as the worldline of the geocenter, i.e. the timelike geodesic of the geocenter in the above ficititious spacetime.

3) The unit of time in the TCS, terrestrial second sT, is defined as the unit of time in the BCS, barycentric second, multiplied by a certain factor so that there exist periodic differences only between the time coordinate of any event in the TCS, i.e. TDT, and the corresponding time coordinate in the BCS, i.e. TDB.

4) The space coordinate axes of the TCS are defined as three geometrically straight lines satisfying that they and the time coordinate axis of the TCS are orthogonal to each other at the geocenter in the above fictitious spacetime, and that the coordinate triad constructed by them is symmetric.

5) The unit of length in the TCS, terrestrial meter mT, is defined as the length so that c = 299792458 mT/sT.

Type
I. Celestial Reference Systems
Copyright
Copyright © Reidel 1988 

References

Fukushima, T., Aoki, S., Kinoshita, H. and Fujimoto, M.-K.: 1986a, Celestial Mechanics, Vol. 36, 215.Google Scholar
Fukushima, T., Aoki, S., Kinoshita, H. and Fujimoto, M.-K.: 1986b, Relativity in Celestial Mechanics and Astrometry (Proc. of IAU Symp. No. 114 held in Leningrad, May, 1985), ed. by Kovalevsky, J. and Brumberg, V.A., D. Reidel Publ. Co., 145.Google Scholar
Fukushima, T.: 1986, Highlights of Astronomy, ed. by Swings, J.-P., 113 CrossRefGoogle Scholar