Fundamental ephemeris

A fundamental ephemeris of the Solar System is a model of the objects of the system in space, with all of their positions and motions accurately represented. It is intended to be a high-precision primary reference for prediction and observation of those positions and motions, and which provides a basis for further refinement of the model. It is generally not intended to cover the entire life of the Solar System; usually a short-duration time span, perhaps a few centuries, is represented to high accuracy. Some long ephemerides cover several millennia to medium accuracy.

Description

The set of physical laws and numerical constants used in the calculation of the ephemeris must be self-consistent and precisely specified. The ephemeris must be calculated strictly in accordance with this set, which represents the most current knowledge of all relevant physical forces and effects. Current fundamental ephemerides are typically released with exact descriptions of all mathematical models, methods of computation, observational data, and adjustment to the observations at the time of their announcement.[1] This may not have been the case in the past, as fundamental ephemerides were then computed from a collection of methods derived over a span of decades by many researchers.[2]

The independent variable of the ephemeris is always time. In the case of the most current ephemerides, it is a relativistic coordinate time scale equivalent to the IAU definition of TCB.[2] In the past, mean solar time (before the discovery of the non-uniform rotation of the Earth) and ephemeris time (before the implementation of relativistic gravitational equations) were used. The remainder of the ephemeris can consist of either the mathematical equations and initial conditions which describe the motions of the bodies of the Solar System, of tabulated data calculated from those equations and conditions, or of condensed mathematical representations of the tabulated data.

A fundamental ephemeris is the basis from which apparent ephemerides, phenomena, and orbital elements are computed for astronomical, nautical, and surveyors' almanacs. Apparent ephemerides give positions and motions of Solar System bodies as seen by observers from the surface of Earth, and are useful for astronomers, navigators, and surveyors in planning observations and in reducing the data acquired, although much of the work of latter two has been supplanted by GPS technology. Phenomena are events related to the configurations of Solar System bodies, for instance rise and set times, phases, eclipses and occultations, and have many civil and scientific applications. Orbital elements are descriptions of the motion of a body at a particular instant, used for further short-time-span calculation of the body's position when high accuracy is not required.

History

Astronomers have been tasked with computing accurate ephemerides, originally for purposes of sea navigation, from at least the 18th century. In England, Charles II founded the Royal Observatory in 1675,[3] which began publishing The Nautical Almanac in 1766.[4] In France, the Bureau des Longitudes was founded in 1795 to publish the Connaissance des Temps.[5] The early fundamental ephemerides of these publications came from many different sources and authors as the science of celestial mechanics matured.[6]

At the end of the 19th century, the analytical methods of general perturbations reached the probable limits of what could be accomplished by hand calculation. The planetary "theories" of Newcomb[7][8][9][10][11][12] and Hill[13][14] formed the fundamental ephemerides of the Nautical Almanac at that time. For the Sun, Mercury, Venus, and Mars, the tabulations of the Astronomical Almanac continued to be derived from the work of Newcomb and Ross[15] through 1983. In France, the works of LeVerrier[16][17][18][19][20] and Gaillot[21][22][23] formed the fundamental ephemeris of the Connaissance des Temps.

From the mid 20th century, work began on numerical integration of the equations of motion on early computing machines for purposes of producing fundamental ephemerides for the Astronomical Almanac. Jupiter, Saturn, Uranus, Neptune, and Pluto were based on the work of Eckert, et al.[24] and Clemence[25] through 1983. The fundamental ephemeris of the Moon, always a difficult problem in celestial mechanics, remained a work-in-progress through the early 1980s. It was based originally on the work of Brown,[26] with updates and corrections by Clemence, et al.[27] and Eckert, et al.[28] [29][30]

Starting in 1984, a revolution in the methods of producing fundamental ephemerides began.[31] From 1984 through 2002, the fundamental ephemeris of the Astronomical Almanac was the Jet Propulsion Laboratory's DE200/LE200, a fully numerically-integrated ephemeris fitted to modern position and velocity observations of the Sun, Moon, and planets. From 2003 onward (as of Feb 2012), JPL's DE405/LE405, an integrated ephemeris referred to the International Celestial Reference Frame, has been used.[2] In France, the Bureau des Longitudes began using their machine-generated semi-analytical theory VSOP82 in 1984,[32] and their work continued with the founding of the Institut de mécanique céleste et de calcul des éphémérides in 1998 and the INPOP[33] series of numerical ephemerides.

References and notes

  1. See, for instance, Standish (1998). "JPL Planetary and Lunar Ephemerides DE405/LE405" (PDF).; Fienga; et al. (2010). "INPOP10a" (PDF).; Pitjeva (2004). "High-Precision Ephemerides of Planets—EPM and Determination of Some Astronomical Constants" (PDF).
  2. 1 2 3 Standish and Williams (2010). "CHAPTER 8: Orbital Ephemerides of the Sun, Moon, and Planets" (PDF). A chapter from an as-yet-unpublished (Feb 2012) version of the Explanatory Supplement (see Sources)
  3. "History of the Royal Observatory, Greenwich".
  4. "History of The Nautical Almanac".
  5. "History of the IMCCE".
  6. See Explanatory Supplement (1961), chap. 7 or Explanatory Supplement (1992), chap. 13 for extensive lists of sources of the early fundamental ephemerides of the Nautical Almanac. (see Sources)
  7. Newcomb (1898). "Tables of the Motion of the Earth on its Axis and Around the Sun". Astronomical Papers Prepared for the Use of the American Ephemeris and Nautical Almanac VI, part I. U.S. Government Printing Office, Washington, DC. (at Google books)
  8. Newcomb (1898). "Tables of the Heliocentric Motion of Mercury". Astronom. Papers American Ephem. VI, part II. (at Google books)
  9. Newcomb (1898). "Tables of the Heliocentric Motion of Venus". Astronom. Papers American Ephem. VI, part III. (at Google books)
  10. Newcomb (1898). "Tables of the Heliocentric Motion of Mars". Astronom. Papers American Ephem. VI, part IV. (at Google books)
  11. Newcomb (1898). "Tables of the Heliocentric Motion of Uranus". Astronom. Papers American Ephem. VII. (at Google books)
  12. Newcomb (1898). "Tables of the Heliocentric Motion of Neptune". Astronom. Papers American Ephem. VII. (at Google books)
  13. Hill (1898). "Tables of Jupiter". Astronom. Papers American Ephem. VII. (at Google books)
  14. Hill (1898). "Tables of Saturn". Astronom. Papers American Ephem. VII. (at Google books)
  15. Ross (1917), New Elements of Mars, Astronom. Papers American Ephem., IX, part II
  16. LeVerrier (1858). "Théorie et Tables du Mouvement Apparent du Soleil". Annales de l'Observatoire Impérial de Paris IV (in French). (at SAO/NASA ADS)
  17. LeVerrier (1859). "Théorie et Tables du Mouvement de Mercure". Annales de l'Observatoire Impérial de Paris V (in French). (at SAO/NASA ADS)
  18. LeVerrier (1861). "Théorie et Tables du Mouvement de Vénus". Annales de l'Observatoire Impérial de Paris, Mémoires VI (in French). (at SAO/NASA ADS)
  19. LeVerrier (1861). "Théorie et Tables du Mouvement de Mars". Annales de l'Observatoire Impérial de Paris, Mémoires VI (in French). (at SAO/NASA ADS)
  20. LeVerrier developed and published his original theories of the outer planets in Annales de l'Observatoire de Paris, Mémoires X-XIV
  21. Gaillot (1913). "Tables Rectifiées du Mouvement de Jupiter". Annales de l'Observatoire de Paris, Mémoires XXXI (in French). (at SAO/NASA ADS)
  22. Gaillot (1904). "Tables Rectifiées du Mouvement de Saturne". Annales de l'Observatoire de Paris, Mémoires XXIV (in French). (at SAO/NASA ADS)
  23. Gaillot (1910). "Tables Nouvelles des Mouvements d'Uranus et de Neptune". Annales de l'Observatoire de Paris, Mémoires XXVIII (in French). (at SAO/NASA ADS)
  24. Eckert; Brouwer; Clemence (1951), Coordinates of the Five Outer Planets 1953-2060, Astronom. Papers American Ephem., XII
  25. Clemence (1954), Perturbations of the Five Outer Planets by the Four Inner Ones, Astronom. Papers American Ephem., XIII, part V
  26. Brown (1919). Tables of the Motion of the Moon. Yale University Press, New Haven, CT. (at Google books)
  27. Clemence; Porter; Sadler (1952). "Aberration in the Lunar Ephemeris". Astronomical Journal 57. pp. 46–47. (at SAO/NASA ADS)
  28. Eckert; Walker; Eckert (1966). "Transformation of the Lunar Coordinates and Orbital Parameters". Astronomical Journal 71. pp. 314–332. (at SAO/NASA ADS)
  29. Eckert; Van Flandern; Wilkins (1969). "A Note on the Evaluation of the Latitude of the Moon". Monthly Notices of the Royal Astronomical Society 146. pp. 473–478. (at SAO/NASA ADS)
  30. See also Nautical Almanac Office, U.S. Naval Observatory; H.M. Nautical Almanac Office, Royal Greenwich Observatory (1954), Improved Lunar Ephemeris, U.S. Government Printing Office, Washington, DC.
  31. See Newhall, Standish, and Williams (1983). "DE 102 - A numerically integrated ephemeris of the moon and planets spanning forty-four centuries". Astronomy and Astrophysics, vol.125, no.1, Aug.1983. for a good description of the new methods from their early days.
  32. Bretagnon (1982). "Théorie du mouvement de l'ensemble des planètes. Solution VSOP82" (in French).
  33. Fienga; et al. (2006). "INPOP06. A new numerical planetary ephemeris" (PDF).; Fienga; et al. (2008). "INPOP08, a 4-D planetary ephemeris" (PDF).; Fienga; et al. (2010). "INPOP10a" (PDF).

See also

Sources

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