On the location of spacecraft in a given number of orbits

Автор: G. P. Egorythev, Т. A. Shiryaeva, A. K. Shlepkin, K. A. Filippov, I. L. Savostyanova

Журнал: Siberian Aerospace Journal @vestnik-sibsau-en

Рубрика: Informatics, computer technology and management

Статья в выпуске: 2 vol.21, 2020 года.

Бесплатный доступ

Space vehicles are an expensive product. For example, just putting such a device into orbit costs at least one hundred million dollars plus the cost of the satellite itself and scientific equipment it carries. However, the cur-rent state of human civilization does not allow us to do without the presence of satellites in orbit. There were 2,062 active satellites in the international database as of March 2019. Compared to 2018, the number of new devices increased by 15 %. Experts warn that in the coming years, the world is expecting a «satellite boom» with a projected increase in the number of devices of about 15–30 % annually. All these satellites are rather different. Currently, several orbits are used for placing satellites on them, depending on the tasks they solve. A geostationary orbit is used for live television broadcasting. Low satellite orbits are used for communication between satellite phones. There are some orbits for navigation systems (GPS, Navstar, GLONASS). Naturally, under these conditions, there is a prob-lem of placing spacecraft over a given number of orbits, with some restrictions on the location of the spacecraft in certain orbits, depending on the purpose of the spacecraft. The solution to this problem is considered on the condition that the number of spacecraft coincides with the number of possible orbits in which they can be placed with some additional re-strictions on the possibility of their placement in orbit. Several solutions to this problem are obtained that allow us to calculate the number of possible combinations for such placement of spacecraft over a given number of orbits.

Еще

Satellite, orbit, substitution, permanent.

Короткий адрес: https://sciup.org/148321734

IDR: 148321734   |   DOI: 10.31772/2587-6066-2020-21-2-170-175

Список литературы On the location of spacecraft in a given number of orbits

  • Dr. Kelso T. S. Basics of the Geostationari Orbit. Available at: http://www.celestrak.com/columns. (accessed 26.03.2020).
  • Treaty on principles governing the activities of States in the exploration and use of outer space, including the moon and other celestial bodies. Available at: http://www.un.org/ru/documents/decl_conv/conventions/outer_space_goveming.html (accessed 26.03.2020)
  • Fateev V. F., Minkov S. [New direction of development of remote sensing of the Earth]. Izv. vuzov. Instrument making. 2004, Vol. 47, No. 3, P. 18–22 (In Russ.).
  • Lebedeva A. A., Nesterenko O. P. Kosmicheskie sistemy nablyudeniya. Sintez i modelirovanie [Space observation systems. Synthesis and modeling]. Moscow, Mashinostroenie Publ., 1991, 224 p.
  • Pob’ezdkov Yu. A. Kosmicheskaya s"emka Zemli 2006–2007 gg. [Space survey of the Earth 2006–2007]. Moscow, Radio engineering Publ., 2008, 275 p.
  • Nevdyaevl L. M., Smirnova A. A. Personal'naya sputnikovaya svyaz [Personal satellite communication]. Moscow, Eco-Trends Publ., 1998, 216 p.
  • Fitken A. C. Determinants and Matrices. Edinburgh, 1939, 201 p.
  • Riordan J. An introductions to combinatorial analysis. John Wiley & Sons, Inc., New York, 1982, 288 p.
  • Minc H. Permanents. Encyclopedia of Mathematics and Its Applications. 1978, Vol. 6, P. 65–70 p.
  • Egorychev G. P. Diskretnaya matematika. Permanenty [Discrete Math. Permanents]. Krasnoyarsk, Siberian Federal University Publ., 2007, 272 p.
  • Egorychev G. P. Integralnoe predstavlenie i vychislenie kombinatornyh summ [Integral representation and computation of combinatorial Math.]. Novosibirsk, Nauka Publ., 1977.
  • Kuzmin O. V. Introduction to combinatorial methods of discrete mathematics. Irkutsk, ISU Publishing House, 2012, 113 p.
  • Aigner M. Combinatorial theory, Springer-Verlag, New York, 1979, 90 р.
  • Touchard J. Sur un proble’me de permutations. Ed. C. R. Acad. Sci. Paris, 1934.
  • Kaplansky I. Solution of the proble’me des me’nages. Bull. Amer. Math. Soc. 1943, Vol. 49,
  • P. 784–785 p.
Еще
Статья научная