Advertisement

About the Numerical Decision of Problem Dirihle for Equation Laplas in a Rectangle in Researches Under the Decision of a Return Problem in Geophysics

  • Z. Z. ArsanukaevEmail author
Conference paper
Part of the Springer Proceedings in Earth and Environmental Sciences book series (SPEES)

Abstract

In article it is shown on the basis of results of computing experiments on analytical continuation of preset values of a field located on a full contour, that a major factor influencing a difference in accuracy for areas in the bottom semispace near to a surface of the Earth and near to the top edge of revolting bodies, incorrect statement of problem Dirihle is.

References

  1. Arsanukaev Z.Z. (2009) Analytical continuation of preset values of a gravitational field in discrete statement through sources in a two-dimensional case. Magazine « Bulletin КPAUNC. Sciences about the Earth » 2009 №1. Release 13. p. 47–57.Google Scholar
  2. Arsanukaev Z.Z. (2010) About the decision of a problem of recalculation downwards preset values of a gravitational field with use of software package GrAnM. Materials of 37th session of the International seminar of D.G.Uspensky « questions of the theory and 6.пpaктики geological interpretation gravitational, magnetic and electric fields » . On January, 25-29th, 2010 Moscow. Institute of Physics of the Earth of the Russian Academy of Sciences, 2010.- p. 29–34.Google Scholar
  3. Arsanukaev Z. Z. (2009) Allocation of revolting objectsa modern method of recalculation of a gravitational field in the bottom semispace. Magazine « Bulletin КPAUNC. Sciences about the Earth 2009. №1. Release 21. p. 231–241.Google Scholar
  4. Boglaev J.P. (1990) Calculus mathematics and programming. Moscow “Higher school”.1990. p. 543.Google Scholar
  5. Goloskokov D.P. (2004) The equations of mathematical physics. Moscow. St.-Petersburg. 2004. p 538.Google Scholar
  6. Strachov V.N, Strachov A.V. (1999) The Basic methods of a finding of the steady approached decisions of systems of the linear algebraic equations arising at the decision of Geophysics problems. II M: Institute of Physics of the Earth of the Russian Academy of Sciences 1999. p. 51.Google Scholar
  7. Strachov V.N, Arsanukaev Z.Z. (2001) Use of a method of discrete potential in Geophysics problems //Questions of the theory and practice of geological interpretation gravitational, magnetic and electric fields: materials of 28th session of the International seminar it. Д. G. Uspenskogo, Kiev, on January, 20th - on February, 2nd, 2001 M: Institute of Physics of the Earth of the Russian Academy of Sciences the Russian Academy of Sciences, 2001. p. 102–104.Google Scholar
  8. Zhukova G.S, Chechetkina E.M., Bogin E.S. (2001) Differentsialnye of the equation in private derivative: Educational grant/ RCTU. TH., 2001..p.197.Google Scholar

Copyright information

© Springer Nature Switzerland AG 2019

Authors and Affiliations

  1. 1.D. Mendeleev University of Chemical Technology of RussiaMoscowRussia

Personalised recommendations