Lithuanian Mathematical Journal

, Volume 23, Issue 3, pp 321–326 | Cite as

Numerical methods for the solution of the equation of a surface with prescribed mean curvature

  • M. Sapagovas


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Literature Cited

  1. 1.
    M. P. Sapagovas, “Numerical methods for solving certain differential equations of hydrodynamics of small volume,” in: Differential Equations and Their Application. Memoirs of the Second Conference, Russe, Bulgaria, June 29–July 4, 1981 [in Russian], A. Kynchev Higher Technical School, Russe (1982), pp. 655–658.Google Scholar
  2. 2.
    A. V. Agal'tsev and M. P. Sapagovas, “Solution of the minimal surface equation by the method of finite differences,” Liet. Mat. Rinkinys,7, No. 3, 373–379 (1967).Google Scholar
  3. 3.
    C. Johnson and V. Thomee, “Error estimates for a finite element approximation of a minimal surface,” Math. Comp.,29, No. 130, 343–349 (1975).Google Scholar
  4. 4.
    I. Ya. Bakel'man, Geometric Methods for Solving Elliptic Equations [in Russian], Nauka, Moscow (1965).Google Scholar
  5. 5.
    M. N. Yakovlev, “Methods for solving nonlinear equations,” Tr. Mat. Inst. im. V. A. Steklova,84, 8–40 (1965).Google Scholar
  6. 6.
    M. M. Karchevskii and A. D. Lyashko, Difference Schemes for Nonlinear Problems of Mathematical Physics [in Russian], Kazan State Univ. (1976).Google Scholar
  7. 7.
    A. A. Samarskii and E. S. Nikolaev, Methods for Solving Grid Equations [in Russian], Nauka, Moscow (1978).Google Scholar
  8. 8.
    V. Ya. Rivkind and N. N. Ural'tseva, “A priori estimates and their application for an approximate method of solution of parabolic equations,” Dokl. Akad. Nauk SSSR,185, No. 2, 271–274 (1969).Google Scholar

Copyright information

© Plenum Publishing Corporation 1984

Authors and Affiliations

  • M. Sapagovas

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