Solution of the Neumann Problem for One Four-Dimensional Elliptic Equation


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Authors

  • Abdumauvlen Berdyshev
  • Anvar Hasanov
  • Ainur Ryskan

Keywords:

Neumann problem, energy-integral method, degenerate four-dimensional elliptic equation, Gauss-Ostrogradsky formula, fundamental solutions, Lauricella hypergeometric functions

Abstract

In this article we investigate the Neumann problem for a degenerate elliptic equation in four variables. A fundamental solution is used to construct a solution to the problem. The fundamental solutions are written by using the Lauricella’s hypergeometric functions. The energy-integral method is used to prove the uniqueness of the solution to the problem under consideration. In the course of proving the existence of the problem solution, differentiation formulas, decomposition formulas, some adjacent relations formulas and the autotransformation formula of hypergeometric functions are used. The Gauss-Ostrogradsky formula is used to express problem’s solution in an explicit form.

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Published

2024-05-29

How to Cite

Berdyshev, A., Hasanov, A., & Ryskan, A. (2024). Solution of the Neumann Problem for One Four-Dimensional Elliptic Equation. Eurasian Mathematical Journal, 11(2). Retrieved from https://emj.enu.kz/index.php/main/article/view/183

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