Construction of Green’s Function of the Neumann Problem in a Ball
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Keywords:
Green’s function, Neumann problem, Poisson equation, Laplace operator, Neumann kernelAbstract
Representation of the Green’s function of the classical Neumann problem for the Poisson equation in the unit ball of arbitrary dimension is given. In constructing this function we use the representation of the fundamental solution of the Laplace equation in the form of a series. It is shown that Green’s function can be represented in terms of elementary functions and its explicit form can be written out. An explicit form of the Neumann kernel was constructed for \( n = 4 \) and \( n = 5 \).
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Published
2016-06-30
How to Cite
Sadybekov, M. A., Torebek, B. T., & Turmetov, B. K. (2016). Construction of Green’s Function of the Neumann Problem in a Ball. Eurasian Mathematical Journal, 7(2), 100–105. Retrieved from https://emj.enu.kz/index.php/main/article/view/638
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