On a boundary value problem in a wedge-shaped domain
UDC
539.3DOI:
https://doi.org/10.31429/vestnik-17-1-1-17-22Abstract
The boundary value problem for the three-dimensional Helmholtz equation is considered in an area that represents a rectangular wedge of infinite length.
The block element method is used for the first time to construct an exact solution of this boundary value problem in the form of a Packed block element, which is necessary for the study of more complex, including mixed problems for block structures. Representations of solutions to boundary problems in the form of Packed block elements make it possible to study and solve boundary problems of almost any complexity and in any areas. This is due to the fact that an arbitrary area can always be represented in real or virtual form as a block structure, blocks of which can be formed from the condition of convenience of solving specified boundary problems on them. In this paper, we consider a three-dimensional Dirichlet boundary value problem for the Helmholtz equation, for which the block element method is used to construct solutions for arbitrary boundary conditions in a wedge-shaped region in the form of Packed and unpacked block elements. There are no such solutions in publications, they exist only for special cases. The block element method solves it quite simply and can be used for more complex tasks.
Keywords:
block element method, boundary value problem, automorphism, pseudo differential equation, wedge-shaped areaAcknowledgement
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