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International Journal of Fluid Mechanics Research
ESCI SJR: 0.22 SNIP: 0.446 CiteScore™: 0.5

ISSN Imprimir: 2152-5102
ISSN En Línea: 2152-5110

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International Journal of Fluid Mechanics Research

DOI: 10.1615/InterJFluidMechRes.v26.i5-6.140
pages 742-757

The Reflection Principle in Two-Dimensional Boundary-Value Problems for the Helmholtz Equation

A. M. Gomilko
Institute of Hydromechanics of National Academy of Sciences of Ukraine, Kyiv, Ukraine
Victor T. Grinchenko
Institute of Hydromechanics, National Academy of Science of Ukraine, Kyiv, Ukraine
Ye. V. Lobova
Fluid Mechanics Institute, Ukrainian Academy of Sciences, Kiev, Ukraine

SINOPSIS

The possibility of employing the principle of reflection in constructing solutions and internal and external boundary-value problems for the Helmholtz equation in two-dimensional domains whose boundaries contain rectilinear segments is analyzed. The principal idea of the approach consists in extending the desired solution in a canonical domain such as a circle by employing the reflection principle for solving the Helmholtz equation through the rectilinear segments of the boundary (at homogeneous boundary conditions). In this case the solution of the boundary-value problem is expressed in terms of series in particular solutions of the Helmholtz equation in polar coordinates; the unknown coefficients of this series can be found from an infinite set of linear algebraic equations. The closure equations at the segments of the circle that do not serve as physical boundaries of the original domain are formulated here by reflection of the desired equation. Various examples of boundary-value problems for the Helmholtz equation for a rectilinear-circular lune (internal and external problems) are analyzed. The manner in which allowance can be made for local singularities of the wave field associated with corner points of the domain under study and the mixed nature of the boundary conditions is shown. Numerical computations that verify the suggested method are performed for one of the problems.


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