On the Fredholm Property and Solvability of a System of Integral Equations in the Transmission Problem for the Helmholtz Equation

On the Fredholm Property and Solvability of a System of Integral Equations in the Transmission Problem for the Helmholtz Equation

A scalar three-dimensional boundary value problem of wave diffraction for the Helmholtz equation with transmission conditions that assume the presence of an infinitely thin material at the media interface is considered. Uniqueness and existence theorems for solutions are proved. The original problem...

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Veröffentlicht in:Differential equations 2023-08, Vol.59 (8), p.1095-1104
Hauptverfasser: Smirnov, Yu. G., Kondyrev, O. V.
Format: Artikel
Sprache:eng
Schlagworte:
Boundary value problems
Collocation methods
Difference and Functional Equations
Electric waves
Electromagnetic radiation
Electromagnetic waves
Electromagnetism
Existence theorems
Fredholm equations
Helmholtz equations
Integral Equations
Linear algebra
Mathematics
Mathematics and Statistics
Ordinary Differential Equations
Partial Differential Equations
Uniqueness theorems
Wave diffraction
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Beschreibung
Zusammenfassung:A scalar three-dimensional boundary value problem of wave diffraction for the Helmholtz equation with transmission conditions that assume the presence of an infinitely thin material at the media interface is considered. Uniqueness and existence theorems for solutions are proved. The original problem is reduced to a system of integral equations over the media interface. Calculation formulas for the system of linear algebraic equations obtained after applying the collocation method and numerical results for solving the problem when the domain is a ball with certain transmission conditions are given.
ISSN:0012-2661
1608-3083
DOI:10.1134/S0012266123080086