Sommerfeld-type integrals for discrete diffraction problems
Three problems for a discrete analog of the Helmholtz equation are studied analytically using the plane wave decomposition and the Sommerfeld integral approach. They are: (1) the problem with a point source on an entire plane; (2) the problem of diffraction by a Dirichlet half-line; (3) the problem...
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Veröffentlicht in: | Wave motion 2020-09, Vol.97, p.102606, Article 102606 |
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Format: | Artikel |
Sprache: | eng |
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Zusammenfassung: | Three problems for a discrete analog of the Helmholtz equation are studied analytically using the plane wave decomposition and the Sommerfeld integral approach. They are: (1) the problem with a point source on an entire plane; (2) the problem of diffraction by a Dirichlet half-line; (3) the problem of diffraction by a Dirichlet right angle. It is shown that the total field can be represented as an integral of an algebraic function over a contour drawn on some manifold. The latter is a torus. As a result, explicit solutions are obtained in terms of recursive relations (for the Green’s function), algebraic functions (for the half-line problem), or elliptic functions (for the right angle problem).
•Three problems for a discrete analog of the Helmholtz equation are studied.•The problem with a point source on an entire plane is studied.•The problem of diffraction by a Dirichlet half-line is studied.•The problem of diffraction by a Dirichlet right angle is studied.•The plane wave decomposition and the Sommerfeld integral approach are applied.•The solution is obtained in terms of the algebraic functions. |
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ISSN: | 0165-2125 1878-433X |
DOI: | 10.1016/j.wavemoti.2020.102606 |