Pseudo-differential operators for embedding formulae

Pseudo-differential operators for embedding formulae

A new method is proposed for deriving embedding formulae in 2D diffraction problems. In contrast to the approach developed in Craster and Shanin (2005) [7], which is based on a differential operator, here a pseudo-differential, i.e., a non-local operator is applied to the wave field. Using this non-...

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Veröffentlicht in:Journal of computational and applied mathematics 2010-07, Vol.234 (6), p.1637-1646
Hauptverfasser: Shanin, A.V., Craster, R.V.
Format: Artikel
Sprache:eng
Schlagworte:
Computation
Diffraction
Mathematical analysis
Mathematical models
Operators
Scattering
Two dimensional
Wedges
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Zusammenfassung:A new method is proposed for deriving embedding formulae in 2D diffraction problems. In contrast to the approach developed in Craster and Shanin (2005) [7], which is based on a differential operator, here a pseudo-differential, i.e., a non-local operator is applied to the wave field. Using this non-local operator a new embedding formula is derived for scattering by a single wedge. The formula has uniform structure for all opening angles, including angles irrational with respect to π ; the earlier theory, Craster and Shanin (2005) [7], was valid only for rational angles.
ISSN:0377-0427
1879-1778
DOI:10.1016/j.cam.2009.08.010