High frequency asymptotic solutions of the reduced wave equation on infinite regions with non-convex boundaries

High frequency asymptotic solutions of the reduced wave equation on infinite regions with non-convex boundaries

The asymptotic behavior as λ→∞ of the function U(x,λ) that satisfies the reduced wave equation Lλ[U]=∇⋅(E(x)∇U)+λ2N2(x)U=0 on an infinite 3-dimensional region, a Dirichlet condition on ∂V , and an outgoing radiation condition is investigated. A function UN(x,λ) is constructed that is a global appr...

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Bibliographic Details
Main Author:	Clifford O. Bloom
Format:	Article
Language:	English
Published:	Hindawi Limited 1996-01-01
Series:	Mathematical Problems in Engineering
Subjects:	High frequency radiation scattering global approximate solution uniform asymptotic approximation caustics geometrical optics inhomogeneous medium anisotropic medium reduced wave equation.
Online Access:	http://dx.doi.org/10.1155/S1024123X96000385

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