Diffraction by an Immersed Elastic Wedge / by Jean-Pierre Croisille, Gilles Lebeau.

Format:

Book

Author/Creator:

Croisille, Jean-Pierre, 1961- author.

Lebeau, Gilles, author.

Contributor:

SpringerLink (Online service)

Series:

Lecture Notes in Mathematics, 0075-8434 ; 1723.

Lecture Notes in Mathematics, 0075-8434 ; 1723

Language:

English

Subjects (All):

Numerical analysis.

Mathematical physics.

Acoustics.

Numerical Analysis.

Mathematical Methods in Physics.

Numerical and Computational Physics, Simulation.

Local Subjects:

Numerical Analysis.

Mathematical Methods in Physics.

Numerical and Computational Physics, Simulation.

Acoustics.

Physical Description:

1 online resource (VIII, 140 pages).

Contained In:

Springer eBooks

Place of Publication:

Berlin, Heidelberg : Springer Berlin Heidelberg : Imprint: Springer, 1999.

System Details:

text file PDF

Summary:

This monograph presents the mathematical description and numerical computation of the high-frequency diffracted wave by an immersed elastic wave with normal incidence. The mathematical analysis is based on the explicit description of the principal symbol of the pseudo-differential operator connected with the coupled linear problem elasticity/fluid by the wedge interface. This description is subsequently used to derive an accurate numerical computation of diffraction diagrams for different incoming waves in the fluid, and for different wedge angles. The method can be applied to any problem of coupled waves by a wedge interface. This work is of interest for any researcher concerned with high frequency wave scattering, especially mathematicians, acousticians, engineers.

Contents:

Notation and results

The spectral function

Proofs of the results

Numerical algorithm

Numerical results.

Other Format:

Printed edition:

ISBN:

9783540466987

Access Restriction:

Restricted for use by site license.