Point-Source Elastic Scattering by a Nested Piecewise Homogeneous Obstacle in an Elastic Environment
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Publication:3161528
DOI10.1177/1081286508102048zbMath1197.74060OpenAlexW2124352254MaRDI QIDQ3161528
Vassilios Sevroglou, Christodoulos E. Athanasiadis, Nikolaos Leonidas Tsitsas, Ioannis G. Stratis
Publication date: 15 October 2010
Published in: Mathematics and Mechanics of Solids (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1177/1081286508102048
linear elasticityreciprocity principleoptical theoremgeneral scattering theoremmixed scattering relationsnested piecewise homogeneous obstaclepoint source fields
Cites Work
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- Scattering theorems for complete dyadic fields
- Inverse scattering by penetrable objects in two-dimensional elastodynamics
- Dyadic Scattering by Small Obstacles. The Rigid Sphere
- On the Low-Frequency Interaction between a Central Dyadic Wave and a Spherical Cavity
- Scattering relations for point-generated dyadic fields in two-dimensional linear elasticity
- 3D elastic scattering theorems for point-generated dyadic fields
- On the far-field operator in elastic obstacle scattering
- Scattering theorems for time-harmonic electromagnetic waves in a piecewise homogeneous medium
- On the acoustic scattering amplitude for a multi-layered Scatterer
- An application of the reciprocity gap functional to inverse scattering theory
- The far-field operator for penetrable and absorbing obstacles in 2D inverse elastic scattering
- Scattering of a Spherical Dyadic Field by a Small Rigid Sphere
- Scattering relations for point sources: Acoustic and electromagnetic waves
- Electromagnetic scattering theorems for interior dipole excitation of a layered obstacle
- Point source excitation of a layered sphere: direct and far-field inverse scattering problems
- Certain Transmission and Reflection Theorems
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