Fundamentals of the physical theory of diffraction /
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| Author / Creator: | Ufimt͡sev, P. I͡A. (Petr I͡Akovlevich) |
|---|---|
| Imprint: | Hoboken, N.J. : Wiley-Interscience, c2007. |
| Description: | 1 online resource (xvii, 329 p.) : ill. |
| Language: | English |
| Subject: | |
| Format: | E-Resource Book |
| URL for this record: | http://pi.lib.uchicago.edu/1001/cat/bib/8680138 |
Table of Contents:
- Foreword
- Preface
- Acknowledgments
- Introduction
- 1. Basic Notions in Acoustic and Electromagnetic Diffraction Problems
- 1.1. Formulation of the Diffraction Problem
- 1.2. Scattered Field in the Far Zone
- 1.3. Physical Optics
- 1.4. Nonuniform Component of Induced Surface Field
- 1.5. Electromagnetic Waves Problems
- 2. Wedge Diffraction: Exact Solution and Asymptotics
- 2.1. Classical Solutions
- 2.2. Transition to the PlaneWave Excitation
- 2.3. Conversion of the Series Solution to the Sommerfeld Integrals
- 2.4. The Sommerfeld Ray Asymptotics
- 2.5. The Pauli Asymptotics
- 2.6. Uniform Asymptotics: Extension of the Pauli Technique
- 2.7. Comments on Alternative Asymptotics Problems
- 3. Wedge Diffraction: The Physical Optics Field
- 3.1. Original PO Integrals
- 3.2. Conversion of the PO Integrals to the Canonical Form
- 3.3. Ray Asymptotics for the PO Diffracted Field Problems
- 4. Wedge Diffraction: Radiation by the Nonuniform Component of Surface Sources
- 4.1. Integrals and Asymptotics
- 4.2. Integral Form of Functions f (1 ) and g (1 )
- 4.3. Oblique Incidence of a PlaneWave at aWedge Problems
- 5. First-Order Diffraction at Strips and Polygonal Cylinders
- 5.1. Diffraction at a Strip
- 5.2. Diffraction at a Triangular Cylinder Problems
- 6. Axially Symmetric Scattering of AcousticWaves at Bodies of Revolution
- 6.1. Diffraction at a Canonical Conic Surface
- 6.2. Scattering at a Disk
- 6.3. Scattering at Cones: Focal Field
- 6.4. Bodies of Revolution with Nonzero Gaussian Curvature: Backscattered Focal Fields
- 6.5. Bodies of Revolution with Nonzero Gaussian Curvature: Axially Symmetric Bistatic Scattering Problems
- 7. Elementary Acoustic and Electromagnetic EdgeWaves
- 7.1. Elementary Strips on a CanonicalWedge
- 7.2. Integrals for j (1 ) , s,h on Elementary Strips
- 7.3. Triple Integrals for Elementary EdgeWaves
- 7.4. Transformation of Triple Integrals into One-Dimensional Integrals
- 7.5. General Asymptotics for Elementary EdgeWaves
- 7.6. Analytic Properties of Elementary EdgeWaves
- 7.7. Numerical Calculations of Elementary EdgeWaves
- 7.8. Electromagnetic Elementary EdgeWaves
- 7.9. Improved Theory of Elementary EdgeWaves
- 7.10. Some References Related to Elementary EdgeWaves Problems
- 8. Ray and Caustics Asymptotics for Edge DiffractedWaves
- 8.1. Ray Asymptotics
- 8.2. Caustic Asymptotics Problems
- 9. Multiple Diffraction of EdgeWaves: Grazing Incidence and Slope Diffraction
- 9.1. Statement of the Problem and Related References
- 9.2. Grazing Diffraction
- 9.3. Slope Diffraction in the Configuration of Figure 9.1
- 9.4. Slope Diffraction: General Case Problems
- 10. Diffraction Interaction of Neighboring Edges on a Ruled Surface
- 10.1. Diffraction at an Acoustically Hard Surface
- 10.2. Diffraction at an Acoustically Soft Surface
- 10.3. Diffraction of Electromagnetic Waves Problems
- 11. Focusing of Multiple Acoustic EdgeWaves Diffracted at a Convex Body of Revolution with a Flat Base
- 11.1. Statement of the Problem and its Characteristic Features
- 11.2. Multiple Hard Diffraction
- 11.3. Multiple Soft Diffraction Problems
- 12. Focusing of Multiple EdgeWaves Diffracted at a Disk
- 12.1. Multiple Hard Diffraction
- 12.2. Multiple Soft Diffraction
- 12.3. Multiple Diffraction of