Save up to 30% on Elsevier print and eBooks with free shipping. No promo code needed.
Save up to 30% on print and eBooks.
Mathematical Modeling in Diffraction Theory
Based on A Priori Information on the Analytical Properties of the Solution
1st Edition - September 19, 2015
Authors: Alexander G. Kyurkchan, Nadezhda I. Smirnova
Language: English
eBook ISBN:9780128037485
9 7 8 - 0 - 1 2 - 8 0 3 7 4 8 - 5
Mathematical Modeling in Diffraction Theory: Based on A Priori Information on the Analytical Properties of the Solution provides the fundamental physical concepts behind the th…Read more
Purchase options
LIMITED OFFER
Save 50% on book bundles
Immediately download your ebook while waiting for your print delivery. No promo code is needed.
Mathematical Modeling in Diffraction Theory: Based on A Priori Information on the Analytical Properties of the Solution provides the fundamental physical concepts behind the theory of wave diffraction and scattered wave fields as well as its application in radio physics, acoustics, optics, radio astronomy, biophysics, geophysics, and astrophysics.
This book provides a coherent discussion of several advanced topics that have the potential to push forward progress in this field. It begins with examples illustrating the importance of taking a priori information into account when developing algorithms for solving diffraction problems, with subsequent chapters discussing the basic analytical representations of wave fields, the auxiliary current and source methods for solving the problems of diffraction at compact scatterers, the null field and matrix methods that are widely used to solve problems in radio-physics, radio-astronomy, and biophysics, and the continued boundary condition and pattern equation method.
Provides ideas and techniques for obtaining a priori information on analytical properties of wave fields and provides methods for solving diffraction problems
Includes numerous concrete examples of localization of singularities of analytical continuation of wave fields
Presents a qualitative explanation of the formation of visions of objects
Formulates the concept of “invisible” objects
Supplies appropriate computer programs for all presented methods
Researchers, scientists and graduate students in the field of radio physics, acoustics, optics, radio astronomy, biophysics, geophysics, astrophysics, and mathematical physics
Introduction
Chapter 1: Analytic Properties of Wave Fields
Abstract
1.1 Derivation of Basic Analytic Representations of Wave Fields
1.2 Analytic Properties of the Wave Field Pattern and the Domains of Existence of Analytic Representations
Chapter 2: Methods of Auxiliary Currents and Method of Discrete Sources
Abstract
2.1 Existence and Uniqueness Theorems
2.2 Solution of the MAC Integral Equation and the MDS
2.3 Rigorous Solution of the Diffraction Problem by MAC [9, 16]
2.4 Modified MDS
Chapter 3: Null Field and T-Matrix Methods
Abstract
3.1 NFM for Scalar Diffraction Problems
3.2 NFM for Vector Diffraction Problems
3.3 Results of Numerical Studies
3.4 T-Matrix Method
Chapter 4: Method of Continued Boundary Conditions
Abstract
4.1 Method of Continued Boundary Conditions for Scalar Diffraction Problems
4.2 Method of Continued Boundary Conditions for Vector Problems of Diffraction
4.3 Results of Numerical Investigations
4.4 Modified Method of Continued Boundary Conditions
Chapter 5: Pattern Equation Method
Abstract
5.1 Solution of Two-Dimensional Problem of Diffraction at a Compact Scatterer Using the Pattern Equation Method
5.2 Wave Diffraction at a Group of Bodies
5.3 Wave Diffraction at Periodic Gratings
5.4 Solution of the Three-Dimensional Acoustic Problem of Diffraction at a Compact Scatterer
5.5 Plane Wave Scattering at a Periodic Interface Between Media
5.6 Calculation of the Reflection and Transmission Coefficients in a Plane Dielectric Waveguide with Foreign Objects Near It
References
Index
No. of pages: 280
Language: English
Edition: 1
Published: September 19, 2015
Imprint: Elsevier
eBook ISBN: 9780128037485
AK
Alexander G. Kyurkchan
Professor A.G. Kyurkchan is the head of the Department of Probability Theory and Applied Mathematics of the Moscow Technical University of Communication and Informatics, and he is a leading researcher at the Institute of Radio Engineering and Electronics, the Russian Academy of Sciences, Fryazino Branch. His research area is mathematical modelling in diffraction theory. Since 1994 he has been the project manager on grants of the Russian Fund of Basic Researches. He has published 137 articles in international scientific journals. His monograph "Analytical Properties of Wave Fields" was published in 1990.
Affiliations and expertise
Department of Probability Theory and Applied Mathematics, Moscow Technical University of Communication and Informatics, Moscow, Russia
NS
Nadezhda I. Smirnova
N.I. Smirnova is an associate professor in the Department of Probability Theory and Applied Mathematics at the Moscow Technical University of Communication and Informatics. Her research area is mathematical modeling in diffraction theory. She has published 10 articles in international scientific journals.
Affiliations and expertise
Department of Probability Theory and Applied Mathematics, Moscow Technical University of Communication and Informatics, Moscow, Russia
Read Mathematical Modeling in Diffraction Theory on ScienceDirect