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The Mathematical Theory of Time-Harmonic Maxwell's Equations

This book gives a concise introduction to the basic techniques needed for the theoretical analysis of the Maxwell Equations, and filters in an elegant way the essential parts, e.g., concerning the various function spaces needed to rigorously investigate the boundary integral equations and variational equations. The book arose from lectures taught by the authors over many years and can be helpful in designing graduate courses for mathematically orientated students on electromagnetic wave propagation problems. The students should have some knowledge on vector analysis (curves, surfaces, divergence theorem) and functional analysis (normed spaces, Hilbert spaces, linear and bounded operators, dual space). Written in an accessible manner, topics are first approached with simpler scale Helmholtz Equations before turning to Maxwell Equations. There are examples and exercises throughout the book. It will be useful for graduate students and researchers in applied mathematics and engineers working in the theoretical approach to electromagnetic wave propagation.

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Series Title
-
Call Number
510
Publisher
Springer Cham : Springer Cham.,
Collation
XIII, 337
Language
English
ISBN/ISSN
978-3-319-11086-8
Classification
510
Content Type
text
Media Type
computer
Carrier Type
-
Edition
-
Subject(s)
Mathematical and Computational Engineering
Specific Detail Info
-
Statement of Responsibility
Other Information
Cataloger
Jemadi
Source
https://link.springer.com/content/pdf/10.1007/978-3-319-11086-8.pdf?pdf=button
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