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  • 1
    Online Resource
    Online Resource
    Hoboken, New Jersey :IEEE Press/Wiley,
    UID:
    almafu_9959329137002883
    Format: 1 online resource
    ISBN: 9781119052388 , 9781119052395 , 1119052394 , 9781119052401 , 1119052408 , 1119052386 , 1118989333 , 9781118989333
    Series Statement: IEEE Press Series on Electromagnetic Wave Theory
    Content: Internationally recognized authority on Differential Forms, Ismo V. Lindell, presents the tools for analyzing electromagnetic problems with special attention on electromagnetic media. The tools are applicable in basic studies of metamaterials and metasurfaces. This book deals with electromagnetic equations in terms of differential forms and exterior calculus (multivectors, multiforms and dyadics), allowing a coordinate-free way of doing analytic work. Also, applying four-dimensional formalism equations and expressions can be handled in a more compact form than through the conventional three-dimensional formalism. The content focuses on electromagnetic media by defining medium classes in several different ways and analyzing wave propagation in them. This book also deals with generation of boundary surfaces in terms of special medium interfaces. The introductory material on various types of dyadics is extended to include an appendix of operational rules ready for application. . Presents the tools for analyzing electromagnetic problems with special attention on electromagnetic media . Includes solutions to end of chapter problems within the appendix . Written by an internationally recognized expert on Differential Forms Multiforms, Dyadics and Electromagnetic Media is mainly focused on applying the formalism to the analysis of electromagnetic media as inspired by the ongoing engineering interest in constructing novel metamaterials and metaboundaries. Ismo V. Lindell is a Professor Emeritus in the Department of Radio Science and Engineering, in the School of Electrical Engineering at the Aalto University, Finland. Dr. Lindell has received many honors in the course of his career, including his recognition as an IEEE Fellow in 1990 for his contributions to electromagnetic theory and for the development of education in electromagnetics in Finland. Dr. Lindell has authored or co-authored 3 books in English, authored or co-authored 10 books in Finnish, and published several hundred articles in professional journals, conference proceedings, and contributed chapters to other books.
    Note: Preface xi -- 1 Multivectors and Multiforms 1 -- 1.1 Vectors and One-Forms, 1 -- 1.1.1 Bar Product , 3.4 Example: Simple Antisymmetric Bidyadic, 64 -- 3.5 Inverse Rules for Bidyadics, 66 -- 3.5.1 Skewon Bidyadic 67 -- 3.5.2 Extended Bidyadics 70 -- 3.5.3 3D Expansions 73 -- Problems, 74 -- 4 Special Dyadics and Bidyadics 79 -- 4.1 Orthogonality Conditions, 79 -- 4.1.1 Orthogonality of Dyadics 79 -- 4.1.2 Orthogonality of Bidyadics 81 -- 4.2 Nilpotent Dyadics and Bidyadics, 81 -- 4.3 Projection Dyadics and Bidyadics, 83 -- 4.4 Unipotent Dyadics and Bidyadics, 85 -- 4.5 Almost-Complex Dyadics, 87 -- 4.5.1 Two-Dimensional AC Dyadics 89 -- 4.5.2 Four-Dimensional AC Dyadics 89 -- 4.6 Almost-Complex Bidyadics, 91 -- 4.7 Modified Closure Relation, 93 -- 4.7.1 Equivalent Conditions 94 -- 4.7.2 Solutions 94 -- 4.7.3 Testing the Two Solutions 96 -- Problems, 98 -- 5 Electromagnetic Fields 101 -- 5.1 Field Equations, 101 -- 5.1.1 Differentiation Operator 101 -- 5.1.2 Maxwell Equations 103 -- 5.1.3 Potential One-Form 105 -- 5.2 Medium Equations, 106 -- 5.2.1 Medium Bidyadics 106 -- 5.2.2 Potential Equation 107 -- 5.2.3 Expansions of Medium Bidyadics 107 -- 5.2.4 Gibbsian Representation 109 -- 5.3 Basic Classes of Media, 110 -- 5.3.1 Hehl-Obukhov Decomposition 110 -- 5.3.2 3D Expansions 112 -- 5.3.3 Simple Principal Medium 114 -- 5.4 Interfaces and Boundaries, 117 -- 5.4.1 Interface Conditions 117 -- 5.4.2 Boundary Conditions 119 -- 5.5 Power and Energy, 123 -- 5.5.1 Bilinear Invariants 123 -- 5.5.2 The Stress-Energy Dyadic 125 -- 5.5.3 Differentiation Rule 127 -- 5.6 Plane Waves, 128 -- 5.6.1 Basic Equations 128 -- 5.6.2 Dispersion Equation 130 -- 5.6.3 Special Cases 132 -- 5.6.4 Plane-Wave Fields 132 -- 5.6.5 Simple Principal Medium 134 -- 5.6.6 Handedness of Plane Wave 135 -- Problems, 136 -- 6 Transformation of Fields and Media 141 -- 6.1 Affine Transformation, 141 -- 6.1.1 Transformation of Fields 141 -- 6.1.2 Transformation of Media 142 -- 6.1.3 Dispersion Equation 144 -- 6.1.4 Simple Principal Medium 145 -- 6.2 Duality Transformation, 145 -- 6.2.1 Transformation of Fields 146. , 6.2.2 Involutionary Duality Transformation 147 -- 6.2.3 Transformation of Media 149 -- 6.3 Transformation of Boundary Conditions, 150 -- 6.3.1 Simple Principal Medium 152 -- 6.3.2 Plane Wave 152 -- 6.4 Reciprocity Transformation, 153 -- 6.4.1 Medium Transformation 153 -- 6.4.2 Reciprocity Conditions 155 -- 6.4.3 Field Relations 157 -- 6.4.4 Time-Harmonic Fields 158 -- 6.5 Conformal Transformation, 159 -- 6.5.1 Properties of the Conformal Transformation 160 -- 6.5.2 Field Transformation 164 -- 6.5.3 Medium Transformation 165 -- Problems, 166 -- 7 Basic Classes of Electromagnetic Media 169 -- 7.1 Gibbsian Isotropy, 169 -- 7.1.1 Gibbsian Isotropic Medium 169 -- 7.1.2 Gibbsian Bi-isotropic Medium 170 -- 7.1.3 Decomposition of GBI Medium 171 -- 7.1.4 Affine Transformation 173 -- 7.1.5 Eigenfields in GBI Medium 174 -- 7.1.6 Plane Wave in GBI Medium 176 -- 7.2 The Axion Medium, 178 -- 7.2.1 Perfect Electromagnetic Conductor 179 -- 7.2.2 PEMC as Limiting Case of GBI Medium 180 -- 7.2.3 PEMC Boundary Problems 181 -- 7.3 Skewon-Axion Media, 182 -- 7.3.1 Plane Wave in Skewon-Axion Medium 184 -- 7.3.2 Gibbsian Representation 185 -- 7.3.3 Boundary Conditions 187 -- 7.4 Extended Skewon-Axion Media, 192 -- Problems, 194 -- 8 Quadratic Media 197 -- 8.1 P Media and Q Media, 197 -- 8.2 Transformations, 200 -- 8.3 Spatial Expansions, 201 -- 8.3.1 Spatial Expansion of Q Media 201 -- 8.3.2 Spatial Expansion of P Media 203 -- 8.3.3 Relation Between P Media and Q Media 204 -- 8.4 Plane Waves, 205 -- 8.4.1 Plane Waves in Q Media 205 -- 8.4.2 Plane Waves in P Media 207 -- 8.4.3 P Medium as Boundary Material 208 -- 8.5 P-Axion and Q-Axion Media, 209 -- 8.6 Extended Q Media, 211 -- 8.6.1 Gibbsian Representation 211 -- 8.6.2 Field Decomposition 214 -- 8.6.3 Transformations 215 -- 8.6.4 Plane Waves in Extended Q Media 215 -- 8.7 Extended P Media, 218 -- 8.7.1 Medium Conditions 218 -- 8.7.2 Plane Waves in Extended P Media 219 -- 8.7.3 Field Conditions 220 -- Problems, 221 -- 9 Media Defined by Bidyadic Equations 225. , 9.1 Quadratic Equation, 226 -- 9.1.1 SD Media 227 -- 9.1.2 Eigenexpansions 228 -- 9.1.3 Duality Transformation 229 -- 9.1.4 3D Representations 231 -- 9.1.5 SDN Media 234 -- 9.2 Cubic Equation, 235 -- 9.2.1 CU Media 235 -- 9.2.2 Eigenexpansions 236 -- 9.2.3 Examples of CU Media 238 -- 9.3 Bi-Quadratic Equation, 240 -- 9.3.1 BQ Media 241 -- 9.3.2 Eigenexpansions 242 -- 9.3.3 3D Representation 244 -- 9.3.4 Special Case 245 -- Problems, 246 -- 10 Media Defined by Plane-Wave Properties 249 -- 10.1 Media with No Dispersion Equation (NDE Media), 249 -- 10.1.1 Two Cases of Solutions 250 -- 10.1.2 Plane-Wave Fields in NDE Media 255 -- 10.1.3 Other Possible NDE Media 257 -- 10.2 Decomposable Media, 259 -- 10.2.1 Special Cases 259 -- 10.2.2 DC-Medium Subclasses 263 -- 10.2.3 Plane-Wave Properties 267 -- Problems, 269 -- Appendix A Solutions to Problems 273 -- Appendix B Transformation to Gibbsian Formalism 369 -- Appendix C Multivector and Dyadic Identities 375 -- References 389 -- Index 395.
    Additional Edition: Print version: Lindell, Ismo V. Multiforms, dyadics, and electromagnetic media. Hoboken, New Jersey : John Wiley & Sons, Inc., [2015] ISBN 9781118989333
    Language: English
    Keywords: Electronic books. ; Electronic books. ; Electronic books. ; Electronic books.
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