This book presents a fresh and original exposition of the foundations of classical electrodynamics in the tradition of the so-called metric-free approach. The text provides an axiomatic treatment of the subject, along with a careful discussion of the relevant mathematics, particularly the calculus of exterior differential forms and the tools of computer algebra. However, strong emphasis is placed not only on mathematical definitions of physical notions, but also on the actual physical measurement procedures and their operational interpretation. Requiring some knowledge of elementary electrodynamics, linear algebra, and basic vector analysis, this systematic work interweaves both mathematics and physics, and will be appropriate for graduate students and researchers in physics, mathematics, and electrical engineering.
Rezensionen / Stimmen
"[The authors] .have stressed the phenomena underlying the axioms chosen and the operational interpretation of the quantities introduced. In this, they have clearly succeeded."
-Mathematical Reviews
"Throughout this book, the rationalized MKS system of units is used, making analysis more intelligible, and there are many diagrams which are of great help in understanding the text. Each part of the book is followed by a copious list of references.... Also, in appropriate places there are indications how computer algebra (REDUCE/EXCALC) can be used.... The printing and appearance of the book are excellent.... It can be warmly recommended."
-Zentralblatt Math
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ISBN-13
978-1-4612-0051-2 (9781461200512)
DOI
10.1007/978-1-4612-0051-2
Schweitzer Klassifikation
Preface y.- Five plus one axioms.- Topological approach.- Electromagnetic spacetime relation as fifth axiom.- Electrodynamics in matter and the sixth axiom.- List of axioms.- A reminder: Electrodynamics in 3-dimensional Euclidean vector calculus.- On the literature.- References.- A Mathematics: Some Exterior Calculus.- Why exterior differential forms?.- A.1 Algebra.- A.2 Exterior calculus.- A.3 Integration on a manifold.- References.- B Axioms of Classical Electrodynamics.- B.1 Electric charge conservation.- B.2 Lorentz force density.- B.3 Magnetic flux conservation.- B.4 Basic classical electrodynamics summarized, example.- B.5 Electromagnetic energy-momentum current and action.- References.- C More Mathematics.- C.1 Linear connection.- C.2 Metric.- References.- D The Maxwell-Lorentz Spacetime Relation.- D.1 A linear relation between H and F.- D.2 Propagation of electromagnetic waves: Quartic wave surface.- D.3 First constraint: Electric/magnetic reciprocity.- D.4 Second constraint: Vanishing skewon field. Emergence of the light cone.- D.5 Extracting the metric by an alternative method.- D.6 Fifth axiom: Maxwell-Lorentz spacetime relation.- References.- E Electrodynamics in Vacuum and in Matter.- E.1 Standard Maxwell-Lorentz theory in vacuum.- E.2 Electromagnetic spacetime relations beyond locality and linearity.- E.3 Electrodynamics in matter, constitutive law.- E.4 Electrodynamics of moving continua.- References.- ®Outlook.- How does gravity affect electrodynamics?.- Reissner-Nordström solution.- Rotating source: Kerr-Newman solution.- Electrodynamics outside black holes and neutron stars.- Force-free electrodynamics.- Remarks on topology and electrodynamics.- Superconductivity: Remarks on Ginzburg-Landau theory.- Classical (first quantized) Dirac field.-On the quantum Hall effect and the composite fermion.- On quantum electrodynamics.- On electroweak unification.- References.- Author Index.
