Book contents
- Frontmatter
- Contents
- Preface
- List of symbols
- 1 Scope, motivation, and orientation
- Part I Classical theory
- 2 A charge coupled to its electromagnetic field
- 3 Historical notes
- 4 The energy–momentum relation
- 5 Long-time asymptotics
- 6 Adiabatic limit
- 7 Self-force
- 8 Comparison dynamics
- 9 The Lorentz–Dirac equation
- 10 Spinning charges
- 11 Many charges
- 12 Summary and preamble to the quantum theory
- Part II Quantum Theory
- References
- Index
12 - Summary and preamble to the quantum theory
Published online by Cambridge University Press: 14 August 2009
- Frontmatter
- Contents
- Preface
- List of symbols
- 1 Scope, motivation, and orientation
- Part I Classical theory
- 2 A charge coupled to its electromagnetic field
- 3 Historical notes
- 4 The energy–momentum relation
- 5 Long-time asymptotics
- 6 Adiabatic limit
- 7 Self-force
- 8 Comparison dynamics
- 9 The Lorentz–Dirac equation
- 10 Spinning charges
- 11 Many charges
- 12 Summary and preamble to the quantum theory
- Part II Quantum Theory
- References
- Index
Summary
Within the framework of specific models for the coupling between charges and the electromagnetic field we have presented a fair amount of rather detailed arguments and computations. Thus before embarking on the quantized theory, it might be useful to summarize our main findings.
Extended charge. To have a well-defined dynamics, a smeared charge distribution has to be used. This can be done either on the semirelativistic level of the Abraham model or in the form of a relativistically covariant theory, i.e. the Lorentz model. In the latter case internal rotation must be included by necessity.
Adiabatic regime. Situations for which the classical electron theory can be experimentally tested fall in the adiabatic regime with a remarkable level of accuracy. Quantum mechanics must be used way before one leaves the domain of validity of the adiabatic approximation. A good example is the hydrogen atom in a bound state. Sufficiently far from the nucleus, which is certainly satisfied when at least a Bohr radius away from it, the assumptions for the adiabatic approximation are fulfilled and the dynamics of the electron is well governed by Eq. (9.14). On the other hand, it is known that the fluorescent spectrum of the hydrogen atom is accounted for only by quantum mechanics. To test the classical electron theory on the basis of this system is simply not feasible. Thus, in the range where the classical electron theory is applicable by necessity one is inside its adiabatic regime. In this regime the particle becomes point-like and is characterized by a charge, an effective mass, and, in the case of internal rotation, by an effective magnetic moment; compare with sections 4.2 and 10.1.
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- Dynamics of Charged Particles and their Radiation Field , pp. 145 - 146Publisher: Cambridge University PressPrint publication year: 2004