Separation of Dirac's Hamiltonian by Van Vleck transformation
2017
ABSTRACTThe now classic Foldy–Wouthuysen transformation (FWT) was introduced as successive unitary transformations. This fundamental idea has become the standard in later developments such as the Douglas–Kroll transformation (DKT) – but it is not the only possibility. FWT can be seen as a simple special case of the general Van Vleck transformation (VVT) which besides the successive version has another, known as the canonical because of a series of nice mathematical properties discovered gradually over time. The aim of the present paper is to compare the two approaches – which give identical results in the lower orders, but not in the higher. After having recapitalised both, we apply them to Dirac's Hamiltonian for the electron in a constant electromagnetic field, written with so few assumptions about the operators that the mathematical techniques stand out separated from the terminology of relativistic quantum mechanics. FWT for a free particle is dealt with by a recent geometric approach to VVT. The orig...
Keywords:
- Hamiltonian (quantum mechanics)
- Free particle
- Special case
- Electromagnetic field
- Relativistic quantum mechanics
- Quantum electrodynamics
- Chemistry
- Electron
- Foldy–Wouthuysen transformation
- Generalization
- Mathematical physics
- Operator (computer programming)
- Dirac (video compression format)
- Computational chemistry
- Unitary state
- Quantum mechanics
- Correction
- Source
- Cite
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