| Author(s) |
Radford, Christopher John
|
| Publication Date |
2003
|
| Abstract |
The Maxwell–Dirac equations are the equations for electronic matter, the 'classical' theory underlying QED. The system combines the Dirac equations with the Maxwell equations sourced by the Dirac current. A stationary Maxwell–Dirac system has ψ = e⁻[iEt],φ with φ independent of t. The system is said to be isolated if the dependent variables obey quite weak regularity and decay conditions. In this paper, we prove the following strong localization result for isolated, stationary Maxwell–Dirac systems,• there are no embedded eigenvalues in the essential spectrum, i.e. −m ≤ E ≤ m;• if |E| < m then the Dirac field decays exponentially as |x| → ∞;• if |E| = m then the system is 'asymptotically' static and decays exponentially if the total charge is non-zero.
|
| Citation |
Journal of Physics A: Mathematical and General, 36(20), p. 5663-5681
|
| ISSN |
1361-6447
0305-4470
1751-8121
1751-8113
|
| Link | |
| Publisher |
Institute of Physics Publishing Ltd
|
| Title |
The Stationary Maxwell-Dirac Equations
|
| Type of document |
Journal Article
|
| Entity Type |
Publication
|
| Name | Size | format | Description | Link |
|---|