An Action Principle for the Masses of Dirac Particles
arXiv:0712.0678 · doi:10.4310/ATMP.2009.v13.n6.a2
Abstract
A variational principle is introduced which minimizes an action formulated for configurations of vacuum Dirac seas. The action is analyzed in position and momentum space. We relate the corresponding Euler-Lagrange equations to the notion of state stability. Examples of numerical minimizers are constructed and discussed.
43 pages, LaTeX, 8 figures, minor corrections (published version)