THEORY OF MOTION FOR MONOPOLE - DIPOLE SINGULARITIES OF CLASSICAL YANG-MILLS HIGGS FIELDS. A: LAWS OF MOTION
Jan, 198334 pages
Published in:
- Phys.Rev.D 29 (1984) 658
Report number:
- MPI-PAE-PTH-2-83
Citations per year
Abstract: (APS)
In two recent papers, the general form of the laws of motion for point particles which are multipole sources of the classical coupled Yang-Mills-Higgs fields was determined by Havas, and for the special case of monopole singularities of a Yang-Mills field an iteration procedure was developed by Drechsler and Rosenblum to obtain the equations of motion of mass points, i.e., the laws of motion including the explicit form of the fields of all interacting particles. In this paper we give a detailed derivation of the laws of motion of monopole-dipole singularities of the coupled Yang-Mills-Higgs fields for point particles with mass and spin, following a procedure first applied by Mathisson and developed by Havas. To obtain the equations of motion, a systematic approximation method is developed in the following paper for the solution of the nonlinear field equations and determination of the fields entering the laws of motion found here to any given order in the coupling constant g.- GAUGE FIELD THEORY: YANG-MILLS
- field theory: classical
- MODEL: HIGGS
- FIELD EQUATIONS: SOLUTION
- FIELD EQUATIONS: MONOPOLE
- MODEL: POTENTIAL
- CHARGE
- TENSOR: ENERGY-MOMENTUM
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