DYNAMICAL (SUPER)SYMMETRIES OF MONOPOLES AND VORTICES

The dynamical (super)symmetries for various monopole systems are reviewed. For a Dirac monopole, non-smooth Runge–Lenz vector can exist; there is, however, a spectrum-generating conformal o(2,1) dynamical symmetry that extends into osp(1/1) or osp(1/2) for spin 1/2 particles. Self-dual 't Hooft–Polyakov-type monopoles admit an su(2/2) dynamical supersymmetry algebra, which allows us to reduce the fluctuation equation to the spin 0 case. For large r, the system reduces to a Dirac monopole plus a suitable inverse-square potential considered before by McIntosh and Cisneros, and by Zwanziger in the spin 0 case, and to the "dyon" of D'Hoker and Vinet for spin 1/2. The asymptotic system admits a Kepler-type dynamical symmetry as well as a "helicity-supersymmetry" analogous to the one Biedenharn found in the relativistic Kepler problem. Similar results hold for the Kaluza–Klein monopole of Gross–Perry–Sorkin. For the magnetic vortex, the N = 2 supersymmetry of the Pauli Hamiltonian in a static magnetic field in the plane combines with the o(2) × o(2,1) bosonic symmetry into an o(2) × osp(1/2) dynamical superalgebra.

[1]  F. Bloore,et al.  Helicity‐supersymmetry of dyons , 1992, hep-th/0512144.

[2]  P. Horvathy ISOSPIN-DEPENDENT o(4,2) SYMMETRY OF SELF-DUAL WU–YANG MONOPOLES , 1991 .

[3]  R. Jackiw Dynamical symmetry of the magnetic vortex , 1990 .

[4]  L. Fehér The O(3,1) symmetry problem of the charge–monopole interaction , 1987 .

[5]  Hughes,et al.  Supersymmetric quantum mechanics in a first-order Dirac equation. , 1986, Physical review. D, Particles and fields.

[6]  Jackiw Erratum: Fractional charge and zero modes for planar systems in a magnetic field , 1984, Physical review. D, Particles and fields.

[7]  Vinet,et al.  Constants of motion for a spin-(1/2) particle in the field of a dyon. , 1985, Physical review letters.

[8]  L. Vinet,et al.  Dynamical supersymmetry of the magnetic monopole and the 1/r2-potential , 1985 .

[9]  L. Vinet,et al.  Supersymmetry of the Pauli equation in the presence of a magnetic monopole , 1984 .

[10]  R. Jackiw Dynamical Symmetry of the Magnetic Monopole , 1980 .

[11]  E. Weinberg Parameter counting for multimonopole solutions , 1979 .

[12]  E. Mottola Zero modes of the 't Hooft-Polyakov monopole , 1978 .

[13]  P. Goddard,et al.  Magnetic monopoles in gauge field theories , 1978 .

[14]  S. D. Ellis,et al.  Scattering on magnetic charge , 1976 .

[15]  A. Barut,et al.  New relativistic Coulomb Hamiltonian with O(4) symmetry and a spinor realization of the dynamical group O(4,2) , 1973 .

[16]  S. Fernbach,et al.  Properties of matter under unusual conditions , 1970 .