Abstract
We develop here the general treatment arising from the Bethe-Salpeter equation for a two-particle bound system in which at least one of the particles is spinless. It is shown that a natural two-component formalism can be formulated for describing the propagators of scalar particles. This leads to a formulation of the Bethe-Salpeter equation in a form very reminiscent of the fermion-fermion case. It is also shown, that using this two-component formulation for spinless particles, the perturbation theory can be systematically developed in a manner similar to that of fermions. Quantum electrodynamics for scalar particles is then developed in the two component formalism, and the problem of bound states, in which one of the constituent particles is spinless, is examined by means of the means of the Bethe-Salpeter equation. For this case, the Bethe-Salpeter equation is cast into a form which is convenient to perform a Foldy-Woutyhuysen transformation which we carry out, keeping the lowest-order relativistic corrections to the nonrelativistic equation. The results are compared with the corresponding fermion-fermion case. It is shown, as might have been expected, that the only spin-independent terms that occur for the fermion-fermion system which do not occur for bound scalar particle cases, is the zitterbewegung contribution. The relevance of the above considerations for systems that are essentially bound by electromagnetic interactions, such as kaonic hydrogen, is discussed.
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References
R. E. Cutkosky,Phys. Rev. 96, 1135 (1954).
L. Foldy and S. Wouthuysen,Phys. Rev. 78, 29 (1950).
F. Rohrlich,Phys. Rev. 80, 666 (1950).
In part of this discussion we shall draw on the results of D. A. Owen,Phys. Rev. D 42, 3534 (1990).
E. Salpeter and H. Bethe,Phys. Rev. 84, 1232 (1951); J. Schwinger,Proc. Natl. Acad. Sci. USA 37, 452 (1951); M. Gell-Mann and F. Low,Phys. Rev. 84, 350 (1951).
E. E. Salpeter,Phys. Rev. 87, 328 (1952);84, 1226 (1951).
J. Bjorken and S. Drell,Relativistic Quantum Mechanics (McGraw-Hill, New York, 1964).
Equation (3.4) is identical to that found by H. Feshbach and F. Villars,Rev. Mod. Phys. 30, 24 (1958), whose initial starting point was the Klain-Gordon equation. Also, Ref. 7 has further details on their approach.
M. Halpert and D. A. Owen,J. Phys. G (in press).
See any standard textbook, for instance,Quarks, Leptons and Gauge Fields, Kerson Huang (World Scientific, Singapore, 1982).
E. E. Salpeter,Phys. Rev. 87, 328 (1952);84, 1226 (1951); A. Karplus and A. Klein,Phys. Rev. 87, (1952); T. Fulton and P. Martin,Phys. Rev. 95, 811 (1954); D. A. Owen, inProceedings of the Topical Seminar on Electromagnetic Interactions, Trieste, 1963 (ICPT report no. IC/71/140, 1971).
D. A. Owen,Phys. Rev. A 16, 452 (1977).
Z. Chraplyvy,Phys. Rev. 91, 388 (1953).
W. Barker and F. Glover,Phys. Rev. 99, 317 (1955).
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Owen, D.A. On quantum electrodynamics of two-particle bound states containing spinless particles. Found Phys 24, 273–296 (1994). https://doi.org/10.1007/BF02313125
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DOI: https://doi.org/10.1007/BF02313125