Abstract
The movement of a light particle in the field of two coulomb centers is considered. A system of equations for components of the total wave function with the appropriate asymptotic behaviour was used without using separation of variables.
Effective potentials for a molecular ion of the hydrogen and theμ-mesic ionddμ − are calculated. In the latter system the spectrum of a mesic molecule in a state with the total angular momentumL=0 is found.
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Born, M., Oppenheimer, R.: Ann. Phys.84, 457 (1927)
Levin, F.S.: Proceedings of the Ninth International Conference on the Few Body Problem. Oregon, USA: Eugene, Aug. 1980
Levin, F.S., Kruger, H.: Phys. Rev. A15, 2147 (1977)
Ford, W.K., Levin, F.: Phys. Lett.109B 155 (1982)
Zubarev, A.L.: Sov. J. Nucl. Phys.28, 566 (1978)
Komarov, I.V.: Collection of the papers. In: The Question of the theory of Atomic Collisions. Vol.1, pp. 23, Leningrad: Publ. House of the Leningrad State University 1975
Belyaev, V.B., et al.: Sov. Phys. JETP10, 1171 (1960)
Melezhik, V.S., et al.: Sov. Phys. JETP52, 353 (1981)
Bracci, L., Fiorentini, G.: Phys. Rep.86, 170 (1982)
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The authors express their deep gratitude to Dr. J. Revay for useful discussions.
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Belyaev, V.B., Brener, S.E., Galimsyanov, R.M. et al. Solution of Faddeev-type equations in the problem of two coulomb centers. Z Physik A 317, 15–18 (1984). https://doi.org/10.1007/BF01420443
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DOI: https://doi.org/10.1007/BF01420443