Abstract
The Green's function for the Morse potential is calculated in the so(2,1) algebraic approach. The energy spectrum and the normalized wave functions of bound states are obtained from the poles of this Green's function, in the complex plane.
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Milshtein A. I., Strakhovenko V. M.: Phys. Lett. A90 (1982) 447.
Boschi-Filho H., Vaidya A. N.: Phys. Lett. A145 (1990) 69.
Hammann T. F., Oberlechner G., Trapp G., Yoccoz J.: J. Physique28 (1967) 755.
Hammann T. F., Ho-Kim Q.: Nuovo Cimento B64 (1969) 367.
Hammann T. F., Desgrolard P., Chetouani L.: Nuovo Cimento A29 (1975) 199.
Desgrolard P., Hammann T. F.: Phys. Rev. C6 (1972) 482.
Inomata A.:in Path Integral from meV to MeV, Bielefeld Encounters in Physics and Mathematics VII (Ed. M. C. Gutzwiller, A. Inomata, J. R. Klauder, L. Streit). World Scientific, Singapore, 1989, pp. 433–448.
Duru I. H.: Phys. Rev. D28 (1983) 2689.
Cai P. Y., Inomata A., Wilson R.: Phys. Lett. A96 (1983) 117.
Grosche C.: Ann. Phys.187 (1988) 110.
Chetouani L., Hammann T. F.: Nuovo Cimento B92 (1986) 106.
Wybourne B. G.: Classical Groups for Physicists. Wiley, New-York, 1974.
Schwinger J.: Phys. Rev.82 (1951) 664.
Gradshteyn I. S., Ryzhik I. M.: Table of Integrals, Series and Products. Academic Press, New-York, 1965.
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The authors would like to thank Dr. J. Richert, Centre de Recherches Nucléaires, Strasbourg, France, for careful reading of the typescript and useful comments.
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Chetouani, L., Guechi, L. & Hammann, T.F. Construction of the Green's function for the Morse potential. Czech J Phys 43, 13–17 (1993). https://doi.org/10.1007/BF01589580
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DOI: https://doi.org/10.1007/BF01589580