Abstract
A method is proposed to obtain a translationnaly invariant solution to the Schrodinger equation including two-body correlation. The conditions to obtain translationnaly invariant excited state are discussed. It is explained why ground states are surrounded by coupled satellite states cooperating to the binding energy.
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M. Fabre de la Ripelle and J. Navarro, Ann. Phys. 123, 185 (1979).
M. Fabre de la Ripelle, Proceedings of the International School on Nuclear Theoretical Physics (Predeal. Inst. Atom. Phys., Bucarest, 1969), http://m-fabredelar-ipelle.com/?q=content/hyperspherical-formalism-applied-three-and-four-body-problem; Contribution to the Second Problem Symposium in Nuclear Physics (Novosibirsk, 1970); Ann. Phys. 147, 281 (1983).
M. Fabre de la Ripelle, S. A. Sofianos, and R. M. Adam, Ann. Phys. 316, 107 (2005).
M. Fabre de la Ripelle, Acad. Sc. Paris, Ser. II 299(13), 839 (1984).
M. Fabre de la Ripelle, Few-Body Syst. 181, 1 (1986).
M. Fabre de la Ripelle, Asymptotic Equations for Two-body Correlations, Ann. Phys. 331 (2013) 146–159.
M. Fabre de la Ripelle, Nucl. Phys., Ser. A 839, 11 (2010).
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I friendly dedicate this work to Vladimir B. Belyaev for his 80h birthday
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Fabre de la Ripelle, M. A mathematical structure for nuclei. Phys. Part. Nuclei Lett. 12, 269–274 (2015). https://doi.org/10.1134/S1547477115020107
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DOI: https://doi.org/10.1134/S1547477115020107