Summary
We consider the most general case of the quantization of angular momentum in theN-dimensional space. We show that a hydrogen atom, when viewed in anN-dimensional, multiply connected space, the angular momentum must be ((N−1)/2)-integral.
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References
Doebner H. D., Elmers H. J. andHedenreich W. F.,J. Math. Phys.,30, (1989), 1053.
Al-Jaber S. M. andHenneberger W. C.,J. Phys. A,23 (1990) 2939.
Al-Jaber S. M. andHenneberger W. C.,Nuovo Cimento B,107 (1992) 23.
Benedict M. G. andGy L.,Phys. Rev. D,39 (1989) 3194.
Ho Vu B.,J. Phys. A,27 (1994) 6237.
Henneberger W. C.,Phys. Rev. Lett.,52 (1984) 573.
Henneberger W. C.,Lett. Math. Phys.,11 (1986) 309.
Morandi G,The Role of Topology in Classical and Quantum Physics (Springer, Berlin) 1992.
Shimakura N.,Partial Differential Operators of Elliptic Type, Translations of Mathematical Monographs, Vol.99 (American Mathematical Society) 1992.
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Al-Jaber, S.M. Quantization of angular momentum in theN-dimensional space. Nuov Cim B 110, 993–995 (1995). https://doi.org/10.1007/BF02722866
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DOI: https://doi.org/10.1007/BF02722866