The rotating Morse potential energy eigenvalues solved by using the analytical transfer matrix method  

The rotating Morse potential energy eigenvalues solved by using the analytical transfer matrix method

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作  者:何英 陶求功 杨艳芳 

机构地区:[1]Department of Physics,Shanghai University

出  处:《Chinese Physics B》2012年第10期73-78,共6页中国物理B(英文版)

基  金:Project supported by the Fund from the Science and Technology Committee of Shanghai Municipality,China (Grant No. 11ZR1412300);the National Natural Science Foundation of China (Grant No. 61108010)

摘  要:We study the eigenvalues of the rotating Morse potential by using the quantization condition from the analytical transfer matrix(ATM) method.A hierarchy of supersymmetric partner potentials is obtained with Pekeris approximation,which can be used to calculate the energies of higher rotational states from the energies of lower states.The energies of rotational states of the hydrogen molecule are calculated by the ATM condition,and comparison of the results with those from the hypervirial perturbation method reveals that the accuracy of the approximate expression of Pekeris for the eigenvalues of the rotating Morse potential can be improved substantially in the framework of supersymmetric quantum mechanics.We study the eigenvalues of the rotating Morse potential by using the quantization condition from the analytical transfer matrix(ATM) method.A hierarchy of supersymmetric partner potentials is obtained with Pekeris approximation,which can be used to calculate the energies of higher rotational states from the energies of lower states.The energies of rotational states of the hydrogen molecule are calculated by the ATM condition,and comparison of the results with those from the hypervirial perturbation method reveals that the accuracy of the approximate expression of Pekeris for the eigenvalues of the rotating Morse potential can be improved substantially in the framework of supersymmetric quantum mechanics.

关 键 词:rotating Morse potential analytical transfer matrix(ATM) Pekeris approximation supersymmetry quantum mechanics(SUSY QM) 

分 类 号:O413.1[理学—理论物理] TN252[理学—物理]

 

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