The upper and lower bounds of energy for nuclear and coulomb few-body systems

被引:5
作者
Donchev A.G. [1 ]
Kalachev S.A. [1 ]
Kolesnikov N.N. [1 ]
Tarasov V.I. [1 ]
机构
[1] Faculty of Physics, Moscow State University, Moscow
来源
Physics of Particles and Nuclei Letters | 2007年 / 4卷 / 1期
关键词
21.10.Dr; 21.45.+v; 45.50.Jf;
D O I
10.1134/S1547477107010074
中图分类号
学科分类号
摘要
The upper and lower bounds of energy are found for three-, four-, and five-particle nuclear and Coulomb systems in the framework variational method with the trial functions of exponential and Gaussian types. The two-sided estimates of energy not only allow one to fix the limits for the exact value of energy but also provide an additional opportunity for extrapolation of the variational estimates to the exact value of energy. This allows one to reduce the volume of calculations by shortening the number of trial functions without the loss of accuracy. © Pleiades Publishing, Ltd. 2007.
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页码:39 / 45
页数:6
相关论文
共 21 条
  • [1] Kolesnikov N.N., Tarasov V.I., Phenomenological NN -Potential from Analyzis of Three-and Four-Particle Nuclei, Yad. Fiz., 35, pp. 609-619, (1982)
  • [2] Donchev A.G., Kolesnikov N.N., Tarasov V.I., Low and Upper Variational Estimations in Calculations of Coulon and Nuclear Systems, Yad. Fiz., 63, pp. 419-430, (2000)
  • [3] Schwartz C., Ground State of the Helium Atom, Phys. Rev., 128, pp. 1146-1148, (1962)
  • [4] Thakkar A.J., Koga T., Ground-State Energies for the Helium Isoelectronic Series, Phys. Rev. A, 50, pp. 854-856, (1994)
  • [5] Frankowski K., Pekeris C.L., LogarithmicTerms in the Wave Functions of the Ground State of Two-Electron Atoms, Phys. Rev., 150, (1966)
  • [6] Temple G., The Theory of Rayleigh's Principle As Applied to Continuous Systems, Proc. Roy. Soc., 119, pp. 276-293, (1928)
  • [7] Romberg W., About Low Bounds of He Nonexited States, Calculated from Ritz Shifts, Phys. Zs., 8, pp. 516-527, (1935)
  • [8] Stvenson A.F., On the Lower Bounds of Weinstein and Romberg in Quantum Mechanics, Phys. Rev., 53, (1938)
  • [9] Weinstein D.H., Modified Ritz Method, Proc. Nat. Acad. Sci., 2, pp. 529-532, (1934)
  • [10] Hall R.L., Post H.R., IV. Short-Range Interactions, Proc. Phys. Soc., 90, pp. 381-396, (1967)
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