High-order perturbation theory for the hydrogen atom in a magnetic field
暂无分享,去创建一个
[1] V. Popov,et al. Effect of a magnetic field on the ionization of atoms , 1996 .
[2] Wang,et al. Calculation of the energy levels of a hydrogen atom in a magnetic field of arbitrary strength by using B splines. , 1995, Physical review. A, Atomic, molecular, and optical physics.
[3] Goodson Dz,et al. Recursive calculation of dimensional expansions for two-electron atoms. , 1987 .
[4] B. R. Johnson,et al. Large-Order Perturbation Theory in the Stark-Zeeman Effect for Parallel Fields , 1983 .
[5] J. Ader. Moment method and the Schrödinger equation in the large N limit , 1983 .
[6] A. Turbiner. Zeeman effect in hydrogen: new outlook on old perturbation theory , 1982 .
[7] C. Bender,et al. Semiclassical perturbation theory for the hydrogen atom in a uniform magnetic field , 1982 .
[8] E. Vrscay,et al. Large order perturbation theory in the context of atomic and molecular physics—interdisciplinary aspects , 1982 .
[9] J. Avron. Bender-Wu formulas for the Zeeman effect in hydrogen , 1981 .
[10] V. Privman. New method of perturbation-theory calculation of the Stark effect for the ground state of hydrogen , 1980 .
[11] B. G. Adams,et al. Bender-Wu formulas for degenerate eigenvalues , 1980 .
[12] Y. Aharonov,et al. Logarithmic perturbation expansions , 1979 .
[13] Y. Aharonov,et al. Gauge invariance and pseudoperturbations , 1979 .
[14] A. Dolgov,et al. The anharmonic oscillator and its dependence on space dimensions , 1979 .
[15] J. Killingbeck. Perturbation theory without wavefunctions , 1978 .
[16] A. Galindo,et al. Hydrogen atom in a strong magnetic field , 1976 .
[17] Tai Tsun Wu,et al. Anharmonic Oscillator. II. A Study of Perturbation Theory in Large Order , 1973 .
[18] D. Cabib,et al. Ground and first excited states of excitons in a magnetic field , 1972 .
[19] S. Danforth,et al. HYPERVIRIAL AND HELLMANN--FEYNMAN THEOREMS APPLIED TO ANHARMONIC OSCILLATORS. , 1972 .
[20] V. Pekar. Perturbation theory for one-dimensional Schrodinger equations that can be used in a region where the wave function is small , 1971 .
[21] J. Ziman. Elements Of Advanced Quantum Theory , 1970 .
[22] E. Guth,et al. Modern Quantum Theory , 1963 .