Zhao, Z.-H., Liu, Y.-Z., Li, X.-G.: Gravitational corrections to energy-levels of a hydrogen atom. Commun. Theor. Phys. 47 , 658 (2007)Zhao, Z.H., Liu, Y.X. & Li, X.G. (2007). Gravitational corrections to energy- levels of a hydrogen atom. Communications in Theoretical ...
Energy levels of a hydrogen atom in a strong magnetic field are calculated by expanding the wavefunction in terms of the Landau orbitals. The Coulomb potential is treated as a perturbation which give rise to coupling between various orbitals. The resulting set of coupled ordinary differential equatio...
Quantum Chaos and Statistical Properties of Energy Levels: Numerical Study of the Hydrogen Atom in a Magnetic Field The transition to chaos in ''the hydrogen atom in a magnetic field'' is numerically studied and shown to lead to well-defined signature on the energy-level......
Energy levels are nothing but the fixed distances of electrons from the nucleus of an atom. The energy levels are also called electron shells. An electron can move in one energy level or to another energy level, but it can not stay in between two energy levels. (Image will be uploaded ...
We re-examine the justification for the imposition of regular boundary conditions on the wavefunction at the Coulomb singularity in the treatment of the hydrogen atom in non-relativistic quantum mechanics. We show that the issue of the correct boundary conditions is not independent of the physical ...
We show that it is not possible to use the hydrogen atom as a probe of background curvature of the universe. In the second order of perturbation, for 1 state, an upper limit for the energy shifts is obtained. 展开 关键词: Fermi normal coordinates Cosmological constant ...
Calculation of the energy levels of a hydrogen atom in a magnetic field of arbitrary strength by usingBsplines B splines with carefully adjusted knot sequences are used as basis functions in cylindrical coordinates to calculate the energy levels of the low-lying (m=... Jang-Haur,Wang,Chen-Shi...
In 1913, Niels Bohr developed an accurate model for the hydrogen atom. The mathematics involved and the simplicity of this model is easily understood. The intention of the paper is not to replace Bohr's model, but to find a similar model for all atoms. The model discussed, which was ...
Hydrogen energy levels calculation The energy of the electron in the hydrogen atom equals: En=−mec2α2Z22n2En=−2n2mec2α2Z2 where: EnEn— Energy of the electron at energy level nn; meme— Mass of the electron; cc— Speed of light; α=1/137α=1/137— Fine structure constant;...
Question. The ionization energy of the electron in the hydrogen atom in its ground state is 13.6 eV. The atoms are excited to higher energy levels to emit radiations of 6 wavelengths. Maximum wavelength of emitted radiation corresponds to the transition betweenC a) n = 3 to n = 1 states...