Exact solution for a hydrogen atom in a magnetic field of arbitrary strength
- Condensed Matter Theory Group, Department of Physics, Uppsala University, Box 530, S-75121, Uppsala (Sweden)
An exact solution describing the quantum states of a hydrogen atom in a homogeneous magnetic field of arbitrary strength is obtained in the form of a power series in the radial variable with coefficients being polynomials in the sine of the polar angle. Energy levels and wave functions for the ground state and for several excited states are calculated exactly for the magnetic field varying in the range 0{lt}{ital B}/({ital m}{sup 2}{ital e}{sup 3}{ital c}/{h_bar}{sup 3}){le}4000. {copyright} {ital 1996 The American Physical Society.}
- OSTI ID:
- 285926
- Journal Information:
- Physical Review A, Journal Name: Physical Review A Journal Issue: 1 Vol. 54; ISSN 1050-2947; ISSN PLRAAN
- Country of Publication:
- United States
- Language:
- English
Similar Records
Exact solution for a hydrogen atom in magnetic field of arbitrary strength
Highly Accurate Solution for a Hydrogen Atom in a Uniform Magnetic Field
Exact perturbative solution of the Kondo problem
Conference
·
Mon Dec 30 23:00:00 EST 1996
·
OSTI ID:426002
Highly Accurate Solution for a Hydrogen Atom in a Uniform Magnetic Field
Journal Article
·
Mon Jul 01 00:00:00 EDT 1996
· Physical Review Letters
·
OSTI ID:286750
Exact perturbative solution of the Kondo problem
Journal Article
·
Thu Nov 30 23:00:00 EST 1995
· Physical Review Letters
·
OSTI ID:277352