Detecting level crossings without looking at the spectrum
Abstract
In many physical systems it is important to be aware of the crossings and avoided crossings which occur when eigenvalues of a physical observable are varied using an external parameter. We have discovered a powerful algebraic method of finding such crossings via a mapping to the problem of locating the roots of a polynomial in that parameter. We demonstrate our method on atoms and molecules in a magnetic field, where it has implications in the search for Feshbach resonances. In the atomic case our method allows us to point out a new class of invariants of the Breit-Rabi Hamiltonian of magnetic resonance. In the case of molecules, it enables us to find curve crossings with practically no knowledge of the corresponding Born-Oppenheimer potentials.
Cite
@article{arxiv.physics/0604213,
title = {Detecting level crossings without looking at the spectrum},
author = {M. Bhattacharya and C. Raman},
journal= {arXiv preprint arXiv:physics/0604213},
year = {2009}
}
Comments
4 pages, new title, no figures, accepted by Phys. Rev. Lett