Observables compatible to the toroidal moment operator
Abstract
The quantum operator , corresponding to the projection of the toroidal moment on the axis, admits several self-adjoint extensions, when defined on the whole space. commutes with (the projection of the angular momentum operator on the axis) and they have a \textit{natural set of coordinates} where is the azimuthal angle. The second set of \textit{natural coordinates} is , where , . In both sets, , so any operator that is a function of and the partial derivatives with respect to the \textit{natural variables} commute with and . Similarly, operators that are functions of , , and the partial derivatives with respect to , , and commute with . Therefore, we introduce here the operators , , and and express them in the coordinates. One may also invert the relations and write the typical operators, like the momentum or the kinetic energy in terms of the "toroidal" operators , , , , and, eventually, . The formalism may be applied to specific physical systems, like nuclei, condensed matter systems, or metamaterials. We exemplify it by calculating the momentum operator and the free particle Hamiltonian in terms of \textit{natural coordinates} in a thin torus, where the general relations get considerably simplified.
Cite
@article{arxiv.2101.05889,
title = {Observables compatible to the toroidal moment operator},
author = {Dragos-Victor Anghel and Amanda Teodora Preda},
journal= {arXiv preprint arXiv:2101.05889},
year = {2021}
}
Comments
19 pages, 4 figures