The Spherical Tensor Gradient Operator
摘要
The spherical tensor gradient operator , which is obtained by replacing the Cartesian components of by the Cartesian components of in the regular solid harmonic , is an irreducible spherical tensor of rank . Accordingly, its application to a scalar function produces an irreducible spherical tensor of rank . Thus, it is in principle sufficient to consider only multicenter integrals of scalar functions: Higher angular momentum states can be generated by differentiation with respect to the nuclear coordinates. Many of the properties of can be understood easily with the help of an old theorem on differentiation by Hobson [Proc. London Math. Soc. {\bf 24}, 54 - 67 (1892)]. It follows from Hobson's theorem that some scalar functions of considerable relevance as for example the Coulomb potential, Gaussian functions, or reduced Bessel functions produce particularly compact results if is applied to them. Fourier transformation is very helpful to understand the properties of since it produces . It is also possible to apply to generalized functions, yielding for instance the spherical delta function . The differential operator can also be used for the derivation of pointwise convergent addition theorems. The feasibility of this approach is demonstrated by deriving the addition theorem of with .
引用
@article{arxiv.math-ph/0505018,
title = {The Spherical Tensor Gradient Operator},
author = {Ernst Joachim Weniger},
journal= {arXiv preprint arXiv:math-ph/0505018},
year = {2007}
}
备注
55 pages, LaTeX2e, 0 figures