中文

Multipole expansions in four-dimensional hyperspherical harmonics

数学物理 2008-07-28 v2 math.MP

摘要

The technique of vector differentiation is applied to the problem of the derivation of multipole expansions in four-dimensional space. Explicit expressions for the multipole expansion of the function rnCj(\hr)r^n C_j (\hr) with \vvr=\vvr1+\vvr2\vvr=\vvr_1+\vvr_2 are given in terms of tensor products of two hyperspherical harmonics depending on the unit vectors \hr1\hr_1 and \hr2\hr_2. The multipole decomposition of the function (\vvr1\vvr2)n(\vvr_1 \cdot \vvr_2)^n is also derived. The proposed method can be easily generalised to the case of the space with dimensionality larger than four. Several explicit expressions for the four-dimensional Clebsch-Gordan coefficients with particular values of parameters are presented in the closed form.

关键词

引用

@article{arxiv.math-ph/0510080,
  title  = {Multipole expansions in four-dimensional hyperspherical harmonics},
  author = {A. V. Meremianin},
  journal= {arXiv preprint arXiv:math-ph/0510080},
  year   = {2008}
}

备注

19 pages, no figures