Wigner D-matrix

The Wigner D-matrix (also known as the Wigner rotation matrix)^[1] is a square matrix, of dimension ${\displaystyle 2j+1}$, given by (Eq. 4.12 of ^[2] )

${\displaystyle D_{m'm}^{j}(\alpha ,\beta ,\gamma ):=\langle jm'|{\mathcal {R}}(\alpha ,\beta ,\gamma )|jm\rangle =e^{-im'\alpha }d_{m'm}^{j}(\beta )e^{-im\gamma }}$

where ${\displaystyle \alpha ,\;\beta ,}$ and ${\displaystyle \gamma \;}$ are Euler angles, and where ${\displaystyle d_{m'm}^{j}(\beta )}$, known as Wigner's reduced d-matrix, is given by (Eqs. 4.11 and 4.13 of ^[2])

${\displaystyle {\begin{array}{lcl}d_{m'm}^{j}(\beta )&=&D_{m'm}^{j}(0,\beta ,0)\\&=&\langle jm'|e^{-i\beta j_{y}}|jm\rangle \\&=&[(j+m)!(j-m)!(j+m')!(j-m')!]^{1/2}\sum _{\chi }{\frac {(-1)^{\chi }}{(j-m'-\chi )!(j+m-\chi )!(\chi +m'-m)!\chi !}}\\&&\times \left(\cos {\frac {\beta }{2}}\right)^{2j+m-m'-2\chi }\left(-\sin {\frac {\beta }{2}}\right)^{m'-m+2\chi }\end{array}}}$

The sum over ${\displaystyle \chi }$ is restricted to those values that do not lead to negative factorials. This function represents a rotation of ${\displaystyle \beta }$ about the (initial frame) ${\displaystyle Y}$ axis.

Relation with spherical harmonic functions

The D-matrix elements with second index equal to zero, are proportional to spherical harmonics (normalized to unity)

${\displaystyle D_{m0}^{\ell }(\alpha ,\beta ,\gamma )^{*}={\sqrt {\frac {4\pi }{2\ell +1}}}Y_{\ell }^{m}(\beta ,\alpha )}$

References

Related reading

• Miguel A. Blanco, M. Flórez and M. Bermejo "Evaluation of the rotation matrices in the basis of real spherical harmonics", Journal of Molecular Structure: THEOCHEM 419 pp. 19-27 (1997)
• Holger Dachsel "Fast and accurate determination of the Wigner rotation matrices in the fast multipole method", Journal of Chemical Physics 124 144115 (2006)

External links

• Wigner D-matrix page on Wikipedia