Spinor spherical harmonics: Difference between revisions

Template:Short description Template:Distinguish In quantum mechanics, the spinor spherical harmonics^[1] (also known as spin spherical harmonics,^[2] spinor harmonics^[3] and Pauli spinors^[4]) are special functions defined over the sphere. The spinor spherical harmonics are the natural spinor analog of the vector spherical harmonics. While the standard spherical harmonics are a basis for the angular momentum operator, the spinor spherical harmonics are a basis for the total angular momentum operator (angular momentum plus spin). These functions are used in analytical solutions to Dirac equation in a radial potential.^[3] The spinor spherical harmonics are sometimes called Pauli central field spinors, in honor to Wolfgang Pauli who employed them in the solution of the hydrogen atom with spin–orbit interaction.^[1]

The spinor spherical harmonics Template:Math are the spinors eigenstates of the total angular momentum operator squared:

${\displaystyle \begin{array}{cc}{𝐣}^2{Y}_{l,s,j,m}& =j(j+1)Y_{l,s,j,m}\\ {\mathrm{j}}_{\mathrm{z}}{Y}_{l,s,j,m}& =m{Y}_{l,s,j,m};m=-j,-(j-1),\cdots ,j-1,j\\ {𝐥}^2{Y}_{l,s,j,m}& =l(l+1)Y_{l,s,j,m}\\ {𝐬}^2{Y}_{l,s,j,m}& =s(s+1)Y_{l,s,j,m}\end{array}}$

where Template:Math, where Template:Math, Template:Math, and Template:Math are the (dimensionless) total, orbital and spin angular momentum operators, j is the total azimuthal quantum number and m is the total magnetic quantum number.

Under a parity operation, we have

${\displaystyle P{Y}_{l,sj,m}=(-1{)}^l{Y}_{l,s,j,m}.}$

For spin-1/2 systems, they are given in matrix form by^[1][3][5]

${\displaystyle Y_{l,\pm \frac{1}{2},j,m}=\frac{1}{\sqrt{2(j\mp \frac{1}{2})+1}}\left(\begin{array}{c}\pm \sqrt{j\mp \frac{1}{2}\pm m+\frac{1}{2}}{Y}_l^{m-\frac{1}{2}}\\ \sqrt{j\mp \frac{1}{2}\mp m+\frac{1}{2}}{Y}_l^{m+\frac{1}{2}}\end{array}\right).}$

where ${\displaystyle Y_l^m}$ are the usual spherical harmonics.

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