Laguerre polynomials

Laguerre polynomials are solutions ${\displaystyle L_{n}(x)}$ to the Laguerre differential equation with ${\displaystyle \nu =0}$. The Laguerre polynomial ${\displaystyle H_{n}(z)}$ can be defined by the contour integral

${\displaystyle L_{n}(z)={\frac {1}{2\pi i}}\oint {\frac {e^{-zt/(1-t)}}{(1-t)t^{n+1}}}{\rm {d}}t}$

The first four Laguerre polynomials are:

${\displaystyle \left.L_{0}(x)\right.=1}$

${\displaystyle \left.L_{1}(x)\right.=-x+1}$

${\displaystyle L_{2}(x)={\frac {1}{2}}(x^{2}-4x+2)}$

${\displaystyle L_{3}(x)={\frac {1}{6}}(-x^{3}+9x^{2}-18x+6)}$

Generalized Laguerre function

${\displaystyle L_{n}^{\alpha }(x)={\frac {(\alpha +1)_{n}}{n!}}~_{1}F_{1}(-n;\alpha +1;x)}$

where ${\displaystyle (a)_{n}}$ is the Pochhammer symbol and ${\displaystyle ~_{1}F_{1}(a;b;x)}$ is a confluent hyper-geometric function.

See also

• Laguerre Polynomial -- from Wolfram MathWorld