Associated Legendre function

In mathematics and physics, an associated Legendre function P_l^(m) is related to a Legendre polynomial P_l by the following equation

${\displaystyle P_{\ell }^{(m)}(x)=(1-x^{2})^{m/2}{\frac {d^{m}P_{\ell }(x)}{dx^{m}}},\qquad 0\leq m\leq \ell .}$

For even m the associated Legendre function is a polynomial, for odd m the function contains the factor (1-x ² )^½ and hence is not a polynomial.

The associated Legendre functions are important in quantum mechanics and potential theory.

Differential equation

Define

${\displaystyle \Pi _{\ell }^{(m)}(x)\equiv {\frac {d^{m}P_{\ell }(x)}{dx^{m}}},}$

where P_l(x) is a Legendre polynomial. Differentiating the Legendre differential equation:

${\displaystyle (1-x^{2}){\frac {d^{2}\Pi _{\ell }^{(0)}(x)}{dx^{2}}}-2x{\frac {d\Pi _{\ell }^{(0)}(x)}{dx}}+\ell (\ell +1)\Pi _{\ell }^{(0)}(x)=0,}$

m times gives an equation for Π^(m)_l

${\displaystyle (1-x^{2}){\frac {d^{2}\Pi _{\ell }^{(m)}(x)}{dx^{2}}}-2(m+1)x{\frac {d\Pi _{\ell }^{(m)}(x)}{dx}}+\left[\ell (\ell +1)-m(m+1)\right]\Pi _{\ell }^{(m)}(x)=0.}$

After substitution of

${\displaystyle \Pi _{\ell }^{(m)}(x)=(1-x^{2})^{-m/2}P_{\ell }^{(m)}(x),}$

and after multiplying through with ${\displaystyle (1-x^{2})^{m/2}}$, we find the associated Legendre differential equation:

${\displaystyle (1-x^{2}){\frac {d^{2}P_{\ell }^{(m)}(x)}{dx^{2}}}-2x{\frac {dP_{\ell }^{(m)}(x)}{dx}}+\left[\ell (\ell +1)-{\frac {m^{2}}{1-x^{2}}}\right]P_{\ell }^{(m)}(x)=0.}$

In physical applications it is usually the case that x = cosθ, then the associated Legendre differential equation takes the form

${\displaystyle {\frac {1}{\sin \theta }}{\frac {d}{d\theta }}\sin \theta {\frac {d}{d\theta }}P_{\ell }^{(m)}+\left[\ell (\ell +1)-{\frac {m^{2}}{\sin ^{2}\theta }}\right]P_{\ell }^{(m)}=0.}$

Extension to negative m

By the Rodrigues formula, one obtains

${\displaystyle P_{\ell }^{(m)}(x)={\frac {1}{2^{\ell }\ell !}}(1-x^{2})^{m/2}\ {\frac {d^{\ell +m}}{dx^{\ell +m}}}(x^{2}-1)^{\ell }.}$

This equation allows extension of the range of m to: ${\displaystyle -m\leq \ell \leq m}$.

Since the associated Legendre equation is invariant under the substitution m → −m, the equations for P_l^{( ±m)}, resulting from this expression, are proportional.

To obtain the proportionality constant we consider

${\displaystyle (1-x^{2})^{-m/2}{\frac {d^{\ell -m}}{dx^{\ell -m}}}(x^{2}-1)^{\ell }=c_{lm}(1-x^{2})^{m/2}{\frac {d^{\ell +m}}{dx^{\ell +m}}}(x^{2}-1)^{\ell },\qquad 0\leq m\leq \ell ,}$

and we bring the factor (1−x²)^−m/2 to the other side. Equate the coefficient of the highest power of x on the left and right hand side of

${\displaystyle {\frac {d^{\ell -m}}{dx^{\ell -m}}}(x^{2}-1)^{\ell }=c_{lm}(1-x^{2})^{m}{\frac {d^{\ell +m}}{dx^{\ell +m}}}(x^{2}-1)^{\ell },\qquad 0\leq m\leq \ell ,}$

and it follows that the proportionality constant is

${\displaystyle c_{lm}=(-1)^{m}{\frac {(\ell -m)!}{(\ell +m)!}},\qquad 0\leq m\leq \ell ,}$

so that the associated Legendre functions of same |m| are related to each other by

${\displaystyle P_{\ell }^{(-|m|)}(x)=(-1)^{m}{\frac {(\ell -|m|)!}{(\ell +|m|)!}}P_{\ell }^{(|m|)}(x).}$

Note that the phase factor (−1)^m arising in this expression is not due to some arbitrary phase convention, but arises from expansion of (1−x²)^m.

Orthogonality relations

Important integral relations are

${\displaystyle \int _{-1}^{1}P_{\ell }^{(m)}(x)P_{\ell '}^{(m)}(x)dx={\frac {2\delta _{\ell \ell '}(\ell +m)!}{(2\ell +1)(\ell -m)!}}}$     [Proof]

${\displaystyle \int _{-1}^{1}P_{\ell }^{(m)}(x)P_{\ell }^{(n)}(x){\frac {dx}{1-x^{2}}}={\frac {\delta _{mn}(\ell +m)!}{m(\ell -m)!}}}$

Recurrence relations

The functions satisfy the following difference equations, which are taken from Edmonds^[1]

${\displaystyle (\ell -m+1)P_{\ell +1}^{(m)}(x)-(2\ell +1)xP_{\ell }^{(m)}(x)+(\ell +m)P_{\ell -1}^{(m)}(x)=0}$

${\displaystyle xP_{\ell }^{(m)}(x)-(\ell -m+1)(1-x^{2})^{1/2}P_{\ell }^{(m-1)}(x)-P_{\ell -1}^{(m)}(x)=0}$

${\displaystyle P_{\ell +1}^{(m)}(x)-xP_{\ell }^{(m)}(x)-(\ell +m)(1-x^{2})^{1/2}P_{\ell }^{(m-1)}(x)=0}$

${\displaystyle (\ell -m+1)P_{\ell +1}^{(m)}(x)+(1-x^{2})^{1/2}P_{\ell }^{(m+1)}(x)-(\ell +m+1)xP_{\ell }^{(m)}(x)=0}$

${\displaystyle (1-x^{2})^{1/2}P_{\ell }^{(m+1)}(x)-2mxP_{\ell }^{(m)}(x)+(\ell +m)(\ell -m+1)(1-x^{2})^{1/2}P_{\ell }^{(m-1)}(x)=0}$

${\displaystyle (1-x^{2}){\frac {dP_{\ell }^{(m)}}{dx}}(x)=(\ell +1)xP_{\ell }^{(m)}(x)-(\ell -m+1)P_{\ell +1}^{(m)}(x)}$

${\displaystyle =(\ell +m)P_{\ell -1}^{(m)}(x)-\ell xP_{\ell }^{(m)}(x)}$

Reference

External link

Weisstein, Eric W. "Legendre Polynomial." From MathWorld--A Wolfram Web Resource. [1]