Legendre polynomials: Difference between revisions
imported>Paul Wormer |
imported>Paul Wormer |
||
Line 42: | Line 42: | ||
Obviously the expansion makes sense only if ''R'' > ''r''. | Obviously the expansion makes sense only if ''R'' > ''r''. | ||
==Normalization== | ==Normalization== | ||
The polynomials are not normalized to unity | The polynomials are not normalized to unity, but | ||
:<math> | :<math> | ||
\int_{-1}^{1} P_{n}(x) P_{m}(x) dx = \frac{2}{2n+1} \delta_{n m}, | \int_{-1}^{1} P_{n}(x) P_{m}(x) dx = \frac{2}{2n+1} \delta_{n m}, | ||
</math> | </math> | ||
where δ<sub>'' | where δ<sub>''nm''</sub> is the [[Kronecker delta]]. | ||
==Differential equation== | ==Differential equation== | ||
The Legendre polynomials are solutions of the Legendre differential equation | The Legendre polynomials are solutions of the Legendre differential equation |
Revision as of 06:13, 21 August 2007
In mathematics, the Legendre polynomials Pn(x) are orthogonal polynomials in the variable -1 ≤ x ≤ 1. Their orthogonality is with unit weight,
The polynomials are named after the French mathematician Legendre (1752–1833).
In physics they commonly appear as a function of a polar angle 0 ≤ θ ≤ π with x = cosθ
- .
By the sequential Gram-Schmidt orthogonalization procedure applied to {1, x, x², x³, …} the polynomials can be constructed.
Rodrigues' formula
The French amateur mathematician Rodrigues (1795–1851) proved the following formula
Using the Newton binomial and the equation
we get the explicit expression
Generating function
The coefficients of hn in the following expansion of the generating function are Legendre polynomials
The expansion converges for |h| < 1. This expansion is useful in expanding the inverse distance between two points r and R
where
Obviously the expansion makes sense only if R > r.
Normalization
The polynomials are not normalized to unity, but
where δnm is the Kronecker delta.
Differential equation
The Legendre polynomials are solutions of the Legendre differential equation
This differential equation has another class of solutions: Legendre functions of the second kind Qn(x), which are infinite series in 1/x. These functions are of lesser importance.
Note that the differential equation has the form of an eigenvalue equation with eigenvalue -n(n+1) of the operator
This operator is the θ-dependent part of the Laplace operator ∇² in spherical polar coordinates.
Properties of Legendre polynomials
Legendre polynomials have parity (-1)n under x → -x,
The following condition normalizes the polynomials
Recurrence Relations
Legendre polynomials satisfy the recurrence relations
From these two relations follows easily