Legendre-Gauss Quadrature formula

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Legendre-Gauss Quadratude formiula is the approximation of the integral

(1) ${\displaystyle \int _{-1}^{1}f(x)\,dx\approx \sum _{i=1}^{N}w_{i}f(x_{i}).}$

with special choice of nodes ${\displaystyle x_{i}}$ and weights ${\displaystyle w_{i}}$, characterised in that, if the finction ${\displaystyle f}$ is polynomial of order smallet than ${\displaystyle 2N}$, then the exact equality takes place in equation (1).

Legendre-Gauss quadratude formula is special case of Gaussian quadratures of more general kind, which allow efficient approximation of a function with known asumptiotic behavior at the edges of the interval of integration.

Nodes and weights

Nodes ${\displaystyle x_{i}}$ in equation (1) are zeros of the Polynomial of Legendre ${\displaystyle P_{N}}$:

(2) ${\displaystyle P_{N}(x_{i})=0}$

(3) ${\displaystyle -1<x_{1}<x_{2}<...<x_{N}<1}$

Weight ${\displaystyle w_{i}}$ in equaiton (1) can be expressed with

(4) ${\displaystyle w_{i}={\frac {2}{\left(1-x_{i}^{2}\right)(P'_{N}(x_{i}))^{2}}}}$

There is no straightforward espression for the nodes ${\displaystyle x_{i}}$; they can be approximated with many decimal digits through only few iterations, solving numerically equation (2) with initial approach

(5) ${\displaystyle x_{i}\approx \cos \left(\pi {\frac {1/2+i}{N}}\right)}$

These formulas are described in the books ^{[1] [2]}

Precision of the approximation

Example

Fig.1. Example of estimate of precision: Logarithm of residual versus number ${\displaystyle N}$ of terms in the right hand side of equation (1) for various integrands ${\displaystyle f(x)}$.

Extension to other interval

is straightforward. Should I copypast the obvious formulas here?

References