| Class | Description |
|---|---|
| GaussChebyshevQuadrature |
Gauss-Chebyshev Quadrature uses the following weighting function:
\[
w(x) = \frac{1}{\sqrt{1 - x^2}}
\]
to evaluate integrals in the interval (-1, 1).
|
| GaussHermiteQuadrature |
Gauss-Hermite quadrature exploits the fact that quadrature approximations are open integration
formulas (that is, the values of the endpoints are not required) to evaluate of integrals in the
range \((-\infty, \infty )\).
|
| GaussianQuadrature |
A quadrature rule is a method of numerical integration in which we approximate the integral of a
function by a weighted sum of sample points.
|
| GaussLaguerreQuadrature |
Gauss-Laguerre quadrature exploits the fact that quadrature approximations are open integration
formulas (i.e.
|
| GaussLegendreQuadrature |
Gauss-Legendre quadrature considers the simplest case of uniform weighting: \(w(x) = 1\).
|
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