numpy.polynomial.hermite_e.hermegauss#
- polynomial.hermite_e.hermegauss(deg)[source]#
Gauss-HermiteE quadrature.
Computes the sample points and weights for Gauss-HermiteE quadrature. These sample points and weights will correctly integrate polynomials of degree \(2*deg - 1\) or less over the interval \([-\inf, \inf]\) with the weight function \(f(x) = \exp(-x^2/2)\).
- Parameters:
- degint
Number of sample points and weights. It must be >= 1.
- Returns:
- xndarray
1-D ndarray containing the sample points.
- yndarray
1-D ndarray containing the weights.
Notes
The results have only been tested up to degree 100, higher degrees may be problematic. The weights are determined by using the fact that
\[w_k = c / (He'_n(x_k) * He_{n-1}(x_k))\]where \(c\) is a constant independent of \(k\) and \(x_k\) is the k’th root of \(He_n\), and then scaling the results to get the right value when integrating 1.