We consider some 'truncated' Gaussian rules based on the zeros of the orthonormal polynomials w.r.t. The weight function with x ∈ (0, +∞), α >0 and β>1. We show that these formulas are stable and converge with the order of the best polynomial approximation in suitable function spaces. Moreover, we apply these results to the related Lagrange interpolation process in weighted L 2 spaces. Finally, some numerical tests are shown.
Gaussian quadrature rules with an exponential weight on the real semiaxis
Notarangelo I.;
2014-01-01
Abstract
We consider some 'truncated' Gaussian rules based on the zeros of the orthonormal polynomials w.r.t. The weight function with x ∈ (0, +∞), α >0 and β>1. We show that these formulas are stable and converge with the order of the best polynomial approximation in suitable function spaces. Moreover, we apply these results to the related Lagrange interpolation process in weighted L 2 spaces. Finally, some numerical tests are shown.
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