Pages that link to "Item:Q2930150"

The following pages link to Gaussian quadrature rules with an exponential weight on the real semiaxis (Q2930150):

Displaying 18 items.

• Some properties of a hypergeometric function which appear in an approximation problem (Q386460) (← links)
• Gaussian interval quadrature rule for exponential weights (Q440876) (← links)
• Gaussian quadrature rules with exponential weights on \((-1,1)\) (Q664535) (← links)
• Some quadrature formulae with nonstandard weights (Q708282) (← links)
• A note on finite quadrature rules with a kind of Freud weight function (Q1036349) (← links)
• Comment on: A Gaussian quadrature for the optimal evaluation of integrals involving Lorentzians over a semi-infinite interval (Q1295808) (← links)
• Gaussian rules on unbounded intervals (Q1401989) (← links)
• Quadrature formulae for the positive real axis in the setting of Mellin analysis: sharp error estimates in terms of the Mellin distance (Q1616088) (← links)
• Polynomial approximation with Pollaczeck-Laguerre weights on the real semiaxis. A survey (Q1716846) (← links)
• Gauss rules associated with nearly singular weights (Q2261931) (← links)
• Polynomial approximation with Pollaczek-type weights. A survey (Q2301265) (← links)
• Lagrange interpolation at Pollaczek-Laguerre zeros on the real semiaxis (Q2315029) (← links)
• A Nyström method for a class of Fredholm integral equations on the real semiaxis (Q2359414) (← links)
• Weighted quadrature formulas for semi-infinite range integrals (Q2822895) (← links)
• On Nyström and Product Integration Methods for Fredholm Integral Equations (Q4611822) (← links)
• High-order asymptotic expansions of Gaussian quadrature rules with classical and generalized weight functions (Q6133113) (← links)
• Computing integrals with an exponential weight on the real axis in floating point arithmetic (Q6546954) (← links)
• Hermite and Hermite-Fejér interpolation at Pollaczek zeros (Q6661012) (← links)