Add to ORKGThis thesis derives a Gaussian quadrature rule from a complete set of orthogonal lacunary polynomials. The resulting quadrature formula is exact for polynomials whose even part skips powers, with a set of sample values that is much smaller than the degree. The weight for these quadratures is a generalized Gaussian, whose negative logarithm is an even monomial; the powers of this monomial make up the even part of the polynomial to be integrated. We first present Rodrigues formulas for generalized Hermite polynomials (GHPs) that are complete and orthogonal with respect to the generalized Gaussian. From the Rodrigues formula for even GHPs we establish a three-term recursion relation and find the normalization constants. We present a slight mod...
Abstract. We study Gauss-Kronrod quadrature formula for Hermite weight function for the particular c...
AbstractExistence of quadrature formulas of Gaussian type related to Hermite-Birkhoff interpolation ...
AbstractUsing the theory of s-orthogonality and reinterpreting it in terms of the standard orthogona...
Traditionally, the derivation of Gaussian quadrature rules from orthogonal polynomials hinged on the...
AbstractWe study Gaussian quadrature formulae for a matrix weight. We firstly show how to generate G...
For the practical estimation of the error of Gauss quadrature rules Gauss-Kronrod rules are widely u...
Multiple Hermite polynomials are an extension of the classical Hermite polynomials for which orthogo...
Multiple Hermite polynomials are an extension of the classical Hermite polynomials for which orthogo...
In order to determine ܣ ൌ ݂ሺݔሻ݀ݔ , the function ݂ሺݔ ሻ can be tabulated in the points ݔ specifie...
Methods for the computation of classical Gaussian quadrature rules are described which are effective...
Methods for the computation of classical Gaussian quadrature rules are described which are effective...
AbstractWe consider the problem of finding optimal generalized polynomials of minimal Lp norm (1 ⩽ p...
Abstract Gauss quadrature is a well-known method for estimating the integral of a continuous functio...
AbstractThe techniques for polynomial interpolation and Gaussian quadrature are generalized to matri...
We consider some 'truncated' Gaussian rules based on the zeros of the orthonormal polynomials w.r.t....
Abstract. We study Gauss-Kronrod quadrature formula for Hermite weight function for the particular c...
AbstractExistence of quadrature formulas of Gaussian type related to Hermite-Birkhoff interpolation ...
AbstractUsing the theory of s-orthogonality and reinterpreting it in terms of the standard orthogona...
Traditionally, the derivation of Gaussian quadrature rules from orthogonal polynomials hinged on the...
AbstractWe study Gaussian quadrature formulae for a matrix weight. We firstly show how to generate G...
For the practical estimation of the error of Gauss quadrature rules Gauss-Kronrod rules are widely u...
Multiple Hermite polynomials are an extension of the classical Hermite polynomials for which orthogo...
Multiple Hermite polynomials are an extension of the classical Hermite polynomials for which orthogo...
In order to determine ܣ ൌ ݂ሺݔሻ݀ݔ , the function ݂ሺݔ ሻ can be tabulated in the points ݔ specifie...
Methods for the computation of classical Gaussian quadrature rules are described which are effective...
Methods for the computation of classical Gaussian quadrature rules are described which are effective...
AbstractWe consider the problem of finding optimal generalized polynomials of minimal Lp norm (1 ⩽ p...
Abstract Gauss quadrature is a well-known method for estimating the integral of a continuous functio...
AbstractThe techniques for polynomial interpolation and Gaussian quadrature are generalized to matri...
We consider some 'truncated' Gaussian rules based on the zeros of the orthonormal polynomials w.r.t....
Abstract. We study Gauss-Kronrod quadrature formula for Hermite weight function for the particular c...
AbstractExistence of quadrature formulas of Gaussian type related to Hermite-Birkhoff interpolation ...
AbstractUsing the theory of s-orthogonality and reinterpreting it in terms of the standard orthogona...