AbstractExistence of quadrature formulas of Gaussian type related to Hermite-Birkhoff interpolation is proved for a class of incidence matrices satisfying the conditions of the Atkinson-Sharma Theorem. For the subclass of Hermite matrices this analysis furnishes yet another proof of the existence of Gaussian quadrature formulas with multiple nodes
Abstract. Consider a hermitian positive-definite linear functional F, and assume we have m distinct ...
Multiple Hermite polynomials are an extension of the classical Hermite polynomials for which orthogo...
Consider a hermitian positive-definite linear functional ℱ, and assume we have m distinct nodes fixe...
AbstractExistence of quadrature formulas of Gaussian type related to Hermite-Birkhoff interpolation ...
AbstractExistence of a generalized Gaussian Birkhoff quadrature formula is proved for a wide class o...
AbstractThe object of this note is to study three row almost Hermitian incidence matrices and to giv...
This thesis derives a Gaussian quadrature rule from a complete set of orthogonal lacunary polynomial...
AbstractWe study Gaussian quadrature formulae for a matrix weight. We firstly show how to generate G...
For Hermite-Birkhoff interpolation of scattered multidimensional data by ra-dial basis functions φ, ...
In order to determine ܣ ൌ ݂ሺݔሻ݀ݔ , the function ݂ሺݔ ሻ can be tabulated in the points ݔ specifie...
Abstract. We study Gauss-Kronrod quadrature formula for Hermite weight function for the particular c...
A new algorithm for constructing quadrature formulas with multiple Gaussian nodes in the presence o...
Traditionally, the derivation of Gaussian quadrature rules from orthogonal polynomials hinged on the...
AbstractThe techniques for polynomial interpolation and Gaussian quadrature are generalized to matri...
AbstractMultivariate Birkhoff interpolation is the most complex polynomial interpolation problem and...
Abstract. Consider a hermitian positive-definite linear functional F, and assume we have m distinct ...
Multiple Hermite polynomials are an extension of the classical Hermite polynomials for which orthogo...
Consider a hermitian positive-definite linear functional ℱ, and assume we have m distinct nodes fixe...
AbstractExistence of quadrature formulas of Gaussian type related to Hermite-Birkhoff interpolation ...
AbstractExistence of a generalized Gaussian Birkhoff quadrature formula is proved for a wide class o...
AbstractThe object of this note is to study three row almost Hermitian incidence matrices and to giv...
This thesis derives a Gaussian quadrature rule from a complete set of orthogonal lacunary polynomial...
AbstractWe study Gaussian quadrature formulae for a matrix weight. We firstly show how to generate G...
For Hermite-Birkhoff interpolation of scattered multidimensional data by ra-dial basis functions φ, ...
In order to determine ܣ ൌ ݂ሺݔሻ݀ݔ , the function ݂ሺݔ ሻ can be tabulated in the points ݔ specifie...
Abstract. We study Gauss-Kronrod quadrature formula for Hermite weight function for the particular c...
A new algorithm for constructing quadrature formulas with multiple Gaussian nodes in the presence o...
Traditionally, the derivation of Gaussian quadrature rules from orthogonal polynomials hinged on the...
AbstractThe techniques for polynomial interpolation and Gaussian quadrature are generalized to matri...
AbstractMultivariate Birkhoff interpolation is the most complex polynomial interpolation problem and...
Abstract. Consider a hermitian positive-definite linear functional F, and assume we have m distinct ...
Multiple Hermite polynomials are an extension of the classical Hermite polynomials for which orthogo...
Consider a hermitian positive-definite linear functional ℱ, and assume we have m distinct nodes fixe...
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