Add to ORKGWe investigate simultaneous Gaussian quadrature for two integrals of the same function f but on two disjoint intervals. The quadrature nodes are zeros of a type II multiple orthogonal polynomial for an Angelesco system. We recall some known results for the quadrature nodes and the quadrature weights and prove some new results about the convergence of the quadrature formulas. Furthermore we give some estimates of the quadrature weights. Our results are based on a vector equilibrium problem in potential theory and weighted polynomial approximation.status: publishe
We construct and analyze generalized Gaussian quadrature rules for integrands with endpoint singular...
AbstractWe consider a Gaussian type quadrature rule for some classes of integrands involving highly ...
We introduce a Gaussian quadrature, based on the polynomials that are orthogonal with respect to the...
A new algorithm for constructing quadrature formulas with multiple Gaussian nodes in the presence o...
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...
Abstract. We discuss the convergence and numerical evaluation of simultaneous quadrature formulas wh...
To compute integrals on bounded or unbounded intervals we propose a new numerical approach by using ...
We investigate a Gaussian quadrature rule and the corresponding orthogonal polynomials for the oscil...
Gaussian quadrature formulas, relative to the Chebyshev weight functions, with multiple nodes and th...
AbstractAngelesco systems of measures with Jacobi-type weights are considered. For such systems, str...
We consider the computation of quadrature rules that are exact for a Chebyshev set of linearly indep...
AbstractWe introduce new families of Gaussian-type quadratures for weighted integrals of exponential...
We consider some 'truncated' Gaussian rules based on the zeros of the orthonormal polynomials w.r.t....
22 pages, no figures.-- MSC2000 codes: Primary 41A55. Secondary 41A28, 65D32.MR#: MR2286008 (2008a:6...
We construct and analyze generalized Gaussian quadrature rules for integrands with endpoint singular...
AbstractWe consider a Gaussian type quadrature rule for some classes of integrands involving highly ...
We introduce a Gaussian quadrature, based on the polynomials that are orthogonal with respect to the...
A new algorithm for constructing quadrature formulas with multiple Gaussian nodes in the presence o...
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...
Abstract. We discuss the convergence and numerical evaluation of simultaneous quadrature formulas wh...
To compute integrals on bounded or unbounded intervals we propose a new numerical approach by using ...
We investigate a Gaussian quadrature rule and the corresponding orthogonal polynomials for the oscil...
Gaussian quadrature formulas, relative to the Chebyshev weight functions, with multiple nodes and th...
AbstractAngelesco systems of measures with Jacobi-type weights are considered. For such systems, str...
We consider the computation of quadrature rules that are exact for a Chebyshev set of linearly indep...
AbstractWe introduce new families of Gaussian-type quadratures for weighted integrals of exponential...
We consider some 'truncated' Gaussian rules based on the zeros of the orthonormal polynomials w.r.t....
22 pages, no figures.-- MSC2000 codes: Primary 41A55. Secondary 41A28, 65D32.MR#: MR2286008 (2008a:6...
We construct and analyze generalized Gaussian quadrature rules for integrands with endpoint singular...
AbstractWe consider a Gaussian type quadrature rule for some classes of integrands involving highly ...
We introduce a Gaussian quadrature, based on the polynomials that are orthogonal with respect to the...