Add to ORKGSzego ̋ quadrature formulas are analogs of Gauss quadrature rules when dealing with the approximate integration of periodic functions, since they exactly integrate trigonometric polynomials of as high degree as possible, or more generally Laurent polynomials which can be viewed as rational functions with poles at the origin and infinity. When more general rational functions with prescribed poles on the extended complex plane not on the unit circle are considered to be exactly integrated, the so called “Rational Szego ̋ Quadrature Formulas ” appear. In this talk, and as a continuation of earlier papers ([1], [2]), some computational aspects concerning these quadratures are analyzed when one or two nodes are previously fixed on the unit circl...
In this paper we characterize rational Szego ̋ quadrature formulas associated with Chebyshev weight ...
The computation of the nodes and weights of rational Szegö quadrature formulas is explained when the...
© 2014 Elsevier B.V. All rights reserved. In this paper we give a survey of some results concerning ...
Szego ̋ quadrature formulas are analogs of Gauss quadrature rules when dealing with the approximate ...
Szego quadrature formulas are analogs of Gauss quadrature rules when dealing with the approximate in...
Classical interpolatory or Gaussian quadrature formulas are exact on sets of polynomials. The Szego ...
By z = exp(iθ) and x = cos θ, one may relate x ∈ I=(-1,1], with θ ∈ (-π,π] and a point z on the comp...
AbstractQuadrature formulas on the unit circle were introduced by Jones in 1989. On the other hand, ...
Quadrature formulas on the unit circle were introduced by Jones et al. in 1989. On the other hand, B...
We present a relation between rational Gauss-Radau quadrature formulas with one fixed node in the op...
AbstractGauss-type quadrature rules with one or two prescribed nodes are well known and are commonly...
AbstractClassical interpolatory or Gaussian quadrature formulas are exact on sets of polynomials. Th...
AbstractQuadrature problems involving functions that have poles outside the interval of integration ...
We provide an algorithm to compute arbitrarily many nodes and weights for rational Gauss-Chebyshev q...
We establish a relation between Gauss quadrature formulas on the interval [-1,1] that approximate in...
In this paper we characterize rational Szego ̋ quadrature formulas associated with Chebyshev weight ...
The computation of the nodes and weights of rational Szegö quadrature formulas is explained when the...
© 2014 Elsevier B.V. All rights reserved. In this paper we give a survey of some results concerning ...
Szego ̋ quadrature formulas are analogs of Gauss quadrature rules when dealing with the approximate ...
Szego quadrature formulas are analogs of Gauss quadrature rules when dealing with the approximate in...
Classical interpolatory or Gaussian quadrature formulas are exact on sets of polynomials. The Szego ...
By z = exp(iθ) and x = cos θ, one may relate x ∈ I=(-1,1], with θ ∈ (-π,π] and a point z on the comp...
AbstractQuadrature formulas on the unit circle were introduced by Jones in 1989. On the other hand, ...
Quadrature formulas on the unit circle were introduced by Jones et al. in 1989. On the other hand, B...
We present a relation between rational Gauss-Radau quadrature formulas with one fixed node in the op...
AbstractGauss-type quadrature rules with one or two prescribed nodes are well known and are commonly...
AbstractClassical interpolatory or Gaussian quadrature formulas are exact on sets of polynomials. Th...
AbstractQuadrature problems involving functions that have poles outside the interval of integration ...
We provide an algorithm to compute arbitrarily many nodes and weights for rational Gauss-Chebyshev q...
We establish a relation between Gauss quadrature formulas on the interval [-1,1] that approximate in...
In this paper we characterize rational Szego ̋ quadrature formulas associated with Chebyshev weight ...
The computation of the nodes and weights of rational Szegö quadrature formulas is explained when the...
© 2014 Elsevier B.V. All rights reserved. In this paper we give a survey of some results concerning ...