AbstractIn this note, interpolatory quadrature formulas with nodes xj being the zeros of Tn(x) + C where Tn(x) denotes the Chebyshev polynomial of degree n and C a constant, are considered
AbstractWe study interpolatory quadrature formulae, relative to the Legendre weight function on [−1,...
AbstractWe investigate the behaviour of the maximum error in applying Gaussian quadrature to the Che...
In this paper, we consider the Gauss-Kronrod quadrature formulas for a modified Chebyshev weight. Ef...
AbstractIn this note, interpolatory quadrature formulas with nodes xj being the zeros of Tn(x) + C w...
AbstractThe aim of this work is to construct a new quadrature formula based on the divided differenc...
AbstractWe study interpolatory quadrature formulae, relative to the Legendre weight function on [−1,...
AbstractMicchelli and Rivlin (1972) obtained a quadrature formula of highest algebraic degree of pre...
AbstractWe give here an n-point Chebyshev-type rule of algebraic degree of precision n − 1, but havi...
AbstractWe study Chebyshev type quadrature formulas of degree n with respect to a weight function on...
AbstractMaking use of the connection between quadrature formulas on the unit circle and the interval...
AbstractWe review interpolatory quadrature formulae, relative to the Legendre weight function on [−1...
AbstractWe consider interpolatory quadrature formulae, relative to the Legendre weight function on [...
AbstractUsing best interpolation function based on a given function information, we present a best q...
AbstractWe review interpolatory quadrature formulae, relative to the Legendre weight function on [−1...
We give Chebyshev-type quadrature formulas for certain new weight classes. These formulas are of hig...
AbstractWe study interpolatory quadrature formulae, relative to the Legendre weight function on [−1,...
AbstractWe investigate the behaviour of the maximum error in applying Gaussian quadrature to the Che...
In this paper, we consider the Gauss-Kronrod quadrature formulas for a modified Chebyshev weight. Ef...
AbstractIn this note, interpolatory quadrature formulas with nodes xj being the zeros of Tn(x) + C w...
AbstractThe aim of this work is to construct a new quadrature formula based on the divided differenc...
AbstractWe study interpolatory quadrature formulae, relative to the Legendre weight function on [−1,...
AbstractMicchelli and Rivlin (1972) obtained a quadrature formula of highest algebraic degree of pre...
AbstractWe give here an n-point Chebyshev-type rule of algebraic degree of precision n − 1, but havi...
AbstractWe study Chebyshev type quadrature formulas of degree n with respect to a weight function on...
AbstractMaking use of the connection between quadrature formulas on the unit circle and the interval...
AbstractWe review interpolatory quadrature formulae, relative to the Legendre weight function on [−1...
AbstractWe consider interpolatory quadrature formulae, relative to the Legendre weight function on [...
AbstractUsing best interpolation function based on a given function information, we present a best q...
AbstractWe review interpolatory quadrature formulae, relative to the Legendre weight function on [−1...
We give Chebyshev-type quadrature formulas for certain new weight classes. These formulas are of hig...
AbstractWe study interpolatory quadrature formulae, relative to the Legendre weight function on [−1,...
AbstractWe investigate the behaviour of the maximum error in applying Gaussian quadrature to the Che...
In this paper, we consider the Gauss-Kronrod quadrature formulas for a modified Chebyshev weight. Ef...
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