AbstractWe review interpolatory quadrature formulae, relative to the Legendre weight function on [−1,1], having as nodes the zeros of any one of the four Chebyshev polynomials of degree n and possibly one or both of the endpoints of the interval of integration. Some of the results we present here are new, and appear in the literature for the first time
AbstractSparked by Bojanov (J. Comput. Appl. Math. 70 (1996) 349), we provide an alternate approach ...
AbstractMicchelli and Rivlin (1972) obtained a quadrature formula of highest algebraic degree of pre...
AbstractUsing best interpolation function based on a given function information, we present a best q...
AbstractWe study interpolatory quadrature formulae, relative to the Legendre weight function on [−1,...
AbstractWe consider interpolatory quadrature formulae, relative to the Legendre weight function on [...
AbstractIn this note, interpolatory quadrature formulas with nodes xj being the zeros of Tn(x) + C w...
AbstractWe study interpolatory quadrature formulae, relative to the Legendre weight function on [−1,...
In this paper we study convergence and computation of interpolatory quadrature formulas with respect...
AbstractIn this note, interpolatory quadrature formulas with nodes xj being the zeros of Tn(x) + C w...
AbstractMicchelli and Rivlin (1972) obtained a quadrature formula of highest algebraic degree of pre...
AbstractWe review interpolatory quadrature formulae, relative to the Legendre weight function on [−1...
AbstractA Chebyshev-type quadrature formula is an integration formula with equal coefficients. We de...
AbstractThe aim of this work is to construct a new quadrature formula based on the divided differenc...
AbstractMaking use of the connection between quadrature formulas on the unit circle and the interval...
Chebyshev's splains, integrals with weight are considered in the paper aiming at the uniqueness proo...
AbstractSparked by Bojanov (J. Comput. Appl. Math. 70 (1996) 349), we provide an alternate approach ...
AbstractMicchelli and Rivlin (1972) obtained a quadrature formula of highest algebraic degree of pre...
AbstractUsing best interpolation function based on a given function information, we present a best q...
AbstractWe study interpolatory quadrature formulae, relative to the Legendre weight function on [−1,...
AbstractWe consider interpolatory quadrature formulae, relative to the Legendre weight function on [...
AbstractIn this note, interpolatory quadrature formulas with nodes xj being the zeros of Tn(x) + C w...
AbstractWe study interpolatory quadrature formulae, relative to the Legendre weight function on [−1,...
In this paper we study convergence and computation of interpolatory quadrature formulas with respect...
AbstractIn this note, interpolatory quadrature formulas with nodes xj being the zeros of Tn(x) + C w...
AbstractMicchelli and Rivlin (1972) obtained a quadrature formula of highest algebraic degree of pre...
AbstractWe review interpolatory quadrature formulae, relative to the Legendre weight function on [−1...
AbstractA Chebyshev-type quadrature formula is an integration formula with equal coefficients. We de...
AbstractThe aim of this work is to construct a new quadrature formula based on the divided differenc...
AbstractMaking use of the connection between quadrature formulas on the unit circle and the interval...
Chebyshev's splains, integrals with weight are considered in the paper aiming at the uniqueness proo...
AbstractSparked by Bojanov (J. Comput. Appl. Math. 70 (1996) 349), we provide an alternate approach ...
AbstractMicchelli and Rivlin (1972) obtained a quadrature formula of highest algebraic degree of pre...
AbstractUsing best interpolation function based on a given function information, we present a best q...
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