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
AbstractThe aim of this work is to analyse the stability and the convergence for the quadrature rule...
AbstractWe review interpolatory quadrature formulae, relative to the Legendre weight function on [−1...
AbstractThis paper shows that the Chebyshev weightw(x)=(1−x2)−1/2is the only weight having the prope...
AbstractWe study interpolatory quadrature formulae, relative to the Legendre weight function on [−1,...
AbstractWe establish a relation between quadrature formulas on the interval [-1,1] that approximate ...
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,...
AbstractThe stability and the convergence of the Chebyshev quadrature rule of one-sided finite part ...
We consider integral error representation related to the Hermite interpolating polynomial and derive...
AbstractIn this paper the authors study “truncated” quadrature rules based on the zeros of Generaliz...
AbstractWe investigate a method for the numerical evaluation of integrals over [-1,1] of functions o...
AbstractThe Lm extremal polynomials in an explicit form with respect to the weights (1−x)−1/2(1+x)(m...
2000 Mathematics Subject Classification: 26C05, 26C10, 30A12, 30D15, 42A05, 42C05.In this paper we p...
AbstractIn this paper we prove several inequalities for polynomials and trigonometric polynomials. T...
AbstractWe study interpolatory quadrature formulae, relative to the Legendre weight function on [−1,...
AbstractThe aim of this work is to analyse the stability and the convergence for the quadrature rule...
AbstractWe review interpolatory quadrature formulae, relative to the Legendre weight function on [−1...
AbstractThis paper shows that the Chebyshev weightw(x)=(1−x2)−1/2is the only weight having the prope...
AbstractWe study interpolatory quadrature formulae, relative to the Legendre weight function on [−1,...
AbstractWe establish a relation between quadrature formulas on the interval [-1,1] that approximate ...
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,...
AbstractThe stability and the convergence of the Chebyshev quadrature rule of one-sided finite part ...
We consider integral error representation related to the Hermite interpolating polynomial and derive...
AbstractIn this paper the authors study “truncated” quadrature rules based on the zeros of Generaliz...
AbstractWe investigate a method for the numerical evaluation of integrals over [-1,1] of functions o...
AbstractThe Lm extremal polynomials in an explicit form with respect to the weights (1−x)−1/2(1+x)(m...
2000 Mathematics Subject Classification: 26C05, 26C10, 30A12, 30D15, 42A05, 42C05.In this paper we p...
AbstractIn this paper we prove several inequalities for polynomials and trigonometric polynomials. T...
AbstractWe study interpolatory quadrature formulae, relative to the Legendre weight function on [−1,...
AbstractThe aim of this work is to analyse the stability and the convergence for the quadrature rule...
AbstractWe review interpolatory quadrature formulae, relative to the Legendre weight function on [−1...
AbstractThis paper shows that the Chebyshev weightw(x)=(1−x2)−1/2is the only weight having the prope...
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