C. Díaz-Mendoza scite author profile

C. Díaz-Mendoza

5Publications

103Citation Statements Received

63Citation Statements Given

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102

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University of La Laguna

Publications

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On the convergence of certain Gauss-type quadrature formulas for unbounded intervals

et al. 1999

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Abstract. We consider the convergence of Gauss-type quadrature formulas for the integral ∞ 0 f (x)ω(x)dx, where ω is a weight function on the half line [0, ∞). The n-point Gauss-type quadrature formulas are constructed such that they are exact in the set of Laurent polynomialsIt is proved that under certain Carleman-type conditions for the weight and when p(n) or q(n) goes to ∞, then convergence holds for all functions f for which fω is integrable on [0, ∞). Some numerical experiments compare the convergence of these quadrature formulas with the convergence of the classical Gauss quadrature formulas for the half line.

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Strong Stieltjes distributions and orthogonal Laurent polynomials with applications to quadratures and Padé approximation

2005

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Abstract. Starting from a strong Stieltjes distribution φ, general sequences of orthogonal Laurent polynomials are introduced and some of their most relevant algebraic properties are studied. From this perspective, the connection between certain quadrature formulas associated with the distribution φ and two-point Padé approximants to the Stieltjes transform of φ is revisited. Finally, illustrative numerical examples are discussed.

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Quadrature on the half line and two-point Padé approximants to Stieltjes functions. Part III. The unbounded case

Bultheel

Díaz-Mendoza

González-Vera

et al. 1997

Journal of Computational and Applied Mathematics

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Quadrature on the half-line and two-point Padé approximants to Stieltjes functions—II: Convergence

Bultheel

Díaz-Mendoza

González-Vera

et al. 1997

Journal of Computational and Applied Mathematics

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Orthogonal Laurent Polynomials and Quadrature Formulas for Unbounded Intervals: I. Gauss-Type Formulas

Bultheel¹,

Díaz-Mendoza²,

González-Vera³

et al. 2003

Rocky Mountain J. Math.

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C. Díaz-Mendoza

On the convergence of certain Gauss-type quadrature formulas for unbounded intervals

Strong Stieltjes distributions and orthogonal Laurent polynomials with applications to quadratures and Padé approximation

Quadrature on the half line and two-point Padé approximants to Stieltjes functions. Part III. The unbounded case

Quadrature on the half-line and two-point Padé approximants to Stieltjes functions—II: Convergence

Orthogonal Laurent Polynomials and Quadrature Formulas for Unbounded Intervals: I. Gauss-Type Formulas

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