Orthogonal Laurent polynomials and two-point Padé approximants associated with Dawson's integral
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Publication:1779443
DOI10.1016/j.cam.2004.09.041zbMath1068.41032OpenAlexW2044448224MaRDI QIDQ1779443
M. Jiménez Paiz, Pablo González-Vera, Carlos Díaz-Mendoza
Publication date: 1 June 2005
Published in: Journal of Computational and Applied Mathematics (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1016/j.cam.2004.09.041
Related Items (3)
Orthogonality and recurrence for ordered Laurent polynomial sequences ⋮ Orthogonal Laurent polynomials. A new algebraic approach ⋮ Foreword to the proceedings of the OrthoQuad 2014 conference
Cites Work
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- Orthogonal Laurent polynomials and the strong Hamburger moment problem
- Continued fractions with applications
- Orthogonal Laurent polynomials and strong moment theory: A survey
- Polynômes orthogonaux formels - applications
- Solutions of the strong Hamburger moment problem
- The special functions and their approximations. Vol. I, II
- A Strong Stieltjes Moment Problem
- A Continued Fraction Expansion, with a Truncation Error Estimate, for Dawson's Integral
- A Formal Extension of the Padé Table to Include Two Point Padé Quotients
- Zero-Free Parabolic Regions for Sequences of Polynomials
- Continued Fractions which Correspond to Power Series Expansions at Two Points
- A Continued Fraction Expansion for a Generalization of Dawson's Integral
- A Further Correspondence Property of M Fractions
- Strong Stieltjes distributions and orthogonal Laurent polynomials with applications to quadratures and Padé approximation
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