论文信息 - Rational approximants to symmetric formal Laurent series

Rational approximants to symmetric formal Laurent series

Rational approximants, in the Padé sense, to a given formal Laurent series,F(z)=Σ−∞∞ckzk, have been considered by several authors (see [3] for a survey about the different kinds of approximants which can be defined). In this paper, we shall be concerned with symmetric series, that is, when the complex coefficients {ck}−∞+∞ satisfyc−k=ck,k=0, 1,....Making use of Brezinski's approach [1], for Padé-type approximation to a formal power series, rational approximants toF(z) with prescribed poles are obtained, and their algebraic properties considered. These results will allow us to give an alternative approach for the Padé-Chebyshev approximants.

Pablo González-Vera | M. Camacho

[1] Adhemar Bultheel,et al. Laurent Series and their Padé Approximations , 1987 .

[2] C. Brezinski. Padé-type approximation and general orthogonal polynomials , 1980 .

[3] C. Brezinski. Outlines of Pade Approximation , 1983 .

[4] Hans J. Maehly,et al. Methods for Fitting Rational Approximations, Parts II and III , 1963, JACM.

[5] Lloyd N. Trefethen,et al. Pade´, stable Pade´, and Chebyshev-Pade´ approximation , 1987 .

[6] Stefan Paszkowski. Approximation uniforme des fonctions continues par les fonctions rationnelles , 1962 .

[7] Hans J. Maehly. Methods for Fitting Rational Approximations, Part I: Telescoping Procedures for Continued Fractions , 1960, JACM.

[8] William B. Gragg,et al. The Laurent-Pade Table , 1974, IFIP Congress.

[9] C. Brezinski. General orthogonal polynomials , 1980 .