Formal orthogonal polynomials and Newton-Pade' approximants

被引：4

作者：

Draux, A ^{[1
]}

机构：

[1] INSA, LMI, Dept Genie Math, F-76131 Mont St Aignan, France

来源：

NUMERICAL ALGORITHMS | 2002年 / 29卷 / 1-3期

关键词：

formal orthogonal polynomials; Newton-Pade approximants;

D O I：

10.1023/A:1014803805476

中图分类号：

O29 [应用数学];

学科分类号：

070104 ;

摘要：

We proved in [8] that the denominators of Newton-Pade approximants for a formal Newton series are formal orthogonal with respect to linear functionals. The same functional is used along an antidiagonal of the Newton-Pade denominator table. The two linear functionals, corresponding to two adjacent antidiagonals, are linked with a very simple relation. Recurrence relations between denominators are given along an antidiagonal or two adjacent antidiagonals in the normal and non-normal case. The same recurrence relations are also satisfied by the Newton-Pade numerators. which implies another formal orthogonality.

引用

页码：67 / 74

页数：8

共 50 条

[1] MULTIVARIATE PARTIAL NEWTON-PADE AND NEWTON-PADE TYPE APPROXIMANTS
ABOUIR, J
CUYT, A
JOURNAL OF APPROXIMATION THEORY, 1993, 72 (03) : 301 - 316
[2] Formal Orthogonal Polynomials and Newton–Padé Approximants
André Draux
Numerical Algorithms, 2002, 29 : 67 - 74
[3] RATIONAL APPROXIMATIONS CORRESPONDING TO NEWTON SERIES (NEWTON-PADE APPROXIMANTS)
GALLUCCI, MA
JONES, WB
JOURNAL OF APPROXIMATION THEORY, 1976, 17 (04) : 366 - 392
[4] GENERAL ORDER NEWTON-PADE APPROXIMANTS FOR MULTIVARIATE FUNCTIONS
CUYT, AAM
VERDONK, BM
NUMERISCHE MATHEMATIK, 1984, 43 (02) : 293 - 307
[5] Pade approximants, continued fractions, and orthogonal polynomials
Aptekarev, A. I.
Buslaev, V. I.
Martinez-Finkelshtein, A.
Suetin, S. P.
RUSSIAN MATHEMATICAL SURVEYS, 2011, 66 (06) : 1049 - 1131
[6] UNIQUENESS OF PADE APPROXIMANTS FROM SERIES OF ORTHOGONAL POLYNOMIALS
SIDI, A
MATHEMATICS OF COMPUTATION, 1977, 31 (139) : 738 - 739
[7] PADE-TYPE APPROXIMANTS WITH ORTHOGONAL GENERATING POLYNOMIALS
PREVOST, M
JOURNAL OF COMPUTATIONAL AND APPLIED MATHEMATICS, 1983, 9 (04) : 333 - 346
[8] Orthogonal polynomials and Pade approximants for reciprocal polynomial weights
Lubinsky, D. S.
JOURNAL OF APPROXIMATION THEORY, 2010, 162 (02) : 298 - 302
[9] ORTHOGONAL POLYNOMIALS AND PADE APPROXIMANTS ASSOCIATED WITH A SYSTEM OF ARCS
NUTTALL, J
SINGH, SR
JOURNAL OF APPROXIMATION THEORY, 1977, 21 (01) : 1 - 42
[10] NEWTON-PADE APPROXIMATION PROBLEM
CLAESSENS, G
JOURNAL OF APPROXIMATION THEORY, 1978, 22 (02) : 150 - 160

← 1 2 3 4 5 →