Rational Approximation and its Applications in Mathematics and Physics Proceedings, Lancut 1985
| Other Authors: | , , |
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| Format: | eBook |
| Language: | English |
| Published: |
Berlin, Heidelberg
Springer Berlin Heidelberg
1987, 1987
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| Edition: | 1st ed. 1987 |
| Series: | Lecture Notes in Mathematics
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| Subjects: | |
| Online Access: | |
| Collection: | Springer Book Archives -2004 - Collection details see MPG.ReNa |
Table of Contents:
- A survey of bounds for the zeros of analytic functions obtained by continued fraction methods
- Rational approximation and interpolation of functions by branched continued fractions
- Polynomial condition of Leja
- Branched continued fractions and convergence acceleration problems
- Two-point Padé-type and Padé Approximants
- Existence of Chebyshev approximations by transformations of powered rationals
- Best Chebyshev rational approximants and poles of functions
- Hyperbolic approximation of meromorphic functions
- Three different approaches to a proof of convergence for Padé approximants
- On the continuity properties of the multivariate Padé—Operator T m,n
- The Marchaud inequality for generalized Moduli of smoothness
- Analytic properties of two-dimensional continued P-fraction expansions with periodical coefficients and their simultaneous Pade-Hermite approximants
- Modification of generalised continued fractions I definition and application to the limit-periodic case
- Convergence acceleration for continued fractions K(an/1), where an ? ?
- Perron-Carathéodory continued fractions
- On approximation of functions by two-dimensional continued fractions
- On the convergence of the multidimensional limit-periodic continued fractions
- Quelques generalisations de la representation de reels par des fractions continues
- Local properties of continued fractions
- A Stieltjes analysis of the K+-p forward elastic amplitude
- Smoothness conditions for Stieltjes measures from Pade approximants
- Exact multisoliton properties of rational approximants to the iterated solution of nonlinear evolution equations
- Application of rational approximations to some functional equations
- Operator rational functions and variational methods for the model operator
- Thegeneralized Schur algorithm for the superfast solution of Toeplitz systems
- Strong unicity in nonlinear approximation