Degeneracies of generalized inverse, vector-valued Padé approximants
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Publication:1122724
DOI10.1007/BF01889622zbMath0676.41021MaRDI QIDQ1122724
C. D. Jenkins, Peter R. Graves-Morris
Publication date: 1989
Published in: Constructive Approximation (Search for Journal in Brave)
Approximation by rational functions (41A20) Padé approximation (41A21) Numerical interpolation (65D05)
Related Items
From matrix to vector Padé approximants ⋮ A review of Padé methods for the acceleration of convergence of a sequence of vectors ⋮ Row convergence theorems for generalised inverse vector-valued Padé approximants ⋮ Row convergence theorems for vector-valued Padé approximants ⋮ An extension of a row convergence theorem for vector Padé approximants ⋮ Solution of integral equations using function-valued Padé approximants. II ⋮ Extrapolation methods for vector sequences ⋮ Similarities of the integral Padé approximants. II ⋮ Solution of integral equations using Padé type approximants ⋮ Solution of integral equations using generalised inverse, function-valued Padé approximants. I ⋮ Degeneracy cases of generalized inverse function-valued Padé approximation ⋮ A family of Padé-type approximants for accelerating the convergence of sequences ⋮ Similarities of the integral Padé approximants ⋮ Introduction to the improved functional epsilon algorithm ⋮ The rise and fall of the vector epsilon algorithm
Cites Work
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- Vector valued rational interpolants. I
- Row convergence theorems for generalised inverse vector-valued Padé approximants
- Computation of the eigenelements of a matrix by the \(\varepsilon\)- algorithm
- Particular rules for the vector \(\varepsilon\)-algorithm
- Approximants de Padé
- Vector-valued, rational interpolants. III
- A note on the \(\epsilon\)-algorithm
- Continued fractions whose coefficients obey a non-commutative law of multiplication
- Extrapolation Methods for Vector Sequences
- Computing Derivatives of Eigensystems by the Vector -Algorithm
- The Padé Table and Its Relation to Certain Algorithms of Numerical Analysis
