Recursive Algorithms for Vector Extrapolation Methods

@inproceedings{US2001RecursiveAF,
  title={Recursive Algorithms for Vector Extrapolation Methods},
  author={A. U.S.},
  year={2001}
}
  • A. U.S.
  • Published 2001
In this work we devise three classes of recursion relations that can be used for implementing some extrapolation methods for vector sequences. One class of recursion relations can be used to implement methods like the modified minimai polynomial extrapolation and the topological epsilon algorithm, another allows implementation of methods like minimal polynomial and reduced rank extrapolation, while the remaining class can be employed in the implementation of the vector E-algorithm. Operation… CONTINUE READING

From This Paper

Topics from this paper.

References

Publications referenced by this paper.
Showing 1-10 of 13 references

An algorithm for a generalization of the Richardson extrapolation process

  • W. F. Ford, A. Sidi
  • SIAM J. Numer. Anal
  • 1987

Recursive interpolation, extrapolation and projection

  • C. Brezinski
  • J. Comput. Appl. Math
  • 1983
2 Excerpts

Graves-Morris, fade Approxinrants. Part I: Basic Theory, Encyclopedia cf Mathematics and Its Applications

  • P. R.
  • 1981

A general extrapolation algorithm

  • C. Brezinski
  • Numer. Math
  • 1980

Extrapolating to the limit of a vector sequence, in: P.C.C. Wang, ed., Information Linkage between Applied Mathematics and Industry

  • R. P. Eddy
  • 1979

Convergence acceleration for the iterative solution of the equations X = AX + I, Comput

  • M. MeSina
  • Methods Appl. Mech. Engrg
  • 1977

Convergence en Analyse Numhrique

  • C. Brezinski, Acchlhration de la
  • Lecture Notes in Mathematics
  • 1977

A polynomial extrapolation method for finding limits and antilimits of vector sequences

  • S. Cabay, L. W. Jackson
  • SIAM J. Numer. Anal
  • 1976

Extrapolating to the limit of a vector sequence

  • P. C. C. Wang
  • SIAM J . Numer . Anal .
  • 1976

Similar Papers

Loading similar papers…