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Numerical Functional Analysis and Optimization Volume 20, 1999 - Issue 9-10
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Original Articles

Convergence of swartztrauber-sweets approximation for the poisson-type equation on a disk

Nami Matsunaga The Institute of Physical and Chemical Research, Wako, 351-0198, Japan
&
Tetsuro Yamamoto Department of Mathematical Sciences, Faculty of Science, Ehime University, Matsuyama, 790-8577, Japan
Pages 917-928 | Published online: 15 May 2007

References

  • Forsythe , G. E. and Wasaw . 1960 . Finite Difference Methods for Partial Differential Equations , John Wiley & Sons, Inc. .
  • Gilbarg , D. and Trudinger , N. S. 1977 . Elliptic Partial Differentia] Equations of Second Order Springer
  • Hackbusch , W. 1992 . “ Elliptic Differential Equations ” . Springer
  • Samarsky , A. A. and Andreev , V. B. 1976 . “ Difference Methods for Elliptic Equations ” . Nauka, Moscow Russian
  • Strikwerda , J. C. and Nagel , Y. 1986 . “ Finite difference methods for polar coordinate systems, MRC Technical Summary Report #2934 ” . University of Wisconsin-Madison .
  • Swartztrauber , P. N. and Sweet , R. A. 1973 . The direct solution of the discrete Poisson equation on a disk . SIAM. J. Numer. Anal. , 10 : 900 – 907 .
  • Todd , J. 1963 . “ Introduction to the Constructive Theory of Functions, ISNM ” . Birkhäuser Verlag
  • Varga , R. S. 1962 . Matrix Iterative Analysis , Prentice-Hall .
  • Young , D. M. 1971 . Iterative Solution of Large Linear Systems , Academic Press .
  • Yamamoto , T. “ On the accuracy of finite difference solution for Dirichlet problems, RIMS Kokyuroku ” . 135 – 142 .

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