ON AN APPLICATION OF A VARIANT OF THE CLOSED GRAPH THEOREM AND THE SECANT METHOD

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IOANNIS K. ARGYROS

Abstract




The method of nondiscrete mathematical induction is used to find error bounds for the Secant method. We assume only that the operator has Holder continuous derivatives. In the case the Frechet­ derivative of the operator satisfies a Lipschitz condition our results reduce to the ones obtained by F. Potra (Num. Math. 1982).




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ARGYROS, I. K. (1993). ON AN APPLICATION OF A VARIANT OF THE CLOSED GRAPH THEOREM AND THE SECANT METHOD. Tamkang Journal of Mathematics, 24(3), 251–267. https://doi.org/10.5556/j.tkjm.24.1993.4496
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Papers

References

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F. A. Potra, "On a modified secant method. L'analyse Numerique et la theorie de l'approximation", Tome 8, No. 2 (1979), 203-214.

F. A. Potra, "An error analysis of the Secant method", Numer. Math., 38 (1982), 427-445.

F. A. Potra and V. Ptak, "Nond·1screte induct10n and iterative processes", Pitman Publ., 1984.

V. Ptak, "Nondiscrete mathematical induction. In: General topology and its relations to modern analysis and algebra IV.", Lecture Notes in Mathematics 609, pp. 166-178. Berlin-Heidelberg New York: Springer 1977.

W. C. Rheinholdt, "A unified convergence theory for a class of iterative processes", SIAM J. Numer. Anal., Vol. 5, 1, (1968), 42-63.

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