An Ulm-type method with R-order of convergence three

Abstract A new iterative method of third-order of convergence is constructed with the interesting feature that the calculation of inverse operators is not needed if the inverse of an operator is approximated. The semilocal convergence of the method is studied under classical Kantorovich-type conditions for iterative methods of second-order. Some applications are given, where the most important features of the method are shown.

[1]  M. A. Salanova,et al.  A NEWTON-LIKE METHOD FOR SOLVING SOME BOUNDARY VALUE PROBLEMS , 2002 .

[2]  Stephen Wolfram,et al.  The Mathematica Book , 1996 .

[3]  Ernst Schröder,et al.  Ueber unendlich viele Algorithmen zur Auflösung der Gleichungen , 1870 .

[4]  Ioannis K. Argyros,et al.  On Ulm’s method using divided differences of order one , 2009, Numerical Algorithms.

[5]  Ioannis K. Argyros,et al.  Results on the Chebyshev method in banach spaces , 1993 .

[6]  I. Argyros Newton-like methods under mild differentiability conditions with error analysis , 1988, Bulletin of the Australian Mathematical Society.

[7]  Antonio Marquina,et al.  Recurrence relations for rational cubic methods II: The Chebyshev method , 1991, Computing.

[8]  Miguel Ángel Hernández,et al.  An optimization of Chebyshev's method , 2009, J. Complex..

[9]  Ole H. Hald On a Newton-Moser type method , 1975 .

[10]  F. Potra,et al.  Nondiscrete induction and iterative processes , 1984 .

[11]  Miguel Ángel Hernández,et al.  The Ulm method under mild differentiability conditions , 2008, Numerische Mathematik.

[12]  M. A. Hernández Chebyshev's Approximation Algorithms and Applications , 2001 .

[13]  José Antonio Ezquerro,et al.  A discretization scheme for some conservative problems , 2000 .

[14]  J. Traub Iterative Methods for the Solution of Equations , 1982 .

[15]  J. Moser Stable and Random Motions in Dynamical Systems: With Special Emphasis on Celestial Mechanics. , 1973 .

[16]  Ioannis K. Argyros,et al.  On Ulm’s method for Fréchet differentiable operators , 2009 .

[17]  J. L. Varona,et al.  Graphic and numerical comparison between iterative methods , 2002 .

[18]  M. A. Salanova,et al.  Modification of the Kantorovich assumptions for semilocal convergence of the Chebyshev method , 2000 .