Three-point methods with and without memory for solving nonlinear equations

Abstract A new family of three-point derivative free methods for solving nonlinear equations is presented. It is proved that the order of convergence of the basic family without memory is eight requiring four function-evaluations, which means that this family is optimal in the sense of the Kung–Traub conjecture. Further accelerations of convergence speed are attained by suitable variation of a free parameter in each iterative step. This self-accelerating parameter is calculated using information from the current and previous iteration so that the presented methods may be regarded as the methods with memory. The self-correcting parameter is calculated applying the secant-type method in three different ways and Newton’s interpolatory polynomial of the second degree. The corresponding R -order of convergence is increased from 8 to 4 ( 1 + 5 / 2 ) ≈ 8.472 , 9, 10 and 11. The increase of convergence order is attained without any additional function calculations, providing a very high computational efficiency of the proposed methods with memory. Another advantage is a convenient fact that these methods do not use derivatives. Numerical examples and the comparison with existing three-point methods are included to confirm theoretical results and high computational efficiency.

[1]  Q Zheng,et al.  OPTIMAL STEFFENSEN-TYPE FAMILIES FOR SOLVING NONLINEAR EQUATIONS , 2011 .

[2]  Miodrag S. Petkovic,et al.  A family of three-point methods of optimal order for solving nonlinear equations , 2010, J. Comput. Appl. Math..

[3]  Qingbiao Wu,et al.  Three-step iterative methods with eighth-order convergence for solving nonlinear equations , 2009 .

[4]  R. D. Murphy,et al.  Iterative solution of nonlinear equations , 1994 .

[5]  G. Alefeld,et al.  Introduction to Interval Computation , 1983 .

[6]  朝倉 利光,et al.  M.J. Beran and G.B. Parrent: Theory of Partial Coherence, Prentice-Hall, Englewood Cliffs, New Jersey, 1964, 193頁, 16×25cm, 3,600円. , 1965 .

[7]  Miodrag S. Petkovic,et al.  Remarks on "On a General Class of Multipoint Root-Finding Methods of High Computational Efficiency" , 2011, SIAM J. Numer. Anal..

[8]  Jovana Dzunic,et al.  A family of two-point methods with memory for solving nonlinear equations , 2011 .

[9]  Miodrag S. Petković,et al.  A family of optimal three-point methods for solving nonlinear equations using two parametric functions , 2011, Appl. Math. Comput..

[10]  Alicia Cordero,et al.  New modifications of Potra-Pták's method with optimal fourth and eighth orders of convergence , 2010, J. Comput. Appl. Math..

[11]  Changbum Chun,et al.  Some fourth-order iterative methods for solving nonlinear equations , 2008, Appl. Math. Comput..

[12]  Qingbiao Wu,et al.  A new family of eighth-order iterative methods for solving nonlinear equations , 2009, Appl. Math. Comput..

[13]  Miodrag S. Petkovic,et al.  Derivative free two-point methods with and without memory for solving nonlinear equations , 2010, Appl. Math. Comput..

[14]  Young Hee Geum,et al.  A multi-parameter family of three-step eighth-order iterative methods locating a simple root , 2010, Appl. Math. Comput..

[15]  Rajni Sharma,et al.  A new family of modified Ostrowski’s methods with accelerated eighth order convergence , 2009, Numerical Algorithms.

[16]  Miodrag S. Petkovic,et al.  On a General Class of Multipoint Root-Finding Methods of High Computational Efficiency , 2010, SIAM J. Numer. Anal..

[17]  Xia Wang,et al.  New eighth-order iterative methods for solving nonlinear equations , 2010 .

[18]  James M. Ortega,et al.  Iterative solution of nonlinear equations in several variables , 2014, Computer science and applied mathematics.

[19]  Miodrag S. Petkovic,et al.  Construction of optimal order nonlinear solvers using inverse interpolation , 2010, Appl. Math. Comput..

[20]  H. T. Kung,et al.  Optimal Order of One-Point and Multipoint Iteration , 1974, JACM.

[21]  Xia Wang,et al.  Modified Ostrowski's method with eighth-order convergence and high efficiency index , 2010, Appl. Math. Lett..

[22]  Jingya Li,et al.  An optimal Steffensen-type family for solving nonlinear equations , 2011, Appl. Math. Comput..

[23]  Young Hee Geum,et al.  A uniparametric family of three-step eighth-order multipoint iterative methods for simple roots , 2011, Appl. Math. Lett..

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