Higher order derivative-free iterative methods with and without memory for systems of nonlinear equations

A derivative-free family of iterations without memory consisting of three steps for solving nonlinear systems of equations is brought forward. Then, the main aim of the paper is furnished by proposing several novel schemes with memory possessing higher rates of convergence. Analytical discussions are reported and the theoretical efficiency of the methods is studied. Application of the schemes in solving partial differential equations is finally provided to support the theoretical discussions.

[1]  Juan A. Carrasco,et al.  Higher order multi-step Jarratt-like method for solving systems of nonlinear equations: Application to PDEs and ODEs , 2015, Comput. Math. Appl..

[2]  Miquel Grau-Sánchez,et al.  Note on the efficiency of some iterative methods for solving nonlinear equations , 2015 .

[3]  Fazlollah Soleymani,et al.  On a New Method for Computing the Numerical Solution of Systems of Nonlinear Equations , 2012, J. Appl. Math..

[4]  A. Polyanin,et al.  Handbook of Nonlinear Partial Differential Equations , 2003 .

[5]  Fazlollah Soleymani,et al.  On the construction of some tri-parametric iterative methods with memory , 2015, Numerical Algorithms.

[6]  Jochen W. Schmidt Die Regula Falsi für Operatoren in Banachräumen , 1961 .

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

[8]  Janak Raj Sharma,et al.  Efficient derivative-free numerical methods for solving systems of nonlinear equations , 2016 .

[9]  Fazlollah Soleymani,et al.  Numerical solution of nonlinear systems by a general class of iterative methods with application to nonlinear PDEs , 2013, Numerical Algorithms.

[10]  Miodrag S. Petkovic,et al.  On some efficient derivative-free iterative methods with memory for solving systems of nonlinear equations , 2015, Numerical Algorithms.

[11]  Xiaofeng Wang,et al.  Seventh-order derivative-free iterative method for solving nonlinear systems , 2015, Numerical Algorithms.

[12]  M. Hermite,et al.  Sur la formule d'interpolation de Lagrange , 1878 .

[13]  Miodrag S. Petkovic,et al.  An efficient derivative free family of fourth order methods for solving systems of nonlinear equations , 2014, Appl. Math. Comput..

[14]  Fazlollah Soleymani,et al.  Iterative methods for nonlinear systems associated with finite difference approach in stochastic differential equations , 2015, Numerical Algorithms.

[15]  Predrag S. Stanimirovic,et al.  Computing outer inverses by scaled matrix iterations , 2016, J. Comput. Appl. Math..

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

[17]  C. Hermite,et al.  Sur la formule d'interpolation de Lagrange. (Extrait d'une lettre de M. Ch. Hermite à M. Borchardt). , 1877 .

[18]  Sergio Amat,et al.  On the approximation of derivatives using divided difference operators preserving the local convergence order of iterative methods , 2011, J. Comput. Appl. Math..

[19]  A. Stavrakoudis,et al.  On locating all roots of systems of nonlinear equations inside bounded domain using global optimization methods , 2010 .

[20]  Fazlollah Soleymani,et al.  A multi-step class of iterative methods for nonlinear systems , 2014, Optim. Lett..

[21]  J. Sharma,et al.  Efficient Jarratt-like methods for solving systems of nonlinear equations , 2014 .

[22]  Miguel Sánchez,et al.  Note on the efficiency of some iterative methods for solving nonlinear equations , 2015 .

[23]  Alicia Cordero,et al.  Dynamical analysis of iterative methods for nonlinear systems or how to deal with the dimension? , 2014, Appl. Math. Comput..

[24]  A. Cordero,et al.  New family of iterative methods based on the Ermakov–Kalitkin scheme for solving nonlinear systems of equations , 2015 .

[25]  Andreas Griewank,et al.  Broyden Updating, the Good and the Bad! , 2012 .

[26]  T. Poinsot,et al.  Theoretical and numerical combustion , 2001 .