Paper Info
Title
Higher order multi-step Jarratt-like method for solving systems of nonlinear equations: Application to PDEs and ODEs.
Abstract
This paper proposes a multi-step iterative method for solving systems of nonlinear equations with a local convergence order of 3m−4, where m(≥2) is the number of steps. The multi-step iterative method includes two parts: the base method and the multi-step part. The base method involves two function evaluations, two Jacobian evaluations, one LU decomposition of a Jacobian, and two matrix–vector multiplications. Every stage of the multi-step part involves the solution of two triangular linear systems and one matrix–vector multiplication. The computational efficiency of the new method is better than those of previously proposed methods. The method is applied to several nonlinear problems resulting from discretizing nonlinear ordinary differential equations and nonlinear partial differential equations.
Year
DOI
Venue
2015
10.1016/j.camwa.2015.05.012
Computers & Mathematics with Applications
Keywords
Field
DocType
Multi-step iterative methods,Systems of nonlinear equations,Newton’s method,Computational efficiency,Nonlinear ordinary differential equations,Nonlinear partial differential equations
Mathematical optimization,Nonlinear system,Iterative method,Mathematical analysis,Relaxation (iterative method),Numerical partial differential equations,Adomian decomposition method,Local convergence,Stone method,Mathematics,Split-step method
Journal
Volume
Issue
ISSN
70
4
0898-1221
Citations 
PageRank 
References 
8
0.56
15
Authors
4
Name
Order
Citations
PageRank
Fayyaz Ahmad14910.88
E. Tohidi2529.65
Malik Zaka Ullah3669.63
Juan A. Carrasco411621.24