Open AccessAn Efficient Family of Root-Finding Methods with Optimal Eighth-Order Convergence
Author(s) -
Rajni Sharma,
Janak Raj Sharma
Publication year - 2012
Publication title -
advances in numerical analysis
Language(s) - English
Resource type - Journals
eISSN - 1687-9570
pISSN - 1687-9562
DOI - 10.1155/2012/346420
Subject(s) - conjecture , mathematics , convergence (economics) , order (exchange) , root (linguistics) , nonlinear system , derivative (finance) , mathematical optimization , discrete mathematics , linguistics , philosophy , physics , finance , financial economics , economics , economic growth , quantum mechanics
We derive a family of eighth-order multipoint methods for the solution of nonlinear equations. In terms of computational cost, the family requires evaluations of only three functions and one first derivative per iteration. This implies that the efficiency index of the present methods is 1.682. Kung and Traub (1974) conjectured that multipoint iteration methods without memory based on n evaluations have optimal order . Thus, the family agrees with Kung-Traub conjecture for the case . Computational results demonstrate that the developed methods are efficient and robust as compared with many well-known methods
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