Enlarging The convergence domain of secant-like methods for equations

We present two new semilocal convergence analyses for secant-like methods in order to approximate a locally unique solution of a nonlinear equation in a Banach space setting. These methods include the secant, Newton’s method and other popular methods as special cases. The convergence analysis is bas...

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Detalhes bibliográficos
Autores: Argyros, I.K., Ezquerro, J.A. [0000-0001-8120-167X], Hernández-Verón, M.A. [0000-0001-5478-2958], Hilout, S., Magreñán, Á.A. [0000-0002-6991-5706]
Tipo de documento: artigo
Estado:Versão publicada
Data de publicação:2015
País:España
Recursos:Universidad de La Rioja (UR)
Repositório:RIUR. Repositorio Institucional de la Universidad de La Rioja
OAI Identifier:oai:portal.dialnet.es:doc/5bbc69b5b750603269e82009
Acesso em linha:https://investigacion.unirioja.es/documentos/5bbc69b5b750603269e82009
Access Level:Acceso aberto
Palavra-chave:Banach space
Divided difference operator
Majorizing sequence
Newton’s method
Nonlinear equation
Secant-like methods
Semilocal convergence
The secant method
Descrição
Resumo:We present two new semilocal convergence analyses for secant-like methods in order to approximate a locally unique solution of a nonlinear equation in a Banach space setting. These methods include the secant, Newton’s method and other popular methods as special cases. The convergence analysis is based on our idea of recurrent functions. Using more precise majorizing sequences than before we obtain weaker convergence criteria. These advantages are obtained because we use more precise estimates for the upper bounds on the norm of the inverse of the linear operators involved than in earlier studies. Numerical examples are given to illustrate the advantages of the new approaches. © 2015, Mathematical Society of the Rep. of China. All rights reserved.