A UNIFYING SEMILOCAL CONVERGENCE ANALYSIS FOR NEWTON-LIKE METHODS UNDER WEAK AND GATEAUX DIFFERENTIABILITY CONDITIONS
Abstract
We present sucient convergence conditions for the semilocal convergence of
Newton-like methods in order to approximate a locally unique solution of a nonlinear equation
containing a nondifferentiable term in a Banach space setting. The operators involved
are Fr{\'e}chet or Gateaux dierentiable. Our results unify, improve the error bounds and also
extend the applicability of earlier results. Numerical examples are also provided in this
study.
Newton-like methods in order to approximate a locally unique solution of a nonlinear equation
containing a nondifferentiable term in a Banach space setting. The operators involved
are Fr{\'e}chet or Gateaux dierentiable. Our results unify, improve the error bounds and also
extend the applicability of earlier results. Numerical examples are also provided in this
study.
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ISSN: 1229-1595 (Print), 2466-0973 (Online)
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