Majorizing sequences for iterative methods

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Abstract

We provide convergence results for very general majorizing sequences of iterative methods. Using our new concept of recurrent functions, we unify the semilocal convergence analysis of Newton-type methods (NTM) under more general Lipschitz-type conditions. We present two very general majorizing sequences and we extend the applicability of (NTM) using the same information before Chen and Yamamoto (1989) [13], Deuflhard (2004) [16], Kantorovich and Akilov (1982) [19], Miel (1979) [20], Miel (1980) [21] and Rheinboldt (1968) [30]. Applications, special cases and examples are also provided in this study to justify the theoretical results of our new approach.

MSC

65G99
65K10
47H17
49M15
90C33

Keywords

Newton-type methods
Banach space
Majorizing sequences
Semilocal convergence
Chandrasekhar integral equation
Radiative transfer

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