We present local convergence results for inexact iterative procedures of high convergence order in a normed space in order to approximate a locally unique solution. The hypotheses involve only Lipschitz conditions on the first Frechet-derivative of the operator involved. Earlier results involve Lipschitz-type hypotheses on higher than the first Frechet-derivative. The applicability of these methods is extended this way and under less computational cost. Special cases and applications are provided to show that these new results can apply to solve these equations
AbstractWe provide sufficient convergence conditions for a certain class of inexact Newton-like meth...
Abstract. We provide a local convergence analysis of inexact Newton–like methods in a Banach space s...
In this work we introduce a new form of setting the general assumptions for the local convergence st...
We first present a local convergence analysis for some families of fourth and six order methods in o...
The study of the dynamics and the analysis of local convergence of an iterative method, when approxi...
The study of the dynamics and the analysis of local convergence of an iterative method, when approxi...
We present a local convergence analysis of an eighth order three step methodin order to approximate ...
Numerous three-step methods of high convergence order have been developed to produce sequences appro...
In this study, we suggested the local convergence of three iterative schemes that works for systems ...
AbstractUnder weak Lipschitz condition, local convergence properties of inexact Newton methods and N...
We present a local convergence analysis of a family of third order methods for approximating a local...
We present a semi-local convergence analysis of Newton's method in order to approximate a locally un...
[EN] The local convergence analysis of a parameter based iteration with Hölder continuous first deri...
This paper deal with the study of local convergence of fourth and fifth order iterative method for s...
Solving problems in various disciplines such as biology, chemistry, economics, medicine, physics, an...
AbstractWe provide sufficient convergence conditions for a certain class of inexact Newton-like meth...
Abstract. We provide a local convergence analysis of inexact Newton–like methods in a Banach space s...
In this work we introduce a new form of setting the general assumptions for the local convergence st...
We first present a local convergence analysis for some families of fourth and six order methods in o...
The study of the dynamics and the analysis of local convergence of an iterative method, when approxi...
The study of the dynamics and the analysis of local convergence of an iterative method, when approxi...
We present a local convergence analysis of an eighth order three step methodin order to approximate ...
Numerous three-step methods of high convergence order have been developed to produce sequences appro...
In this study, we suggested the local convergence of three iterative schemes that works for systems ...
AbstractUnder weak Lipschitz condition, local convergence properties of inexact Newton methods and N...
We present a local convergence analysis of a family of third order methods for approximating a local...
We present a semi-local convergence analysis of Newton's method in order to approximate a locally un...
[EN] The local convergence analysis of a parameter based iteration with Hölder continuous first deri...
This paper deal with the study of local convergence of fourth and fifth order iterative method for s...
Solving problems in various disciplines such as biology, chemistry, economics, medicine, physics, an...
AbstractWe provide sufficient convergence conditions for a certain class of inexact Newton-like meth...
Abstract. We provide a local convergence analysis of inexact Newton–like methods in a Banach space s...
In this work we introduce a new form of setting the general assumptions for the local convergence st...