AbstractConvergence is improved in the context of the monotone Newton theorem if the starting points are chosen as close to the root as possible. It follows that accurate partial functional elimination can be applied in order to accelerate the convergence of the Newton and the Newton-Fourier iterations
We aim at finding the best possible seed values when computing reciprocals, square-roots and square-...
AbstractIt is proved that monotone convergence of a third order bracketing method for nonlinear syst...
International audiencehe Josephy--Newton method for solving a nonlinear complementarity problem cons...
AbstractConvergence is improved in the context of the monotone Newton theorem if the starting points...
AbstractThe improvement in convergence by means of accurate functional elimination in the context of...
AbstractIn the context of the monotone Newton theorem (MNT) it has been conjectured that discretised...
summary:Given two initial points generating monotone convergent Brown iterations in the context of t...
AbstractWe show that, under convenient hypotheses, partial elimination in nonlinear systems can be u...
In this article there are investigated close to the method of Newton algorithms for equations with m...
An improved version of an infeasible full Newton-step interior-point method for linear optimization ...
Adresse de la revue : http://www.elsevier.com/wps/find/journaldescription.cws_home/505625/descriptio...
AbstractWe aim at finding the best possible seed values when computing a1/p using the Newton–Raphson...
We aim at finding the best possible seed values when computing reciprocals, square-roots and square-...
In this work, after a theoretical explanation of the monotone iteration method, there are presented ...
In this work, after a theoretical explanation of the monotone iteration method, there are presented ...
We aim at finding the best possible seed values when computing reciprocals, square-roots and square-...
AbstractIt is proved that monotone convergence of a third order bracketing method for nonlinear syst...
International audiencehe Josephy--Newton method for solving a nonlinear complementarity problem cons...
AbstractConvergence is improved in the context of the monotone Newton theorem if the starting points...
AbstractThe improvement in convergence by means of accurate functional elimination in the context of...
AbstractIn the context of the monotone Newton theorem (MNT) it has been conjectured that discretised...
summary:Given two initial points generating monotone convergent Brown iterations in the context of t...
AbstractWe show that, under convenient hypotheses, partial elimination in nonlinear systems can be u...
In this article there are investigated close to the method of Newton algorithms for equations with m...
An improved version of an infeasible full Newton-step interior-point method for linear optimization ...
Adresse de la revue : http://www.elsevier.com/wps/find/journaldescription.cws_home/505625/descriptio...
AbstractWe aim at finding the best possible seed values when computing a1/p using the Newton–Raphson...
We aim at finding the best possible seed values when computing reciprocals, square-roots and square-...
In this work, after a theoretical explanation of the monotone iteration method, there are presented ...
In this work, after a theoretical explanation of the monotone iteration method, there are presented ...
We aim at finding the best possible seed values when computing reciprocals, square-roots and square-...
AbstractIt is proved that monotone convergence of a third order bracketing method for nonlinear syst...
International audiencehe Josephy--Newton method for solving a nonlinear complementarity problem cons...
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