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Critical solutions of nonlinear equations: local attraction for Newton-type methods from which the iterates generated by a certain class of Newton-type methods necessarily converge
Local Attractors of Newton-Type Methods for Constrained Equations and Complementarity Problems with Nonisolated Solutions of Newton-type methods is well defined and necessarily converges to this specific solution (despite
Certain aspects of applying Newton's method to the Navier-Stokes equations in the practical use of Newton's method is associated with the inversion of the Fŕechet derivative. The method
Newton law in covariant unimodular F(R) gravity© 2016 World Scientific Publishing Company.We investigate the Newton law in the unimodular F(R
Newton law in covariant unimodular F(R) gravity© 2016 World Scientific Publishing Company.We investigate the Newton law in the unimodular F(R
A class of active-set newton methods for mixed complementarity problems (MCP), we propose a class of Newton methods for which local superlinear convergence holds under
Numerical results for a globalized active-set newton method for mixed complementarity problemsWe discuss a globalization scheme for a class of active-set Newton methods for solving the mixed
On the convergence rate of an iterative method for the linearized navier-stokes equations of the implementation of Newton's method as applied to nonlinear problem is determined primarily by the efficiency
Brane world corrections to Newton's law brief general exposition, we review in more detail the predicted corrections to Newton's law of gravity
A globally convergent lp-Newton methodWe develop a globally convergent algorithm based on the LP-Newton method, which has been recently
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