Abstract:

In convex programming theory, a constrained optimization problem, by KT conditions, is usually converted into a mixed nonlinear complementarily problem. According to regular solution and general solution, we in the paper describe and establish a sufficient condition under which the Newton-type algorithm possesses quadratic convergence property when it is applied to solving mix-complementarity problems. In addition, we also show that, when the   stepsize is suitably chosen, the inexact Newton's method and the discrete Newton's method converge quadratically.

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