2005 , Volume 10, № 3, p.72-86

Convergences of the iterative Newton's method for systems of nonlinear equations g(x)=0 with functions g having Lipschitz' constant L versus functions g having local Lipschitz' constant L(x) are compared. For the second class of functions the results similar to the Kantorovich (TK) theorems for C^{1,1}(D) are obtained. It is shown that the second class has elements and initial approximations which do not guarantee convergence while the TK do. Vice versa, the class C^{1,1} has elements and initial approximations that guarantee the convergence according to the TK, but they do not satisfy the conditions of the theorems presented here.