Kantorovich's type theorems for systems of equations with constant rank derivatives |
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| Authors: | Nuchun Hu Weiping Shen Chong Li |
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| Institution: | Department of Mathematics, Zhejiang University, Hangzhou 310027, PR China |
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| Abstract: | The famous Newton–Kantorovich hypothesis has been used for a long time as a sufficient condition for the convergence of Newton's method to a solution of an equation. Here we present a “Kantorovich type” convergence analysis for the Gauss–Newton's method which improves the result in W.M. Häußler, A Kantorovich-type convergence analysis for the Gauss–Newton-method, Numer. Math. 48 (1986) 119–125.] and extends the main theorem in I.K. Argyros, On the Newton-Kantorovich hypothesis for solving equations, J. Comput. Appl. Math. 169 (2004) 315–332]. Furthermore, the radius of convergence ball is also obtained. |
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| Keywords: | Gauss&ndash Newton's method Majorizing sequence Semilocal convergence Local convergence Lipschitz condition |
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