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Kantorovichs Theorem on Newtons Method

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 Added by Orizon Ferreira
 Publication date 2012
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and research's language is English




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In this work we present a simplifyed proof of Kantorovichs Theorem on Newtons Method. This analysis uses a technique which has already been used for obtaining new extensions of this theorem.



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We prove that under semi-local assumptions, the inexact Newton method with a fixed relative residual error tolerance converges Q-linearly to a zero of the non-linear operator under consideration. Using this result we show that Newton method for minimizing a self-concordant function or to find a zero of an analytic function can be implemented with a fixed relative residual error tolerance. In the absence of errors, our analysis retrieve the classical Kantorovich Theorem on Newton method.
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