Optimal inequality factor for Durand-Kerner's and Tanabe's methods

Optimal inequality factor for Durand-Kerner's and Tanabe's methods

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The convergence condition for the simultaneous inclusion methods is \(w^{(0)}<c(a,b,n)d^{(0)}\), where \(w^{(0)}\) is the maximum Weierstrass factor \(W^{0}_k\), \(k\in I_n\), and \(d^{0}\) is the minimum distance between \(z^{(0)}_1\), \(z^{(0)}_2\), \(\ldots\), \(z^{(0)}_n\), the distinct appr...

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Bibliographic Details
Main Authors:	Octavian Cira, Cristian Mihai Cira
Format:	Article
Language:	English
Published:	Publishing House of the Romanian Academy 2011-08-01
Series:	Journal of Numerical Analysis and Approximation Theory
Subjects:	root-finding methods polynomial zeros simultaneous inclusion methods Durand-Kerner's method Tanabe's method convergence
Online Access:	https://ictp.acad.ro/jnaat/journal/article/view/1043

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