Convergence of Newton’s method and inverse function theorem in Banach space-Reference-Cited by-同舟云学术

Convergence of Newton’s method and inverse function theorem in Banach space

Published:1999 Issue:225 Volume:68 Page:169-186
ISSN:0025-5718
Container-title:Mathematics of Computation
language:en
Short-container-title:Math. Comp.

Author:

Xinghua Wang

Abstract

Under the hypothesis that the derivative satisfies some kind of weak Lipschitz condition, a proper condition which makes Newton’s method converge, and an exact estimate for the radius of the ball of the inverse function theorem are given in a Banach space. Also, the relevant results on premises of Kantorovich and Smale types are improved in this paper.

Publisher

American Mathematical Society (AMS)

Subject

Applied Mathematics,Computational Mathematics,Algebra and Number Theory

Link

http://www.ams.org/mcom/1999-68-225/S0025-5718-99-00999-0/S0025-5718-99-00999-0.pdf

Reference16 articles.

1. [1] Wang Xinghua, Convergence of Newton’s method and uniqueness of the solution of equations in Banach space, Hangzhou University, preprint.

2. Optimal error bounds for the Newton-Kantorovich theorem;Gragg, W. B.;SIAM J. Numer. Anal.,1974

3. Pure and Applied Mathematics, Vol. 9;Ostrowski, A. M.,1973

4. [5] Wang Xinghua, Convergence of an iterative procedure, KeXue TongBao, 20(1975), 558-559; J. of Hangzhou University, 1977, 2: 16-42; 1978, 3: 23-26.

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