一次连续可微函数的多重根计算和边界的全局收敛区间方法

I. Mohd, Y. Dasril
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引用次数: 0

摘要

本文给出了牛顿方法如何推广到若干区间牛顿方法中,用于在给定区间内求一次连续可微函数的多重根和单根的定位和边界。大多数讨论集中在理论方面,并得到了一些数值证据的支持。证明了所提出的方法永远不会不收敛。本文给出了牛顿方法如何推广到若干区间牛顿方法中,用于在给定区间内求一次连续可微函数的多重根和单根的定位和边界。大多数讨论集中在理论方面,并得到了一些数值证据的支持。证明了所提出的方法永远不会不收敛。
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A globally convergent interval method for computing and bounding multiple roots of a once continuously differentiable function
This paper showed how Newton’s method can be extended to the several interval Newton methods for locating and bounding multiple and simple roots of a once continuously differentiable function in a given interval. Most of the discussion focused on the theoretical aspect and it had been supported by some numerical evidence. This paper proved that the proposed methods never fail to converge.This paper showed how Newton’s method can be extended to the several interval Newton methods for locating and bounding multiple and simple roots of a once continuously differentiable function in a given interval. Most of the discussion focused on the theoretical aspect and it had been supported by some numerical evidence. This paper proved that the proposed methods never fail to converge.
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