非阿基米德布洛登法

Proceedings of the 45th International Symposium on Symbolic and Algebraic Computation Pub Date : 2020-07-20 DOI:10.1145/3373207.3404045

X. Dahan, Tristan Vaccon

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引用次数: 0

摘要

牛顿的方法是解决方程的普遍工具，无论是在阿基米德和非阿基米德的情况下，它实际上并没有什么不同。布洛登是所谓“准牛顿方法”的发起者。这些方法使用迭代步骤，其中不需要计算完整的雅可比矩阵及其逆矩阵。在一般的非阿基米德情况下，给出了一种适用于缺乏内积的Broyden方法，并研究了其Q和R的收敛性。证明了该方法在维数为m的条件下，对r阶方程至少收敛q -线性和r -超线性。

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On a non-archimedean broyden method

Newton's method is an ubiquitous tool to solve equations, both in the archimedean and non-archimedean settings --- for which it does not really differ. Broyden was the instigator of what is called "quasi-Newton methods". These methods use an iteration step where one does not need to compute a complete Jacobian matrix nor its inverse. We provide an adaptation of Broyden's method in a general non-archimedean setting, compatible with the lack of inner product, and study its Q and R convergence. We prove that our adapted method converges at least Q-linearly and R-superlinearly with R-order [EQUATION] in dimension m. Numerical data are provided.

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Proceedings of the 45th International Symposium on Symbolic and Algebraic Computation

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