安德森加速度滤波

Sara N. Pollock, L. Rebholz
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引用次数: 2

摘要

本文介绍、分析并论证了一种有效的、理论上合理的滤波策略,以保证每次迭代时最小二乘问题的解的条件。过滤策略由两步组成:第一步控制最小二乘矩阵列之间的长度差,第二步对该矩阵列所跨的子空间之间的角度施加下界。该组合策略用于控制每次迭代时最小二乘矩阵的条件个数。结果表明,该方法对基于偏微分方程离散化的一系列问题是有效的。对于初始迭代可能远离解的问题,以及经过不同的前渐近和渐近阶段的问题,它被证明是特别有效的。
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Filtering for Anderson acceleration
This work introduces, analyzes and demonstrates an efficient and theoretically sound filtering strategy to ensure the condition of the least-squares problem solved at each iteration of Anderson acceleration. The filtering strategy consists of two steps: the first controls the length disparity between columns of the least-squares matrix, and the second enforces a lower bound on the angles between subspaces spanned by the columns of that matrix. The combined strategy is shown to control the condition number of the least-squares matrix at each iteration. The method is shown to be effective on a range of problems based on discretizations of partial differential equations. It is shown particularly effective for problems where the initial iterate may lie far from the solution, and which progress through distinct preasymptotic and asymptotic phases.
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