S. González-Pinto, Ernst Hairer, D. Hernández-Abreu
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引用次数: 0
摘要
本研究考虑了矩形域上的空间离散抛物线问题,该问题受德里希特边界条件的限制。对于时间积分,考虑了 s 级 AMF-W 方法,即 ADI(交替方向隐式)类型积分器。当问题的空间维数 m 较大时,这种方法尤其有效。最近,[J. Comput. Appl. Math., 417:114642, 2023]获得了 m = 2 情况下 PDE 收敛的最佳结果。本研究的目的是将这些结果扩展到任意空间维度 m ≥ 3。本文解释了哪些秩语句可以从 m = 2 的情况延续到 m ≥ 3,哪些不可以。
PDE-convergence in Euclidean norm of AMF-W methods for linear multidimensional parabolic problems
This work considers space-discretised parabolic problems on a rectangular domain subject to Dirichlet boundary conditions. For the time integration s-stage AMF-W-methods, which are ADI (alternating direc- tion implicit) type integrators, are considered. They are particularly efficient when the space dimension m of the problem is large. Optimal results on PDE-convergence have recently been obtained in [J. Comput. Appl. Math., 417:114642, 2023] for the case m = 2. The aim of the present work is to extend these results to arbitrary space dimension m ≥ 3. It is explained which order statements carry over from the case m = 2 to m ≥ 3, and which do not.
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