并行通用hp-自适应有限元软件算法

IF 2.7 1区 数学 Q2 COMPUTER SCIENCE, SOFTWARE ENGINEERING
M. Fehling, W. Bangerth
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引用次数: 4

摘要

hp自适应有限元法——独立选择每个单元的网格大小(h)和多项式度(p)——长期以来被认为比单独使用h或p自适应方法具有更好的理论收敛性。然而,它并没有被广泛使用,至少部分原因是底层算法的困难和缺乏广泛可用的实现。当使用连续有限单元时尤其如此。在此,我们讨论了在分布式内存并行机器上全面和通用地实现hp自适应有限元方法所必需的算法。特别是,我们将提出一种适用于连续有限元空间的唯一自由度枚举的多阶段算法,描述加权负载平衡的考虑因素,并讨论进程之间可变大小数据的传输。我们用数值示例说明了算法的性能,并证明它们可以合理地扩展到至少16,384个消息传递接口进程。作为开源库协议的一部分,我们提供了我们算法的参考实现。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
Algorithms for Parallel Generic hp-Adaptive Finite Element Software
The hp-adaptive finite element method—where one independently chooses the mesh size (h) and polynomial degree (p) to be used on each cell—has long been known to have better theoretical convergence properties than either h- or p-adaptive methods alone. However, it is not widely used, owing at least in part to the difficulty of the underlying algorithms and the lack of widely usable implementations. This is particularly true when used with continuous finite elements. Herein, we discuss algorithms that are necessary for a comprehensive and generic implementation of hp-adaptive finite element methods on distributed-memory, parallel machines. In particular, we will present a multistage algorithm for the unique enumeration of degrees of freedom suitable for continuous finite element spaces, describe considerations for weighted load balancing, and discuss the transfer of variable size data between processes. We illustrate the performance of our algorithms with numerical examples and demonstrate that they scale reasonably up to at least 16,384 message passage interface processes. We provide a reference implementation of our algorithms as part of the open source library deal.II.
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来源期刊
ACM Transactions on Mathematical Software
ACM Transactions on Mathematical Software 工程技术-计算机:软件工程
CiteScore
5.00
自引率
3.70%
发文量
50
审稿时长
>12 weeks
期刊介绍: As a scientific journal, ACM Transactions on Mathematical Software (TOMS) documents the theoretical underpinnings of numeric, symbolic, algebraic, and geometric computing applications. It focuses on analysis and construction of algorithms and programs, and the interaction of programs and architecture. Algorithms documented in TOMS are available as the Collected Algorithms of the ACM at calgo.acm.org.
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