无痛可微旋转动力学

IF 9.5 1区计算机科学 Q1 COMPUTER SCIENCE, SOFTWARE ENGINEERING

ACM Transactions on Graphics Pub Date : 2025-07-27 DOI:10.1145/3730944

Magí Romanyà-Serrasolsas, Juan J. Casafranca, Miguel A. Otaduy

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引用次数: 0

摘要

我们提出了利用李代数旋转导数的正微分刚体动力学公式。特别地，我们展示了这种方法如何容易地应用于正向动力学的增量势公式，并且我们为可微动力学引入了伴随的新定义。与旋转的其他参数化（特别是流行的旋转矢量参数化）相比，我们的方法带来了简单而紧凑的导数，更好的调节和更高的运行时效率。我们在基本刚体问题上展示了我们的方法，也在多刚体动力学的一个例子上展示了我们的方法。

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Painless Differentiable Rotation Dynamics

We propose the formulation of forward and differentiable rigid-body dynamics using Lie-algebra rotation derivatives. In particular, we show how this approach can easily be applied to incremental-potential formulations of forward dymamics, and we introduce a novel definition of adjoints for differentiable dynamics. In contrast to other parameterizations of rotations (notably the popular rotation-vector parameterization), our approach leads to painlessly simple and compact derivatives, better conditioning, and higher runtime efficiency. We demonstrate our approach on fundamental rigid-body problems, but also on Cosserat rods as an example of multi-rigid-body dynamics.

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来源期刊

ACM Transactions on Graphics 工程技术-计算机：软件工程

CiteScore

14.30

自引率

25.80%

发文量

193

审稿时长

12 months

期刊介绍： ACM Transactions on Graphics (TOG) is a peer-reviewed scientific journal that aims to disseminate the latest findings of note in the field of computer graphics. It has been published since 1982 by the Association for Computing Machinery. Starting in 2003, all papers accepted for presentation at the annual SIGGRAPH conference are printed in a special summer issue of the journal.