求解离散域上抛物线偏微分方程的框架

IF 7.8 1区 计算机科学 Q1 COMPUTER SCIENCE, SOFTWARE ENGINEERING ACM Transactions on Graphics Pub Date : 2024-05-28 DOI:10.1145/3666087
Leticia Mattos Da Silva, Oded Stein, Justin Solomon
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引用次数: 0

摘要

我们介绍了一种解决三角形网格表面抛物线偏微分方程的框架,包括汉密尔顿-贾科比方程和福克-普朗克方程。这类偏微分方程通常有非线性或刚性项,无法用标准方法在曲面三角形网格上求解。为了应对这一挑战,我们利用分裂积分器结合凸优化步骤来求解这些 PDE。我们的机制可用于计算几何域上最佳传输距离的熵近似值,克服了最先进方法的数值限制。此外,我们还展示了我们的方法在一些线性和非线性 PDE 上的多功能性,这些 PDE 出现在几何处理中的扩散和前传播任务中。
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A Framework for Solving Parabolic Partial Differential Equations on Discrete Domains

We introduce a framework for solving a class of parabolic partial differential equations on triangle mesh surfaces, including the Hamilton-Jacobi equation and the Fokker-Planck equation. PDE in this class often have nonlinear or stiff terms that cannot be resolved with standard methods on curved triangle meshes. To address this challenge, we leverage a splitting integrator combined with a convex optimization step to solve these PDE. Our machinery can be used to compute entropic approximation of optimal transport distances on geometric domains, overcoming the numerical limitations of the state-of-the-art method. In addition, we demonstrate the versatility of our method on a number of linear and nonlinear PDE that appear in diffusion and front propagation tasks in geometry processing.

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来源期刊
ACM Transactions on Graphics
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.
期刊最新文献
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