Differential Walk on Spheres

IF 7.8 1区计算机科学 Q1 COMPUTER SCIENCE, SOFTWARE ENGINEERING

ACM Transactions on Graphics Pub Date : 2024-11-19 DOI:10.1145/3687913

Bailey Miller, Rohan Sawhney, Keenan Crane, Ioannis Gkioulekas

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Abstract

We introduce a Monte Carlo method for computing derivatives of the solution to a partial differential equation (PDE) with respect to problem parameters (such as domain geometry or boundary conditions). Derivatives can be evaluated at arbitrary points, without performing a global solve or constructing a volumetric grid or mesh. The method is hence well suited to inverse problems with complex geometry, such as PDE-constrained shape optimization. Like other walk on spheres (WoS) algorithms, our method is trivial to parallelize, and is agnostic to boundary representation (meshes, splines, implicit surfaces, etc. ), supporting large topological changes. We focus in particular on screened Poisson equations, which model diverse problems from scientific and geometric computing. As in differentiable rendering, we jointly estimate derivatives with respect to all parameters---hence, cost does not grow significantly with parameter count. In practice, even noisy derivative estimates exhibit fast, stable convergence for stochastic gradient-based optimization, as we show through examples from thermal design, shape from diffusion, and computer graphics.

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球面微分行走

我们介绍一种蒙特卡罗方法，用于计算偏微分方程（PDE）解相对于问题参数（如域几何或边界条件）的导数。导数可以在任意点进行评估，而无需执行全局求解或构建体积网格或网格。因此，该方法非常适合复杂几何形状的逆问题，如 PDE 受限形状优化。与其他球面行走（WoS）算法一样，我们的方法易于并行化，并且与边界表示（网格、样条、隐式曲面等）无关，支持大规模拓扑变化。我们尤其专注于筛选泊松方程，它可以模拟科学和几何计算中的各种问题。与可微分渲染一样，我们联合估计所有参数的导数--因此，成本不会随着参数数量的增加而显著增加。在实践中，对于基于随机梯度的优化，即使是有噪声的导数估计也能表现出快速、稳定的收敛性，我们将通过热设计、扩散形状和计算机图形学中的实例来说明这一点。

本文章由计算机程序翻译，如有差异，请以英文原文为准。

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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.