埃尔米特数据的双重轮廓

Proceedings of the 29th annual conference on Computer graphics and interactive techniques Pub Date : 2002-07-01 DOI:10.1145/566570.566586

T. Ju, Frank Losasso, S. Schaefer, J. Warren

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引用次数: 722

摘要

本文描述了一种用Hermite数据(即;确切的交点和法线)。这种方法避免了像以前的Hermite轮廓方法那样需要明确地识别和处理“特征”。利用一种新的、数值稳定的二次误差函数表示，我们开发了一种基于八叉树的方法来简化由该方法产生的轮廓。接下来，我们将我们的轮廓方法扩展到这些简化的八叉树。这种新方法没有对八叉树施加任何约束(比如成为一个受限制的八叉树)，也不需要“修补裂缝”。最后，我们给出了一个简化过程中保持轮廓拓扑的简单测试。

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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Dual contouring of hermite data

This paper describes a new method for contouring a signed grid whose edges are tagged by Hermite data (i.e; exact intersection points and normals). This method avoids the need to explicitly identify and process "features" as required in previous Hermite contouring methods. Using a new, numerically stable representation for quadratic error functions, we develop an octree-based method for simplifying contours produced by this method. We next extend our contouring method to these simpli£ed octrees. This new method imposes no constraints on the octree (such as being a restricted octree) and requires no "crack patching". We conclude with a simple test for preserving the topology of the contour during simplification.

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Proceedings of the 29th annual conference on Computer graphics and interactive techniques

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