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基于弧长参数化的曲面W-M分形插值 被引量:2

W-M fractals interpolation with freeform surface based on arc-length parameterization
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摘要 论文提出了一种以Weierstrass-Mandelbrot分形(简称W-M分形)与参数曲面相合成来实现分形曲面的数字化建模的方法。指出了在参数曲面上合成W-M分形以及实施弧长参数化计算的必要性;论述了弧长参数化的具体算法,并用此方法实现了W-M分形与参数曲面的合成;在此基础上,提出了两向异性分形曲面的一种建模方法,实现了参数曲面上进行两向异性W-M分形的插值模拟。 A method of modeling W-M fractal freeform surfaces by superposing W-M fractals on parametric surfaces is proposed in this work.First,the significance of superposing W-M fractals with parametric curves and surfaces is pointed out;then the importance of utilizing arc-length parameterization for the superposing is described,and followed by our specific algorithm with which the fractal simulation with freeform surfaces is achieved;at the last section,an anisotropic approach for presenting freeform fractal surfaces is developed and with demonstrated graphics simulation.
作者 刘远东 王清辉 刘林 熊巍
机构地区 华南理工大学设计学院 华南理工大学机械与汽车工程学院
出处 《图学学报》 CSCD 北大核心 2012年第6期59-64,共6页 Journal of Graphics
基金 广东省自然科学基金资助项目(9151030101000007) 国家自然科学基金资助项目(50975092)
关键词 分形 弧长参数化 参数曲面 两向异性 fractal arc-length parameterization parametric surfaces anisotropic
分类号 TB24 [一般工业技术—工程设计测绘]
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参考文献11

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二级参考文献30

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图学学报
2012年 第6期

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