保持平面五次曲线勾股定理性质的控制点修正

IF 4.6 Q2 MATERIALS SCIENCE, BIOMATERIALS ACS Applied Bio Materials Pub Date : 2024-10-01 DOI:10.1016/j.cam.2024.116301
Francesca Pelosi , Maria Lucia Sampoli , Rida T. Farouki
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引用次数: 0

摘要

虽然平面毕达哥拉斯曲线(PH)与标准伯恩斯坦-贝塞尔表示法兼容,但随意修改控制点会损害其 PH 性质。本研究的重点是确定控制点位移,以确保给定的平面 PH 曲线仍然是 PH 曲线。具体而言,对于平面五元 PH 曲线 r(t),t∈[0,1],研究表明,两个控制点的有限多个同时位移会产生修正的五元 PH 曲线,并将其确定为二次方程和三次方程的解。作为一种更实用的方法,我们考虑了通过单个内部控制点的位移来修正 r(0)=0 和 r(1)=1 的典型 PH 五边形,并利用其余内部控制点来最小化与原始 PH 五边形的偏差。正如几个示例所示,这种方法提供了一种高效、直观的手段,可在平面 PH 五边形曲线空间内实现合理的形状修改。
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Control point modifications that preserve the Pythagorean–hodograph nature of planar quintic curves
Although planar Pythagorean–hodograph (PH) curves are compatible with the standard Bernstein–Bézier representations, freely modifying the control points will compromise their PH nature. The present study focuses on identifying control point displacements that ensure a given planar PH curve remains a PH curve. In particular, for planar quintic PH curves r(t), t[0,1] it is shown that finitely-many simultaneous displacements of two control points yield modified quintic PH curves, identified as the solutions of quadratic and cubic equations. As a more practical approach, modification of PH quintics in canonical form with r(0)=0 and r(1)=1 by the displacement of a single interior control point is considered, with the remaining interior control points being used to minimize a measure of deviation from the original PH quintic. As illustrated by several examples, this approach provides an efficient and intuitive means of effecting reasonable shape modifications within the space of planar quintic PH curves.
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来源期刊
ACS Applied Bio Materials
ACS Applied Bio Materials Chemistry-Chemistry (all)
CiteScore
9.40
自引率
2.10%
发文量
464
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