Limit properties of rational Bézier curves with mixed weights(具有混合权函数的有理Bézier曲线的极限性质)
The weights of a rational Bézier curve play a crucial role in shape modification of the curve. As the weight of a rational Bézier curve approaches infinity, the curve tends towards the corresponding control point. Previous research has shown that when all weights of a rational Bézier curve tend to i...
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| Main Authors: | , , , |
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| Format: | Article |
| Language: | zho |
| Published: |
Zhejiang University Press
2025-01-01
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| Series: | Zhejiang Daxue xuebao. Lixue ban |
| Subjects: | |
| Online Access: | https://doi.org/10.3785/j.issn.1008-9497.2025.01.012 |
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| Summary: | The weights of a rational Bézier curve play a crucial role in shape modification of the curve. As the weight of a rational Bézier curve approaches infinity, the curve tends towards the corresponding control point. Previous research has shown that when all weights of a rational Bézier curve tend to infinity in the form of power or exponential functions, the curve approaches its regular control curve. In this paper, we propose a new model, combining the transformation relationship between power functions and exponential functions, and then define the regular control curve of a rational Bézier curve with mixed weight functions. Based the toric degeneration theory, we prove that the limit of a rational Bézier curve is exactly its regular control curve when all weights tend to infinity in the form of mixed functions.(权因子是调整有理Bézier曲线形状的重要手段。当单个权因子趋于无穷时,有理Bézier曲线趋向于相应的控制顶点。已有研究表明,当所有权因子都以幂函数或指数函数形式趋于无穷时,有理Bézier曲线的极限曲线为其正则控制曲线。基于此,提出了一个新模型,结合幂权函数与指数权函数的转换关系,定义了具有混合权函数的有理Bézier曲线的正则控制曲线;结合toric退化理论,证明了当所有权因子都以混合函数形式趋于无穷时,有理Bézier曲线的极限曲线恰为其正则控制曲线;最后通过实例验证了结论的正确性。) |
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| ISSN: | 1008-9497 |