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1.
计算机图形学是计算机科学中最主要的分支之一,其核心技术是如何建立所处理对象的模型并生成该对象的图形。本文阐述计算机图形学中的拟合原理,双三次贝齐尔曲面的特性,介绍与该曲面有关的程序代码以及程序的运行结果。  相似文献   

2.
介绍计算机图形学中的几种曲面的表达方式,并叙述它们之间的联系与区别.最后介绍双三次贝齐尔曲面在船体曲面设计中的应用实例.  相似文献   

3.
给出了三角域上L、W曲面的定义,从定义中得出了三角域L曲面的比例因子构造方法,分析了三角域上L曲面与B-B曲面的关系.同时将L样条函数推广到了三角域上,分析讨论了三角L样条函数的一些重要性质.最后给出了三角域上有理L、W曲面的定义和三角域有理L曲面构造方法,并讨论了其一些重要性质,分析了有理L曲面与三角域上有理Bézier曲面间的关系.  相似文献   

4.
通过研究单纯形上的B形式曲面,给出了三角域上Bezier.曲面和矩形域上张量积Bezier曲面在三维单纯形上的B形式表示,由此得到了三角域上Bezier曲面和矩形域上张量积Bezier曲面之间的互化公式,最后把这些结果推广到高维单纯形条件下  相似文献   

5.
本文总结了MATLAB在三维曲面的绘制中的一些实例。在规则三维曲面的绘制上,给出了莫比乌斯带的绘制。在不规则曲面绘制上,给出了离散点绘制光滑曲面的实例,通过设计飞机座椅靠背曲线的问题给出了在现实生活中三维图像绘制的应用。  相似文献   

6.
介绍了Mathematica在几种几何图形绘制中的应用,提出了获得空间旋转曲面的参数方程的一般方法,并给出了用Mathematica绘制空间旋转曲面的实例的源代码.  相似文献   

7.
几何画板轨迹功能在三维曲面绘制中的应用   总被引:1,自引:1,他引:0  
探讨了几何画板的绘图功能在空间曲面绘制中的应用,给出通过建立基础网格利用“轨迹”功能绘制曲面网状图和建立三维坐标系利用“追踪”功能绘制曲面的方法。  相似文献   

8.
介绍了Mathematica在几种几何图形绘制中的应用,提出了获得空间旋转曲面的参数方程的一般方法,并给出了用Mathematica绘制空间旋转曲面的实例的源代码.  相似文献   

9.
以某零件一角为例,利用MasterCAM的CAD功能,介绍了熔接及处理三个不等半径圆角曲面的两种方法,方法一采用直观传统的三圆角曲面熔接的命令进行处理;方法二采用两曲面熔接命令.重点阐述了圆角熔接的比较,用理论证明了采用两曲面熔接命令处理三个不等半径圆角曲面的方法优于直接采用三圆角曲面熔接的命令.  相似文献   

10.
CAGD里常用的Bezier曲线曲面除了可以用经典的Bernstein基形式表示外,还可以用算子形式表示.将Bezier曲线给出的定理推广到张量积Bwzier曲面和三角Bezier曲面上,并得到了相应的结论.  相似文献   

11.
采用方向导数,得到了矩形域上有理Bzier曲面的C~Υ拼接条件。  相似文献   

12.
由于Bezier曲线与曲面的特性,它在计算机的辅助几何设计方面得到广泛的应用。本文在分析Bezier曲线与曲面的基础上,提出了Bezier曲线与曲面极值问题,即最短Bezier曲线与最小Bezier曲面问题,并提出了用模式搜索法与在matlab中用变量极值函数来解决该问题的解法,最后通过实例验证了该解法。  相似文献   

13.
双三次有理Bezier曲面G1光滑拼接算法   总被引:1,自引:0,他引:1  
依据有理Bezier曲面理论,研究了有理Bezier曲面的拼接问题,给出了具有公共边界曲线的两张双三次有理Bezier曲面G1光滑拼接条件.  相似文献   

14.
In this paper, Bezier basis with shape parameter is constructed by an integral approach. Based on this basis, we define the Bezier curves with shape parameter. The Bezier basis curves with shape parameter have most properties of Bemstein basis and the Bezier curves. Moreover the shape parameter can adjust the curves' shape with the same control polygon. As the increase of the shape parameter, the Bezier curves with shape parameter approximate to the control polygon. In the last, the Bezier surface with shape parameter is also constructed and it has most properties of Bezier surface.  相似文献   

15.
Two kinds of B-basis of the algebraic hyperbolic space   总被引:15,自引:2,他引:15  
In this paper, two new kinds of B-basis functions called algebraic hyperbolic (AH) Bezier basis and AH B-Spline basis are presented in the space (?)k=span{1,t,...,tk-3,sinht,cosht}, in which K is an arbitrary integer larger than or equal to 3. They share most optimal properties as those of the Bezier basis and B-Spline basis respectively and can represent exactly some remarkable curves and surfaces such as the hyperbola, catenary, hyperbolic spiral and the hyperbolic paraboloid. The generation of tensor product surfaces of the AH B-Spline basis have two forms: AH B-Spline surface and AH T-Spline surface.  相似文献   

16.
OpenGL求值程序的应用   总被引:1,自引:0,他引:1  
该文简要介绍了OpenGL中求值程序的数学原理、函数原型及实现步骤,为绘制高质量的曲线(面)提供了一种处理方法。  相似文献   

17.
Applying homogeneous coordinates, we extend a newly appeared algorithm of best constrained multi-degree reduction for polynomial Bezier curves to the algorithms of constrained multi-degree reduction for rational Bezier curves. The idea is introducing two criteria, variance criterion and ratio criterion, for reparameterization of rational Bezier curves, which are used to make uniform the weights of the rational Bezier curves as accordant as possible, and then do multi-degree reduction for each component in homogeneous coordinates. Compared with the two traditional algorithms of "cancelling the best linear common divisor" and "shifted Chebyshev polynomial", the two new algorithms presented here using reparameterization have advantages of simplicity and fast computing, being able to preserve high degrees continuity at the end points of the curves, do multi-degree reduction at one time, and have good approximating effect.  相似文献   

18.
We decompose the problem of the optimal multi-degree reduction of Bezier curves with comers constraint into two simpler subproblems, namely making high order interpolations at the two endpoints without degree reduction, and doing optimal degree reduction without making high order interpolations at the two endpoints. Further, we convert the second subproblem into multi-degree reduction of Jacobi polynomials. Then, we can easily derive the optimal solution using orthonormality of Jacobi polynomials and the least square method of unequally accurate measurement. This method of 'divide and conquer' has several advantages including maintaining high continuity at the two endpoints of the curve, doing multi-degree reduction only once, using explicit approximation expressions, estimating error in advance, low time cost, and high precision. More importantly, it is not only deduced simply and directly, but also can be easily extended to the degree reduction of surfaces. Finally, we present two examples to demonstrate the effectiveness of our algorithm.  相似文献   

19.
研究了基于某种约束条件的有理Bezier曲线的形状修改,约束条件为曲线通过某个单点或多个点,或在端点处满足某种切矢条件。方法是修改控制点。目的是使得修改前后的曲线的控制点的改变量最小。给出了具体控制点的扰动的计算公式,且给出了具体实例。  相似文献   

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