您要查找的是不是:
- Multivariate splines are applied widely in approximation theory, computer aided geometric design and finite element method. 多元样条在函数逼近、计算几何、计算机辅助几何设计和有限元等领域中均有很广泛的应用。
- multivariate spline 多元样条
- multivariate spline function 多元样条函数
- multivariate spline functions 多元样条函数
- Carl De Boor A Practical Guide to Spline. 样条函数实践指导。
- Describes a Bzier spline and how to draw one. 描述贝塞尔样条以及如何绘制贝塞尔样条。
- Outside surface is a spline through points. 外表是通过点的齿条。
- Adds a spline curve to the current figure. 向当前图形添加一段样条曲线。
- Creates an array of four points to define a spline. 创建一个包含四个点的数组来定义样条。
- The tension is shown for each spline. 每个样条都显示了张力。
- Spline function method of interpolation. 样条函数插值法。
- Second, the Bezier spline is very well controlled. 其次,贝塞尔曲线非常好控制。
- The prognosis was analyzed by Cox multivariate model. cox回归模型进行多因素预后分析。
- The Bzier spline is drawn from the first point to the fourth point. 在第一个点和第四个点之间绘制贝塞尔样条。
- multivariate splines 多元样条函数
- Overloaded. Draws a closed cardinal spline defined by an array of. 结构的数组定义的闭合基数样条。
- Draws a closed cardinal spline defined by an array of. 结构数组定义的闭合基数样条。
- This process heightens the use results of involute spline broach. 通过此种工艺的采用,提高了渐开线拉刀的使用效果。
- Multivariate analysis showed that CR rate was an independent prognostic factor. 多因素分析显示仅治疗后的cr率是独立预后因素。
- The Bezier spline is always anchored at the two end points. 贝塞尔曲线总是锚定在两个端点。