1·Its result is close to the cubic spline interpolation.
接近三次样条插值的结果。
2·Elastic registration based on thin plate spline interpolation is deeply studied.
薄板样条插值是应用较多的弹性配准方法。
3·In general, spline interpolation functions don't fit the need of monotony property.
在实际问题中,一般的样条插值函数不满足单调递增性质。
4·This is the method of calculating it, and spline interpolation code, you can refer to.
这是计算方法里面的,样条插值代码,大家可以参考一下。
5·The interpolation result is C1 continuous and looks almost as smooth as spline interpolation.
插值结果 C1连续 ,视觉上的平滑性接近于样条插值。
6·This paper is concerned with the problem of quartic lacunary polynomial spline interpolation.
本文讨论四次缺插值多项式样条。
7·Temperature shifting is solved through temperature compensation with triple spline interpolation.
采用三维样条插值法进行温度补偿,很好的解决了温度漂移。
8·New results are: present new expression for the basic function of many knot spline interpolation;
主要的新结果是:对多结点样条基本函数的构造给出了新的表述;
9·In this paper we give a simple interpolation of rational function-difference spline interpolation.
给出一种简单的有理分式插值——差分样条插值。
10·This is the spline interpolation of source code, university courses calculation method is a case in point.
这是样条插值的源代码,是大学课程计算方法中的一个例子。