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In the application of CAD/CAM. the target form of a curve, which is used for plotting or as the data supplied for CAM, is s set of points on (or near by) the curve,Using the subdivision algorithm, the procedure of curve generation from Control points→Mathematical form of the curve→Points on(or near by) the curve which is used in most systems for curve design, is simplified in this paper to Control points→Points on(or near by) the curve. We also discuss the conditions of shape preserving, polynomial reproducing, continuity as well as the convergent properties of the target curve. 相似文献
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《数学的实践与认识》2015,(23)
针对多目标线性优化问题进行研究,提出了一种基于效用加性方法(UTA)的多目标线性优化方法.利用不同目标值的组合给出训练方案,决策者针对训练方案给出一些偏好信息,据此推断决策者的效用函数,并进一步求解多目标线性优化模型.进一步给出了算例来说明方法的实施过程及验证可行性.方法较多的考虑了决策者对于决策的偏好,注重决策者的意见,为多目标决策问题提供了一种新的思路. 相似文献
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利用Delaunay三角网对目标区域进行剖分,在对地表温度进行高度插值后,运用二重积分的思想建立了基于Delaunayr三角剖分的地表平均温度测量模型.同时以南极地表平均温度的测量为例,将67个自动气象地表台站、46个气象地表台站以及56个高空气象观测站的加权平均温度与地表平均温度的数据进行分析,得到南极2015全年地表平均温度均在-8℃以下,最低温约为-20℃,符合南极大陆地表温度的实际情况. 相似文献
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通过分析1维和2维线性插值可以推导出任意斜角直线坐标系下n维线性插值的一般计算公式以及有唯一解的条件,这一结论能够应用于三维温度场计算。可以将n维插值问题归结如下:已知n 1维空间中的n 1个点的坐标以及第n 2个点的n个坐标分量xn 2,1,x n 2,2,,xn 2,n,求解该点的第n 1个坐标分量xn 2,n 1。根据线性插值定义,第n 2个点位于前n 1个点所确定的n维超平面上。根据这一条件列写方程、求解方程可得到插值xn 2,n 1。n维插值问题有唯一解的条件是已知的n 1个点在n维空间中构成的多面体的体积不为0。推导过程在斜角直线坐标系中完成,因而结论具有较大普适性。 相似文献
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Zheng Zhang · Xu Han · Chao Jiang State Key Laboratory of Advanced Design Manufacturing for Vehicle Body College of Mechanical Vehicle Engineering Hunan University Changsha China 《Acta Mechanica Sinica》2011,27(5):757-766
In this article,an effective technique is developed to efficiently obtain the output responses of parameterized structural dynamic problems.This technique is based on the conception of reduced basis method and the usage of linear interpolation principle.The original problem is projected onto the reduced basis space by linear interpolation projection,and subsequently an associated interpolation matrix is generated.To ensure the largest nonsingularity,the interpolation matrix needs to go through a timenode choosing process,which is developed by applying the angle of vector spaces.As a part of this technique,error estimation is recommended for achieving the computational error bound.To ensure the successful performance of this technique,the offline-online computational procedures are conducted in practical engineering.Two numerical examples demonstrate the accuracy and efficiency of the presented method. 相似文献
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