共查询到18条相似文献,搜索用时 203 毫秒
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研究了利用近似能量极小构造平面$C^1$三次Hermite插值曲线的方法.该方法的主要的目是求出$C^1$三次Hermite插值曲线的最佳切矢.通过将应变能、曲率变化能和组合能的近似函数极小化,得到了求解最佳切矢的线性方程组.通过求解发现,近似曲率变化能极小不存在唯一解, 而近似应变能极小和近似组合能极小由于方程系统的系数矩阵为严格对角占优故都存在唯一解.最后, 通过实例表明了本文方法构造平面$C^1$三次Hermite插值曲线的有效性. 相似文献
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利用三次Hermite插值公式给出了寻找曲线之间相似程度的算法,对于给定股票的任意一段曲线形状,文章利用该算法找出走势与之相似的股票,将原来只能寻找股价曲线满足特定形状(如W底)的股票的方法进行了推广,对于证券投资者来说是一个有效的工具.同时文章将相似算法应用于利用某只股票的历史走势来预测该股票价格的将来走势,具有有效的投资指导意义.实验证明,文章给出的算法是行之有效的. 相似文献
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一种有理三次保形插值样条王艳春,许有信(南京理工大学)(南京航空航天大学)ASHAPEPRESERVINGRATIONALCUBICINTERPOLATIONSPLINE¥WangYan-chun(NanjingUniversityofScience... 相似文献
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本文在等距分划上引入在似于文[1]的I型广义Hermlie样条插值,改进了Ⅱ型广义Hermite样条.与文[1]比较,我们证明了改进后的Ⅱ型广义Hermite样条插值的逼近精度得到了充分的提高.并利用这二种样条插值,讨论了对振荡积分,有限Fourier积分等的数值逼近. 相似文献
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一、引言给定插值数据点集{(x_i,y_i)}_(i-0)~n,在许多实际应用中(VLSI,CAD/CAM等),要求插值曲线除满足一定的光滑性条件外,还必须反映插值点集的整体几何性质。例如,通常要求单调(凸)数据产生的插值曲线是单调(凸)的。分段三次Hermite插值多项式是外形 相似文献
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构造了一种C^1连续的保单调的有理三次插值函数。由于函数表达式中含有调节参数,使得插值曲线更具灵活性。 相似文献
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基于函数空间{1,sint,cost,sin~2t,sin~3t,cos~3t}构造了一种形状可调的三次三角Hermite插值样条.该样条不仅具有带参数的Hermite型插值样条的主要特性,而且在插值节点为等距时可自动满足C2连续,其形状还可通过所带的参数进行调节.在适当条件下,该样条对应的Ferguson曲线可精确表示工程中一些常见的曲线. 相似文献
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The paper proposes a method for the construction of a shape preserving C2 function interpolating a given set of data. The constructed interpolant is a parametric cubic curve. The shape of the curve can be easily controlled via tension parameters which have an immediate geometric interpretation. The approximation order is investigated and numerical examples are presented. 相似文献
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Energy minimization has been widely used for constructing curve and surface in the fields such as computer-aided geometric design, computer graphics. However, our testing examples show that energy minimization does not optimize the shape of the curve sometimes. This paper studies the relationship between minimizing strain energy and curve shapes, the study is carried out by constructing a cubic Hermite curve with satisfactory shape. The cubic Hermite curve interpolates the positions and tangent vectors of two given endpoints. Computer simulation technique has become one of the methods of scientific discovery, the study process is carried out by numerical computation and computer simulation technique. Our result shows that: (1) cubic Hermite curves cannot be constructed by solely minimizing the strain energy; (2) by adoption of a local minimum value of the strain energy, the shapes of cubic Hermite curves could be determined for about 60 percent of all cases, some of which have unsatisfactory shapes, however. Based on strain energy model and analysis, a new model is presented for constructing cubic Hermite curves with satisfactory shapes, which is a modification of strain energy model. The new model uses an explicit formula to compute the magnitudes of the two tangent vectors, and has the properties: (1) it is easy to compute; (2) it makes the cubic Hermite curves have satisfactory shapes while holding the good property of minimizing strain energy for some cases in curve construction. The comparison of the new model with the minimum strain energy model is included. 相似文献
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Ying-guang Shi 《计算数学(英文版)》2001,19(2):151-156
1. IntroductionThis note deals with convergence of (0,1,2,3) illterpolation on an arbitrary system of nodes.Fisrt we illtroduce some definitions and notations.LetGiven a fiXed even integer m, let Ajk 6 Pm.--1 (the set of polynomials of degree at most mn-- 1)satisfyThen the (0,1,...,m--1) Hermite--Fej6r type illterpolation for f 6 C[--1, 1] is defined byand the (0,1,...,m--1) Hernilte interpolation for f e Cd--'[--1, 1] is defined by(of. [6]). We also need a well known fact:where 11' 11 sta… 相似文献
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最简型的Hermite插指 总被引:1,自引:1,他引:1
颜宁生 《应用数学与计算数学学报》2006,20(1):75-81
本文提出了Hermite插值问题的一种新形式,幂指数形式,简称Hermite插指。 相似文献
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For the approximation in $L_p$-norm, we determine the weakly asymptoticorders for the simultaneous approximation errors of Sobolev classes by piecewise cubic Hermite interpolation with equidistant knots. For $p = 1$, $∞$, we obtain its values.By these results we know that for the Sobolev classes, the approximation errors bypiecewise cubic Hermite interpolation are weakly equivalent to the correspondinginfinite-dimensional Kolmogorov widths. At the same time, the approximation errors of derivatives are weakly equivalent to the corresponding infinite-dimensionalKolmogorov widths. 相似文献
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Hermite interpolation is a very important tool in approximation theory and numerical analysis, and provides a popular method for modeling in the area of computer aided geometric design. However, the classical Hermite interpolant is unique for a prescribed data set,and hence lacks freedom for the choice of an interpolating curve, which is a crucial requirement in design environment. Even though there is a rather well developed fractal theory for Hermite interpolation that offers a large flexibility in the choice of interpolants, it also has the shortcoming that the functions that can be well approximated are highly restricted to the class of self-affine functions. The primary objective of this paper is to suggest a C1-cubic Hermite interpolation scheme using a fractal methodology, namely, the coalescence hidden variable fractal interpolation, which works equally well for the approximation of a self-affine and non-self-affine data generating functions. The uniform error bound for the proposed fractal interpolant is established to demonstrate that the convergence properties are similar to that of the classical Hermite interpolant. For the Hermite interpolation problem, if the derivative values are not actually prescribed at the knots, then we assign these values so that the interpolant gains global C2-continuity. Consequently, the procedure culminates with the construction of cubic spline coalescence hidden variable fractal interpolants. Thus, the present article also provides an alternative to the construction of cubic spline coalescence hidden variable fractal interpolation functions through moments proposed by Chand and Kapoor [Fractals, 15(1)(2007), pp. 41-53]. 相似文献
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