例句與造句

1. a cubic constrained rational interpolating spline and its approximation
   一種三次約束有理插值樣條及其逼近性質(zhì)
2. this paper first gives out an new derivation method of generalized interpolatin, splines, and then obtains the analytic properties of the generalized interpolating splines with obstacles by the new method
   摘要本文由樣條的極值性質(zhì)出發(fā)給出了微分算子插值樣條（即廣義插值樣條）新的推導(dǎo)方法。
3. in this paper, we construct a multi-resolution analysis of h2 ( i ) space using spline function and give the multi-level decomposition of a function through interpolating spline wavelet transform
   本文中我們給出了由樣條函數(shù)構(gòu)造的h~2(i)空間上的多分辨分析并利用樣條小波插值變換對函數(shù)進行多尺度分解。
4. thirdly, the effects on the cv rational interpolating splines from the perturbation of the two boundary conditions are analyzed . from this the error bounds of first and second derivatives of cv rational interpolating spline are given
   然后,分析了兩類端點條件的擾動對cv有理插值樣條函數(shù)的影響,給出了它們在非均勻節(jié)點處的一階和二階導(dǎo)數(shù)值的誤差界
5. thirdly, the effects on the cv rational interpolating splines from the perturbation of the two boundary conditions are analyzed . from this the error bounds of first and second derivatives of cv rational interpolating spline are given
   然后,分析了兩類端點條件的擾動對cv有理插值樣條函數(shù)的影響,給出了它們在非均勻節(jié)點處的一階和二階導(dǎo)數(shù)值的誤差界
6. It's difficult to find interpolating spline in a sentence. 用interpolating spline造句挺難的
7. lastly, the cv rational interpolating splines above are extended to the case of two variables . their existence and uniqueness are proved for two usually boundary conditions as well . the cv rational interpolating splines of two variables are represented as tensor product from of the case of simple variable
   最后,定義了二元cv有理插值樣條函數(shù),就兩類邊界條件證明了其存在唯一性,并建立了它的表達式,給出了廣義deboor算法
8. lastly, the cv rational interpolating splines above are extended to the case of two variables . their existence and uniqueness are proved for two usually boundary conditions as well . the cv rational interpolating splines of two variables are represented as tensor product from of the case of simple variable
   最后,定義了二元cv有理插值樣條函數(shù),就兩類邊界條件證明了其存在唯一性,并建立了它的表達式,給出了廣義deboor算法