cardinal splines 中文意思是什麼
cardinal splines
解釋
基數樣條函數-
Some extremal properties of multivariate cardinal splines
樣條空間的極值性質 -
Spline curves defined in the space constructed by polynomial and hyperbolic functions are studied in this paper. the main research contents and achievements are as follow : firstly, we generate the cardinal extended complete chebychevian ( ect ) - systems on the space constructed by polynomial and hyperbolic functions, then introduce the algebraic - hyperbolic b - spline space and identify the dimension law and zero properties. the existence of a basis of splines with minimal compact supports is demonstrated, and functions named non - uniform algebraic - hyperbolic b - splines are obtained by solving certain linear equations with a block matrix
本文主要研究定義在多項式和雙曲函數構成的空間上的樣條曲線,其內容和完成結果如下:一、生成由多項式和雙曲函數構成的空間上的一組典範式ect ( extendedcompletechebychevian )組及其對偶, ,證明非均勻代數雙曲b樣條空間的維數定理和零點定理,直接通過解塊矩陣線性方程組得到具有最小緊支撐的非均勻代數雙曲b樣條函數,進而構造非均勻代數雙曲b樣條曲線,還具體給出低階的表示 -
To take advantage of the excellent localization character of wavelet, cardinal b - splines wavelet basis is used as a substitute for the traditional polynomial basis in this dissertation. related theories are expatiated first, and then a method is developed for using wavelet in efg
本文首先對有關的理論作了闡述,然後提出了採用小波基的具體實現方法,並通過多個算例說明了此方法具有的高精度。 -
Shows how to draw cardinal and bezier splines
演示如何繪制基數樣條和貝塞爾樣條。 -
Describes cardinal splines and how to draw them
描述基數樣條以及如何繪制基數樣條。 -
How to : draw cardinal splines
如何:繪制基數樣條曲線 -
Defines cardinal splines and identifies the classes needed to draw them
定義基數樣條並確定繪制這些形狀所需的類。
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