Algorithm 1020: Computation of Multi-Degree Tchebycheffian B-Splines

H. Speleers
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引用次数: 6

Abstract

Multi-degree Tchebycheffian splines are splines with pieces drawn from extended (complete) Tchebycheff spaces, which may differ from interval to interval, and possibly of different dimensions. These are a natural extension of multi-degree polynomial splines. Under quite mild assumptions, they can be represented in terms of a so-called multi-degree Tchebycheffian B-spline (MDTB-spline) basis; such basis possesses all the characterizing properties of the classical polynomial B-spline basis. We present a practical framework to compute MDTB-splines, and provide an object-oriented implementation in Matlab. The implementation supports the construction, differentiation, and visualization of MDTB-splines whose pieces belong to Tchebycheff spaces that are null-spaces of constant-coefficient linear differential operators. The construction relies on an extraction operator that maps local Tchebycheffian Bernstein functions to the MDTB-spline basis of interest.
算法1020:多次tchbycheffian b样条的计算
多度Tchebycheffian样条是从扩展的(完全的)Tchebycheff空间中绘制的样条,这些空间可能因间隔而异,并且可能具有不同的维度。这是多次多项式样条的自然推广。在相当温和的假设下,它们可以用所谓的多次切比切夫b样条(mdtb样条)基来表示;这种基具有经典多项式b样条基的所有表征性质。我们提出了一个实用的mdtb样条计算框架,并在Matlab中提供了一个面向对象的实现。该实现支持mdtb样条的构造、微分和可视化,这些样条的片段属于常系数线性微分算子的零空间Tchebycheff空间。该构造依赖于一个提取算子,该算子将局部Tchebycheffian Bernstein函数映射到感兴趣的mdtb样条基。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
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