Truncated power function: Difference between revisions

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Line 1: In ~~the [[mathematical]] subfield of [[numerical analysis]]~~mathematics, the '''truncated power function'''<ref>{{cite ~~is a generalization of the [[indicator function]].~~book \|title=Interpolation and Approximation with Splines and Fractals \|first=Peter\|last=Massopust \|publisher= Oxford University Press, USA \|year=2010 \|isbn=978-0-19-533654-2 \|page=46 }}</ref> with exponent <math>n</math> is defined as :<math>f_x_+^n := ▼ ~~==Definition==~~ ~~\left\{~~\begin{~~matrix~~cases} ▼ x^n &:\ x > 0 \\ 0 &:\ x \le 0. \end{cases} </math> In particular, ~~Given a function ''f'' the '''truncated power function''' is defined as~~ :<math>x_+ = \begin{cases} ▲:<math>f_+^n := x &:\ x > 0 \\ ▲\left\{\begin{matrix} ~~f^n~~0 &~~\mbox{if}~~:\ fx \gele 0 \\. \end{cases} ~~0 &\mbox{if}\ f < 0~~ ~~\end{matrix}\right.~~ </math> and interpret the exponent as conventional [[power function\|power]]. ==Relations== * Truncated power functions can be used for construction of [[B-spline]]s. * <math>x \mapsto x_+^0</math> is the [[Heaviside function]]. :* <math>\chi_{([a,b])}(x) = (b-x)_+^0 - (a-x)_+^0</math> where <math>\chi</math> is the [[indicator function]].▼ * Truncated power functions are [[refinable function\|refinable]]. ==~~Notes~~ See also == * [[Macaulay brackets]] ==External links== ▲:<math>\chi_{(a,b]}(x) = (b-x)_+^0 - (a-x)_+^0</math> *[http://mathworld.wolfram.com/TruncatedPowerFunction.html Truncated Power Function on MathWorld]▼ ==~~External Links~~References== <references/> ▲[http://mathworld.wolfram.com/TruncatedPowerFunction.html Truncated Power Function on MathWorld] [[Category:Numerical analysis]]