理查德森外推法

假定某一函數${\displaystyle D}$ 可數值近似（離散化）為${\displaystyle D\left(h\right)}$ ，其中${\displaystyle h}$ 為步長，

${\displaystyle D=D\left(h\right)+ah^{p}+bh^{q}+\ldots }$  （1）

其中${\displaystyle p}$ 為首項階數，${\displaystyle q}$ 下一項階數, 滿足${\displaystyle q>p}$ 。

考慮該函數又可以使用同樣的數值近似方法，以步長為${\displaystyle h_{2}}$ 做離散近似

${\displaystyle D=D\left(h_{2}\right)+ah_{2}^{p}+bh_{2}^{q}+\ldots }$  （2）

如果希望消掉式(1)中的${\displaystyle h^{p}}$ 項，我們可以對以上兩式相減，即(1)${\displaystyle -r}$ (2)，其中${\displaystyle r=\left({\frac {h}{h_{2}}}\right)^{p}}$ ：

${\displaystyle \left(1-r\right)D=D\left(h\right)+ah^{p}+bh^{q}-rD\left(h_{2}\right)-rah_{2}^{p}-rbh_{2}^{q}+\ldots =D\left(h\right)-rD\left(h_{2}\right)+a\underbrace {\left(h^{p}-rh_{2}^{p}\right)} _{0}+b\left(h^{q}-rh_{2}^{q}\right)}$ 

${\displaystyle \left(1-r\right)D=D\left(h\right)-rD\left(h_{2}\right)+b\left(h^{q}-rh_{2}^{q}\right)}$ 

${\displaystyle D={\frac {D\left(h\right)-rD\left(h_{2}\right)}{1-r}}+{\frac {b\left(h^{q}-rh_{2}^{q}\right)}{1-r}}={\frac {D\left(h\right)-rD\left(h_{2}\right)}{1-r}}+{\frac {b\left(1-r{\frac {h_{2}^{q}}{h^{q}}}\right)h^{q}}{1-r}}}$ 

${\displaystyle D={\frac {D\left(h\right)-rD\left(h_{2}\right)}{1-r}}+{\frac {b\left(1-\left({\frac {h}{h_{2}}}\right)^{p}\left({\frac {h_{2}}{h}}\right)^{q}\right)h^{q}}{1-r}}=\underbrace {\frac {D\left(h\right)-rD\left(h_{2}\right)}{1-r}} _{D^{\ast }\left(h\right)}+\underbrace {\frac {b\left(1-\left({\frac {h_{2}}{h}}\right)^{q-p}\right)}{1-r}} _{b^{\ast }}h^{q}}$ 

或簡記作：

${\displaystyle \therefore D=D^{\ast }\left(h\right)+b^{\ast }h^{q}}$ 

${\displaystyle D^{\ast }(h)}$ 代替了${\displaystyle D(h)}$ ，為${\displaystyle D}$ 的新的數值近似。新近似相比最初形式具有更高階的誤差項，數值精度由此提高，此方法即為理查德森外推法。

應用理查德森方法，改善用於近似微分的中心差分公式

${\displaystyle f'\left(x_{n}\right)={\underset {D\left(h\right)}{\underbrace {\frac {f\left(x_{n}+h\right)-f\left(x_{n}-h\right)}{2h}} }}-{\underset {a}{\underbrace {\frac {f'''\left(x_{n}\right)}{6}} }}h^{2}-{\underset {b}{\underbrace {\frac {f^{\left(5\right)}\left(x_{n}\right)}{120}} }}h^{4}}$ 

則由式(1)可知${\displaystyle p=2,q=4}$ , ${\displaystyle h_{2}=2h,r=\left({\frac {1}{2}}\right)^{p}={\frac {1}{4}}}$  代入公式：

${\displaystyle D^{\ast }={\frac {D\left(h\right)-rD\left(h_{2}\right)}{1-r}}={\frac {{\frac {f\left(x_{n}+h\right)-f\left(x_{n}-h\right)}{2h}}-{\frac {1}{4}}{\frac {f\left(x_{n}+2h\right)-f\left(x_{n}-2h\right)}{4h}}}{1-{\frac {1}{4}}}}}$ 

${\displaystyle D^{\ast }={\frac {8\left[f\left(x_{n}+h\right)-f\left(x_{n}-h\right)\right]-f\left(x_{n}+2h\right)+f\left(x_{n}-2h\right)}{12h}}}$ 

由此，中心差分公式精度由2階變為4階。

• Extrapolation Methods. Theory and Practice by C. Brezinski and M. Redivo Zaglia, North-Holland, 1991.

• Module for Richardson's Extrapolation, fullerton.edu
• Fundamental Methods of Numerical Extrapolation With Applications （頁面存檔備份，存於互聯網檔案館）, mit.edu
• Richardson-Extrapolation （頁面存檔備份，存於互聯網檔案館）
• Richardson extrapolation on a website of Robert Israel (University of British Columbia) （頁面存檔備份，存於互聯網檔案館）